# command line: # KaDE kin_phos_8.ka -print-efficiency -ode-backend DOTNET -with-symmetries Backward -dotnet-output network_kin_phos_8_with_bsym.net # THINGS THAT ARE KNOWN FROM KAPPA FILE AND KaSim OPTIONS: # # init - the initial abundances of each species and token # tinit - the initial simulation time (likely 0) # tend - the final simulation time # initialstep - initial time step at the beginning of numerical integration # maxstep - maximal time step for numerical integration # reltol - relative error tolerance; # abstol - absolute error tolerance; # period - the time period between points to return # # variables (init(i),y(i)) denote numbers of embeddings # rule rates are corrected by the number of automorphisms in the lhs of rules begin parameters 1 tinit 0 2 tend 1 3 period 0.01 4 Stot 100 5 kuS 0.01 6 kdPS 0.1 7 kPS 0.001 8 kpS 0.1 9 kdKS 1. 10 kKS 0.01 end parameters begin species 1 S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~u,x7~u,x8~u) 100 2 P(s) 100 3 K(s) 100 4 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~u,x7~u,x8~u!1) 0 5 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~u,x7~u!2,x8~u!1).K(s!2) 0 6 S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~u,x7~u,x8~p) 0 7 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~u,x7~u!1,x8~p) 0 8 S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~u,x7~u,x8~p!1).P(s!1) 0 9 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~u,x7~u!1,x8~p!2).P(s!2) 0 10 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~u!2,x7~u!1,x8~p!3).P(s!3).K(s!2) 0 11 S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~u,x7~p,x8~p!1).P(s!1) 0 12 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~u!1,x7~p,x8~p!2).P(s!2) 0 13 S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~u,x7~p!1,x8~p!2).P(s!1).P(s!2) 0 14 S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~u,x7~p,x8~p) 0 15 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~u!1,x7~p,x8~p) 0 16 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u!2,x6~u!1,x7~p,x8~p).K(s!2) 0 17 S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~p,x7~p,x8~p) 0 18 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u!1,x6~p,x7~p,x8~p) 0 19 S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~p,x7~p,x8~p!1).P(s!1) 0 20 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u!1,x6~p,x7~p,x8~p!2).P(s!2) 0 21 S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~p,x7~p!1,x8~p!2).P(s!2).P(s!1) 0 22 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u!1,x6~p,x7~p!2,x8~p!3).P(s!3).P(s!2) 0 23 S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~p!1,x7~p!2,x8~p!3).P(s!1).P(s!3).P(s!2) 0 24 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u!1,x6~p!2,x7~p!3,x8~p!4).P(s!4).P(s!3).P(s!2) 0 25 K(s!1).S(x1~u,x2~u,x3~u,x4~u!2,x5~u!1,x6~p!3,x7~p!4,x8~p!5).P(s!5).K(s!2).P(s!4).P(s!3) 0 26 S(x1~u,x2~u,x3~u,x4~u,x5~p,x6~p!1,x7~p!2,x8~p!3).P(s!2).P(s!3).P(s!1) 0 27 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~u!1,x7~p!2,x8~p!3).P(s!3).P(s!2) 0 28 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u!2,x6~u!1,x7~p!3,x8~p!4).P(s!4).K(s!2).P(s!3) 0 29 K(s!1).S(x1~u,x2~u,x3~u,x4~u!2,x5~u!3,x6~u!1,x7~p!4,x8~p!5).P(s!5).K(s!3).P(s!4).K(s!2) 0 30 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u!2,x6~u!1,x7~p,x8~p!3).P(s!3).K(s!2) 0 31 K(s!1).S(x1~u,x2~u,x3~u,x4~u!2,x5~u!3,x6~u!1,x7~p,x8~p!4).P(s!4).K(s!3).K(s!2) 0 32 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~u!1,x7~u!2,x8~p).K(s!2) 0 33 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u!2,x6~u!3,x7~u!1,x8~p).K(s!3).K(s!2) 0 34 K(s!1).S(x1~u,x2~u,x3~u,x4~u!2,x5~u!3,x6~u!4,x7~u!1,x8~p).K(s!4).K(s!3).K(s!2) 0 35 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u!2,x6~u!1,x7~u!3,x8~p!4).P(s!4).K(s!3).K(s!2) 0 36 K(s!1).S(x1~u,x2~u,x3~u,x4~u!2,x5~u!3,x6~u!4,x7~u!1,x8~p!5).P(s!5).K(s!4).K(s!3).K(s!2) 0 37 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u,x6~u!2,x7~u!1,x8~u!3).K(s!3).K(s!2) 0 38 K(s!1).S(x1~u,x2~u,x3~u,x4~u,x5~u!2,x6~u!3,x7~u!4,x8~u!1).K(s!4).K(s!3).K(s!2) 0 39 K(s!1).S(x1~u,x2~u,x3~u,x4~u!2,x5~u!3,x6~u!4,x7~u!5,x8~u!1).K(s!5).K(s!4).K(s!3).K(s!2) 0 40 K(s!1).S(x1~u,x2~u,x3~u!2,x4~u!3,x5~u!4,x6~u!5,x7~u!6,x8~u!1).K(s!6).K(s!5).K(s!4).K(s!3).K(s!2) 0 41 K(s!1).S(x1~u,x2~u!2,x3~u!3,x4~u!4,x5~u!5,x6~u!6,x7~u!7,x8~u!1).K(s!7).K(s!6).K(s!5).K(s!4).K(s!3).K(s!2) 0 42 K(s!1).S(x1~u,x2~u,x3~u!2,x4~u!3,x5~u!4,x6~u!1,x7~u!5,x8~p).K(s!5).K(s!4).K(s!3).K(s!2) 0 43 K(s!1).S(x1~u,x2~u!2,x3~u!3,x4~u!4,x5~u!5,x6~u!6,x7~u!1,x8~p).K(s!6).K(s!5).K(s!4).K(s!3).K(s!2) 0 44 K(s!1).S(x1~u,x2~u,x3~u!2,x4~u!3,x5~u!1,x6~u!4,x7~p,x8~p).K(s!4).K(s!3).K(s!2) 0 45 K(s!1).S(x1~u,x2~u,x3~u!2,x4~u!1,x5~u!3,x6~u!4,x7~u!5,x8~p!6).P(s!6).K(s!5).K(s!4).K(s!3).K(s!2) 0 46 K(s!1).S(x1~u,x2~u!2,x3~u!3,x4~u!4,x5~u!5,x6~u!6,x7~u!1,x8~p!7).P(s!7).K(s!6).K(s!5).K(s!4).K(s!3).K(s!2) 0 47 K(s!1).S(x1~u,x2~u,x3~u!2,x4~u!3,x5~u!4,x6~u!1,x7~p,x8~p!5).P(s!5).K(s!4).K(s!3).K(s!2) 0 48 K(s!1).S(x1~u,x2~u!2,x3~u!3,x4~u!4,x5~u!5,x6~u!1,x7~p,x8~p!6).P(s!6).K(s!5).K(s!4).K(s!3).K(s!2) 0 49 K(s!1).S(x1~u,x2~u,x3~u!2,x4~u!1,x5~u!3,x6~p,x7~p,x8~p!4).P(s!4).K(s!3).K(s!2) 0 50 K(s!1).S(x1~u,x2~u,x3~u!2,x4~u!1,x5~u!3,x6~u!4,x7~p!5,x8~p!6).P(s!6).K(s!4).P(s!5).K(s!3).K(s!2) 0 51 K(s!1).S(x1~u,x2~u!2,x3~u!3,x4~u!4,x5~u!5,x6~u!1,x7~p!6,x8~p!7).P(s!7).K(s!5).P(s!6).K(s!4).K(s!3).K(s!2) 0 52 K(s!1).S(x1~u,x2~u,x3~u!2,x4~u!3,x5~u!1,x6~p,x7~p!4,x8~p!5).P(s!5).K(s!3).P(s!4).K(s!2) 0 53 K(s!1).S(x1~u,x2~u!2,x3~u!3,x4~u!4,x5~u!1,x6~p,x7~p!5,x8~p!6).P(s!6).K(s!4).P(s!5).K(s!3).K(s!2) 0 54 K(s!1).S(x1~u,x2~u,x3~u,x4~u!2,x5~u!1,x6~p,x7~p!3,x8~p!4).P(s!4).K(s!2).P(s!3) 0 55 K(s!1).S(x1~u,x2~u,x3~u!1,x4~u!2,x5~p,x6~p,x7~p!3,x8~p!4).P(s!4).K(s!2).P(s!3) 0 56 K(s!1).S(x1~u,x2~u,x3~u!2,x4~u!1,x5~u!3,x6~p!4,x7~p!5,x8~p!6).P(s!6).K(s!3).P(s!5).P(s!4).K(s!2) 0 57 K(s!1).S(x1~u,x2~u!2,x3~u!3,x4~u!4,x5~u!1,x6~p!5,x7~p!6,x8~p!7).P(s!7).K(s!4).P(s!6).P(s!5).K(s!3).K(s!2) 0 58 K(s!1).S(x1~u,x2~u,x3~u!2,x4~u!1,x5~p,x6~p!3,x7~p!4,x8~p!5).P(s!5).K(s!2).P(s!4).P(s!3) 0 59 K(s!1).S(x1~u,x2~u!2,x3~u!3,x4~u!1,x5~p,x6~p!4,x7~p!5,x8~p!6).P(s!6).K(s!3).P(s!5).P(s!4).K(s!2) 0 60 K(s!1).S(x1~u,x2~u,x3~u,x4~u!1,x5~p,x6~p!2,x7~p!3,x8~p!4).P(s!2).P(s!4).P(s!3) 0 61 K(s!1).S(x1~u,x2~u,x3~u!1,x4~p,x5~p,x6~p!2,x7~p!3,x8~p!4).P(s!4).P(s!3).P(s!2) 0 62 K(s!1).S(x1~u,x2~u,x3~u!2,x4~u!1,x5~p!3,x6~p!4,x7~p!5,x8~p!6).P(s!6).K(s!2).P(s!5).P(s!4).P(s!3) 0 63 K(s!1).S(x1~u,x2~u!2,x3~u!3,x4~u!1,x5~p!4,x6~p!5,x7~p!6,x8~p!7).P(s!7).K(s!3).P(s!6).P(s!5).K(s!2).P(s!4) 0 64 K(s!1).S(x1~u,x2~u,x3~u,x4~u!1,x5~p!2,x6~p!3,x7~p!4,x8~p!5).P(s!2).P(s!5).P(s!4).P(s!3) 0 65 K(s!1).S(x1~u,x2~u,x3~u!1,x4~p,x5~p!2,x6~p!3,x7~p!4,x8~p!5).P(s!5).P(s!4).P(s!3).P(s!2) 0 66 K(s!1).S(x1~u,x2~u!2,x3~u!1,x4~p,x5~p!3,x6~p!4,x7~p!5,x8~p!6).P(s!6).K(s!2).P(s!5).P(s!4).P(s!3) 0 67 S(x1~u,x2~u,x3~u,x4~p,x5~p!1,x6~p!2,x7~p!3,x8~p!4).P(s!2).P(s!4).P(s!3).P(s!1) 0 68 S(x1~u,x2~u,x3~p,x4~p,x5~p!1,x6~p!2,x7~p!3,x8~p!4).P(s!2).P(s!4).P(s!3).P(s!1) 0 69 K(s!1).S(x1~u,x2~u,x3~u!1,x4~p!2,x5~p!3,x6~p!4,x7~p!5,x8~p!6).P(s!2).P(s!6).P(s!5).P(s!4).P(s!3) 0 70 K(s!1).S(x1~u,x2~u!2,x3~u!1,x4~p!3,x5~p!4,x6~p!5,x7~p!6,x8~p!7).P(s!7).K(s!2).P(s!6).P(s!5).P(s!4).P(s!3) 0 71 S(x1~u,x2~u,x3~u,x4~p!1,x5~p!2,x6~p!3,x7~p!4,x8~p!5).P(s!1).P(s!5).P(s!4).P(s!3).P(s!2) 0 72 S(x1~u,x2~u,x3~p,x4~p!1,x5~p!2,x6~p!3,x7~p!4,x8~p!5).P(s!1).P(s!5).P(s!4).P(s!3).P(s!2) 0 73 K(s!1).S(x1~u,x2~u!1,x3~p,x4~p!2,x5~p!3,x6~p!4,x7~p!5,x8~p!6).P(s!6).P(s!5).P(s!4).P(s!3).P(s!2) 0 74 S(x1~u,x2~u,x3~p!1,x4~p!2,x5~p!3,x6~p!4,x7~p!5,x8~p!6).P(s!1).P(s!6).P(s!5).P(s!4).P(s!3).P(s!2) 0 75 K(s!1).S(x1~u,x2~u!1,x3~p!2,x4~p!3,x5~p!4,x6~p!5,x7~p!6,x8~p!7).P(s!7).P(s!6).P(s!5).P(s!4).P(s!3).P(s!2) 0 76 K(s!1).S(x1~u!1,x2~u!2,x3~p!3,x4~p!4,x5~p!5,x6~p!6,x7~p!7,x8~p!8).P(s!8).K(s!2).P(s!7).P(s!6).P(s!5).P(s!4).P(s!3) 0 77 S(x1~u,x2~p,x3~p!1,x4~p!2,x5~p!3,x6~p!4,x7~p!5,x8~p!6).P(s!2).P(s!6).P(s!5).P(s!4).P(s!3).P(s!1) 0 78 K(s!1).S(x1~u!1,x2~p,x3~p!2,x4~p!3,x5~p!4,x6~p!5,x7~p!6,x8~p!7).P(s!7).P(s!6).P(s!5).P(s!4).P(s!3).P(s!2) 0 79 S(x1~u,x2~p!1,x3~p!2,x4~p!3,x5~p!4,x6~p!5,x7~p!6,x8~p!7).P(s!1).P(s!7).P(s!6).P(s!5).P(s!4).P(s!3).P(s!2) 0 80 S(x1~u,x2~p,x3~p,x4~p!1,x5~p!2,x6~p!3,x7~p!4,x8~p!5).P(s!1).P(s!5).P(s!4).P(s!3).P(s!2) 0 81 K(s!1).S(x1~u!1,x2~p,x3~p,x4~p!2,x5~p!3,x6~p!4,x7~p!5,x8~p!6).P(s!6).P(s!5).P(s!4).P(s!3).P(s!2) 0 82 S(x1~u,x2~p,x3~p,x4~p,x5~p!1,x6~p!2,x7~p!3,x8~p!4).P(s!2).P(s!4).P(s!3).P(s!1) 0 83 K(s!1).S(x1~u!1,x2~p,x3~p,x4~p,x5~p!2,x6~p!3,x7~p!4,x8~p!5).P(s!5).P(s!4).P(s!3).P(s!2) 0 84 S(x1~u,x2~p,x3~p,x4~p,x5~p,x6~p!1,x7~p!2,x8~p!3).P(s!1).P(s!3).P(s!2) 0 85 S(x1~u,x2~u,x3~p,x4~p,x5~p,x6~p!1,x7~p!2,x8~p!3).P(s!3).P(s!2).P(s!1) 0 86 K(s!1).S(x1~u,x2~u!1,x3~p,x4~p,x5~p,x6~p!2,x7~p!3,x8~p!4).P(s!4).P(s!3).P(s!2) 0 87 S(x1~u,x2~u,x3~p,x4~p,x5~p,x6~p,x7~p!1,x8~p!2).P(s!2).P(s!1) 0 88 S(x1~u,x2~u,x3~u,x4~p,x5~p,x6~p,x7~p!1,x8~p!2).P(s!2).P(s!1) 0 89 K(s!1).S(x1~u,x2~u,x3~u!1,x4~p,x5~p,x6~p,x7~p!2,x8~p!3).P(s!3).P(s!2) 0 90 S(x1~u,x2~u,x3~u,x4~p,x5~p,x6~p!1,x7~p!2,x8~p!3).P(s!3).P(s!2).P(s!1) 0 91 S(x1~u,x2~u,x3~u,x4~p,x5~p,x6~p,x7~p,x8~p!1).P(s!1) 0 92 S(x1~u,x2~u,x3~u,x4~u,x5~p,x6~p,x7~p,x8~p!1).P(s!1) 0 93 K(s!1).S(x1~u,x2~u,x3~u,x4~u!1,x5~p,x6~p,x7~p,x8~p!2).P(s!2) 0 94 S(x1~u,x2~u,x3~u,x4~u,x5~p,x6~p,x7~p!1,x8~p!2).P(s!2).P(s!1) 0 95 S(x1~u,x2~u,x3~u,x4~u,x5~p,x6~p,x7~p,x8~p) 0 96 K(s!1).S(x1~u,x2~u,x3~u,x4~u!1,x5~p,x6~p,x7~p,x8~p) 0 97 K(s!1).S(x1~u,x2~u,x3~u!2,x4~u!1,x5~p,x6~p,x7~p,x8~p).K(s!2) 0 98 S(x1~u,x2~u,x3~u,x4~p,x5~p,x6~p,x7~p,x8~p) 0 99 K(s!1).S(x1~u,x2~u,x3~u!1,x4~p,x5~p,x6~p,x7~p,x8~p) 0 100 K(s!1).S(x1~u,x2~u!2,x3~u!1,x4~p,x5~p,x6~p,x7~p,x8~p).K(s!2) 0 101 S(x1~u,x2~u,x3~p,x4~p,x5~p,x6~p,x7~p,x8~p) 0 102 K(s!1).S(x1~u,x2~u,x3~u!1,x4~p,x5~p,x6~p,x7~p,x8~p!2).P(s!2) 0 103 K(s!1).S(x1~u,x2~u!2,x3~u!1,x4~p,x5~p,x6~p,x7~p,x8~p!3).P(s!3).K(s!2) 0 104 S(x1~u,x2~u,x3~p,x4~p,x5~p,x6~p,x7~p,x8~p!1).P(s!1) 0 105 K(s!1).S(x1~u,x2~u!1,x3~p,x4~p,x5~p,x6~p,x7~p,x8~p!2).P(s!2) 0 106 K(s!1).S(x1~u!1,x2~u!2,x3~p,x4~p,x5~p,x6~p,x7~p,x8~p!3).P(s!3).K(s!2) 0 107 S(x1~u,x2~p,x3~p,x4~p,x5~p,x6~p,x7~p,x8~p!1).P(s!1) 0 108 K(s!1).S(x1~u,x2~u!1,x3~p,x4~p,x5~p,x6~p,x7~p!2,x8~p!3).P(s!3).P(s!2) 0 109 K(s!1).S(x1~u,x2~u!1,x3~p,x4~p,x5~p,x6~p,x7~p,x8~p) 0 110 K(s!1).S(x1~u!1,x2~u!2,x3~p,x4~p,x5~p,x6~p,x7~p,x8~p).K(s!2) 0 111 S(x1~u,x2~p,x3~p,x4~p,x5~p,x6~p,x7~p,x8~p) 0 112 K(s!1).S(x1~u!1,x2~p,x3~p,x4~p,x5~p,x6~p,x7~p,x8~p) 0 113 S(x1~p,x2~p,x3~p,x4~p,x5~p,x6~p,x7~p,x8~p) 0 114 K(s!1).S(x1~u!1,x2~p,x3~p,x4~p,x5~p,x6~p,x7~p,x8~p!2).P(s!2) 0 115 S(x1~p,x2~p,x3~p,x4~p,x5~p,x6~p,x7~p,x8~p!1).P(s!1) 0 116 K(s!1).S(x1~u!1,x2~p,x3~p,x4~p,x5~p,x6~p,x7~p!2,x8~p!3).P(s!3).P(s!2) 0 117 S(x1~u,x2~p,x3~p,x4~p,x5~p,x6~p,x7~p!1,x8~p!2).P(s!2).P(s!1) 0 118 S(x1~p,x2~p,x3~p,x4~p,x5~p,x6~p,x7~p!1,x8~p!2).P(s!2).P(s!1) 0 119 K(s!1).S(x1~u!1,x2~p,x3~p,x4~p,x5~p,x6~p!2,x7~p!3,x8~p!4).P(s!4).P(s!3).P(s!2) 0 120 S(x1~p,x2~p,x3~p,x4~p,x5~p,x6~p!1,x7~p!2,x8~p!3).P(s!2).P(s!3).P(s!1) 0 121 S(x1~p,x2~p,x3~p,x4~p,x5~p!1,x6~p!2,x7~p!3,x8~p!4).P(s!4).P(s!3).P(s!2).P(s!1) 0 122 S(x1~p,x2~p,x3~p,x4~p!1,x5~p!2,x6~p!3,x7~p!4,x8~p!5).P(s!5).P(s!4).P(s!3).P(s!2).P(s!1) 0 123 S(x1~p,x2~p,x3~p!1,x4~p!2,x5~p!3,x6~p!4,x7~p!5,x8~p!6).P(s!6).P(s!5).P(s!4).P(s!3).P(s!2).P(s!1) 0 124 S(x1~p,x2~p!1,x3~p!2,x4~p!3,x5~p!4,x6~p!5,x7~p!6,x8~p!7).P(s!7).P(s!6).P(s!5).P(s!4).P(s!3).P(s!2).P(s!1) 0 125 S(x1~p!1,x2~p!2,x3~p!3,x4~p!4,x5~p!5,x6~p!6,x7~p!7,x8~p!8).P(s!1).P(s!8).P(s!7).P(s!6).P(s!5).P(s!4).P(s!3).P(s!2) 0 126 K(s!1).S(x1~u!1,x2~u!2,x3~p,x4~p,x5~p,x6~p,x7~p!3,x8~p!4).P(s!4).K(s!2).P(s!3) 0 127 K(s!1).S(x1~u!2,x2~u!1,x3~p,x4~p,x5~p,x6~p!3,x7~p!4,x8~p!5).P(s!5).K(s!2).P(s!4).P(s!3) 0 128 K(s!1).S(x1~u!1,x2~u!2,x3~p,x4~p,x5~p!3,x6~p!4,x7~p!5,x8~p!6).P(s!6).K(s!2).P(s!5).P(s!4).P(s!3) 0 129 K(s!1).S(x1~u,x2~u!1,x3~u!2,x4~p,x5~p,x6~p,x7~p!3,x8~p!4).P(s!4).K(s!2).P(s!3) 0 130 K(s!1).S(x1~u!1,x2~u!2,x3~u!3,x4~p,x5~p,x6~p,x7~p!4,x8~p!5).P(s!5).K(s!3).P(s!4).K(s!2) 0 131 K(s!1).S(x1~u,x2~u!2,x3~u!1,x4~p,x5~p,x6~p!3,x7~p!4,x8~p!5).P(s!5).K(s!2).P(s!4).P(s!3) 0 132 K(s!1).S(x1~u,x2~u,x3~u!2,x4~u!1,x5~p,x6~p,x7~p,x8~p!3).P(s!3).K(s!2) 0 133 K(s!1).S(x1~u,x2~u!2,x3~u!3,x4~u!1,x5~p,x6~p,x7~p,x8~p!4).P(s!4).K(s!3).K(s!2) 0 134 K(s!1).S(x1~u,x2~u,x3~u,x4~u!1,x5~u!2,x6~p,x7~p,x8~p).K(s!2) 0 135 K(s!1).S(x1~u,x2~u,x3~u!2,x4~u!3,x5~u!1,x6~p,x7~p,x8~p).K(s!3).K(s!2) 0 136 K(s!1).S(x1~u,x2~u,x3~u,x4~u!2,x5~u!1,x6~p,x7~p,x8~p!3).P(s!3).K(s!2) 0 137 K(s!1).S(x1~u,x2~u!2,x3~u!3,x4~u!4,x5~u!1,x6~p,x7~p,x8~p).K(s!4).K(s!3).K(s!2) 0 138 K(s!1).S(x1~u!1,x2~u!2,x3~u!3,x4~u!4,x5~u!5,x6~p,x7~p,x8~p).K(s!5).K(s!4).K(s!3).K(s!2) 0 139 K(s!1).S(x1~u,x2~u!2,x3~u!1,x4~u!3,x5~p,x6~p,x7~p,x8~p).K(s!3).K(s!2) 0 140 K(s!1).S(x1~u,x2~u!2,x3~u!3,x4~u!1,x5~u!4,x6~p,x7~p,x8~p!5).P(s!5).K(s!4).K(s!3).K(s!2) 0 141 K(s!1).S(x1~u!1,x2~u!2,x3~u!3,x4~u!4,x5~u!5,x6~p,x7~p,x8~p!6).P(s!6).K(s!5).K(s!4).K(s!3).K(s!2) 0 142 K(s!1).S(x1~u!2,x2~u!3,x3~u!1,x4~u!4,x5~p,x6~p,x7~p,x8~p!5).P(s!5).K(s!4).K(s!3).K(s!2) 0 143 K(s!1).S(x1~u!2,x2~u!3,x3~u!4,x4~u!5,x5~u!1,x6~p,x7~p!6,x8~p!7).P(s!7).K(s!5).P(s!6).K(s!4).K(s!3).K(s!2) 0 144 K(s!1).S(x1~u,x2~u!2,x3~u!3,x4~u!4,x5~u!5,x6~u!1,x7~p,x8~p).K(s!5).K(s!4).K(s!3).K(s!2) 0 145 K(s!1).S(x1~u!1,x2~u!2,x3~u!3,x4~u!4,x5~u!5,x6~u!6,x7~p,x8~p).K(s!6).K(s!5).K(s!4).K(s!3).K(s!2) 0 146 K(s!1).S(x1~u!2,x2~u!3,x3~u!4,x4~u!5,x5~u!6,x6~u!1,x7~p,x8~p!7).P(s!7).K(s!6).K(s!5).K(s!4).K(s!3).K(s!2) 0 147 K(s!1).S(x1~u!2,x2~u!1,x3~u!3,x4~u!4,x5~u!5,x6~u!6,x7~p!7,x8~p!8).P(s!8).K(s!6).P(s!7).K(s!5).K(s!4).K(s!3).K(s!2) 0 148 K(s!1).S(x1~u!2,x2~u!3,x3~u!1,x4~u!4,x5~p,x6~p,x7~p!5,x8~p!6).P(s!6).K(s!4).P(s!5).K(s!3).K(s!2) 0 149 K(s!1).S(x1~u!2,x2~u!1,x3~u!3,x4~u!4,x5~u!5,x6~p!6,x7~p!7,x8~p!8).P(s!8).K(s!5).P(s!7).P(s!6).K(s!4).K(s!3).K(s!2) 0 150 K(s!1).S(x1~u!2,x2~u!3,x3~u!4,x4~u!1,x5~p,x6~p!5,x7~p!6,x8~p!7).P(s!7).K(s!4).P(s!6).P(s!5).K(s!3).K(s!2) 0 151 K(s!1).S(x1~u!2,x2~u!1,x3~u!3,x4~p,x5~p,x6~p!4,x7~p!5,x8~p!6).P(s!6).K(s!3).P(s!5).P(s!4).K(s!2) 0 152 K(s!1).S(x1~u!2,x2~u!1,x3~u!3,x4~u!4,x5~p!5,x6~p!6,x7~p!7,x8~p!8).P(s!8).K(s!4).P(s!7).P(s!6).K(s!3).K(s!2).P(s!5) 0 153 K(s!1).S(x1~u!2,x2~u!3,x3~u!1,x4~p,x5~p!4,x6~p!5,x7~p!6,x8~p!7).P(s!7).K(s!3).P(s!6).P(s!5).K(s!2).P(s!4) 0 154 K(s!1).S(x1~u!2,x2~u!1,x3~u!3,x4~p!4,x5~p!5,x6~p!6,x7~p!7,x8~p!8).P(s!8).K(s!3).P(s!7).P(s!6).K(s!2).P(s!5).P(s!4) 0 155 K(s!1).S(x1~u!2,x2~u!1,x3~p,x4~p!3,x5~p!4,x6~p!5,x7~p!6,x8~p!7).P(s!7).K(s!2).P(s!6).P(s!5).P(s!4).P(s!3) 0 156 K(s!1).S(x1~u,x2~u!2,x3~u!1,x4~u!3,x5~p,x6~p,x7~p!4,x8~p!5).P(s!5).K(s!3).P(s!4).K(s!2) 0 157 K(s!1).S(x1~u!2,x2~u!1,x3~u!3,x4~p,x5~p,x6~p,x7~p,x8~p!4).P(s!4).K(s!3).K(s!2) 0 158 K(s!1).S(x1~u!2,x2~u!1,x3~u!3,x4~u!4,x5~p,x6~p,x7~p,x8~p).K(s!4).K(s!3).K(s!2) 0 159 K(s!1).S(x1~u!2,x2~u!3,x3~u!1,x4~p,x5~p,x6~p,x7~p,x8~p).K(s!3).K(s!2) 0 160 K(s!1).S(x1~u,x2~u!1,x3~p,x4~p,x5~p!2,x6~p!3,x7~p!4,x8~p!5).P(s!2).P(s!5).P(s!4).P(s!3) 0 161 K(s!1).S(x1~u,x2~u,x3~u,x4~u!1,x5~p,x6~p,x7~p!2,x8~p!3).P(s!3).P(s!2) 0 162 K(s!1).S(x1~u!1,x2~p!2,x3~p!3,x4~p!4,x5~p!5,x6~p!6,x7~p!7,x8~p!8).P(s!8).P(s!7).P(s!6).P(s!5).P(s!4).P(s!3).P(s!2) 0 163 S(x1~u,x2~u,x3~u,x4~u,x5~p!1,x6~p!2,x7~p!3,x8~p!4).P(s!2).P(s!4).P(s!3).P(s!1) 0 164 K(s!1).S(x1~u,x2~u,x3~u,x4~u!2,x5~u!1,x6~u!3,x7~p,x8~p).K(s!3).K(s!2) 0 165 K(s!1).S(x1~u!1,x2~u!2,x3~u!3,x4~u!4,x5~u!5,x6~u!6,x7~u!7,x8~p!8).P(s!8).K(s!7).K(s!6).K(s!5).K(s!4).K(s!3).K(s!2) 0 166 K(s!1).S(x1~u!1,x2~u!2,x3~u!3,x4~u!4,x5~u!5,x6~u!6,x7~u!7,x8~p).K(s!7).K(s!6).K(s!5).K(s!4).K(s!3).K(s!2) 0 167 K(s!1).S(x1~u!1,x2~u!2,x3~u!3,x4~u!4,x5~u!5,x6~u!6,x7~u!7,x8~u!8).K(s!8).K(s!7).K(s!6).K(s!5).K(s!4).K(s!3).K(s!2) 0 end species begin reactions # rule : K(s!1), S(x8~u!1) -> K(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) + K(s) 1 5 3,7 kpS # rule : K(s!1), S(x8~u!1) -> K(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) + K(s) 2 5 3,4 kdKS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) + K(s) 3 5 3,7 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) + K(s) 4 5 3,4 kdKS # rule : K(s), S(x6~u) -> K(s!1), S(x6~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) 5 3,5 37 kKS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) 6 3,5 37 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) 7 3,5 37 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) 8 3,5 37 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) 9 3,5 37 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) 10 3,5 37 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) 11 2,7 9 kPS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p) + K(s) 12 7 3,14 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p) + K(s) 13 7 3,6 kdKS # rule : K(s), S(x6~u) -> K(s!1), S(x6~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) 14 3,7 32 kKS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) 15 3,7 32 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) 16 3,7 32 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) 17 3,7 32 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) 18 3,7 32 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) 19 3,7 32 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) + P(s) 20 10 2,5 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) + P(s) 21 10 2,32 kdPS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) + K(s) 22 10 3,12 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) + K(s) 23 10 3,9 kdKS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) + K(s) 24 10 3,12 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) + K(s) 25 10 3,9 kdKS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) 26 3,10 35 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) 27 3,10 35 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) 28 3,10 35 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) 29 3,10 35 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) 30 3,10 35 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) + P(s) 31 12 2,7 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) + P(s) 32 12 2,15 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) 33 2,12 27 kPS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p!1), P(s!1) + K(s) 34 12 3,19 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p!1), P(s!1) + K(s) 35 12 3,11 kdKS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) 36 3,12 30 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) 37 3,12 30 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) 38 3,12 30 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) 39 3,12 30 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) 40 3,12 30 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p!1, x8~p!2), P(s!1), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p!1), P(s!1) + P(s) 41 13 2,8 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p!1, x8~p!2), P(s!1), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p!1), P(s!1) + P(s) 42 13 2,11 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p!1, x8~p!2), P(s!1), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p!1), P(s!1) + P(s) 43 13 2,8 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p!1, x8~p!2), P(s!1), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p!1), P(s!1) + P(s) 44 13 2,11 kdPS # rule : K(s), S(x6~u) -> K(s!1), S(x6~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p!1, x8~p!2), P(s!1), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) 45 3,13 27 kKS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p!1, x8~p!2), P(s!1), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) 46 3,13 27 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p!1, x8~p!2), P(s!1), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) 47 3,13 27 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p!1, x8~p!2), P(s!1), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) 48 3,13 27 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p!1, x8~p!2), P(s!1), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) 49 3,13 27 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p!1, x8~p!2), P(s!1), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) 50 3,13 27 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) 51 2,16 30 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) 52 2,16 30 kPS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) + K(s) 53 16 3,18 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) + K(s) 54 16 3,15 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) + K(s) 55 16 3,18 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) + K(s) 56 16 3,15 kdKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) 57 3,16 164 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) 58 3,16 164 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) 59 3,16 164 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) 60 3,16 164 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) 61 2,18 20 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) 62 2,18 20 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) 63 2,18 20 kPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p) + K(s) 64 18 3,95 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p) + K(s) 65 18 3,17 kdKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) 66 3,18 134 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) 67 3,18 134 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) 68 3,18 134 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) 69 3,18 134 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) + P(s) 70 20 2,15 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) + P(s) 71 20 2,18 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 72 2,20 22 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 73 2,20 22 kPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) 74 20 3,92 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p!1), P(s!1) + K(s) 75 20 3,19 kdKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 76 3,20 136 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 77 3,20 136 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 78 3,20 136 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 79 3,20 136 