TSTP Solution File: PHI024+1 by PyRes---1.5
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- Process Solution
%------------------------------------------------------------------------------
% File : PyRes---1.5
% Problem : PHI024+1 : TPTP v8.1.2. Released v7.4.0.
% Transfm : none
% Format : tptp:raw
% Command : pyres-fof.py -tifbsVp -nlargest -HPickGiven5 %s
% Computer : n025.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 : 300s
% DateTime : Thu May 9 17:37:18 EDT 2024
% Result : CounterSatisfiable 0.41s 0.62s
% Output : Saturation 0.41s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.03/0.13 % Problem : PHI024+1 : TPTP v8.1.2. Released v7.4.0.
% 0.03/0.14 % Command : pyres-fof.py -tifbsVp -nlargest -HPickGiven5 %s
% 0.14/0.35 % Computer : n025.cluster.edu
% 0.14/0.35 % Model : x86_64 x86_64
% 0.14/0.35 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.14/0.35 % Memory : 8042.1875MB
% 0.14/0.35 % OS : Linux 3.10.0-693.el7.x86_64
% 0.14/0.35 % CPULimit : 300
% 0.14/0.35 % WCLimit : 300
% 0.14/0.35 % DateTime : Wed May 8 22:29:38 EDT 2024
% 0.14/0.36 % CPUTime :
% 0.41/0.62 % Version: 1.5
% 0.41/0.62 % SZS status CounterSatisfiable
% 0.41/0.62 % SZS output start Saturation
% 0.41/0.62 fof(necessary,axiom,(![X]:(![Y]:(necessary(X)<=>(((externalTo(Y,X)&determinedByFixedMethod(X,Y))&determinedByDefiniteMethod(X,Y))&(isMethodAction(Y)|isMethodExistence(Y)))))),file('/export/starexec/sandbox2/benchmark/Axioms/PHI002+0.ax', necessary)).
% 0.41/0.62 fof(c119,plain,(![X]:(![Y]:((~necessary(X)|(((externalTo(Y,X)&determinedByFixedMethod(X,Y))&determinedByDefiniteMethod(X,Y))&(isMethodAction(Y)|isMethodExistence(Y))))&((((~externalTo(Y,X)|~determinedByFixedMethod(X,Y))|~determinedByDefiniteMethod(X,Y))|(~isMethodAction(Y)&~isMethodExistence(Y)))|necessary(X))))),inference(fof_nnf,[status(thm)],[necessary])).
% 0.41/0.62 fof(c120,plain,((![X]:(~necessary(X)|((((![Y]:externalTo(Y,X))&(![Y]:determinedByFixedMethod(X,Y)))&(![Y]:determinedByDefiniteMethod(X,Y)))&(![Y]:(isMethodAction(Y)|isMethodExistence(Y))))))&(![X]:((![Y]:(((~externalTo(Y,X)|~determinedByFixedMethod(X,Y))|~determinedByDefiniteMethod(X,Y))|(~isMethodAction(Y)&~isMethodExistence(Y))))|necessary(X)))),inference(shift_quantors,[status(thm)],[c119])).
% 0.41/0.62 fof(c122,plain,(![X29]:(![X30]:(![X31]:(![X32]:(![X33]:(![X34]:(![X35]:((~necessary(X29)|(((externalTo(X30,X29)&determinedByFixedMethod(X29,X31))&determinedByDefiniteMethod(X29,X32))&(isMethodAction(X33)|isMethodExistence(X33))))&((((~externalTo(X35,X34)|~determinedByFixedMethod(X34,X35))|~determinedByDefiniteMethod(X34,X35))|(~isMethodAction(X35)&~isMethodExistence(X35)))|necessary(X34)))))))))),inference(shift_quantors,[status(thm)],[fof(c121,plain,((![X29]:(~necessary(X29)|((((![X30]:externalTo(X30,X29))&(![X31]:determinedByFixedMethod(X29,X31)))&(![X32]:determinedByDefiniteMethod(X29,X32)))&(![X33]:(isMethodAction(X33)|isMethodExistence(X33))))))&(![X34]:((![X35]:(((~externalTo(X35,X34)|~determinedByFixedMethod(X34,X35))|~determinedByDefiniteMethod(X34,X35))|(~isMethodAction(X35)&~isMethodExistence(X35))))|necessary(X34)))),inference(variable_rename,[status(thm)],[c120])).])).
