0.09/0.12 % Problem : theBenchmark.p : TPTP v0.0.0. Released v0.0.0. 0.09/0.12 % Command : tptp2X_and_run_prover9 %d %s 0.12/0.33 % Computer : n008.cluster.edu 0.12/0.33 % Model : x86_64 x86_64 0.12/0.33 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz 0.12/0.33 % Memory : 8042.1875MB 0.12/0.33 % OS : Linux 3.10.0-693.el7.x86_64 0.12/0.33 % CPULimit : 960 0.12/0.33 % WCLimit : 120 0.12/0.33 % DateTime : Tue Aug 9 04:13:39 EDT 2022 0.12/0.33 % CPUTime : 0.82/1.09 ============================== Prover9 =============================== 0.82/1.09 Prover9 (32) version 2009-11A, November 2009. 0.82/1.09 Process 32651 was started by sandbox2 on n008.cluster.edu, 0.82/1.09 Tue Aug 9 04:13:39 2022 0.82/1.09 The command was "/export/starexec/sandbox2/solver/bin/prover9 -t 960 -f /tmp/Prover9_32261_n008.cluster.edu". 0.82/1.09 ============================== end of head =========================== 0.82/1.09 0.82/1.09 ============================== INPUT ================================= 0.82/1.09 0.82/1.09 % Reading from file /tmp/Prover9_32261_n008.cluster.edu 0.82/1.09 0.82/1.09 set(prolog_style_variables). 0.82/1.09 set(auto2). 0.82/1.09 % set(auto2) -> set(auto). 0.82/1.09 % set(auto) -> set(auto_inference). 0.82/1.09 % set(auto) -> set(auto_setup). 0.82/1.09 % set(auto_setup) -> set(predicate_elim). 0.82/1.09 % set(auto_setup) -> assign(eq_defs, unfold). 0.82/1.09 % set(auto) -> set(auto_limits). 0.82/1.09 % set(auto_limits) -> assign(max_weight, "100.000"). 0.82/1.09 % set(auto_limits) -> assign(sos_limit, 20000). 0.82/1.09 % set(auto) -> set(auto_denials). 0.82/1.09 % set(auto) -> set(auto_process). 0.82/1.09 % set(auto2) -> assign(new_constants, 1). 0.82/1.09 % set(auto2) -> assign(fold_denial_max, 3). 0.82/1.09 % set(auto2) -> assign(max_weight, "200.000"). 0.82/1.09 % set(auto2) -> assign(max_hours, 1). 0.82/1.09 % assign(max_hours, 1) -> assign(max_seconds, 3600). 0.82/1.09 % set(auto2) -> assign(max_seconds, 0). 0.82/1.09 % set(auto2) -> assign(max_minutes, 5). 0.82/1.09 % assign(max_minutes, 5) -> assign(max_seconds, 300). 0.82/1.09 % set(auto2) -> set(sort_initial_sos). 0.82/1.09 % set(auto2) -> assign(sos_limit, -1). 0.82/1.09 % set(auto2) -> assign(lrs_ticks, 3000). 0.82/1.09 % set(auto2) -> assign(max_megs, 400). 0.82/1.09 % set(auto2) -> assign(stats, some). 0.82/1.09 % set(auto2) -> clear(echo_input). 0.82/1.09 % set(auto2) -> set(quiet). 0.82/1.09 % set(auto2) -> clear(print_initial_clauses). 0.82/1.09 % set(auto2) -> clear(print_given). 0.82/1.09 assign(lrs_ticks,-1). 0.82/1.09 assign(sos_limit,10000). 0.82/1.09 assign(order,kbo). 0.82/1.09 set(lex_order_vars). 0.82/1.09 clear(print_given). 0.82/1.09 0.82/1.09 % formulas(sos). % not echoed (96 formulas) 0.82/1.09 0.82/1.09 ============================== end of input ========================== 0.82/1.09 0.82/1.09 % From the command line: assign(max_seconds, 960). 0.82/1.09 0.82/1.09 ============================== PROCESS NON-CLAUSAL FORMULAS ========== 0.82/1.09 0.82/1.09 % Formulas that are not ordinary clauses: 0.82/1.09 1 (all U (ssItem(U) -> (all V (ssItem(V) -> (all W (ssList(W) -> (all X (ssList(X) -> (frontsegP(cons(U,W),cons(V,X)) <-> frontsegP(W,X) & V = U))))))))) # label(ax44) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 2 (all U (ssList(U) -> (all V (ssList(V) -> (all W (ssList(W) -> (frontsegP(U,V) -> frontsegP(app(U,W),V)))))))) # label(ax43) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 3 (all U (ssItem(U) -> -memberP(nil,U))) # label(ax38) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 4 (all U (ssList(U) -> (all V (ssList(V) -> (U != nil -> hd(app(U,V)) = hd(U)))))) # label(ax85) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 5 (all U (ssList(U) -> rearsegP(U,nil))) # label(ax51) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 6 (all U (ssList(U) -> app(nil,U) = U)) # label(ax28) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 7 (all U (ssList(U) -> (all V (ssList(V) -> (all W (ssList(W) -> (app(W,V) = app(U,V) -> W = U))))))) # label(ax79) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 8 (all U (ssItem(U) -> (all V (ssItem(V) -> (all W (ssItem(W) -> (geq(V,W) & geq(U,V) -> geq(U,W)))))))) # label(ax88) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 9 (all U (ssItem(U) -> (all V (ssItem(V) -> (all W (ssItem(W) -> (gt(U,V) & gt(V,W) -> gt(U,W)))))))) # label(ax95) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 10 (all U (ssList(U) -> (all V (ssList(V) -> (all W (ssItem(W) -> (all X (ssItem(X) -> (cons(X,V) = cons(W,U) -> X = W & U = V))))))))) # label(ax19) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 11 (all U (ssList(U) -> (all V (ssList(V) -> ((exists W ((exists X (U = app(app(W,V),X) & ssList(X))) & ssList(W))) <-> segmentP(U,V)))))) # label(ax7) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 12 (all U (ssItem(U) -> totalorderedP(cons(U,nil)))) # label(ax65) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 13 (all U (ssItem(U) -> geq(U,U))) # label(ax89) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 14 (all U (ssList(U) -> (all V (ssList(V) -> ssList(app(U,V)))))) # label(ax26) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 15 (all U (ssList(U) -> (all V (ssItem(V) -> ssList(cons(V,U)))))) # label(ax16) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 16 (all U (ssItem(U) -> duplicatefreeP(cons(U,nil)))) # label(ax71) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 17 (all U (ssItem(U) -> totalorderP(cons(U,nil)))) # label(ax61) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 18 (all U (ssList(U) -> (all V (ssList(V) -> ((exists W (ssList(W) & app(V,W) = U)) <-> frontsegP(U,V)))))) # label(ax5) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 19 (all U (ssList(U) -> frontsegP(U,U))) # label(ax42) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 20 (all U (ssList(U) -> rearsegP(U,U))) # label(ax49) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 21 (all U (ssItem(U) -> (all V (ssItem(V) -> (all W (ssList(W) -> (memberP(cons(V,W),U) <-> memberP(W,U) | V = U))))))) # label(ax37) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 22 (all U (ssItem(U) -> strictorderP(cons(U,nil)))) # label(ax63) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 23 (all U (ssList(U) -> ((all V (ssItem(V) -> (all W (ssItem(W) -> (all X (ssList(X) -> (all Y (ssList(Y) -> (all Z (ssList(Z) -> (app(app(X,cons(V,Y)),cons(W,Z)) = U -> -(leq(V,W) & leq(W,V))))))))))))) <-> cyclefreeP(U)))) # label(ax8) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 24 (all U (ssList(U) -> (equalelemsP(U) <-> (all V (ssItem(V) -> (all W (ssItem(W) -> (all X (ssList(X) -> (all Y (ssList(Y) -> (app(X,cons(V,cons(W,Y))) = U -> V = W)))))))))))) # label(ax14) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 25 (all U (ssList(U) -> segmentP(U,U))) # label(ax55) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 26 (all U (ssList(U) -> (all V (ssList(V) -> (all W (ssList(W) -> (all X (ssList(X) -> (segmentP(U,V) -> segmentP(app(app(W,U),X),V)))))))))) # label(ax56) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 27 (all U (ssList(U) -> nil = U | (exists V ((exists W (cons(W,V) = U & ssItem(W))) & ssList(V))))) # label(ax20) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 28 (all U (ssList(U) -> ((all V (ssItem(V) -> (all W (ssItem(W) -> (all X (ssList(X) -> (all Y (ssList(Y) -> (all Z (ssList(Z) -> (app(app(X,cons(V,Y)),cons(W,Z)) = U -> lt(V,W)))))))))))) <-> strictorderedP(U)))) # label(ax12) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 29 (all U (ssItem(U) -> -lt(U,U))) # label(ax90) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 30 (all U (ssItem(U) -> (all V (ssList(V) -> (V != nil & strictorderedP(V) & lt(U,hd(V)) | V = nil <-> strictorderedP(cons(U,V))))))) # label(ax70) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 31 (all U (ssList(U) -> (nil != U -> ssItem(hd(U))))) # label(ax22) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 32 (all U (ssList(U) -> (U != nil -> ssList(tl(U))))) # label(ax24) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 33 (all U (ssList(U) -> (all V (ssList(V) -> (all W (ssList(W) -> (rearsegP(U,V) & rearsegP(V,W) -> rearsegP(U,W)))))))) # label(ax47) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 