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) + P(s) 80 22 2,12 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) + P(s) 81 22 2,20 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) + P(s) 82 22 2,12 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) + P(s) 83 22 2,20 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 84 2,22 24 kPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) 85 22 3,94 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) 86 22 3,21 kdKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 87 3,22 54 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 88 3,22 54 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 89 3,22 54 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 90 3,22 54 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 91 25 2,28 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 92 25 2,54 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 93 25 2,28 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 94 25 2,54 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 95 25 2,28 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 96 25 2,54 kdPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) + K(s) 97 25 3,60 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) 98 25 3,24 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) + K(s) 99 25 3,60 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) 100 25 3,24 kdKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) 101 3,25 56 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) 102 3,25 56 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) 103 3,25 56 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 104 26 2,21 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 105 26 2,94 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 106 26 2,21 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 107 26 2,94 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 108 26 2,21 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 109 26 2,94 kdPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) 110 2,26 163 kPS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) 111 3,26 60 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) 112 3,26 60 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) 113 3,26 60 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) 114 3,26 60 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) 115 29 2,35 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) 116 29 2,31 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) 117 29 2,35 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) 118 29 2,31 kdPS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 119 29 3,54 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 120 29 3,28 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 121 29 3,54 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 122 29 3,28 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 123 29 3,54 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 124 29 3,28 kdKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) 125 3,29 50 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) 126 3,29 50 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) 127 3,29 50 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) + P(s) 128 31 2,33 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) + P(s) 129 31 2,164 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 130 2,31 29 kPS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 131 31 3,136 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 132 31 3,30 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 133 31 3,136 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 134 31 3,30 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 135 31 3,136 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 136 31 3,30 kdKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 137 3,31 47 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 138 3,31 47 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 139 3,31 47 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 140 2,34 36 kPS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) + K(s) 141 34 3,164 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) + K(s) 142 34 3,33 kdKS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) + K(s) 143 34 3,164 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) + K(s) 144 34 3,33 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) + K(s) 145 34 3,164 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) + K(s) 146 34 3,33 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) + K(s) 147 34 3,164 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) + K(s) 148 34 3,33 kdKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) 149 3,34 42 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) 150 3,34 42 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) 151 3,34 42 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) + P(s) 152 36 2,38 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) + P(s) 153 36 2,34 kdPS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 154 36 3,31 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 155 36 3,35 kdKS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 156 36 3,31 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 157 36 3,35 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 158 36 3,31 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 159 36 3,35 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 160 36 3,31 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 161 36 3,35 kdKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 162 3,36 45 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 163 3,36 45 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 164 3,36 45 kKS # rule : K(s!1), S(x8~u!1) -> K(s), S(x8~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!8), K(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 165 167 3,166 kpS # rule : K(s!1), S(x8~u!1) -> K(s), S(x8~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!8), K(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 166 167 3,41 kdKS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!8), K(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 167 167 3,166 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!8), K(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 168 167 3,41 kdKS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!8), K(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 169 167 3,166 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!8), K(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 170 167 3,41 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!8), K(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 171 167 3,166 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!8), K(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 172 167 3,41 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!8), K(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 173 167 3,166 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!8), K(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 174 167 3,41 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!8), K(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 175 167 3,166 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!8), K(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 176 167 3,41 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!8), K(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 177 167 3,166 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!8), K(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 178 167 3,41 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!8), K(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 179 167 3,166 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!8), K(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 180 167 3,41 kdKS # rule : K(s!1), S(x8~u!1) -> K(s), S(x8~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 181 41 3,43 kpS # rule : K(s!1), S(x8~u!1) -> K(s), S(x8~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 182 41 3,40 kdKS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 183 41 3,43 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 184 41 3,40 kdKS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 185 41 3,43 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 186 41 3,40 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 187 41 3,43 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 188 41 3,40 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 189 41 3,43 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 190 41 3,40 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 191 41 3,43 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 192 41 3,40 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 193 41 3,43 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 194 41 3,40 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!8), K(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 195 3,41 167 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 196 2,43 46 kPS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 197 43 3,144 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 198 43 3,42 kdKS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 199 43 3,144 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 200 43 3,42 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 201 43 3,144 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 202 43 3,42 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 203 43 3,144 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 204 43 3,42 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 205 43 3,144 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 206 43 3,42 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 207 43 3,144 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 208 43 3,42 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 209 3,43 166 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 210 2,44 47 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 211 2,44 47 kPS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 212 44 3,135 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) + K(s) 213 44 3,164 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 214 44 3,135 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) + K(s) 215 44 3,164 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 216 44 3,135 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) + K(s) 217 44 3,164 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 218 44 3,135 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) + K(s) 219 44 3,164 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) 220 3,44 144 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) 221 3,44 144 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p!8), P(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 222 2,166 165 kPS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 223 166 3,145 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 224 166 3,43 kdKS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 225 166 3,145 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 226 166 3,43 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 227 166 3,145 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 228 166 3,43 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 229 166 3,145 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 230 166 3,43 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 231 166 3,145 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 232 166 3,43 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 233 166 3,145 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 234 166 3,43 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 235 166 3,145 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 236 166 3,43 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p!8), P(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 237 165 2,41 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p!8), P(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 238 165 2,166 kdPS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p!8), P(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 239 165 3,146 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p!8), P(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 240 165 3,46 kdKS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p!8), P(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 241 165 3,146 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p!8), P(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 242 165 3,46 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p!8), P(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 243 165 3,146 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p!8), P(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 244 165 3,46 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p!8), P(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 245 165 3,146 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p!8), P(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 246 165 3,46 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p!8), P(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 247 165 3,146 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p!8), P(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 248 165 3,46 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p!8), P(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 249 165 3,146 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p!8), P(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 250 165 3,46 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p!8), P(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 251 165 3,146 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p!8), P(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 252 165 3,46 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 253 46 2,40 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 254 46 2,43 kdPS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 255 46 3,48 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 256 46 3,45 kdKS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 257 46 3,48 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 258 46 3,45 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 259 46 3,48 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 260 46 3,45 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 261 46 3,48 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 262 46 3,45 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 263 46 3,48 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 264 46 3,45 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 265 46 3,48 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 266 46 3,45 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~p!8), P(s!8), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 267 3,46 165 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 268 48 2,42 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 269 48 2,144 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) 270 2,48 51 kPS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 271 48 3,140 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 272 48 3,47 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 273 48 3,140 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 274 48 3,47 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 275 48 3,140 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 276 48 3,47 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 277 48 3,140 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 278 48 3,47 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 279 48 3,140 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 280 48 3,47 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 281 3,48 146 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 282 2,164 31 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 283 2,164 31 kPS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) + K(s) 284 164 3,134 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) + K(s) 285 164 3,16 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) + K(s) 286 164 3,134 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) + K(s) 287 164 3,16 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) + K(s) 288 164 3,134 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) + K(s) 289 164 3,16 kdKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) 290 3,164 44 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) 291 3,164 44 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) 292 3,164 44 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~u!3, x7~p, x8~p), K(s!3), K(s!2) + P(s) 293 49 2,164 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) + P(s) 294 49 2,135 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 295 2,49 52 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 296 2,49 52 kPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 297 49 3,132 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 298 49 3,136 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 299 49 3,132 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 300 49 3,136 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 301 49 3,132 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 302 49 3,136 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 303 3,49 140 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 304 3,49 140 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 305 51 2,45 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 306 51 2,48 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 307 51 2,45 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 308 51 2,48 kdPS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 309 51 3,53 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 310 51 3,50 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 311 51 3,53 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 312 51 3,50 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 313 51 3,53 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 314 51 3,50 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 315 51 3,53 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 316 51 3,50 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 317 51 3,53 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 318 51 3,50 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p!7, x8~p!8), P(s!8), K(s!6), P(s!7), K(s!5), K(s!4), K(s!3), K(s!2) 319 3,51 147 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + P(s) 320 53 2,47 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + P(s) 321 53 2,140 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + P(s) 322 53 2,47 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + P(s) 323 53 2,140 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) 324 2,53 57 kPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 325 53 3,156 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 326 53 3,52 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 327 53 3,156 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 328 53 3,52 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 329 53 3,156 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 330 53 3,52 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 331 53 3,156 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 332 53 3,52 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) 333 3,53 143 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) 334 54 2,30 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) 335 54 2,136 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) 336 54 2,30 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) 337 54 2,136 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 338 2,54 25 kPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 339 54 3,161 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 340 54 3,22 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 341 54 3,161 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 342 54 3,22 kdKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 343 3,54 52 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 344 3,54 52 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 345 3,54 52 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) 346 55 2,136 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) 347 55 2,132 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) 348 55 2,136 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) 349 55 2,132 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 350 2,55 58 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 351 2,55 58 kPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 352 55 3,89 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 353 55 3,161 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 354 55 3,89 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 355 55 3,161 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 356 3,55 156 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 357 3,55 156 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + P(s) 358 57 2,50 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + P(s) 359 57 2,53 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + P(s) 360 57 2,50 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + P(s) 361 57 2,53 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + P(s) 362 57 2,50 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + P(s) 363 57 2,53 kdPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) 364 57 3,59 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) 365 57 3,56 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) 366 57 3,59 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) 