% 0.41/0.62 fof(c123,plain,(![X29]:(![X30]:(![X31]:(![X32]:(![X33]:(![X34]:(![X35]:(((((~necessary(X29)|externalTo(X30,X29))&(~necessary(X29)|determinedByFixedMethod(X29,X31)))&(~necessary(X29)|determinedByDefiniteMethod(X29,X32)))&(~necessary(X29)|(isMethodAction(X33)|isMethodExistence(X33))))&(((((~externalTo(X35,X34)|~determinedByFixedMethod(X34,X35))|~determinedByDefiniteMethod(X34,X35))|~isMethodAction(X35))|necessary(X34))&((((~externalTo(X35,X34)|~determinedByFixedMethod(X34,X35))|~determinedByDefiniteMethod(X34,X35))|~isMethodExistence(X35))|necessary(X34))))))))))),inference(distribute,[status(thm)],[c122])).
% 0.41/0.62 cnf(c129,plain,~externalTo(X348,X349)|~determinedByFixedMethod(X349,X348)|~determinedByDefiniteMethod(X349,X348)|~isMethodExistence(X348)|necessary(X349),inference(split_conjunct,[status(thm)],[c123])).
% 0.41/0.62 cnf(c128,plain,~externalTo(X346,X347)|~determinedByFixedMethod(X347,X346)|~determinedByDefiniteMethod(X347,X346)|~isMethodAction(X346)|necessary(X347),inference(split_conjunct,[status(thm)],[c123])).
% 0.41/0.62 cnf(c45,axiom,X344!=X342|X345!=X343|~objectOf(X344,X345)|objectOf(X342,X343),theory(equality)).
% 0.41/0.62 cnf(c44,axiom,X340!=X338|X341!=X339|~ideateOf(X340,X341)|ideateOf(X338,X339),theory(equality)).
% 0.41/0.62 cnf(c43,axiom,X336!=X334|X337!=X335|~correspondWith(X336,X337)|correspondWith(X334,X335),theory(equality)).
% 0.41/0.62 cnf(c41,axiom,X332!=X330|X333!=X331|~canBeUnderstoodInTermsOf(X332,X333)|canBeUnderstoodInTermsOf(X330,X331),theory(equality)).
% 0.41/0.62 fof(absolutely_infinite,axiom,(![X]:(![Y]:(absolutelyInfinite(X)<=>((substance(X)&constInInfAttributes(X))&(attributeOf(Y,X)=>(expressesEternalEssentiality(Y)&expressesInfiniteEssentiality(Y))))))),file('/export/starexec/sandbox2/benchmark/Axioms/PHI002+0.ax', absolutely_infinite)).
% 0.41/0.62 fof(c139,plain,(![X]:(![Y]:((~absolutelyInfinite(X)|((substance(X)&constInInfAttributes(X))&(~attributeOf(Y,X)|(expressesEternalEssentiality(Y)&expressesInfiniteEssentiality(Y)))))&(((~substance(X)|~constInInfAttributes(X))|(attributeOf(Y,X)&(~expressesEternalEssentiality(Y)|~expressesInfiniteEssentiality(Y))))|absolutelyInfinite(X))))),inference(fof_nnf,[status(thm)],[absolutely_infinite])).
% 0.41/0.62 fof(c140,plain,((![X]:(~absolutelyInfinite(X)|((substance(X)&constInInfAttributes(X))&(![Y]:(~attributeOf(Y,X)|(expressesEternalEssentiality(Y)&expressesInfiniteEssentiality(Y)))))))&(![X]:(((~substance(X)|~constInInfAttributes(X))|((![Y]:attributeOf(Y,X))&(![Y]:(~expressesEternalEssentiality(Y)|~expressesInfiniteEssentiality(Y)))))|absolutelyInfinite(X)))),inference(shift_quantors,[status(thm)],[c139])).