34 (all U (ssList(U) -> (all V (ssList(V) -> (all W (ssItem(W) -> cons(W,app(V,U)) = app(cons(W,V),U))))))) # label(ax27) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 35 (all U (ssList(U) -> (all V (ssList(V) -> (V != U <-> neq(U,V)))))) # label(ax15) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 36 (all U (ssItem(U) -> (all V (ssList(V) -> (V = nil | leq(U,hd(V)) & totalorderedP(V) & V != nil <-> totalorderedP(cons(U,V))))))) # label(ax67) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 37 (all U (ssList(U) -> ((all V (ssItem(V) -> (all W (ssItem(W) -> (all X (ssList(X) -> (all Y (ssList(Y) -> (all Z (ssList(Z) -> (app(app(X,cons(V,Y)),cons(W,Z)) = U -> lt(V,W) | lt(W,V)))))))))))) <-> strictorderP(U)))) # label(ax10) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 38 (all U (ssList(U) -> (nil != U -> (exists V (ssList(V) & V = tl(U)))))) # label(ax76) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 39 (all U (ssList(U) -> (nil != U -> cons(hd(U),tl(U)) = U))) # label(ax78) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 40 (all U (ssList(U) -> (U = nil <-> frontsegP(nil,U)))) # label(ax46) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 41 (all U (ssItem(U) -> (all V (ssItem(V) -> (neq(U,V) <-> U != V))))) # label(ax1) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 42 (all U (ssList(U) -> (all V (ssList(V) -> (frontsegP(U,V) & frontsegP(V,U) -> U = V))))) # label(ax41) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 43 (all U (ssItem(U) -> strictorderedP(cons(U,nil)))) # label(ax68) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 44 (all U (ssItem(U) -> (all V (ssItem(V) -> (geq(U,V) & geq(V,U) -> U = V))))) # label(ax87) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 45 (all U (ssList(U) -> (all V (ssItem(V) -> V = hd(cons(V,U)))))) # label(ax23) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 46 (all U (ssItem(U) -> (all V (ssItem(V) -> (lt(U,V) -> -lt(V,U)))))) # label(ax33) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 47 (all U (ssList(U) -> (all V (ssList(V) -> (rearsegP(V,U) & rearsegP(U,V) -> V = U))))) # label(ax48) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 48 (all U (ssList(U) -> (U != nil -> (exists V (hd(U) = V & ssItem(V)))))) # label(ax75) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 49 (all U (ssList(U) -> (all V (ssList(V) -> (all W (ssList(W) -> (frontsegP(V,W) & frontsegP(U,V) -> frontsegP(U,W)))))))) # label(ax40) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 50 (all U (ssList(U) -> (all V (ssItem(V) -> app(cons(V,nil),U) = cons(V,U))))) # label(ax81) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 51 (all U (ssList(U) -> (rearsegP(nil,U) <-> U = nil))) # label(ax52) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 52 (all U (ssItem(U) -> (all V (ssItem(V) -> (geq(U,V) <-> leq(V,U)))))) # label(ax32) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 53 (all U (ssList(U) -> (totalorderedP(U) <-> (all V (ssItem(V) -> (all W (ssItem(W) -> (all X (ssList(X) -> (all Y (ssList(Y) -> (all Z (ssList(Z) -> (U = app(app(X,cons(V,Y)),cons(W,Z)) -> leq(V,W))))))))))))))) # label(ax11) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 54 (all U (ssItem(U) -> (all V (ssItem(V) -> (leq(V,U) & leq(U,V) -> V = U))))) # label(ax29) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 55 (all U (ssList(U) -> (duplicatefreeP(U) <-> (all V (ssItem(V) -> (all W (ssItem(W) -> (all X (ssList(X) -> (all Y (ssList(Y) -> (all Z (ssList(Z) -> (app(app(X,cons(V,Y)),cons(W,Z)) = U -> V != W)))))))))))))) # label(ax13) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 56 (all U (ssItem(U) -> cyclefreeP(cons(U,nil)))) # label(ax59) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 57 (all U (ssList(U) -> (all V (ssList(V) -> (U != nil & tl(V) = tl(U) & hd(U) = hd(V) & nil != V -> V = U))))) # label(ax77) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 58 (all U (ssList(U) -> (all V (ssList(V) -> (all W (ssList(W) -> (rearsegP(U,V) -> rearsegP(app(W,U),V)))))))) # label(ax50) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 