367 57 3,56 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) 368 57 3,59 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) 369 57 3,56 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) 370 57 3,59 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) 371 57 3,56 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!5), P(s!7), P(s!6), K(s!4), K(s!3), K(s!2) 372 3,57 149 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) 373 59 2,52 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) 374 59 2,156 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) 375 59 2,52 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) 376 59 2,156 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) 377 59 2,52 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) 378 59 2,156 kdPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) 379 2,59 63 kPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) 380 59 3,131 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) 381 59 3,58 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) 382 59 3,131 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) 383 59 3,58 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) 384 59 3,131 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) 385 59 3,58 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) 386 3,59 150 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 387 60 2,22 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 388 60 2,161 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 389 60 2,22 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 390 60 2,161 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 391 60 2,22 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 392 60 2,161 kdPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) 393 2,60 64 kPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + K(s) 394 60 3,90 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + K(s) 395 60 3,26 kdKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 396 3,60 58 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 397 3,60 58 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 398 3,60 58 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 399 61 2,161 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 400 61 2,89 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 401 61 2,161 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 402 61 2,89 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 403 61 2,161 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 404 61 2,89 kdPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) 405 2,61 65 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) 406 2,61 65 kPS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + K(s) 407 61 3,85 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + K(s) 408 61 3,90 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 409 3,61 131 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 410 3,61 131 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) 411 63 2,56 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) 412 63 2,59 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) 413 63 2,56 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) 414 63 2,59 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) 415 63 2,56 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) 416 63 2,59 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) 417 63 2,56 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) 418 63 2,59 kdPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + K(s) 419 63 3,66 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + K(s) 420 63 3,62 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + K(s) 421 63 3,66 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + K(s) 422 63 3,62 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + K(s) 423 63 3,66 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + K(s) 424 63 3,62 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + K(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!4), P(s!7), P(s!6), K(s!3), K(s!2), P(s!5) 425 3,63 152 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 426 64 2,24 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) + P(s) 427 64 2,60 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 428 64 2,24 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) + P(s) 429 64 2,60 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 430 64 2,24 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) + P(s) 431 64 2,60 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 432 64 2,24 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) + P(s) 433 64 2,60 kdPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + K(s) 434 64 3,67 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + K(s) 435 64 3,163 kdKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) 436 3,64 62 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) 437 3,64 62 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) 438 3,64 62 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 439 66 2,58 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 440 66 2,131 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 441 66 2,58 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 442 66 2,131 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 443 66 2,58 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 444 66 2,131 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 445 66 2,58 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 446 66 2,131 kdPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) 447 2,66 70 kPS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + K(s) 448 66 3,160 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 449 66 3,65 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + K(s) 450 66 3,160 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 451 66 3,65 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) 452 3,66 153 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + P(s) 453 67 2,26 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) 454 67 2,90 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + P(s) 455 67 2,26 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) 456 67 2,90 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + P(s) 457 67 2,26 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) 458 67 2,90 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + P(s) 459 67 2,26 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) 460 67 2,90 kdPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) 461 2,67 71 kPS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) 462 3,67 65 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) 463 3,67 65 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) 464 3,67 65 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) 465 68 2,90 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) 466 68 2,85 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) 467 68 2,90 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) 468 68 2,85 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) 469 68 2,90 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) 470 68 2,85 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) 471 68 2,90 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) 472 68 2,85 kdPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) -> S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) 473 2,68 72 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) -> S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) 474 2,68 72 kPS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) 475 3,68 160 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) 476 3,68 160 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 477 70 2,62 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 478 70 2,66 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 479 70 2,62 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 480 70 2,66 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 481 70 2,62 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 482 70 2,66 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 483 70 2,62 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 484 70 2,66 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 485 70 2,62 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 486 70 2,66 kdPS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 487 70 3,73 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + K(s) 488 70 3,69 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 489 70 3,73 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + K(s) 490 70 3,69 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!3), P(s!7), P(s!6), K(s!2), P(s!5), P(s!4) 491 3,70 154 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + P(s) 492 163 2,23 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + P(s) 493 163 2,26 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + P(s) 494 163 2,23 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + P(s) 495 163 2,26 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + P(s) 496 163 2,23 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + P(s) 497 163 2,26 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + P(s) 498 163 2,23 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + P(s) 499 163 2,26 kdPS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) 500 3,163 64 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) 501 3,163 64 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) 502 3,163 64 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) 503 3,163 64 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 504 71 2,163 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 505 71 2,67 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 506 71 2,163 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 507 71 2,67 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 508 71 2,163 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 509 71 2,67 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 510 71 2,163 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 511 71 2,67 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 512 71 2,163 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 513 71 2,67 kdPS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) 514 3,71 69 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) 515 3,71 69 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) 516 3,71 69 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 517 73 2,65 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + P(s) 518 73 2,160 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 519 73 2,65 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + P(s) 520 73 2,160 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 521 73 2,65 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + P(s) 522 73 2,160 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 523 73 2,65 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + P(s) 524 73 2,160 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 525 73 2,65 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + P(s) 526 73 2,160 kdPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 527 2,73 75 kPS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 528 73 3,80 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 529 73 3,72 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) 530 3,73 155 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!2), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) 531 76 2,70 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!2), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) 532 76 2,155 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!2), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) 533 76 2,70 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!2), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) 534 76 2,155 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!2), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) 535 76 2,70 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!2), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) 536 76 2,155 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!2), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) 537 76 2,70 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!2), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) 538 76 2,155 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!2), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) 539 76 2,70 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!2), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) 540 76 2,155 kdPS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!2), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) 541 76 2,70 kuS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!2), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) 542 76 2,155 kdPS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!2), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 543 76 3,78 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!2), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 544 76 3,75 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!2), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 545 76 3,78 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!2), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 546 76 3,75 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 547 78 2,73 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 548 78 2,81 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 549 78 2,73 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 550 78 2,81 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 551 78 2,73 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 552 78 2,81 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 553 78 2,73 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 554 78 2,81 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 555 78 2,73 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 556 78 2,81 kdPS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~u) # K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 557 78 2,73 kuS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~p) # K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 558 78 2,81 kdPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 559 2,78 162 kPS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + K(s) 560 78 3,123 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) + K(s) 561 78 3,77 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 562 162 2,75 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 563 162 2,78 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 564 162 2,75 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 565 162 2,78 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 566 162 2,75 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 567 162 2,78 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 568 162 2,75 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 569 162 2,78 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # K(s!1), S(x1~u!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 570 162 2,75 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # K(s!1), S(x1~u!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 571 162 2,78 kdPS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~u) # K(s!1), S(x1~u!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 572 162 2,75 kuS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~p) # K(s!1), S(x1~u!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 573 162 2,78 kdPS # rule : P(s!1), S(x2~p!1) -> P(s), S(x2~u) # K(s!1), S(x1~u!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 574 162 2,75 kuS # rule : P(s!1), S(x2~p!1) -> P(s), S(x2~p) # K(s!1), S(x1~u!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 575 162 2,78 kdPS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + K(s) 576 162 3,124 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 577 162 3,79 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 578 79 2,74 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) + P(s) 579 79 2,77 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 580 79 2,74 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) + P(s) 581 79 2,77 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 582 79 2,74 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) + P(s) 583 79 2,77 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 584 79 2,74 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) + P(s) 585 79 2,77 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 586 79 2,74 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) + P(s) 587 79 2,77 kdPS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~u) # S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 588 79 2,74 kuS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~p) # S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) + P(s) 589 79 2,77 kdPS # rule : P(s!1), S(x2~p!1) -> P(s), S(x2~u) # S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 590 79 2,74 kuS # rule : P(s!1), S(x2~p!1) -> P(s), S(x2~p) # S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) + P(s) 591 79 2,77 kdPS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 592 3,79 162 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + P(s) 593 81 2,160 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 594 81 2,83 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + P(s) 595 81 2,160 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 596 81 2,83 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + P(s) 597 81 2,160 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 598 81 2,83 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + P(s) 599 81 2,160 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 600 81 2,83 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + P(s) 601 81 2,160 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 602 81 2,83 kdPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 603 2,81 78 kPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 604 2,81 78 kPS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + K(s) 605 81 3,122 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 606 81 3,80 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 607 83 2,86 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 608 83 2,119 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 609 83 2,86 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 610 83 2,119 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 611 83 2,86 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 612 83 2,119 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 613 83 2,86 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 614 83 2,119 kdPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 615 2,83 81 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 616 2,83 81 kPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 617 2,83 81 kPS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) + K(s) 618 83 3,121 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + K(s) 619 83 3,82 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 620 84 2,87 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 621 84 2,117 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 622 84 2,87 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 623 84 2,117 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 624 84 2,87 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 625 84 2,117 kdPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) 626 2,84 82 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) 627 2,84 82 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) 628 2,84 82 kPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) 629 2,84 82 kPS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 630 3,84 119 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 631 86 2,89 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 632 86 2,108 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 633 86 2,89 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 634 86 2,108 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 635 86 2,89 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 636 86 2,108 kdPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) 637 2,86 160 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) 638 2,86 160 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) 639 2,86 160 kPS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + K(s) 640 86 3,84 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + K(s) 641 86 3,85 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 642 3,86 127 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 643 87 2,91 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 644 87 2,104 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 645 87 2,91 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 646 87 2,104 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) 647 2,87 85 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) 648 2,87 85 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) 649 2,87 85 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) 650 2,87 85 kPS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 651 3,87 108 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 652 3,87 108 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) 653 89 2,93 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) 654 89 2,102 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) 655 89 2,93 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) 656 89 2,102 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 657 2,89 61 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 658 2,89 61 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 