% 0.41/0.62 fof(c142,plain,(![X41]:(![X42]:(![X43]:(![X44]:(![X45]:((~absolutelyInfinite(X41)|((substance(X41)&constInInfAttributes(X41))&(~attributeOf(X42,X41)|(expressesEternalEssentiality(X42)&expressesInfiniteEssentiality(X42)))))&(((~substance(X43)|~constInInfAttributes(X43))|(attributeOf(X44,X43)&(~expressesEternalEssentiality(X45)|~expressesInfiniteEssentiality(X45))))|absolutelyInfinite(X43)))))))),inference(shift_quantors,[status(thm)],[fof(c141,plain,((![X41]:(~absolutelyInfinite(X41)|((substance(X41)&constInInfAttributes(X41))&(![X42]:(~attributeOf(X42,X41)|(expressesEternalEssentiality(X42)&expressesInfiniteEssentiality(X42)))))))&(![X43]:(((~substance(X43)|~constInInfAttributes(X43))|((![X44]:attributeOf(X44,X43))&(![X45]:(~expressesEternalEssentiality(X45)|~expressesInfiniteEssentiality(X45)))))|absolutelyInfinite(X43)))),inference(variable_rename,[status(thm)],[c140])).])).
% 0.41/0.62 fof(c143,plain,(![X41]:(![X42]:(![X43]:(![X44]:(![X45]:((((~absolutelyInfinite(X41)|substance(X41))&(~absolutelyInfinite(X41)|constInInfAttributes(X41)))&((~absolutelyInfinite(X41)|(~attributeOf(X42,X41)|expressesEternalEssentiality(X42)))&(~absolutelyInfinite(X41)|(~attributeOf(X42,X41)|expressesInfiniteEssentiality(X42)))))&((((~substance(X43)|~constInInfAttributes(X43))|attributeOf(X44,X43))|absolutelyInfinite(X43))&(((~substance(X43)|~constInInfAttributes(X43))|(~expressesEternalEssentiality(X45)|~expressesInfiniteEssentiality(X45)))|absolutelyInfinite(X43))))))))),inference(distribute,[status(thm)],[c142])).
% 0.41/0.62 cnf(c149,plain,~substance(X328)|~constInInfAttributes(X328)|~expressesEternalEssentiality(X329)|~expressesInfiniteEssentiality(X329)|absolutelyInfinite(X328),inference(split_conjunct,[status(thm)],[c143])).
% 0.41/0.62 cnf(c148,plain,~substance(X327)|~constInInfAttributes(X327)|attributeOf(X326,X327)|absolutelyInfinite(X327),inference(split_conjunct,[status(thm)],[c143])).
% 0.41/0.62 cnf(c40,axiom,X324!=X322|X325!=X323|~conceptionInvolves(X324,X325)|conceptionInvolves(X322,X323),theory(equality)).
% 0.41/0.62 cnf(reflexivity,axiom,X67=X67,theory(equality)).
% 0.41/0.62 fof(conceived_through,axiom,(![X]:(![Y]:((~conceivedThru(X,X))=>(conceivedThru(X,Y)&X!=Y)))),file('/export/starexec/sandbox2/benchmark/Axioms/PHI002+1.ax', conceived_through)).
% 0.41/0.62 fof(c96,plain,(![X]:(![Y]:(~conceivedThru(X,X)=>(conceivedThru(X,Y)&X!=Y)))),inference(fof_simplification,[status(thm)],[conceived_through])).
% 0.41/0.62 fof(c97,plain,(![X]:(![Y]:(conceivedThru(X,X)|(conceivedThru(X,Y)&X!=Y)))),inference(fof_nnf,[status(thm)],[c96])).
% 0.41/0.62 fof(c98,plain,(![X]:(conceivedThru(X,X)|((![Y]:conceivedThru(X,Y))&(![Y]:X!=Y)))),inference(shift_quantors,[status(thm)],[c97])).