59 (all U (ssList(U) -> (segmentP(nil,U) <-> U = nil))) # label(ax58) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 60 (all U (ssList(U) -> (all V (ssList(V) -> (nil = V & U = nil <-> app(U,V) = nil))))) # label(ax83) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 61 (all U (ssList(U) -> (all V (ssItem(V) -> tl(cons(V,U)) = U)))) # label(ax25) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 62 (all U (ssList(U) -> U = app(U,nil))) # label(ax84) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 63 (all U (ssList(U) -> (all V (ssList(V) -> (all W (ssList(W) -> (app(V,W) = app(V,U) -> U = W))))))) # label(ax80) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 64 (all U (ssItem(U) -> leq(U,U))) # label(ax31) # label(axiom) # label(non_clause). [assumption]. 0.82/1.09 65 (all U (ssList(U) -> (all V (ssItem(V) -> cons(V,U) != U)))) # label(ax18) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 66 (all U (ssList(U) -> (all V (ssList(V) -> (segmentP(U,V) & segmentP(V,U) -> V = U))))) # label(ax54) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 67 (all U (ssList(U) -> (all V (ssList(V) -> (nil != U -> tl(app(U,V)) = app(tl(U),V)))))) # label(ax86) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 68 (all U (ssList(U) -> (all V (ssItem(V) -> cons(V,U) != nil)))) # label(ax21) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 69 (all U (ssItem(U) -> (all V (ssList(V) -> (all W (ssList(W) -> (memberP(W,U) | memberP(V,U) <-> memberP(app(V,W),U)))))))) # label(ax36) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 70 (all U (ssItem(U) -> equalelemsP(cons(U,nil)))) # label(ax73) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 71 (all U (ssList(U) -> frontsegP(U,nil))) # label(ax45) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 72 (all U (ssList(U) -> (all V (ssList(V) -> ((exists W (U = app(W,V) & ssList(W))) <-> rearsegP(U,V)))))) # label(ax6) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 73 (all U (ssList(U) -> (totalorderP(U) <-> (all V (ssItem(V) -> (all W (ssItem(W) -> (all X (ssList(X) -> (all Y (ssList(Y) -> (all Z (ssList(Z) -> (app(app(X,cons(V,Y)),cons(W,Z)) = U -> leq(W,V) | leq(V,W))))))))))))))) # label(ax9) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 74 (all U (ssItem(U) -> (all V (ssItem(V) -> (all W (ssItem(W) -> (leq(U,V) & leq(V,W) -> leq(U,W)))))))) # label(ax30) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 75 (all U (ssItem(U) -> (all V (ssItem(V) -> (leq(U,V) & V != U <-> lt(U,V)))))) # label(ax93) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 76 (all U (ssItem(U) -> (all V (ssItem(V) -> (all W (ssItem(W) -> (leq(U,V) & lt(V,W) -> lt(U,W)))))))) # label(ax91) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 77 (all U (ssItem(U) -> (all V (ssItem(V) -> (gt(U,V) -> -gt(V,U)))))) # label(ax94) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 78 (exists U (ssItem(U) & (exists V (ssItem(V) & U != V)))) # label(ax2) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 79 (all U (ssItem(U) -> (all V (ssItem(V) -> (gt(U,V) <-> lt(V,U)))))) # label(ax35) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 80 (all U (ssList(U) -> (all V (ssItem(V) -> (memberP(U,V) <-> (exists W ((exists X (U = app(W,cons(V,X)) & ssList(X))) & ssList(W)))))))) # label(ax3) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 81 (all U (ssList(U) -> segmentP(U,nil))) # label(ax57) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 82 (all U (ssItem(U) -> (all V (ssItem(V) -> (all W (ssItem(W) -> (lt(V,W) & lt(U,V) -> lt(U,W)))))))) # label(ax34) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 83 (all U (ssItem(U) -> (all V (ssItem(V) -> (leq(U,V) -> V = U | lt(U,V)))))) # label(ax92) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 84 (all U (ssList(U) -> ((exists V (ssItem(V) & U = cons(V,nil))) <-> singletonP(U)))) # label(ax4) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 85 (all U (ssList(U) -> (all V (ssList(V) -> (all W (ssList(W) -> (segmentP(V,W) & segmentP(U,V) -> segmentP(U,W)))))))) # label(ax53) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 86 (all U (ssList(U) -> (all V (ssList(V) -> (all W (ssList(W) -> app(app(U,V),W) = app(U,app(V,W)))))))) # label(ax82) # label(axiom) # label(non_clause). [assumption]. 