659 2,89 61 kPS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) 660 89 3,87 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) 661 89 3,88 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 662 3,89 129 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 663 3,89 129 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 664 90 2,94 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 665 90 2,88 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 666 90 2,94 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 667 90 2,88 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 668 90 2,94 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 669 90 2,88 kdPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) 670 2,90 67 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) 671 2,90 67 kPS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 672 3,90 61 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 673 3,90 61 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 674 3,90 61 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p) + P(s) 675 91 2,95 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) 676 91 2,98 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 677 2,91 88 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 678 2,91 88 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 679 2,91 88 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 680 2,91 88 kPS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 681 3,91 102 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 682 3,91 102 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 683 3,91 102 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) + P(s) 684 93 2,18 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) + P(s) 685 93 2,96 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 686 2,93 161 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 687 2,93 161 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 688 2,93 161 kPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) 689 93 3,91 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) 690 93 3,92 kdKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 691 3,93 132 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 692 3,93 132 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 693 3,93 132 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) + P(s) 694 161 2,20 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) 695 161 2,93 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) + P(s) 696 161 2,20 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) 697 161 2,93 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) 698 2,161 60 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) 699 2,161 60 kPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) 700 161 3,88 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) 701 161 3,94 kdKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 702 3,161 55 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 703 3,161 55 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 704 3,161 55 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 705 94 2,19 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 706 94 2,92 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 707 94 2,19 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 708 94 2,92 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) 709 2,94 26 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) 710 2,94 26 kPS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 711 3,94 161 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 712 3,94 161 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 713 3,94 161 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 714 3,94 161 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 715 2,97 132 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 716 2,97 132 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 717 2,97 132 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 718 2,97 132 kPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) 719 97 3,99 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) + K(s) 720 97 3,96 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) 721 97 3,99 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) + K(s) 722 97 3,96 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) 723 3,97 139 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) 724 3,97 139 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 725 2,100 103 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 726 2,100 103 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 727 2,100 103 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 728 2,100 103 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 729 2,100 103 kPS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) 730 100 3,109 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) 731 100 3,99 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) 732 100 3,109 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) 733 100 3,99 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + K(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) 734 3,100 159 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 735 2,101 104 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 736 2,101 104 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 737 2,101 104 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 738 2,101 104 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 739 2,101 104 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 740 2,101 104 kPS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) 741 3,101 109 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) 742 3,101 109 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) 743 103 2,97 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) 744 103 2,100 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 745 2,103 129 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 746 2,103 129 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 747 2,103 129 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 748 2,103 129 kPS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) 749 103 3,105 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) 750 103 3,102 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) 751 103 3,105 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) 752 103 3,102 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 753 3,103 157 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) 754 106 2,100 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) 755 106 2,110 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 756 2,106 126 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 757 2,106 126 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 758 2,106 126 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 759 2,106 126 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 760 2,106 126 kPS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) 761 106 3,114 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) 762 106 3,105 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) 763 106 3,114 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) 764 106 3,105 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) 765 107 2,101 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) 766 107 2,111 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 767 2,107 117 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 768 2,107 117 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 769 2,107 117 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 770 2,107 117 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 771 2,107 117 kPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 772 2,107 117 kPS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 773 3,107 114 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 774 160 2,61 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 775 160 2,86 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 776 160 2,61 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 777 160 2,86 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 778 160 2,61 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 779 160 2,86 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 780 160 2,61 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 781 160 2,86 kdPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 782 2,160 73 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 783 2,160 73 kPS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + K(s) 784 160 3,82 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) -> S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + K(s) 785 160 3,68 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) 786 3,160 128 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 787 128 2,131 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 788 128 2,127 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 789 128 2,131 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 790 128 2,127 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 791 128 2,131 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 792 128 2,127 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 793 128 2,131 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 794 128 2,127 kdPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) 795 2,128 155 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) 796 2,128 155 kPS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 797 128 3,83 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + K(s) 798 128 3,160 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 799 128 3,83 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + K(s) 800 128 3,160 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) 801 130 2,133 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) 802 130 2,157 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) 803 130 2,133 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) 804 130 2,157 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) 805 2,130 151 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) 806 2,130 151 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) 807 2,130 151 kPS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 808 130 3,126 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 809 130 3,129 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 810 130 3,126 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 811 130 3,129 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 812 130 3,126 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 813 130 3,129 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 814 131 2,55 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 815 131 2,129 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 816 131 2,55 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 817 131 2,129 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 818 131 2,55 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 819 131 2,129 kdPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) 820 2,131 66 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) 821 2,131 66 kPS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) 822 131 3,86 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) 823 131 3,61 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) 824 131 3,86 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) 825 131 3,61 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) 826 3,131 151 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) + P(s) 827 133 2,135 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + P(s) 828 133 2,139 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 829 2,133 156 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 830 2,133 156 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 831 2,133 156 kPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 832 133 3,103 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 833 133 3,132 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 834 133 3,103 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 835 133 3,132 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 836 133 3,103 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 837 133 3,132 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 838 3,133 142 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 839 2,138 141 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 840 2,138 141 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 841 2,138 141 kPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 842 138 3,158 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 843 138 3,137 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 844 138 3,158 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 845 138 3,137 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 846 138 3,158 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 847 138 3,137 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 848 138 3,158 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 849 138 3,137 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 850 138 3,158 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 851 138 3,137 kdKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 852 2,139 133 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 853 2,139 133 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 854 2,139 133 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 855 2,139 133 kPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + K(s) 856 139 3,100 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) + K(s) 857 139 3,97 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + K(s) 858 139 3,100 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) + K(s) 859 139 3,97 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + K(s) 860 139 3,100 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) + K(s) 861 139 3,97 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) 862 3,139 158 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + P(s) 863 157 2,139 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + P(s) 864 157 2,159 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 865 2,157 130 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 866 2,157 130 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 867 2,157 130 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 868 2,157 130 kPS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 869 157 3,106 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 870 157 3,103 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 871 157 3,106 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 872 157 3,103 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 873 157 3,106 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 874 157 3,103 kdKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 875 2,159 157 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 876 2,159 157 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 877 2,159 157 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 878 2,159 157 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 879 2,159 157 kPS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + K(s) 880 159 3,110 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + K(s) 881 159 3,100 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + K(s) 882 159 3,110 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + K(s) 883 159 3,100 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + K(s) 884 159 3,110 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + K(s) 885 159 3,100 kdKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 886 2,158 142 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 887 2,158 142 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 888 2,158 142 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 889 2,158 142 kPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 890 158 3,159 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 891 158 3,139 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 892 158 3,159 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 893 158 3,139 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 894 158 3,159 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 895 158 3,139 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 896 158 3,159 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 897 158 3,139 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + P(s) 898 142 2,137 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + P(s) 899 142 2,158 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) 900 2,142 148 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) 901 2,142 148 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) 902 2,142 148 kPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 903 142 3,157 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 904 142 3,133 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 905 142 3,157 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 906 142 3,133 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 907 142 3,157 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 908 142 3,133 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 909 142 3,157 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 910 142 3,133 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + P(s) 911 148 2,140 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + P(s) 912 148 2,142 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + P(s) 913 148 2,140 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + P(s) 914 148 2,142 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) 915 2,148 150 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) 916 2,148 150 kPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 917 148 3,130 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 918 148 3,156 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 919 148 3,130 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 920 148 3,156 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 921 148 3,130 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 922 148 3,156 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 923 148 3,130 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 924 148 3,156 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) 925 156 2,49 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) 926 156 2,133 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) 927 156 2,49 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) 928 156 2,133 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) 929 2,156 59 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) 930 2,156 59 kPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 931 156 3,129 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 932 156 3,55 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 933 156 3,129 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 934 156 3,55 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 935 156 3,129 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 936 156 3,55 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) 937 3,156 148 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) 938 151 2,156 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) 939 151 2,130 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) 940 151 2,156 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) 941 151 2,130 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) 942 151 2,156 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) 943 151 2,130 kdPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) 944 2,151 153 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) 945 2,151 153 kPS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) 946 151 3,127 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) 947 151 3,131 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) 948 151 3,127 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) 949 151 3,131 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) 950 151 3,127 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) 951 151 3,131 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 952 155 2,66 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 953 155 2,128 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 954 155 2,66 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 955 155 2,128 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 956 155 2,66 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 957 155 2,128 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 958 155 2,66 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 959 155 2,128 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 960 155 2,66 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + P(s) 961 155 2,128 kdPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!2), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3) 962 2,155 76 kPS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 963 155 3,81 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 964 155 3,73 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 965 155 3,81 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 966 155 3,73 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!3), P(s!7), P(s!6), K(s!2), P(s!5), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + P(s) 967 154 2,63 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!3), P(s!7), P(s!6), K(s!2), P(s!5), P(s!4) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + P(s) 968 154 2,153 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!3), P(s!7), P(s!6), K(s!2), P(s!5), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + P(s) 969 154 2,63 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!3), P(s!7), P(s!6), K(s!2), P(s!5), P(s!4) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + P(s) 970 154 2,153 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!3), P(s!7), P(s!6), K(s!2), P(s!5), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + P(s) 971 154 2,63 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!3), P(s!7), P(s!6), K(s!2), P(s!5), P(s!4) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + P(s) 972 154 2,153 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!3), P(s!7), P(s!6), K(s!2), P(s!5), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + P(s) 973 154 2,63 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!3), P(s!7), P(s!6), K(s!2), P(s!5), P(s!4) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + P(s) 974 154 2,153 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!3), P(s!7), P(s!6), K(s!2), P(s!5), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + P(s) 975 154 2,63 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!3), P(s!7), P(s!6), K(s!2), P(s!5), P(s!4) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + P(s) 976 154 2,153 kdPS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!3), P(s!7), P(s!6), K(s!2), P(s!5), P(s!4) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + K(s) 977 154 3,155 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!3), P(s!7), P(s!6), K(s!2), P(s!5), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + K(s) 978 154 3,70 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!3), P(s!7), P(s!6), K(s!2), P(s!5), P(s!4) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + K(s) 979 154 3,155 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!3), P(s!7), P(s!6), K(s!2), P(s!5), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + K(s) 980 154 3,70 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!3), P(s!7), P(s!6), K(s!2), P(s!5), P(s!4) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + K(s) 981 154 3,155 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!3), P(s!7), P(s!6), K(s!2), P(s!5), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + K(s) 982 154 3,70 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) 983 153 2,59 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) 984 153 2,151 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) 985 153 2,59 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) 986 153 2,151 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) 987 153 2,59 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) 988 153 2,151 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) 989 153 2,59 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + P(s) 990 153 2,151 kdPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + P(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!3), P(s!7), P(s!6), K(s!2), P(s!5), P(s!4) 991 2,153 154 kPS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + K(s) 992 153 3,128 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + K(s) 993 153 3,66 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + K(s) 994 153 3,128 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + K(s) 995 153 3,66 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + K(s) 996 153 3,128 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + K(s) 997 153 3,66 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!4), P(s!7), P(s!6), K(s!3), K(s!2), P(s!5) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + P(s) 998 152 2,57 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!4), P(s!7), P(s!6), K(s!3), K(s!2), P(s!5) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + P(s) 999 152 2,150 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!4), P(s!7), P(s!6), K(s!3), K(s!2), P(s!5) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + P(s) 1000 152 2,57 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!4), P(s!7), P(s!6), K(s!3), K(s!2), P(s!5) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + P(s) 1001 152 2,150 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!4), P(s!7), P(s!6), K(s!3), K(s!2), P(s!5) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + P(s) 1002 152 2,57 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!4), P(s!7), P(s!6), K(s!3), K(s!2), P(s!5) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + P(s) 1003 152 2,150 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!4), P(s!7), P(s!6), K(s!3), K(s!2), P(s!5) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + P(s) 1004 152 2,57 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!4), P(s!7), P(s!6), K(s!3), K(s!2), P(s!5) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + P(s) 1005 152 2,150 kdPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!4), P(s!7), P(s!6), K(s!3), K(s!2), P(s!5) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + K(s) 1006 152 3,153 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!4), P(s!7), P(s!6), K(s!3), K(s!2), P(s!5) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + K(s) 1007 152 3,63 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!4), P(s!7), P(s!6), K(s!3), K(s!2), P(s!5) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + K(s) 1008 152 3,153 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!4), P(s!7), P(s!6), K(s!3), K(s!2), P(s!5) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + K(s) 1009 152 3,63 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!4), P(s!7), P(s!6), K(s!3), K(s!2), P(s!5) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + K(s) 1010 152 3,153 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!4), P(s!7), P(s!6), K(s!3), K(s!2), P(s!5) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + K(s) 1011 152 3,63 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!4), P(s!7), P(s!6), K(s!3), K(s!2), P(s!5) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~p, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + K(s) 1012 152 3,153 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!4), P(s!7), P(s!6), K(s!3), K(s!2), P(s!5) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) + K(s) 1013 152 3,63 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + P(s) 1014 150 2,53 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + P(s) 1015 150 2,148 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + P(s) 1016 150 2,53 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + P(s) 1017 150 2,148 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + P(s) 1018 150 2,53 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + P(s) 1019 150 2,148 kdPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!4), P(s!7), P(s!6), K(s!3), K(s!2), P(s!5) 1020 2,150 152 kPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) 1021 150 3,151 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) 1022 150 3,59 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) 1023 150 3,151 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) 1024 150 3,59 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) 1025 150 3,151 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) 1026 150 3,59 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~p, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) 1027 150 3,151 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) 1028 150 3,59 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!5), P(s!7), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + P(s) 1029 149 2,51 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!5), P(s!7), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + P(s) 1030 149 2,143 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!5), P(s!7), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + P(s) 1031 149 2,51 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!5), P(s!7), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + P(s) 1032 149 2,143 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!5), P(s!7), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + P(s) 1033 149 2,51 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!5), P(s!7), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + P(s) 1034 149 2,143 kdPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!5), P(s!7), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + K(s) 1035 149 3,150 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!5), P(s!7), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + K(s) 1036 149 3,57 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!5), P(s!7), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + K(s) 1037 149 3,150 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!5), P(s!7), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + K(s) 1038 149 3,57 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!5), P(s!7), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + K(s) 1039 149 3,150 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!5), P(s!7), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + K(s) 1040 149 3,57 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!5), P(s!7), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + K(s) 1041 149 3,150 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!5), P(s!7), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + K(s) 1042 149 3,57 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!5), P(s!7), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!1, x5~p, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + K(s) 1043 149 3,150 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!5), P(s!7), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) + K(s) 1044 149 3,57 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 1045 143 2,48 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 1046 143 2,141 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 1047 143 2,48 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 1048 143 2,141 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!5), P(s!7), P(s!6), K(s!4), K(s!3), K(s!2) 1049 2,143 149 kPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 1050 143 3,148 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 1051 143 3,53 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 1052 143 3,148 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 1053 143 3,53 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 1054 143 3,148 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 1055 143 3,53 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 1056 143 3,148 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 1057 143 3,53 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 1058 143 3,148 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) 1059 143 3,53 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p!7, x8~p!8), P(s!8), K(s!6), P(s!7), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 1060 147 2,46 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p!7, x8~p!8), P(s!8), K(s!6), P(s!7), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 1061 147 2,146 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p!7, x8~p!8), P(s!8), K(s!6), P(s!7), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 1062 147 2,46 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p!7, x8~p!8), P(s!8), K(s!6), P(s!7), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 1063 147 2,146 kdPS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p!7, x8~p!8), P(s!8), K(s!6), P(s!7), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + K(s) 1064 147 3,143 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p!7, x8~p!8), P(s!8), K(s!6), P(s!7), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + K(s) 1065 147 3,51 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p!7, x8~p!8), P(s!8), K(s!6), P(s!7), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + K(s) 1066 147 3,143 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p!7, x8~p!8), P(s!8), K(s!6), P(s!7), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + K(s) 1067 147 3,51 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p!7, x8~p!8), P(s!8), K(s!6), P(s!7), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + K(s) 1068 147 3,143 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p!7, x8~p!8), P(s!8), K(s!6), P(s!7), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + K(s) 1069 147 3,51 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p!7, x8~p!8), P(s!8), K(s!6), P(s!7), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + K(s) 1070 147 3,143 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p!7, x8~p!8), P(s!8), K(s!6), P(s!7), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + K(s) 1071 147 3,51 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p!7, x8~p!8), P(s!8), K(s!6), P(s!7), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + K(s) 1072 147 3,143 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p!7, x8~p!8), P(s!8), K(s!6), P(s!7), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + K(s) 1073 147 3,51 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p!7, x8~p!8), P(s!8), K(s!6), P(s!7), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + K(s) 1074 147 3,143 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p!7, x8~p!8), P(s!8), K(s!6), P(s!7), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) + K(s) 1075 147 3,51 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 1076 146 2,43 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 1077 146 2,145 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p!7, x8~p!8), P(s!8), K(s!6), P(s!7), K(s!5), K(s!4), K(s!3), K(s!2) 1078 2,146 147 kPS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1079 146 3,141 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1080 146 3,48 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1081 146 3,141 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1082 146 3,48 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1083 146 3,141 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1084 146 3,48 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1085 146 3,141 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1086 146 3,48 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1087 146 3,141 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1088 146 3,48 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1089 146 3,141 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1090 146 3,48 kdKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 1091 2,145 146 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!6, x6~u!1, x7~p, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 1092 2,145 146 kPS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1093 145 3,138 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1094 145 3,144 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1095 145 3,138 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1096 145 3,144 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1097 145 3,138 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1098 145 3,144 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1099 145 3,138 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1100 145 3,144 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1101 145 3,138 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1102 145 3,144 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1103 145 3,138 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1104 145 3,144 kdKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 1105 2,144 48 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 1106 2,144 48 kPS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1107 144 3,137 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1108 144 3,44 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1109 144 3,137 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1110 144 3,44 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1111 144 3,137 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1112 144 3,44 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1113 144 3,137 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1114 144 3,44 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1115 144 3,137 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1116 144 3,44 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~p, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 1117 3,144 145 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 1118 141 2,144 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 1119 141 2,138 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) 1120 2,141 143 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!4, x4~u!5, x5~u!1, x6~p, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) 1121 2,141 143 kPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1122 141 3,142 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1123 141 3,140 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1124 141 3,142 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1125 141 3,140 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1126 141 3,142 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1127 141 3,140 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1128 141 3,142 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1129 141 3,140 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u!2, x2~u!3, x3~u!1, x4~u!4, x5~p, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1130 141 3,142 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1131 141 3,140 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + P(s) 1132 140 2,44 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + P(s) 1133 140 2,137 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) 1134 2,140 53 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) 1135 2,140 53 kPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 1136 140 3,133 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 1137 140 3,49 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 1138 140 3,133 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 1139 140 3,49 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 1140 140 3,133 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 1141 140 3,49 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 1142 140 3,133 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 1143 140 3,49 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 1144 3,140 141 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 1145 2,137 140 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 1146 2,137 140 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~u!4, x6~p, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 1147 2,137 140 kPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 1148 137 3,139 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 1149 137 3,135 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 1150 137 3,139 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 1151 137 3,135 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 1152 137 3,139 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 1153 137 3,135 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~u!3, x5~p, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 1154 137 3,139 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) 1155 137 3,135 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~p, x7~p, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) 1156 3,137 138 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 1157 2,135 49 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 1158 2,135 49 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 1159 2,135 49 kPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) + K(s) 1160 135 3,97 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) + K(s) 1161 135 3,134 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) + K(s) 1162 135 3,97 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) + K(s) 1163 135 3,134 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) + K(s) 1164 135 3,97 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) + K(s) 1165 135 3,134 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) 1166 3,135 137 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p, x8~p), K(s!4), K(s!3), K(s!2) 1167 3,135 137 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) + P(s) 1168 136 2,16 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) + P(s) 1169 136 2,134 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 1170 2,136 54 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 1171 2,136 54 kPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) 1172 136 3,93 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) + K(s) 1173 136 3,20 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) 1174 136 3,93 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) + K(s) 1175 136 3,20 kdKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 1176 3,136 49 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 1177 3,136 49 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 1178 3,136 49 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 1179 2,134 136 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 1180 2,134 136 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 1181 2,134 136 kPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) + K(s) 1182 134 3,96 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) + K(s) 1183 134 3,18 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) + K(s) 1184 134 3,96 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) + K(s) 1185 134 3,18 kdKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) 1186 3,134 135 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) 1187 3,134 135 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p, x8~p), K(s!3), K(s!2) 1188 3,134 135 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~u!2, x6~p, x7~p, x8~p), K(s!2) + P(s) 1189 132 2,134 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) 1190 132 2,97 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 1191 2,132 55 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 1192 2,132 55 