% 0.41/0.62 fof(c100,plain,(![X19]:(![X20]:(![X21]:(conceivedThru(X19,X19)|(conceivedThru(X19,X20)&X19!=X21))))),inference(shift_quantors,[status(thm)],[fof(c99,plain,(![X19]:(conceivedThru(X19,X19)|((![X20]:conceivedThru(X19,X20))&(![X21]:X19!=X21)))),inference(variable_rename,[status(thm)],[c98])).])).
% 0.41/0.62 fof(c101,plain,(![X19]:(![X20]:(![X21]:((conceivedThru(X19,X19)|conceivedThru(X19,X20))&(conceivedThru(X19,X19)|X19!=X21))))),inference(distribute,[status(thm)],[c100])).
% 0.41/0.62 cnf(c102,plain,conceivedThru(X138,X138)|conceivedThru(X138,X137),inference(split_conjunct,[status(thm)],[c101])).
% 0.41/0.62 cnf(c212,plain,conceivedThru(X141,X141),inference(factor,[status(thm)],[c102])).
% 0.41/0.62 cnf(c14,axiom,X196!=X194|X197!=X195|~conceivedThru(X196,X197)|conceivedThru(X194,X195),theory(equality)).
% 0.41/0.62 cnf(c227,plain,X316!=X315|X316!=X314|conceivedThru(X315,X314),inference(resolution,[status(thm)],[c14, c212])).
% 0.41/0.62 cnf(c244,plain,X320!=X319|conceivedThru(X319,X320),inference(resolution,[status(thm)],[c227, reflexivity])).
% 0.41/0.62 fof(finite_after_its_kind,axiom,(![X]:(![Y]:(finiteAfterItsKind(X)<=>(canBeLimitedBy(X,Y)&sameKind(X,Y))))),file('/export/starexec/sandbox2/benchmark/Axioms/PHI002+0.ax', finite_after_its_kind)).
% 0.41/0.62 fof(c183,plain,(![X]:(![Y]:((~finiteAfterItsKind(X)|(canBeLimitedBy(X,Y)&sameKind(X,Y)))&((~canBeLimitedBy(X,Y)|~sameKind(X,Y))|finiteAfterItsKind(X))))),inference(fof_nnf,[status(thm)],[finite_after_its_kind])).
% 0.41/0.62 fof(c184,plain,((![X]:(~finiteAfterItsKind(X)|((![Y]:canBeLimitedBy(X,Y))&(![Y]:sameKind(X,Y)))))&(![X]:((![Y]:(~canBeLimitedBy(X,Y)|~sameKind(X,Y)))|finiteAfterItsKind(X)))),inference(shift_quantors,[status(thm)],[c183])).
% 0.41/0.62 fof(c186,plain,(![X60]:(![X61]:(![X62]:(![X63]:(![X64]:((~finiteAfterItsKind(X60)|(canBeLimitedBy(X60,X61)&sameKind(X60,X62)))&((~canBeLimitedBy(X63,X64)|~sameKind(X63,X64))|finiteAfterItsKind(X63)))))))),inference(shift_quantors,[status(thm)],[fof(c185,plain,((![X60]:(~finiteAfterItsKind(X60)|((![X61]:canBeLimitedBy(X60,X61))&(![X62]:sameKind(X60,X62)))))&(![X63]:((![X64]:(~canBeLimitedBy(X63,X64)|~sameKind(X63,X64)))|finiteAfterItsKind(X63)))),inference(variable_rename,[status(thm)],[c184])).])).
% 0.41/0.62 fof(c187,plain,(![X60]:(![X61]:(![X62]:(![X63]:(![X64]:(((~finiteAfterItsKind(X60)|canBeLimitedBy(X60,X61))&(~finiteAfterItsKind(X60)|sameKind(X60,X62)))&((~canBeLimitedBy(X63,X64)|~sameKind(X63,X64))|finiteAfterItsKind(X63)))))))),inference(distribute,[status(thm)],[c186])).