0.82/1.10 87 -(all U (ssList(U) -> (all V (ssList(V) -> (all W (ssList(W) -> (all X (ssList(X) -> U != W | nil = W & nil != X | (V != nil | nil = U) & (neq(U,nil) & segmentP(V,U) | -neq(V,nil)) | (all Y (ssList(Y) -> (all Z (ssList(Z) -> (exists X5 (ssItem(X5) & (exists X6 (ssList(X6) & app(cons(X5,nil),X6) = Z & (exists X7 (ssItem(X7) & (exists X8 (app(X8,cons(X7,nil)) = W & lt(X7,X5) & ssList(X8))))))))) | (exists X1 ((exists X2 (ssList(X2) & (exists X3 ((exists X4 (lt(X1,X3) & app(cons(X3,nil),X4) = W & ssList(X4))) & ssItem(X3))) & app(X2,cons(X1,nil)) = Y)) & ssItem(X1))) | -strictorderedP(W) | app(app(Y,W),Z) != X)))) | X != V)))))))) # label(co1) # label(negated_conjecture) # label(non_clause). [assumption]. 0.82/1.10 0.82/1.10 ============================== end of process non-clausal formulas === 0.82/1.11 0.82/1.11 ============================== PROCESS INITIAL CLAUSES =============== 0.82/1.11 0.82/1.11 ============================== PREDICATE ELIMINATION ================= 0.82/1.11 88 -ssList(A) | -equalelemsP(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | app(D,cons(B,cons(C,E))) != A | C = B # label(ax14) # label(axiom). [clausify(24)]. 0.82/1.11 89 equalelemsP(nil) # label(ax74) # label(axiom). [assumption]. 0.82/1.11 Derived: -ssList(nil) | -ssItem(A) | -ssItem(B) | -ssList(C) | -ssList(D) | app(C,cons(A,cons(B,D))) != nil | B = A. [resolve(88,b,89,a)]. 0.82/1.11 90 -ssList(A) | equalelemsP(A) | ssItem(f9(A)) # label(ax14) # label(axiom). [clausify(24)]. 0.82/1.11 Derived: -ssList(A) | ssItem(f9(A)) | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | app(D,cons(B,cons(C,E))) != A | C = B. [resolve(90,b,88,b)]. 0.82/1.11 91 -ssList(A) | equalelemsP(A) | ssItem(f10(A)) # label(ax14) # label(axiom). [clausify(24)]. 0.82/1.11 Derived: -ssList(A) | ssItem(f10(A)) | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | app(D,cons(B,cons(C,E))) != A | C = B. [resolve(91,b,88,b)]. 0.82/1.11 92 -ssList(A) | equalelemsP(A) | ssList(f11(A)) # label(ax14) # label(axiom). [clausify(24)]. 0.82/1.11 Derived: -ssList(A) | ssList(f11(A)) | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | app(D,cons(B,cons(C,E))) != A | C = B. [resolve(92,b,88,b)]. 0.82/1.11 93 -ssList(A) | equalelemsP(A) | ssList(f12(A)) # label(ax14) # label(axiom). [clausify(24)]. 0.82/1.11 Derived: -ssList(A) | ssList(f12(A)) | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | app(D,cons(B,cons(C,E))) != A | C = B. [resolve(93,b,88,b)]. 0.82/1.11 94 -ssList(A) | equalelemsP(A) | app(f11(A),cons(f9(A),cons(f10(A),f12(A)))) = A # label(ax14) # label(axiom). [clausify(24)]. 0.82/1.11 Derived: -ssList(A) | app(f11(A),cons(f9(A),cons(f10(A),f12(A)))) = A | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | app(D,cons(B,cons(C,E))) != A | C = B. [resolve(94,b,88,b)]. 0.82/1.11 95 -ssList(A) | equalelemsP(A) | f10(A) != f9(A) # label(ax14) # label(axiom). [clausify(24)]. 0.82/1.11 Derived: -ssList(A) | f10(A) != f9(A) | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | app(D,cons(B,cons(C,E))) != A | C = B. [resolve(95,b,88,b)]. 0.82/1.11 96 -ssItem(A) | equalelemsP(cons(A,nil)) # label(ax73) # label(axiom). [clausify(70)]. 0.82/1.11 Derived: -ssItem(A) | -ssList(cons(A,nil)) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | app(D,cons(B,cons(C,E))) != cons(A,nil) | C = B. [resolve(96,b,88,b)]. 0.82/1.11 97 -ssList(A) | -duplicatefreeP(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | C != B # label(ax13) # label(axiom). [clausify(55)]. 0.82/1.11 98 -ssItem(A) | duplicatefreeP(cons(A,nil)) # label(ax71) # label(axiom). [clausify(16)]. 0.82/1.11 Derived: -ssList(cons(A,nil)) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != cons(A,nil) | C != B | -ssItem(A). [resolve(97,b,98,b)]. 0.82/1.11 99 -ssList(A) | duplicatefreeP(A) | ssItem(f32(A)) # label(ax13) # label(axiom). [clausify(55)]. 