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 1193 2,132 55 kPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) 1194 132 3,102 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) 1195 132 3,93 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) 1196 132 3,102 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) 1197 132 3,93 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 1198 3,132 133 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 1199 3,132 133 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) 1200 129 2,132 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) 1201 129 2,103 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) 1202 129 2,132 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) 1203 129 2,103 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 1204 2,129 131 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 1205 2,129 131 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 1206 2,129 131 kPS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 1207 129 3,108 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 1208 129 3,89 kdKS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 1209 129 3,108 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 1210 129 3,89 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~u!3, x4~p, x5~p, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 1211 3,129 130 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 1212 127 2,129 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 1213 127 2,126 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 1214 127 2,129 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 1215 127 2,126 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~u!2, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 1216 127 2,129 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 1217 127 2,126 kdPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) 1218 2,127 128 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) 1219 2,127 128 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) 1220 2,127 128 kPS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) 1221 127 3,119 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) 1222 127 3,86 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) 1223 127 3,119 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) 1224 127 3,86 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) 1225 126 2,103 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) 1226 126 2,106 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) 1227 126 2,103 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) 1228 126 2,106 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 1229 2,126 127 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 1230 2,126 127 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 1231 2,126 127 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) -> K(s!1), S(x1~u!2, x2~u!1, x3~p, x4~p, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 1232 2,126 127 kPS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 1233 126 3,116 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 1234 126 3,108 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 1235 126 3,116 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 1236 126 3,108 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) 1237 108 2,102 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) 1238 108 2,105 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) 1239 108 2,102 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) 1240 108 2,105 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 1241 2,108 86 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 1242 2,108 86 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 1243 2,108 86 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 1244 2,108 86 kPS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) 1245 108 3,117 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) 1246 108 3,87 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 1247 3,108 126 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 1248 2,110 106 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 1249 2,110 106 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 1250 2,110 106 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 1251 2,110 106 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 1252 2,110 106 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 1253 2,110 106 kPS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) 1254 110 3,112 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) 1255 110 3,109 kdKS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) 1256 110 3,112 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) 1257 110 3,109 kdKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1258 2,113 115 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1259 2,113 115 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1260 2,113 115 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1261 2,113 115 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1262 2,113 115 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1263 2,113 115 kPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1264 2,113 115 kPS # rule : P(s), S(x1~p) -> P(s!1), S(x1~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1265 2,113 115 kPS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) 1266 115 2,111 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) 1267 115 2,113 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 1268 2,115 118 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 1269 2,115 118 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 1270 2,115 118 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 1271 2,115 118 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 1272 2,115 118 kPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 1273 2,115 118 kPS # rule : P(s), S(x1~p) -> P(s!1), S(x1~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 1274 2,115 118 kPS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 1275 117 2,104 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 1276 117 2,107 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 1277 117 2,104 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 1278 117 2,107 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) 1279 2,117 84 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) 1280 2,117 84 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) 1281 2,117 84 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) 1282 2,117 84 kPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) 1283 2,117 84 kPS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1284 3,117 116 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 1285 118 2,107 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 1286 118 2,115 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 1287 118 2,107 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 1288 118 2,115 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) 1289 2,118 120 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) 1290 2,118 120 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) 1291 2,118 120 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) 1292 2,118 120 kPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) 1293 2,118 120 kPS # rule : P(s), S(x1~p) -> P(s!1), S(x1~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) 1294 2,118 120 kPS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~p!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!1), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1295 125 2,79 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~p!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!1), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1296 125 2,124 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~p!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!1), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1297 125 2,79 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~p!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!1), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1298 125 2,124 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~p!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!1), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1299 125 2,79 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~p!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!1), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1300 125 2,124 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # S(x1~p!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!1), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1301 125 2,79 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # S(x1~p!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!1), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1302 125 2,124 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # S(x1~p!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!1), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1303 125 2,79 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # S(x1~p!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!1), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1304 125 2,124 kdPS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~u) # S(x1~p!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!1), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1305 125 2,79 kuS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~p) # S(x1~p!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!1), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1306 125 2,124 kdPS # rule : P(s!1), S(x2~p!1) -> P(s), S(x2~u) # S(x1~p!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!1), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1307 125 2,79 kuS # rule : P(s!1), S(x2~p!1) -> P(s), S(x2~p) # S(x1~p!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!1), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1308 125 2,124 kdPS # rule : P(s!1), S(x1~p!1) -> P(s), S(x1~u) # S(x1~p!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!1), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1309 125 2,79 kuS # rule : P(s!1), S(x1~p!1) -> P(s), S(x1~p) # S(x1~p!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!1), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1310 125 2,124 kdPS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) + P(s) 1311 124 2,77 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1312 124 2,123 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) + P(s) 1313 124 2,77 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1314 124 2,123 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) + P(s) 1315 124 2,77 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1316 124 2,123 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) + P(s) 1317 124 2,77 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1318 124 2,123 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) + P(s) 1319 124 2,77 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1320 124 2,123 kdPS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~u) # S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) + P(s) 1321 124 2,77 kuS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~p) # S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1322 124 2,123 kdPS # rule : P(s!1), S(x2~p!1) -> P(s), S(x2~u) # S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) + P(s) 1323 124 2,77 kuS # rule : P(s!1), S(x2~p!1) -> P(s), S(x2~p) # S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1324 124 2,123 kdPS # rule : P(s), S(x1~p) -> P(s!1), S(x1~p!1) # S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) -> S(x1~p!1, x2~p!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!1), P(s!8), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 1325 2,124 125 kPS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1326 123 2,80 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1327 123 2,122 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1328 123 2,80 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1329 123 2,122 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1330 123 2,80 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1331 123 2,122 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1332 123 2,80 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1333 123 2,122 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1334 123 2,80 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1335 123 2,122 kdPS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~u) # S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1336 123 2,80 kuS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~p) # S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1337 123 2,122 kdPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) -> S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) 1338 2,123 124 kPS # rule : P(s), S(x1~p) -> P(s!1), S(x1~p!1) # S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) -> S(x1~p, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) 1339 2,123 124 kPS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1340 122 2,82 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1341 122 2,121 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1342 122 2,82 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1343 122 2,121 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1344 122 2,82 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1345 122 2,121 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1346 122 2,82 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1347 122 2,121 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1348 122 2,82 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) 1349 122 2,121 kdPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) 1350 2,122 123 kPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) 1351 2,122 123 kPS # rule : P(s), S(x1~p) -> P(s!1), S(x1~p!1) # S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) 1352 2,122 123 kPS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + P(s) 1353 121 2,84 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + P(s) 1354 121 2,120 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + P(s) 1355 121 2,84 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + P(s) 1356 121 2,120 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + P(s) 1357 121 2,84 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + P(s) 1358 121 2,120 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + P(s) 1359 121 2,84 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + P(s) 1360 121 2,120 kdPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) 1361 2,121 122 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) 1362 2,121 122 kPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) 1363 2,121 122 kPS # rule : P(s), S(x1~p) -> P(s!1), S(x1~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2), P(s!1) 1364 2,121 122 kPS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 1365 120 2,117 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 1366 120 2,118 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 1367 120 2,117 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 1368 120 2,118 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 1369 120 2,117 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 1370 120 2,118 kdPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) 1371 2,120 121 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) 1372 2,120 121 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) 1373 2,120 121 kPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) 1374 2,120 121 kPS # rule : P(s), S(x1~p) -> P(s!1), S(x1~p!1) # S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + P(s) -> S(x1~p, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2), P(s!1) 1375 2,120 121 kPS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 1376 119 2,108 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 1377 119 2,116 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 1378 119 2,108 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 1379 119 2,116 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 1380 119 2,108 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 1381 119 2,116 kdPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) 1382 2,119 83 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) 1383 2,119 83 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) 1384 2,119 83 kPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) 1385 2,119 83 kPS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + K(s) 1386 119 3,120 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + K(s) 1387 119 3,84 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) 1388 116 2,105 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) 1389 116 2,114 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) 1390 116 2,105 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) 1391 116 2,114 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 1392 2,116 119 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 1393 2,116 119 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 1394 2,116 119 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 1395 2,116 119 kPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 1396 2,116 119 kPS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) 1397 116 3,118 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) 1398 116 3,117 kdKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) 1399 114 2,109 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) 1400 114 2,112 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1401 2,114 116 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1402 2,114 116 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1403 2,114 116 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1404 2,114 116 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1405 2,114 116 kPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1406 2,114 116 kPS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) 1407 114 3,115 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) 1408 114 3,107 kdKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1409 2,112 114 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1410 2,112 114 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1411 2,112 114 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1412 2,112 114 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1413 2,112 114 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1414 2,112 114 kPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1415 2,112 114 kPS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~p) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) -> S(x1~p, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) 1416 112 3,113 kpS # rule : K(s!1), S(x1~u!1) -> K(s), S(x1~u) # K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) 1417 112 3,111 kdKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1418 2,111 107 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1419 2,111 107 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1420 2,111 107 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1421 2,111 107 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1422 2,111 107 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1423 2,111 107 kPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1424 2,111 107 kPS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) 1425 3,111 112 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1426 2,109 105 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1427 2,109 105 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1428 2,109 105 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1429 2,109 105 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1430 2,109 105 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1431 2,109 105 kPS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) 1432 109 3,111 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) 1433 109 3,101 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) 1434 3,109 110 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) 1435 105 2,99 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) 1436 105 2,109 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1437 2,105 108 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1438 2,105 108 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1439 2,105 108 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1440 2,105 108 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1441 2,105 108 kPS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) 1442 105 3,107 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) 1443 105 3,104 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 1444 3,105 106 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) 1445 104 2,98 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) 1446 104 2,101 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 1447 2,104 87 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 1448 2,104 87 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 1449 2,104 87 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 1450 2,104 87 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 1451 2,104 87 kPS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1452 3,104 105 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1453 3,104 105 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) + P(s) 1454 102 2,96 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) 1455 102 2,99 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1456 2,102 89 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1457 2,102 89 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1458 2,102 89 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1459 2,102 89 kPS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) 