% 0.41/0.62 cnf(c190,plain,~canBeLimitedBy(X312,X313)|~sameKind(X312,X313)|finiteAfterItsKind(X312),inference(split_conjunct,[status(thm)],[c187])).
% 0.41/0.62 cnf(c39,axiom,X310!=X308|X311!=X309|~haveNothingInCommon(X310,X311)|haveNothingInCommon(X308,X309),theory(equality)).
% 0.41/0.62 fof(mode,axiom,(![X]:(![Y]:(![Z]:(mode(X)<=>((modification(X,Y)&substance(Y))|(existsIn(X,Z)&conceivedThru(X,Z))))))),file('/export/starexec/sandbox2/benchmark/Axioms/PHI002+0.ax', mode)).
% 0.41/0.62 fof(c158,plain,(![X]:(![Y]:(![Z]:((~mode(X)|((modification(X,Y)&substance(Y))|(existsIn(X,Z)&conceivedThru(X,Z))))&(((~modification(X,Y)|~substance(Y))&(~existsIn(X,Z)|~conceivedThru(X,Z)))|mode(X)))))),inference(fof_nnf,[status(thm)],[mode])).
% 0.41/0.62 fof(c159,plain,((![X]:(~mode(X)|(((![Y]:modification(X,Y))&(![Y]:substance(Y)))|((![Z]:existsIn(X,Z))&(![Z]:conceivedThru(X,Z))))))&(![X]:(((![Y]:(~modification(X,Y)|~substance(Y)))&(![Z]:(~existsIn(X,Z)|~conceivedThru(X,Z))))|mode(X)))),inference(shift_quantors,[status(thm)],[c158])).
% 0.41/0.62 fof(c161,plain,(![X48]:(![X49]:(![X50]:(![X51]:(![X52]:(![X53]:(![X54]:(![X55]:((~mode(X48)|((modification(X48,X49)&substance(X50))|(existsIn(X48,X51)&conceivedThru(X48,X52))))&(((~modification(X53,X54)|~substance(X54))&(~existsIn(X53,X55)|~conceivedThru(X53,X55)))|mode(X53))))))))))),inference(shift_quantors,[status(thm)],[fof(c160,plain,((![X48]:(~mode(X48)|(((![X49]:modification(X48,X49))&(![X50]:substance(X50)))|((![X51]:existsIn(X48,X51))&(![X52]:conceivedThru(X48,X52))))))&(![X53]:(((![X54]:(~modification(X53,X54)|~substance(X54)))&(![X55]:(~existsIn(X53,X55)|~conceivedThru(X53,X55))))|mode(X53)))),inference(variable_rename,[status(thm)],[c159])).])).
% 0.41/0.62 fof(c162,plain,(![X48]:(![X49]:(![X50]:(![X51]:(![X52]:(![X53]:(![X54]:(![X55]:((((~mode(X48)|(modification(X48,X49)|existsIn(X48,X51)))&(~mode(X48)|(modification(X48,X49)|conceivedThru(X48,X52))))&((~mode(X48)|(substance(X50)|existsIn(X48,X51)))&(~mode(X48)|(substance(X50)|conceivedThru(X48,X52)))))&(((~modification(X53,X54)|~substance(X54))|mode(X53))&((~existsIn(X53,X55)|~conceivedThru(X53,X55))|mode(X53)))))))))))),inference(distribute,[status(thm)],[c161])).
% 0.41/0.62 cnf(c168,plain,~existsIn(X305,X306)|~conceivedThru(X305,X306)|mode(X305),inference(split_conjunct,[status(thm)],[c162])).
% 0.41/0.62 cnf(c242,plain,~existsIn(X307,X307)|mode(X307),inference(resolution,[status(thm)],[c168, c212])).
% 0.41/0.62 cnf(c164,plain,~mode(X304)|modification(X304,X302)|conceivedThru(X304,X303),inference(split_conjunct,[status(thm)],[c162])).
% 0.41/0.62 cnf(c163,plain,~mode(X301)|modification(X301,X299)|existsIn(X301,X300),inference(split_conjunct,[status(thm)],[c162])).
