TSTP Solution File: SWV189+1 by PyRes---1.3

View Problem - Process Solution 
%------------------------------------------------------------------------------
% File     : PyRes---1.3
% Problem  : SWV189+1 : TPTP v8.1.0. Bugfixed v3.3.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : pyres-fof.py -tifbsVp -nlargest -HPickGiven5 %s

% Computer : n017.cluster.edu
% Model    : x86_64 x86_64
% CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 2.10GHz
% Memory   : 8042.1875MB
% OS       : Linux 3.10.0-693.el7.x86_64
% CPULimit : 300s
% WCLimit  : 600s
% DateTime : Wed Jul 20 21:16:06 EDT 2022

% Result   : Theorem 35.10s 35.35s
% Output   : Refutation 35.10s
% Verified : 
% SZS Type : -

% Comments : 
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%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.03/0.12  % Problem  : SWV189+1 : TPTP v8.1.0. Bugfixed v3.3.0.
% 0.03/0.13  % Command  : pyres-fof.py -tifbsVp -nlargest -HPickGiven5 %s
% 0.13/0.33  % Computer : n017.cluster.edu
% 0.13/0.33  % Model    : x86_64 x86_64
% 0.13/0.33  % CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.33  % Memory   : 8042.1875MB
% 0.13/0.33  % OS       : Linux 3.10.0-693.el7.x86_64
% 0.13/0.33  % CPULimit : 300
% 0.13/0.33  % WCLimit  : 600
% 0.13/0.33  % DateTime : Wed Jun 15 16:33:40 EDT 2022
% 0.13/0.33  % CPUTime  : 
% 35.10/35.35  # Version:  1.3
% 35.10/35.35  # SZS status Theorem
% 35.10/35.35  # SZS output start CNFRefutation
% 35.10/35.35  fof(irreflexivity_gt,axiom,(![X]:(~gt(X,X))),input).
% 35.10/35.35  fof(c455,axiom,(![X]:~gt(X,X)),inference(fof_simplification,status(thm),[irreflexivity_gt])).
% 35.10/35.35  fof(c456,axiom,(![X177]:~gt(X177,X177)),inference(variable_rename,status(thm),[c455])).
% 35.10/35.35  cnf(c457,axiom,~gt(X185,X185),inference(split_conjunct,status(thm),[c456])).
% 35.10/35.35  fof(leq_succ_gt,axiom,(![X]:(![Y]:(leq(succ(X),Y)=>gt(Y,X)))),input).
% 35.10/35.35  fof(c112,axiom,(![X]:(![Y]:(~leq(succ(X),Y)|gt(Y,X)))),inference(fof_nnf,status(thm),[leq_succ_gt])).
% 35.10/35.35  fof(c113,axiom,(![X45]:(![X46]:(~leq(succ(X45),X46)|gt(X46,X45)))),inference(variable_rename,status(thm),[c112])).
% 35.10/35.35  cnf(c114,axiom,~leq(succ(X321),X320)|gt(X320,X321),inference(split_conjunct,status(thm),[c113])).
% 35.10/35.35  fof(cl5_nebula_init_0121,conjecture,((![A]:((leq(n0,A)&leq(A,n4))=>a_select3(center_init,A,n0)=init))=>(![B]:((leq(n0,B)&leq(B,tptp_minus_1))=>(![C]:((leq(n0,C)&leq(C,n4))=>a_select3(q_init,B,C)=init))))),input).
% 35.10/35.35  fof(c66,negated_conjecture,(~((![A]:((leq(n0,A)&leq(A,n4))=>a_select3(center_init,A,n0)=init))=>(![B]:((leq(n0,B)&leq(B,tptp_minus_1))=>(![C]:((leq(n0,C)&leq(C,n4))=>a_select3(q_init,B,C)=init)))))),inference(assume_negation,status(cth),[cl5_nebula_init_0121])).
% 35.10/35.35  fof(c67,negated_conjecture,((![A]:((~leq(n0,A)|~leq(A,n4))|a_select3(center_init,A,n0)=init))&(?[B]:((leq(n0,B)&leq(B,tptp_minus_1))&(?[C]:((leq(n0,C)&leq(C,n4))&a_select3(q_init,B,C)!=init))))),inference(fof_nnf,status(thm),[c66])).
% 35.10/35.35  fof(c68,negated_conjecture,((![X8]:((~leq(n0,X8)|~leq(X8,n4))|a_select3(center_init,X8,n0)=init))&(?[X9]:((leq(n0,X9)&leq(X9,tptp_minus_1))&(?[X10]:((leq(n0,X10)&leq(X10,n4))&a_select3(q_init,X9,X10)!=init))))),inference(variable_rename,status(thm),[c67])).