1460 102 3,104 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) 1461 102 3,91 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 1462 3,102 103 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!3), P(s!3), K(s!2) 1463 3,102 103 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1464 2,99 102 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1465 2,99 102 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1466 2,99 102 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1467 2,99 102 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1468 2,99 102 kPS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) 1469 99 3,101 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) 1470 99 3,98 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) 1471 3,99 100 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p), K(s!2) 1472 3,99 100 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1473 2,98 91 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1474 2,98 91 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1475 2,98 91 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1476 2,98 91 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1477 2,98 91 kPS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p) 1478 3,98 99 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p) 1479 3,98 99 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p, x8~p) 1480 3,98 99 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1481 2,96 93 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1482 2,96 93 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1483 2,96 93 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1484 2,96 93 kPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p) + K(s) 1485 96 3,98 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p) + K(s) 1486 96 3,95 kdKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) 1487 3,96 97 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) 1488 3,96 97 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p, x7~p, x8~p), K(s!2) 1489 3,96 97 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1490 2,95 92 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1491 2,95 92 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1492 2,95 92 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) 1493 2,95 92 kPS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) 1494 3,95 96 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) 1495 3,95 96 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) 1496 3,95 96 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p) 1497 3,95 96 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p) + P(s) 1498 92 2,17 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p) + P(s) 1499 92 2,95 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 1500 2,92 94 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 1501 2,92 94 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 1502 2,92 94 kPS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1503 3,92 93 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1504 3,92 93 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1505 3,92 93 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p, x7~p, x8~p!2), P(s!2) 1506 3,92 93 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 1507 88 2,92 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 1508 88 2,91 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 1509 88 2,92 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 1510 88 2,91 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) 1511 2,88 90 kPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) 1512 2,88 90 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) 1513 2,88 90 kPS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1514 3,88 89 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1515 3,88 89 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1516 3,88 89 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 1517 85 2,88 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 1518 85 2,87 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 1519 85 2,88 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 1520 85 2,87 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 1521 85 2,88 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 1522 85 2,87 kdPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) 1523 2,85 68 kPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) 1524 2,85 68 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) 1525 2,85 68 kPS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 1526 3,85 86 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 1527 3,85 86 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) 1528 82 2,85 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + P(s) 1529 82 2,84 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) 1530 82 2,85 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + P(s) 1531 82 2,84 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) 1532 82 2,85 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + P(s) 1533 82 2,84 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!3), P(s!2), P(s!1) + P(s) 1534 82 2,85 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + P(s) 1535 82 2,84 kdPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) -> S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) 1536 2,82 80 kPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) -> S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) 1537 2,82 80 kPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) -> S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) 1538 2,82 80 kPS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + K(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) 1539 3,82 83 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1540 80 2,68 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1541 80 2,82 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1542 80 2,68 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1543 80 2,82 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1544 80 2,68 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1545 80 2,82 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1546 80 2,68 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1547 80 2,82 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1548 80 2,68 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1549 80 2,82 kdPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) -> S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) 1550 2,80 77 kPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) -> S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) 1551 2,80 77 kPS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u!1, x2~p, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 1552 3,80 81 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1553 77 2,72 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1554 77 2,80 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1555 77 2,72 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1556 77 2,80 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1557 77 2,72 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1558 77 2,80 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1559 77 2,72 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1560 77 2,80 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1561 77 2,72 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1562 77 2,80 kdPS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~u) # S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1563 77 2,72 kuS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~p) # S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) -> S(x1~u, x2~p, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1564 77 2,80 kdPS # rule : P(s), S(x2~p) -> P(s!1), S(x2~p!1) # S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) + P(s) -> S(x1~u, x2~p!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!1), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 1565 2,77 79 kPS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) + K(s) -> K(s!1), S(x1~u!1, x2~p, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 1566 3,77 78 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) 1567 75 2,69 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1568 75 2,73 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) 1569 75 2,69 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1570 75 2,73 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) 1571 75 2,69 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1572 75 2,73 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) 1573 75 2,69 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1574 75 2,73 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) 1575 75 2,69 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1576 75 2,73 kdPS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~u) # K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + P(s) 1577 75 2,69 kuS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~p) # K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1578 75 2,73 kdPS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~p) # K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~p, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3), P(s!1) + K(s) 1579 75 3,77 kpS # rule : K(s!1), S(x2~u!1) -> K(s), S(x2~u) # K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 1580 75 3,74 kdKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u!1, x2~u!2, x3~p!3, x4~p!4, x5~p!5, x6~p!6, x7~p!7, x8~p!8), P(s!8), K(s!2), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3) 1581 3,75 76 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1582 74 2,71 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1583 74 2,72 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1584 74 2,71 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1585 74 2,72 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1586 74 2,71 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1587 74 2,72 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1588 74 2,71 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1589 74 2,72 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1590 74 2,71 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1591 74 2,72 kdPS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~u) # S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1592 74 2,71 kuS # rule : P(s!1), S(x3~p!1) -> P(s), S(x3~p) # S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1593 74 2,72 kdPS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 1594 3,74 75 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!1, x3~p!2, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 1595 3,74 75 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1596 72 2,67 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1597 72 2,68 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1598 72 2,67 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1599 72 2,68 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1600 72 2,67 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1601 72 2,68 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1602 72 2,67 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1603 72 2,68 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1604 72 2,67 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + P(s) 1605 72 2,68 kdPS # rule : P(s), S(x3~p) -> P(s!1), S(x3~p!1) # S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) -> S(x1~u, x2~u, x3~p!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!1), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 1606 2,72 74 kPS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 1607 3,72 73 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!1, x3~p, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), P(s!5), P(s!4), P(s!3), P(s!2) 1608 3,72 73 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + P(s) 1609 69 2,64 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1610 69 2,65 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + P(s) 1611 69 2,64 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1612 69 2,65 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + P(s) 1613 69 2,64 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1614 69 2,65 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + P(s) 1615 69 2,64 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1616 69 2,65 kdPS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + P(s) 1617 69 2,64 kuS # rule : P(s!1), S(x4~p!1) -> P(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) 1618 69 2,65 kdPS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> S(x1~u, x2~u, x3~p, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 1619 69 3,72 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) -> S(x1~u, x2~u, x3~u, x4~p!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!1), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 1620 69 3,71 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) 1621 3,69 70 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p!3, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!2), P(s!6), P(s!5), P(s!4), P(s!3) 1622 3,69 70 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) + P(s) 1623 65 2,60 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 1624 65 2,61 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) + P(s) 1625 65 2,60 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 1626 65 2,61 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) + P(s) 1627 65 2,60 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 1628 65 2,61 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) + P(s) 1629 65 2,60 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + P(s) 1630 65 2,61 kdPS # rule : P(s), S(x4~p) -> P(s!1), S(x4~p!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p!2, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!2), P(s!6), P(s!5), P(s!4), P(s!3) 1631 2,65 69 kPS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~p, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + K(s) 1632 65 3,68 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~p, x5~p!1, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3), P(s!1) + K(s) 1633 65 3,67 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) 1634 3,65 66 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!1, x4~p, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) 1635 3,65 66 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 1636 62 2,25 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 1637 62 2,58 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 1638 62 2,25 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 1639 62 2,58 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 1640 62 2,25 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 1641 62 2,58 kdPS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 1642 62 2,25 kuS # rule : P(s!1), S(x5~p!1) -> P(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) 1643 62 2,58 kdPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 1644 62 3,65 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + K(s) 1645 62 3,64 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!5), P(s!4), P(s!3), P(s!2) + K(s) 1646 62 3,65 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p!2, x6~p!3, x7~p!4, x8~p!5), P(s!2), P(s!5), P(s!4), P(s!3) + K(s) 1647 62 3,64 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) 1648 3,62 63 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p!4, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!3), P(s!6), P(s!5), K(s!2), P(s!4) 1649 3,62 63 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 1650 58 2,54 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 1651 58 2,55 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 1652 58 2,54 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 1653 58 2,55 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 1654 58 2,54 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + P(s) 1655 58 2,55 kdPS # rule : P(s), S(x5~p) -> P(s!1), S(x5~p!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!2), P(s!5), P(s!4), P(s!3) 1656 2,58 62 kPS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) 1657 58 3,61 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) + K(s) 1658 58 3,60 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~p, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) 1659 58 3,61 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!1, x5~p, x6~p!2, x7~p!3, x8~p!4), P(s!2), P(s!4), P(s!3) + K(s) 1660 58 3,60 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) 1661 3,58 59 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!1, x5~p, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) 1662 3,58 59 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) 1663 56 2,29 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) 1664 56 2,52 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) 1665 56 2,29 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) 1666 56 2,52 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) 1667 56 2,29 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) 1668 56 2,52 kdPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) 1669 56 3,58 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) 1670 56 3,25 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) 1671 56 3,58 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) 1672 56 3,25 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~p, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) 1673 56 3,58 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) + K(s) 1674 56 3,25 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) 1675 3,56 57 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p!5, x7~p!6, x8~p!7), P(s!7), K(s!4), P(s!6), P(s!5), K(s!3), K(s!2) 1676 3,56 57 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) 1677 52 2,31 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) 1678 52 2,49 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) 1679 52 2,31 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + P(s) 1680 52 2,49 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p!4, x7~p!5, x8~p!6), P(s!6), K(s!3), P(s!5), P(s!4), K(s!2) 1681 2,52 56 kPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 1682 52 3,55 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 1683 52 3,54 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 1684 52 3,55 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 1685 52 3,54 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!1, x4~u!2, x5~p, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 1686 52 3,55 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) 1687 52 3,54 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) 1688 3,52 53 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!1, x6~p, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) 1689 3,52 53 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + P(s) 1690 50 2,36 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + P(s) 1691 50 2,47 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + P(s) 1692 50 2,36 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + P(s) 1693 50 2,47 kdPS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 1694 50 3,52 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 1695 50 3,29 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 1696 50 3,52 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 1697 50 3,29 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 1698 50 3,52 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 1699 50 3,29 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~p, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 1700 50 3,52 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) + K(s) 1701 50 3,29 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) 1702 3,50 51 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p!6, x8~p!7), P(s!7), K(s!5), P(s!6), K(s!4), K(s!3), K(s!2) 1703 3,50 51 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) + P(s) 1704 47 2,34 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + P(s) 1705 47 2,44 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~p!5, x8~p!6), P(s!6), K(s!4), P(s!5), K(s!3), K(s!2) 1706 2,47 50 kPS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 1707 47 3,49 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 1708 47 3,31 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 1709 47 3,49 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 1710 47 3,31 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 1711 47 3,49 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 1712 47 3,31 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~p, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 1713 47 3,49 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) 1714 47 3,31 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 1715 3,47 48 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!1, x7~p, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 1716 3,47 48 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 1717 45 2,39 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) 1718 45 2,42 kdPS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1719 45 3,47 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1720 45 3,36 kdKS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1721 45 3,47 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1722 45 3,36 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1723 45 3,47 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1724 45 3,36 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1725 45 3,47 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1726 45 3,36 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~p, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1727 