% 0.41/0.62 fof(free,axiom,(![X]:(![Y]:(free(X)<=>(existsOnlyByNecessityOfOwnNature(X)&(actionOf(Y,X)=>determinedByItselfAlone(Y,X)))))),file('/export/starexec/sandbox2/benchmark/Axioms/PHI002+0.ax', free)).
% 0.41/0.62 fof(c130,plain,(![X]:(![Y]:((~free(X)|(existsOnlyByNecessityOfOwnNature(X)&(~actionOf(Y,X)|determinedByItselfAlone(Y,X))))&((~existsOnlyByNecessityOfOwnNature(X)|(actionOf(Y,X)&~determinedByItselfAlone(Y,X)))|free(X))))),inference(fof_nnf,[status(thm)],[free])).
% 0.41/0.62 fof(c131,plain,((![X]:(~free(X)|(existsOnlyByNecessityOfOwnNature(X)&(![Y]:(~actionOf(Y,X)|determinedByItselfAlone(Y,X))))))&(![X]:((~existsOnlyByNecessityOfOwnNature(X)|((![Y]:actionOf(Y,X))&(![Y]:~determinedByItselfAlone(Y,X))))|free(X)))),inference(shift_quantors,[status(thm)],[c130])).
% 0.41/0.62 fof(c133,plain,(![X36]:(![X37]:(![X38]:(![X39]:(![X40]:((~free(X36)|(existsOnlyByNecessityOfOwnNature(X36)&(~actionOf(X37,X36)|determinedByItselfAlone(X37,X36))))&((~existsOnlyByNecessityOfOwnNature(X38)|(actionOf(X39,X38)&~determinedByItselfAlone(X40,X38)))|free(X38)))))))),inference(shift_quantors,[status(thm)],[fof(c132,plain,((![X36]:(~free(X36)|(existsOnlyByNecessityOfOwnNature(X36)&(![X37]:(~actionOf(X37,X36)|determinedByItselfAlone(X37,X36))))))&(![X38]:((~existsOnlyByNecessityOfOwnNature(X38)|((![X39]:actionOf(X39,X38))&(![X40]:~determinedByItselfAlone(X40,X38))))|free(X38)))),inference(variable_rename,[status(thm)],[c131])).])).
% 0.41/0.62 fof(c134,plain,(![X36]:(![X37]:(![X38]:(![X39]:(![X40]:(((~free(X36)|existsOnlyByNecessityOfOwnNature(X36))&(~free(X36)|(~actionOf(X37,X36)|determinedByItselfAlone(X37,X36))))&(((~existsOnlyByNecessityOfOwnNature(X38)|actionOf(X39,X38))|free(X38))&((~existsOnlyByNecessityOfOwnNature(X38)|~determinedByItselfAlone(X40,X38))|free(X38))))))))),inference(distribute,[status(thm)],[c133])).
% 0.41/0.62 cnf(c136,plain,~free(X298)|~actionOf(X297,X298)|determinedByItselfAlone(X297,X298),inference(split_conjunct,[status(thm)],[c134])).
% 0.41/0.62 cnf(c37,axiom,X295!=X293|X296!=X294|~knowledgeOfEffect(X295,X296)|knowledgeOfEffect(X293,X294),theory(equality)).
% 0.41/0.62 fof(exists,axiom,(![X]:(![Y]:(exists(X)<=>(existsIn(X,X)|(existsIn(X,Y)&X!=Y))))),file('/export/starexec/sandbox2/benchmark/Axioms/PHI002+1.ax', exists)).
% 0.41/0.62 fof(c104,plain,(![X]:(![Y]:((~exists(X)|(existsIn(X,X)|(existsIn(X,Y)&X!=Y)))&((~existsIn(X,X)&(~existsIn(X,Y)|X=Y))|exists(X))))),inference(fof_nnf,[status(thm)],[exists])).
% 0.41/0.62 fof(c105,plain,((![X]:(~exists(X)|(existsIn(X,X)|((![Y]:existsIn(X,Y))&(![Y]:X!=Y)))))&(![X]:((~existsIn(X,X)&(![Y]:(~existsIn(X,Y)|X=Y)))|exists(X)))),inference(shift_quantors,[status(thm)],[c104])).