0.82/1.11 Derived: -ssList(A) | ssItem(f32(A)) | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | C != B. [resolve(99,b,97,b)]. 0.82/1.11 100 -ssList(A) | duplicatefreeP(A) | ssItem(f33(A)) # label(ax13) # label(axiom). [clausify(55)]. 0.82/1.11 Derived: -ssList(A) | ssItem(f33(A)) | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | C != B. [resolve(100,b,97,b)]. 0.82/1.11 101 -ssList(A) | duplicatefreeP(A) | ssList(f34(A)) # label(ax13) # label(axiom). [clausify(55)]. 0.82/1.11 Derived: -ssList(A) | ssList(f34(A)) | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | C != B. [resolve(101,b,97,b)]. 0.82/1.11 102 -ssList(A) | duplicatefreeP(A) | ssList(f35(A)) # label(ax13) # label(axiom). [clausify(55)]. 0.82/1.11 Derived: -ssList(A) | ssList(f35(A)) | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | C != B. [resolve(102,b,97,b)]. 0.82/1.11 103 -ssList(A) | duplicatefreeP(A) | ssList(f36(A)) # label(ax13) # label(axiom). [clausify(55)]. 0.82/1.12 Derived: -ssList(A) | ssList(f36(A)) | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | C != B. [resolve(103,b,97,b)]. 0.82/1.12 104 -ssList(A) | duplicatefreeP(A) | app(app(f34(A),cons(f32(A),f35(A))),cons(f33(A),f36(A))) = A # label(ax13) # label(axiom). [clausify(55)]. 0.82/1.12 Derived: -ssList(A) | app(app(f34(A),cons(f32(A),f35(A))),cons(f33(A),f36(A))) = A | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | C != B. [resolve(104,b,97,b)]. 0.82/1.12 105 -ssList(A) | duplicatefreeP(A) | f33(A) = f32(A) # label(ax13) # label(axiom). [clausify(55)]. 0.82/1.12 Derived: -ssList(A) | f33(A) = f32(A) | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | C != B. [resolve(105,b,97,b)]. 0.82/1.12 106 duplicatefreeP(nil) # label(ax72) # label(axiom). [assumption]. 0.82/1.12 Derived: -ssList(nil) | -ssItem(A) | -ssItem(B) | -ssList(C) | -ssList(D) | -ssList(E) | app(app(C,cons(A,D)),cons(B,E)) != nil | B != A. [resolve(106,a,97,b)]. 0.82/1.12 107 -ssList(A) | -totalorderP(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | leq(C,B) | leq(B,C) # label(ax9) # label(axiom). [clausify(73)]. 0.82/1.12 108 -ssItem(A) | totalorderP(cons(A,nil)) # label(ax61) # label(axiom). [clausify(17)]. 0.82/1.12 109 totalorderP(nil) # label(ax62) # label(axiom). [assumption]. 0.82/1.12 Derived: -ssList(cons(A,nil)) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != cons(A,nil) | leq(C,B) | leq(B,C) | -ssItem(A). [resolve(107,b,108,b)]. 0.82/1.12 Derived: -ssList(nil) | -ssItem(A) | -ssItem(B) | -ssList(C) | -ssList(D) | -ssList(E) | app(app(C,cons(A,D)),cons(B,E)) != nil | leq(B,A) | leq(A,B). [resolve(107,b,109,a)]. 0.82/1.12 110 -ssList(A) | totalorderP(A) | ssItem(f38(A)) # label(ax9) # label(axiom). [clausify(73)]. 0.82/1.12 Derived: -ssList(A) | ssItem(f38(A)) | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | leq(C,B) | leq(B,C). [resolve(110,b,107,b)]. 0.82/1.12 111 -ssList(A) | totalorderP(A) | ssItem(f39(A)) # label(ax9) # label(axiom). [clausify(73)]. 0.82/1.12 Derived: -ssList(A) | ssItem(f39(A)) | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | leq(C,B) | leq(B,C). [resolve(111,b,107,b)]. 0.82/1.12 112 -ssList(A) | totalorderP(A) | ssList(f40(A)) # label(ax9) # label(axiom). [clausify(73)]. 0.82/1.12 Derived: -ssList(A) | ssList(f40(A)) | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | leq(C,B) | leq(B,C). [resolve(112,b,107,b)]. 0.82/1.12 113 -ssList(A) | totalorderP(A) | ssList(f41(A)) # label(ax9) # label(axiom). [clausify(73)]. 0.82/1.12 Derived: -ssList(A) | ssList(f41(A)) | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | leq(C,B) | leq(B,C). [resolve(113,b,107,b)]. 0.82/1.12 114 -ssList(A) | totalorderP(A) | ssList(f42(A)) # label(ax9) # label(axiom). [clausify(73)]. 0.82/1.12 Derived: -ssList(A) | ssList(f42(A)) | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | leq(C,B) | leq(B,C). [resolve(114,b,107,b)]. 0.82/1.12 115 -ssList(A) | totalorderP(A) | app(app(f40(A),cons(f38(A),f41(A))),cons(f39(A),f42(A))) = A # label(ax9) # label(axiom). [clausify(73)]. 0.82/1.12 Derived: -ssList(A) | app(app(f40(A),cons(f38(A),f41(A))),cons(f39(A),f42(A))) = A | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | leq(C,B) | leq(B,C). [resolve(115,b,107,b)]. 