% 35.10/35.35  fof(c70,negated_conjecture,(![X8]:(((~leq(n0,X8)|~leq(X8,n4))|a_select3(center_init,X8,n0)=init)&((leq(n0,skolem0001)&leq(skolem0001,tptp_minus_1))&((leq(n0,skolem0002)&leq(skolem0002,n4))&a_select3(q_init,skolem0001,skolem0002)!=init)))),inference(shift_quantors,status(thm),[fof(c69,negated_conjecture,((![X8]:((~leq(n0,X8)|~leq(X8,n4))|a_select3(center_init,X8,n0)=init))&((leq(n0,skolem0001)&leq(skolem0001,tptp_minus_1))&((leq(n0,skolem0002)&leq(skolem0002,n4))&a_select3(q_init,skolem0001,skolem0002)!=init))),inference(skolemize,status(esa),[c68])).])).
% 35.10/35.35  cnf(c73,negated_conjecture,leq(skolem0001,tptp_minus_1),inference(split_conjunct,status(thm),[c70])).
% 35.10/35.35  fof(transitivity_leq,axiom,(![X]:(![Y]:(![Z]:((leq(X,Y)&leq(Y,Z))=>leq(X,Z))))),input).
% 35.10/35.35  fof(c450,axiom,(![X]:(![Y]:(![Z]:((~leq(X,Y)|~leq(Y,Z))|leq(X,Z))))),inference(fof_nnf,status(thm),[transitivity_leq])).
% 35.10/35.35  fof(c451,axiom,(![X173]:(![X174]:(![X175]:((~leq(X173,X174)|~leq(X174,X175))|leq(X173,X175))))),inference(variable_rename,status(thm),[c450])).
% 35.10/35.35  cnf(c452,axiom,~leq(X2244,X2243)|~leq(X2243,X2245)|leq(X2244,X2245),inference(split_conjunct,status(thm),[c451])).
% 35.10/35.35  cnf(c27548,plain,~leq(X2413,skolem0001)|leq(X2413,tptp_minus_1),inference(resolution,status(thm),[c452, c73])).
% 35.10/35.35  cnf(c72,negated_conjecture,leq(n0,skolem0001),inference(split_conjunct,status(thm),[c70])).
% 35.10/35.35  cnf(c27528,plain,~leq(X2348,n0)|leq(X2348,skolem0001),inference(resolution,status(thm),[c452, c72])).
% 35.10/35.35  cnf(symmetry,axiom,X187!=X186|X186=X187,eq_axiom).
% 35.10/35.35  fof(succ_tptp_minus_1,axiom,succ(tptp_minus_1)=n0,input).
% 35.10/35.35  cnf(c147,axiom,succ(tptp_minus_1)=n0,inference(split_conjunct,status(thm),[succ_tptp_minus_1])).
% 35.10/35.35  cnf(c491,plain,n0=succ(tptp_minus_1),inference(resolution,status(thm),[c147, symmetry])).
% 35.10/35.35  cnf(reflexivity,axiom,X183=X183,eq_axiom).
% 35.10/35.35  fof(reflexivity_leq,axiom,(![X]:leq(X,X)),input).
% 35.10/35.35  fof(c453,axiom,(![X176]:leq(X176,X176)),inference(variable_rename,status(thm),[reflexivity_leq])).
% 35.10/35.35  cnf(c454,axiom,leq(X184,X184),inference(split_conjunct,status(thm),[c453])).
% 35.10/35.35  cnf(c19,plain,X288!=X286|X287!=X285|~leq(X288,X287)|leq(X286,X285),eq_axiom).
% 35.10/35.35  cnf(c678,plain,X2868!=X2870|X2868!=X2869|leq(X2870,X2869),inference(resolution,status(thm),[c19, c454])).
% 35.10/35.35  cnf(c49011,plain,X2874!=X2873|leq(X2873,X2874),inference(resolution,status(thm),[c678, reflexivity])).
% 35.10/35.35  cnf(c49069,plain,leq(succ(tptp_minus_1),n0),inference(resolution,status(thm),[c49011, c491])).
% 35.10/35.35  cnf(c49334,plain,leq(succ(tptp_minus_1),skolem0001),inference(resolution,status(thm),[c49069, c27528])).
% 35.10/35.35  cnf(c50409,plain,leq(succ(tptp_minus_1),tptp_minus_1),inference(resolution,status(thm),[c49334, c27548])).
% 35.10/35.35  cnf(c51428,plain,gt(tptp_minus_1,tptp_minus_1),inference(resolution,status(thm),[c50409, c114])).
% 35.10/35.35  cnf(c51532,plain,$false,inference(resolution,status(thm),[c51428, c457])).
% 35.10/35.35  # SZS output end CNFRefutation
% 35.10/35.35  
% 35.10/35.35  # Initial clauses    : 318
% 35.10/35.35  # Processed clauses  : 1371
% 35.10/35.35  # Factors computed   : 1
% 35.10/35.35  # Resolvents computed: 51073
% 35.10/35.35  # Tautologies deleted: 2
% 35.10/35.35  # Forward subsumed   : 1085
% 35.10/35.35  # Backward subsumed  : 0
% 35.10/35.35  # -------- CPU Time ---------
% 35.10/35.35  # User time          : 34.759 s
% 35.10/35.35  # System time        : 0.216 s
% 35.10/35.35  # Total time         : 34.975 s
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