% 0.41/0.62 fof(c107,plain,(![X22]:(![X23]:(![X24]:(![X25]:(![X26]:((~exists(X22)|(existsIn(X22,X22)|(existsIn(X22,X23)&X22!=X24)))&((~existsIn(X25,X25)&(~existsIn(X25,X26)|X25=X26))|exists(X25)))))))),inference(shift_quantors,[status(thm)],[fof(c106,plain,((![X22]:(~exists(X22)|(existsIn(X22,X22)|((![X23]:existsIn(X22,X23))&(![X24]:X22!=X24)))))&(![X25]:((~existsIn(X25,X25)&(![X26]:(~existsIn(X25,X26)|X25=X26)))|exists(X25)))),inference(variable_rename,[status(thm)],[c105])).])).
% 0.41/0.62 fof(c108,plain,(![X22]:(![X23]:(![X24]:(![X25]:(![X26]:(((~exists(X22)|(existsIn(X22,X22)|existsIn(X22,X23)))&(~exists(X22)|(existsIn(X22,X22)|X22!=X24)))&((~existsIn(X25,X25)|exists(X25))&((~existsIn(X25,X26)|X25=X26)|exists(X25))))))))),inference(distribute,[status(thm)],[c107])).
% 0.41/0.62 cnf(c112,plain,~existsIn(X291,X292)|X291=X292|exists(X291),inference(split_conjunct,[status(thm)],[c108])).
% 0.41/0.62 cnf(c110,plain,~exists(X288)|existsIn(X288,X288)|X288!=X289,inference(split_conjunct,[status(thm)],[c108])).
% 0.41/0.62 cnf(c241,plain,~exists(X290)|existsIn(X290,X290),inference(resolution,[status(thm)],[c110, reflexivity])).
% 0.41/0.62 fof(true_idea,axiom,(![X]:(![Y]:(trueIdea(X)=>(correspondWith(X,Y)&(ideateOf(Y,X)|objectOf(Y,X)))))),file('/export/starexec/sandbox2/benchmark/Axioms/PHI002+1.ax', true_idea)).
% 0.41/0.62 fof(c67,plain,(![X]:(![Y]:(~trueIdea(X)|(correspondWith(X,Y)&(ideateOf(Y,X)|objectOf(Y,X)))))),inference(fof_nnf,[status(thm)],[true_idea])).
% 0.41/0.62 fof(c68,plain,(![X]:(~trueIdea(X)|((![Y]:correspondWith(X,Y))&(![Y]:(ideateOf(Y,X)|objectOf(Y,X)))))),inference(shift_quantors,[status(thm)],[c67])).
% 0.41/0.62 fof(c70,plain,(![X7]:(![X8]:(![X9]:(~trueIdea(X7)|(correspondWith(X7,X8)&(ideateOf(X9,X7)|objectOf(X9,X7))))))),inference(shift_quantors,[status(thm)],[fof(c69,plain,(![X7]:(~trueIdea(X7)|((![X8]:correspondWith(X7,X8))&(![X9]:(ideateOf(X9,X7)|objectOf(X9,X7)))))),inference(variable_rename,[status(thm)],[c68])).])).
% 0.41/0.62 fof(c71,plain,(![X7]:(![X8]:(![X9]:((~trueIdea(X7)|correspondWith(X7,X8))&(~trueIdea(X7)|(ideateOf(X9,X7)|objectOf(X9,X7))))))),inference(distribute,[status(thm)],[c70])).
% 0.41/0.62 cnf(c73,plain,~trueIdea(X285)|ideateOf(X284,X285)|objectOf(X284,X285),inference(split_conjunct,[status(thm)],[c71])).
% 0.41/0.62 cnf(c36,axiom,X282!=X280|X283!=X281|~effectNecessarilyFollowsFrom(X282,X283)|effectNecessarilyFollowsFrom(X280,X281),theory(equality)).