45 3,47 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1728 45 3,36 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 1729 3,45 46 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p!7), P(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 1730 3,45 46 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!1, x5~u!3, x6~u!4, x7~u!5, x8~p!6), P(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 1731 2,42 45 kPS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1732 42 3,44 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1733 42 3,34 kdKS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1734 42 3,44 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1735 42 3,34 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1736 42 3,44 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1737 42 3,34 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1738 42 3,44 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1739 42 3,34 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!1, x6~u!4, x7~p, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1740 42 3,44 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1741 42 3,34 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 1742 3,42 43 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!1, x8~p), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 1743 3,42 43 kKS # rule : K(s!1), S(x8~u!1) -> K(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1744 40 3,42 kpS # rule : K(s!1), S(x8~u!1) -> K(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1745 40 3,39 kdKS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1746 40 3,42 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1747 40 3,39 kdKS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1748 40 3,42 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1749 40 3,39 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1750 40 3,42 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1751 40 3,39 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1752 40 3,42 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1753 40 3,39 kdKS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~p) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!1, x7~u!5, x8~p), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1754 40 3,42 kpS # rule : K(s!1), S(x3~u!1) -> K(s), S(x3~u) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) 1755 40 3,39 kdKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 1756 3,40 41 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u!2, x3~u!3, x4~u!4, x5~u!5, x6~u!6, x7~u!7, x8~u!1), K(s!7), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 1757 3,40 41 kKS # rule : K(s!1), S(x8~u!1) -> K(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1758 39 3,34 kpS # rule : K(s!1), S(x8~u!1) -> K(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) + K(s) 1759 39 3,38 kdKS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1760 39 3,34 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) + K(s) 1761 39 3,38 kdKS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1762 39 3,34 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) + K(s) 1763 39 3,38 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1764 39 3,34 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) + K(s) 1765 39 3,38 kdKS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) + K(s) 1766 39 3,34 kpS # rule : K(s!1), S(x4~u!1) -> K(s), S(x4~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) + K(s) 1767 39 3,38 kdKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 1768 3,39 40 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 1769 3,39 40 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u!2, x4~u!3, x5~u!4, x6~u!5, x7~u!6, x8~u!1), K(s!6), K(s!5), K(s!4), K(s!3), K(s!2) 1770 3,39 40 kKS # rule : K(s!1), S(x8~u!1) -> K(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) + K(s) 1771 38 3,33 kpS # rule : K(s!1), S(x8~u!1) -> K(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) + K(s) 1772 38 3,37 kdKS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) + K(s) 1773 38 3,33 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) + K(s) 1774 38 3,37 kdKS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) + K(s) 1775 38 3,33 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) + K(s) 1776 38 3,37 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) + K(s) 1777 38 3,33 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) + K(s) 1778 38 3,37 kdKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) 1779 3,38 39 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) 1780 3,38 39 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) 1781 3,38 39 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!5, x8~u!1), K(s!5), K(s!4), K(s!3), K(s!2) 1782 3,38 39 kKS # rule : K(s!1), S(x8~u!1) -> K(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) + K(s) 1783 37 3,32 kpS # rule : K(s!1), S(x8~u!1) -> K(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) + K(s) 1784 37 3,5 kdKS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) + K(s) 1785 37 3,32 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) + K(s) 1786 37 3,5 kdKS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) + K(s) 1787 37 3,32 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) + K(s) 1788 37 3,5 kdKS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) 1789 3,37 38 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) 1790 3,37 38 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) 1791 3,37 38 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) 1792 3,37 38 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!4, x8~u!1), K(s!4), K(s!3), K(s!2) 1793 3,37 38 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~u!3), K(s!3), K(s!2) + P(s) 1794 35 2,37 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) + P(s) 1795 35 2,33 kdPS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 1796 35 3,30 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) + K(s) 1797 35 3,10 kdKS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 1798 35 3,30 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) + K(s) 1799 35 3,10 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) 1800 35 3,30 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) + K(s) 1801 35 3,10 kdKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 1802 3,35 36 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 1803 3,35 36 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 1804 3,35 36 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p!5), P(s!5), K(s!4), K(s!3), K(s!2) 1805 3,35 36 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~u!3, x8~p!4), P(s!4), K(s!3), K(s!2) 1806 2,33 35 kPS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) + K(s) 1807 33 3,16 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) + K(s) 1808 33 3,32 kdKS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) + K(s) 1809 33 3,16 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) + K(s) 1810 33 3,32 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) + K(s) 1811 33 3,16 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) + K(s) 1812 33 3,32 kdKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) 1813 3,33 34 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) 1814 3,33 34 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) 1815 3,33 34 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!4, x7~u!1, x8~p), K(s!4), K(s!3), K(s!2) 1816 3,33 34 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) 1817 2,32 10 kPS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) + K(s) 1818 32 3,15 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) + K(s) 1819 32 3,7 kdKS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) + K(s) 1820 32 3,15 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) + K(s) 1821 32 3,7 kdKS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) 1822 3,32 33 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) 1823 3,32 33 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) 1824 3,32 33 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) 1825 3,32 33 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!3, x7~u!1, x8~p), K(s!3), K(s!2) 1826 3,32 33 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~u!2, x8~p), K(s!2) + P(s) 1827 30 2,32 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) + P(s) 1828 30 2,16 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 1829 2,30 28 kPS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) + K(s) 1830 30 3,20 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) + K(s) 1831 30 3,12 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) + K(s) 1832 30 3,20 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) + K(s) 1833 30 3,12 kdKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 1834 3,30 31 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 1835 3,30 31 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 1836 3,30 31 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p, x8~p!4), P(s!4), K(s!3), K(s!2) 1837 3,30 31 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) + P(s) 1838 28 2,10 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) 1839 28 2,30 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) + P(s) 1840 28 2,10 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p!3), P(s!3), K(s!2) + P(s) 1841 28 2,30 kdPS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 1842 28 3,22 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 1843 28 3,27 kdKS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 1844 28 3,22 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) 1845 28 3,27 kdKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 1846 3,28 29 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 1847 3,28 29 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 1848 3,28 29 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!3, x6~u!1, x7~p!4, x8~p!5), P(s!5), K(s!3), P(s!4), K(s!2) 1849 3,28 29 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) + P(s) 1850 27 2,9 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) + P(s) 1851 27 2,12 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) + P(s) 1852 27 2,9 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) + P(s) 1853 27 2,12 kdPS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) 1854 27 3,21 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p!1, x8~p!2), P(s!1), P(s!2) + K(s) 1855 27 3,13 kdKS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 1856 3,27 28 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 1857 3,27 28 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 1858 3,27 28 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 1859 3,27 28 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p!3, x8~p!4), P(s!4), K(s!2), P(s!3) 1860 3,27 28 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 1861 24 2,27 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 1862 24 2,22 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 1863 24 2,27 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 1864 24 2,22 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 1865 24 2,27 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) + P(s) 1866 24 2,22 kdPS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~p, x6~p!1, x7~p!2, x8~p!3), P(s!2), P(s!3), P(s!1) + K(s) 1867 24 3,26 kpS # rule : K(s!1), S(x5~u!1) -> K(s), S(x5~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + K(s) 1868 24 3,23 kdKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 1869 3,24 25 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 1870 3,24 25 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 1871 3,24 25 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u!2, x5~u!1, x6~p!3, x7~p!4, x8~p!5), P(s!5), K(s!2), P(s!4), P(s!3) 1872 3,24 25 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p!1, x8~p!2), P(s!1), P(s!2) + P(s) 1873 23 2,13 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 1874 23 2,21 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p!1, x8~p!2), P(s!1), P(s!2) + P(s) 1875 23 2,13 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 1876 23 2,21 kdPS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~u) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p!1, x8~p!2), P(s!1), P(s!2) + P(s) 1877 23 2,13 kuS # rule : P(s!1), S(x6~p!1) -> P(s), S(x6~p) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) 1878 23 2,21 kdPS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 1879 3,23 24 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 1880 3,23 24 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 1881 3,23 24 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 1882 3,23 24 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p!2, x7~p!3, x8~p!4), P(s!4), P(s!3), P(s!2) 1883 3,23 24 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p!1), P(s!1) + P(s) 1884 21 2,11 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 1885 21 2,19 kdPS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~u) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p!1), P(s!1) + P(s) 1886 21 2,11 kuS # rule : P(s!1), S(x7~p!1) -> P(s), S(x7~p) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p!1), P(s!1) + P(s) 1887 21 2,19 kdPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p!1, x7~p!2, x8~p!3), P(s!1), P(s!3), P(s!2) 1888 2,21 23 kPS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1889 3,21 22 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1890 3,21 22 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1891 3,21 22 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1892 3,21 22 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p!2, x8~p!3), P(s!3), P(s!2) 1893 3,21 22 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p!1), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p) + P(s) 1894 19 2,14 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p!1), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p) + P(s) 1895 19 2,17 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 1896 2,19 21 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p!1, x8~p!2), P(s!2), P(s!1) 1897 2,19 21 kPS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) 1898 3,19 20 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) 1899 3,19 20 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) 1900 3,19 20 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) 1901 3,19 20 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p!2), P(s!2) 1902 3,19 20 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p!1), P(s!1) 1903 2,17 19 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p!1), P(s!1) 1904 2,17 19 kPS # rule : P(s), S(x6~p) -> P(s!1), S(x6~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p!1), P(s!1) 1905 2,17 19 kPS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) 1906 3,17 18 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) 1907 3,17 18 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) 1908 3,17 18 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) 1909 3,17 18 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!1, x6~p, x7~p, x8~p) 1910 3,17 18 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) 1911 2,15 12 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) + P(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) 1912 2,15 12 kPS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~p, x7~p, x8~p) + K(s) 1913 15 3,17 kpS # rule : K(s!1), S(x6~u!1) -> K(s), S(x6~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p) + K(s) 1914 15 3,14 kdKS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) 1915 3,15 16 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) 1916 3,15 16 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) 1917 3,15 16 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) 1918 3,15 16 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u!2, x6~u!1, x7~p, x8~p), K(s!2) 1919 3,15 16 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p!1), P(s!1) 1920 2,14 11 kPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p!1), P(s!1) 1921 2,14 11 kPS # rule : K(s), S(x6~u) -> K(s!1), S(x6~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) 1922 3,14 15 kKS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) 1923 3,14 15 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) 1924 3,14 15 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) 1925 3,14 15 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) 1926 3,14 15 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p) 1927 3,14 15 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p!1), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p) + P(s) 1928 11 2,6 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p!1), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p) + P(s) 1929 11 2,14 kdPS # rule : P(s), S(x7~p) -> P(s!1), S(x7~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p!1), P(s!1) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p!1, x8~p!2), P(s!1), P(s!2) 1930 2,11 13 kPS # rule : K(s), S(x6~u) -> K(s!1), S(x6~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) 1931 3,11 12 kKS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) 1932 3,11 12 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) 1933 3,11 12 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) 1934 3,11 12 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) 1935 3,11 12 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!1, x7~p, x8~p!2), P(s!2) 1936 3,11 12 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) + P(s) 1937 9 2,4 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) + P(s) 1938 9 2,7 kdPS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~p, x8~p!1), P(s!1) + K(s) 1939 9 3,11 kpS # rule : K(s!1), S(x7~u!1) -> K(s), S(x7~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p!1), P(s!1) + K(s) 1940 9 3,8 kdKS # rule : K(s), S(x6~u) -> K(s!1), S(x6~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) 1941 3,9 10 kKS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) 1942 3,9 10 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) 1943 3,9 10 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) 1944 3,9 10 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) 1945 3,9 10 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u!2, x7~u!1, x8~p!3), P(s!3), K(s!2) 1946 3,9 10 kKS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~u) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p!1), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u) + P(s) 1947 8 1,2 kuS # rule : P(s!1), S(x8~p!1) -> P(s), S(x8~p) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p!1), P(s!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p) + P(s) 1948 8 2,6 kdPS # rule : K(s), S(x7~u) -> K(s!1), S(x7~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) 1949 3,8 9 kKS # rule : K(s), S(x6~u) -> K(s!1), S(x6~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) 1950 3,8 9 kKS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) 1951 3,8 9 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) 1952 3,8 9 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) 1953 3,8 9 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) 1954 3,8 9 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p!1), P(s!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p!2), P(s!2) 1955 3,8 9 kKS # rule : P(s), S(x8~p) -> P(s!1), S(x8~p!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p) + P(s) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p!1), P(s!1) 1956 2,6 8 kPS # rule : K(s), S(x7~u) -> K(s!1), S(x7~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) 1957 3,6 7 kKS # rule : K(s), S(x6~u) -> K(s!1), S(x6~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) 1958 3,6 7 kKS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) 1959 3,6 7 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) 1960 3,6 7 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) 1961 3,6 7 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) 1962 3,6 7 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!1, x8~p) 1963 3,6 7 kKS # rule : K(s!1), S(x8~u!1) -> K(s), S(x8~p) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~p) + K(s) 1964 4 3,6 kpS # rule : K(s!1), S(x8~u!1) -> K(s), S(x8~u) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) -> S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u) + K(s) 1965 4 1,3 kdKS # rule : K(s), S(x7~u) -> K(s!1), S(x7~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) 1966 3,4 5 kKS # rule : K(s), S(x6~u) -> K(s!1), S(x6~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) 1967 3,4 5 kKS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) 1968 3,4 5 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) 1969 3,4 5 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) 1970 3,4 5 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) 1971 3,4 5 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u!2, x8~u!1), K(s!2) 1972 3,4 5 kKS # rule : K(s), S(x8~u) -> K(s!1), S(x8~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) 1973 1,3 4 kKS # rule : K(s), S(x7~u) -> K(s!1), S(x7~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) 1974 1,3 4 kKS # rule : K(s), S(x6~u) -> K(s!1), S(x6~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) 1975 1,3 4 kKS # rule : K(s), S(x5~u) -> K(s!1), S(x5~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) 1976 1,3 4 kKS # rule : K(s), S(x4~u) -> K(s!1), S(x4~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) 1977 1,3 4 kKS # rule : K(s), S(x3~u) -> K(s!1), S(x3~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) 1978 1,3 4 kKS # rule : K(s), S(x2~u) -> K(s!1), S(x2~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) 1979 1,3 4 kKS # rule : K(s), S(x1~u) -> K(s!1), S(x1~u!1) # S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u) + K(s) -> K(s!1), S(x1~u, x2~u, x3~u, x4~u, x5~u, x6~u, x7~u, x8~u!1) 1980 1,3 4 kKS end reactions