TSTP Solution File: NUM605+3 by PyRes---1.3
View Problem
- Process Solution
%------------------------------------------------------------------------------
% File : PyRes---1.3
% Problem : NUM605+3 : TPTP v8.1.0. Released v4.0.0.
% 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 : Mon Jul 18 13:38:06 EDT 2022
% Result : Theorem 23.17s 23.35s
% Output : Refutation 23.17s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.10/0.11 % Problem : NUM605+3 : TPTP v8.1.0. Released v4.0.0.
% 0.10/0.12 % Command : pyres-fof.py -tifbsVp -nlargest -HPickGiven5 %s
% 0.12/0.33 % Computer : n017.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 : 300
% 0.12/0.33 % WCLimit : 600
% 0.12/0.33 % DateTime : Tue Jul 5 02:00:43 EDT 2022
% 0.12/0.33 % CPUTime :
% 23.17/23.35 # Version: 1.3
% 23.17/23.35 # SZS status Theorem
% 23.17/23.35 # SZS output start CNFRefutation
% 23.17/23.35 fof(m__3520,plain,xK!=sz00,input).
% 23.17/23.35 cnf(c860,plain,xK!=sz00,inference(split_conjunct,status(thm),[m__3520])).
% 23.17/23.35 cnf(symmetry,axiom,X289!=X288|X288=X289,eq_axiom).
% 23.17/23.35 fof(mZeroNum,axiom,aElementOf0(sz00,szNzAzT0),input).
% 23.17/23.35 cnf(c5116,axiom,aElementOf0(sz00,szNzAzT0),inference(split_conjunct,status(thm),[mZeroNum])).
% 23.17/23.35 fof(mCardSeg,axiom,(![W0]:(aElementOf0(W0,szNzAzT0)=>sbrdtbr0(slbdtrb0(W0))=W0)),input).
% 23.17/23.35 fof(c4973,axiom,(![W0]:(~aElementOf0(W0,szNzAzT0)|sbrdtbr0(slbdtrb0(W0))=W0)),inference(fof_nnf,status(thm),[mCardSeg])).
% 23.17/23.35 fof(c4974,axiom,(![X182]:(~aElementOf0(X182,szNzAzT0)|sbrdtbr0(slbdtrb0(X182))=X182)),inference(variable_rename,status(thm),[c4973])).
% 23.17/23.35 cnf(c4975,axiom,~aElementOf0(X1077,szNzAzT0)|sbrdtbr0(slbdtrb0(X1077))=X1077,inference(split_conjunct,status(thm),[c4974])).
% 23.17/23.35 cnf(c9753,plain,sbrdtbr0(slbdtrb0(sz00))=sz00,inference(resolution,status(thm),[c4975, c5116])).
% 23.17/23.35 cnf(c9783,plain,sz00=sbrdtbr0(slbdtrb0(sz00)),inference(resolution,status(thm),[c9753, symmetry])).
% 23.17/23.35 cnf(transitivity,axiom,X291!=X290|X290!=X292|X291=X292,eq_axiom).
% 23.17/23.35 fof(m__5078,plain,((((aSet0(xQ)&(![W0]:(aElementOf0(W0,xQ)=>aElementOf0(W0,xO))))&aSubsetOf0(xQ,xO))&sbrdtbr0(xQ)=xK)&aElementOf0(xQ,slbdtsldtrb0(xO,xK))),input).
% 23.17/23.35 fof(c29,plain,((((aSet0(xQ)&(![W0]:(~aElementOf0(W0,xQ)|aElementOf0(W0,xO))))&aSubsetOf0(xQ,xO))&sbrdtbr0(xQ)=xK)&aElementOf0(xQ,slbdtsldtrb0(xO,xK))),inference(fof_nnf,status(thm),[m__5078])).
% 23.17/23.35 fof(c31,plain,(![X3]:((((aSet0(xQ)&(~aElementOf0(X3,xQ)|aElementOf0(X3,xO)))&aSubsetOf0(xQ,xO))&sbrdtbr0(xQ)=xK)&aElementOf0(xQ,slbdtsldtrb0(xO,xK)))),inference(shift_quantors,status(thm),[fof(c30,plain,((((aSet0(xQ)&(![X3]:(~aElementOf0(X3,xQ)|aElementOf0(X3,xO))))&aSubsetOf0(xQ,xO))&sbrdtbr0(xQ)=xK)&aElementOf0(xQ,slbdtsldtrb0(xO,xK))),inference(variable_rename,status(thm),[c29])).])).