0.82/1.12 116 -ssList(A) | totalorderP(A) | -leq(f39(A),f38(A)) # label(ax9) # label(axiom). [clausify(73)]. 0.82/1.12 Derived: -ssList(A) | -leq(f39(A),f38(A)) | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | leq(C,B) | leq(B,C). [resolve(116,b,107,b)]. 0.82/1.12 117 -ssList(A) | totalorderP(A) | -leq(f38(A),f39(A)) # label(ax9) # label(axiom). [clausify(73)]. 0.82/1.16 Derived: -ssList(A) | -leq(f38(A),f39(A)) | -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | leq(C,B) | leq(B,C). [resolve(117,b,107,b)]. 0.82/1.16 118 -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | lt(B,C) | lt(C,B) | -strictorderP(A) # label(ax10) # label(axiom). [clausify(37)]. 0.82/1.16 119 -ssItem(A) | strictorderP(cons(A,nil)) # label(ax63) # label(axiom). [clausify(22)]. 0.82/1.16 120 -ssList(A) | ssItem(f20(A)) | strictorderP(A) # label(ax10) # label(axiom). [clausify(37)]. 0.82/1.16 121 -ssList(A) | ssItem(f21(A)) | strictorderP(A) # label(ax10) # label(axiom). [clausify(37)]. 0.82/1.16 122 -ssList(A) | ssList(f22(A)) | strictorderP(A) # label(ax10) # label(axiom). [clausify(37)]. 0.82/1.16 123 -ssList(A) | ssList(f23(A)) | strictorderP(A) # label(ax10) # label(axiom). [clausify(37)]. 0.82/1.16 124 -ssList(A) | ssList(f24(A)) | strictorderP(A) # label(ax10) # label(axiom). [clausify(37)]. 0.82/1.16 125 -ssList(A) | app(app(f22(A),cons(f20(A),f23(A))),cons(f21(A),f24(A))) = A | strictorderP(A) # label(ax10) # label(axiom). [clausify(37)]. 0.82/1.16 126 -ssList(A) | -lt(f20(A),f21(A)) | strictorderP(A) # label(ax10) # label(axiom). [clausify(37)]. 0.82/1.16 127 -ssList(A) | -lt(f21(A),f20(A)) | strictorderP(A) # label(ax10) # label(axiom). [clausify(37)]. 0.82/1.16 Derived: -ssList(cons(A,nil)) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != cons(A,nil) | lt(B,C) | lt(C,B) | -ssItem(A). [resolve(118,j,119,b)]. 0.82/1.16 Derived: -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | lt(B,C) | lt(C,B) | -ssList(A) | ssItem(f20(A)). [resolve(118,j,120,c)]. 0.82/1.16 Derived: -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | lt(B,C) | lt(C,B) | -ssList(A) | ssItem(f21(A)). [resolve(118,j,121,c)]. 0.82/1.16 Derived: -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | lt(B,C) | lt(C,B) | -ssList(A) | ssList(f22(A)). [resolve(118,j,122,c)]. 0.82/1.16 Derived: -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | lt(B,C) | lt(C,B) | -ssList(A) | ssList(f23(A)). [resolve(118,j,123,c)]. 0.82/1.16 Derived: -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | lt(B,C) | lt(C,B) | -ssList(A) | ssList(f24(A)). [resolve(118,j,124,c)]. 0.82/1.16 Derived: -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | lt(B,C) | lt(C,B) | -ssList(A) | app(app(f22(A),cons(f20(A),f23(A))),cons(f21(A),f24(A))) = A. [resolve(118,j,125,c)]. 0.82/1.16 Derived: -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | lt(B,C) | lt(C,B) | -ssList(A) | -lt(f20(A),f21(A)). [resolve(118,j,126,c)]. 0.82/1.16 Derived: -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | lt(B,C) | lt(C,B) | -ssList(A) | -lt(f21(A),f20(A)). [resolve(118,j,127,c)]. 0.82/1.16 128 strictorderP(nil) # label(ax64) # label(axiom). [assumption]. 0.82/1.16 Derived: -ssList(nil) | -ssItem(A) | -ssItem(B) | -ssList(C) | -ssList(D) | -ssList(E) | app(app(C,cons(A,D)),cons(B,E)) != nil | lt(A,B) | lt(B,A). [resolve(128,a,118,j)]. 0.82/1.16 129 -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | -leq(B,C) | -leq(C,B) | -cyclefreeP(A) # label(ax8) # label(axiom). [clausify(23)]. 0.82/1.16 130 -ssList(A) | ssItem(f4(A)) | cyclefreeP(A) # label(ax8) # label(axiom). [clausify(23)]. 0.82/1.16 131 -ssList(A) | ssItem(f5(A)) | cyclefreeP(A) # label(ax8) # label(axiom). [clausify(23)]. 0.82/1.16 132 -ssList(A) | ssList(f6(A)) | cyclefreeP(A) # label(ax8) # label(axiom). [clausify(23)]. 0.82/1.16 133 -ssList(A) | ssList(f7(A)) | cyclefreeP(A) # label(ax8) # label(axiom). [clausify(23)]. 0.82/1.16 134 -ssList(A) | ssList(f8(A)) | cyclefreeP(A) # label(ax8) # label(axiom). [clausify(23)]. 