% 23.17/23.35 cnf(c35,plain,sbrdtbr0(xQ)=xK,inference(split_conjunct,status(thm),[c31])).
% 23.17/23.35 cnf(c5256,plain,X528!=sbrdtbr0(xQ)|X528=xK,inference(resolution,status(thm),[c35, transitivity])).
% 23.17/23.35 cnf(c3,plain,X306!=X305|sbrdtbr0(X306)=sbrdtbr0(X305),eq_axiom).
% 23.17/23.35 fof(mSegZero,axiom,slbdtrb0(sz00)=slcrc0,input).
% 23.17/23.35 cnf(c4993,axiom,slbdtrb0(sz00)=slcrc0,inference(split_conjunct,status(thm),[mSegZero])).
% 23.17/23.35 fof(m__,conjecture,(~((~(?[W0]:aElementOf0(W0,xQ)))&xQ=slcrc0)),input).
% 23.17/23.35 fof(c23,negated_conjecture,(~(~((~(?[W0]:aElementOf0(W0,xQ)))&xQ=slcrc0))),inference(assume_negation,status(cth),[m__])).
% 23.17/23.35 fof(c24,negated_conjecture,((![W0]:~aElementOf0(W0,xQ))&xQ=slcrc0),inference(fof_nnf,status(thm),[c23])).
% 23.17/23.35 fof(c26,negated_conjecture,(![X2]:(~aElementOf0(X2,xQ)&xQ=slcrc0)),inference(shift_quantors,status(thm),[fof(c25,negated_conjecture,((![X2]:~aElementOf0(X2,xQ))&xQ=slcrc0),inference(variable_rename,status(thm),[c24])).])).
% 23.17/23.35 cnf(c28,negated_conjecture,xQ=slcrc0,inference(split_conjunct,status(thm),[c26])).
% 23.17/23.35 cnf(c5232,plain,slcrc0=xQ,inference(resolution,status(thm),[c28, symmetry])).
% 23.17/23.35 cnf(c5239,plain,X412!=slcrc0|X412=xQ,inference(resolution,status(thm),[c5232, transitivity])).
% 23.17/23.35 cnf(c5756,plain,slbdtrb0(sz00)=xQ,inference(resolution,status(thm),[c5239, c4993])).
% 23.17/23.35 cnf(c5772,plain,sbrdtbr0(slbdtrb0(sz00))=sbrdtbr0(xQ),inference(resolution,status(thm),[c5756, c3])).
% 23.17/23.35 cnf(c9042,plain,sbrdtbr0(slbdtrb0(sz00))=xK,inference(resolution,status(thm),[c5772, c5256])).
% 23.17/23.35 cnf(c9078,plain,X2536!=sbrdtbr0(slbdtrb0(sz00))|X2536=xK,inference(resolution,status(thm),[c9042, transitivity])).
% 23.17/23.35 cnf(c19845,plain,sz00=xK,inference(resolution,status(thm),[c9078, c9783])).
% 23.17/23.35 cnf(c19847,plain,xK=sz00,inference(resolution,status(thm),[c19845, symmetry])).
% 23.17/23.35 cnf(c19916,plain,$false,inference(resolution,status(thm),[c19847, c860])).
% 23.17/23.35 # SZS output end CNFRefutation
% 23.17/23.35
% 23.17/23.35 # Initial clauses : 4905
% 23.17/23.35 # Processed clauses : 2071
% 23.17/23.35 # Factors computed : 10
% 23.17/23.35 # Resolvents computed: 14695
% 23.17/23.35 # Tautologies deleted: 29
% 23.17/23.35 # Forward subsumed : 1174
% 23.17/23.35 # Backward subsumed : 42
% 23.17/23.35 # -------- CPU Time ---------
% 23.17/23.35 # User time : 22.955 s
% 23.17/23.35 # System time : 0.062 s
% 23.17/23.35 # Total time : 23.017 s
%------------------------------------------------------------------------------