2.74/3.02 135 -ssList(A) | app(app(f6(A),cons(f4(A),f7(A))),cons(f5(A),f8(A))) = A | cyclefreeP(A) # label(ax8) # label(axiom). [clausify(23)]. 2.74/3.02 136 -ssList(A) | leq(f4(A),f5(A)) | cyclefreeP(A) # label(ax8) # label(axiom). [clausify(23)]. 2.74/3.02 137 -ssList(A) | leq(f5(A),f4(A)) | cyclefreeP(A) # label(ax8) # label(axiom). [clausify(23)]. 2.74/3.02 Derived: -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | -leq(B,C) | -leq(C,B) | -ssList(A) | ssItem(f4(A)). [resolve(129,j,130,c)]. 2.74/3.02 Derived: -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | -leq(B,C) | -leq(C,B) | -ssList(A) | ssItem(f5(A)). [resolve(129,j,131,c)]. 2.74/3.02 Derived: -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | -leq(B,C) | -leq(C,B) | -ssList(A) | ssList(f6(A)). [resolve(129,j,132,c)]. 2.74/3.02 Derived: -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | -leq(B,C) | -leq(C,B) | -ssList(A) | ssList(f7(A)). [resolve(129,j,133,c)]. 2.74/3.02 Derived: -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | -leq(B,C) | -leq(C,B) | -ssList(A) | ssList(f8(A)). [resolve(129,j,134,c)]. 2.74/3.02 Derived: -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | -leq(B,C) | -leq(C,B) | -ssList(A) | app(app(f6(A),cons(f4(A),f7(A))),cons(f5(A),f8(A))) = A. [resolve(129,j,135,c)]. 2.74/3.02 Derived: -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | -leq(B,C) | -leq(C,B) | -ssList(A) | leq(f4(A),f5(A)). [resolve(129,j,136,c)]. 2.74/3.02 Derived: -ssList(A) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != A | -leq(B,C) | -leq(C,B) | -ssList(A) | leq(f5(A),f4(A)). [resolve(129,j,137,c)]. 2.74/3.02 138 cyclefreeP(nil) # label(ax60) # label(axiom). [assumption]. 2.74/3.02 Derived: -ssList(nil) | -ssItem(A) | -ssItem(B) | -ssList(C) | -ssList(D) | -ssList(E) | app(app(C,cons(A,D)),cons(B,E)) != nil | -leq(A,B) | -leq(B,A). [resolve(138,a,129,j)]. 2.74/3.02 139 -ssItem(A) | cyclefreeP(cons(A,nil)) # label(ax59) # label(axiom). [clausify(56)]. 2.74/3.02 Derived: -ssItem(A) | -ssList(cons(A,nil)) | -ssItem(B) | -ssItem(C) | -ssList(D) | -ssList(E) | -ssList(F) | app(app(D,cons(B,E)),cons(C,F)) != cons(A,nil) | -leq(B,C) | -leq(C,B). [resolve(139,b,129,j)]. 2.74/3.02 2.74/3.02 ============================== end predicate elimination ============= 2.74/3.02 2.74/3.02 Auto_denials: (non-Horn, no changes). 2.74/3.02 2.74/3.02 Term ordering decisions: 2.74/3.02 Function symbol KB weights: nil=1. c1=1. c2=1. c3=1. c4=1. c5=1. c6=1. c7=1. c8=1. cons=1. app=1. f1=1. f2=1. f3=1. f37=1. f43=1. f44=1. hd=1. tl=1. f4=1. f5=1. f6=1. f7=1. f8=1. f9=1. f10=1. f11=1. f12=1. f13=1. f14=1. f15=1. f16=1. f17=1. f18=1. f19=1. f20=1. f21=1. f22=1. f23=1. f24=1. f25=1. f26=1. f27=1. f28=1. f29=1. f30=1. f31=1. f32=1. f33=1. f34=1. f35=1. f36=1. f38=1. f39=1. f40=1. f41=1. f42=1. f45=1. 2.74/3.02 2.74/3.02 ============================== end of process initial clauses ======== 2.74/3.02 2.74/3.02 ============================== CLAUSES FOR SEARCH ==================== 2.74/3.02 2.74/3.02 ============================== end of clauses for search ============= 2.74/3.02 2.74/3.02 ============================== SEARCH ================================ 2.74/3.02 2.74/3.02 % Starting search at 0.50 seconds. 2.74/3.02 2.74/3.02 Low Water (keep): wt=43.000, iters=3710 2.74/3.02 2.74/3.02 Low Water (keep): wt=31.000, iters=3416 2.74/3.02 2.74/3.02 NOTE: Back_subsumption disabled, ratio of kept to back_subsumed is 103 (0.00 of 0.97 sec). 2.74/3.02 2.74/3.02 Low Water (keep): wt=29.000, iters=3467 2.74/3.02 2.74/3.02 Low Water (keep): wt=23.000, iters=3490 2.74/3.02 2.74/3.02 Low Water (keep): wt=22.000, iters=3364 2.74/3.02 2.74/3.02 Low Water (keep): wt=21.000, iters=3400 2.74/3.02 2.74/3.02 Low Water (keep): wt=20.000, iters=3354 2.74/3.02 2.74/3.02 Low Water (keep): wt=19.000, iters=3381 2.74/3.02 2.74/3.02 Low Water (keep): wt=18.000, iters=3424 2.74/3.02 2.74/3.02 Low Water (keep): wt=17.000, iters=3351 2.74/3.02 2.74/3.02 Low Water (keep): wt=16.000, iters=3391 2.74/3.02 2.74/3.02 Low Water (keep): wt=14.000, iters=3429 2.74/3.02 2.74/3.02 Low Water (keep): Alarm clock 119.41/120.01 Prover9 interrupted 119.41/120.02 EOF