% 0.41/0.62 cnf(c167,plain,~modification(X278,X279)|~substance(X279)|mode(X278),inference(split_conjunct,[status(thm)],[c162])).
% 0.41/0.62 cnf(c166,plain,~mode(X277)|substance(X275)|conceivedThru(X277,X276),inference(split_conjunct,[status(thm)],[c162])).
% 0.41/0.62 cnf(c165,plain,~mode(X274)|substance(X272)|existsIn(X274,X273),inference(split_conjunct,[status(thm)],[c162])).
% 0.41/0.62 cnf(c147,plain,~absolutelyInfinite(X270)|~attributeOf(X271,X270)|expressesInfiniteEssentiality(X271),inference(split_conjunct,[status(thm)],[c143])).
% 0.41/0.62 cnf(c146,plain,~absolutelyInfinite(X268)|~attributeOf(X269,X268)|expressesEternalEssentiality(X269),inference(split_conjunct,[status(thm)],[c143])).
% 0.41/0.62 cnf(c31,axiom,X266!=X264|X267!=X265|~determinedByFixedMethod(X266,X267)|determinedByFixedMethod(X264,X265),theory(equality)).
% 0.41/0.62 cnf(c138,plain,~existsOnlyByNecessityOfOwnNature(X262)|~determinedByItselfAlone(X263,X262)|free(X262),inference(split_conjunct,[status(thm)],[c134])).
% 0.41/0.62 cnf(c137,plain,~existsOnlyByNecessityOfOwnNature(X260)|actionOf(X261,X260)|free(X260),inference(split_conjunct,[status(thm)],[c134])).
% 0.41/0.62 cnf(c47,axiom,X256!=X255|~hasEssence(X256)|hasEssence(X255),theory(equality)).
% 0.41/0.62 cnf(c30,axiom,X253!=X251|X254!=X252|~externalTo(X253,X254)|externalTo(X251,X252),theory(equality)).
% 0.41/0.62 cnf(c46,axiom,X249!=X248|~canBeConceivedAsNonExisting(X249)|canBeConceivedAsNonExisting(X248),theory(equality)).
% 0.41/0.62 cnf(c42,axiom,X246!=X245|~trueIdea(X246)|trueIdea(X245),theory(equality)).
% 0.41/0.62 cnf(c27,axiom,X242!=X240|X243!=X241|~determinedByDefiniteMethod(X242,X243)|determinedByDefiniteMethod(X240,X241),theory(equality)).
% 0.41/0.62 cnf(c38,axiom,X239!=X238|~knowledgeOfACause(X239)|knowledgeOfACause(X238),theory(equality)).
% 0.41/0.62 cnf(c35,axiom,X236!=X235|~definiteCause(X236)|definiteCause(X235),theory(equality)).
% 0.41/0.62 cnf(c34,axiom,X233!=X232|~exists(X233)|exists(X232),theory(equality)).
% 0.41/0.62 cnf(c25,axiom,X230!=X228|X231!=X229|~determinedByItselfAlone(X230,X231)|determinedByItselfAlone(X228,X229),theory(equality)).
% 0.41/0.62 cnf(c33,axiom,X226!=X225|~existConcFollowFromDefEternal(X226)|existConcFollowFromDefEternal(X225),theory(equality)).
% 0.41/0.62 cnf(c32,axiom,X223!=X222|~eternity(X223)|eternity(X222),theory(equality)).
% 0.41/0.62 cnf(c24,axiom,X219!=X217|X220!=X218|~actionOf(X219,X220)|actionOf(X217,X218),theory(equality)).
% 0.41/0.62 cnf(c29,axiom,X216!=X215|~isMethodExistence(X216)|isMethodExistence(X215),theory(equality)).
% 0.41/0.62 cnf(c28,axiom,X213!=X212|~isMethodAction(X213)|isMethodAction(X212),theory(equality)).
% 0.41/0.62 cnf(c26,axiom,X210!=X209|~necessary(X210)|necessary(X209),theory(equality)).
% 0.41/0.62 cnf(c19,axiom,X207!=X205|X208!=X206|~attributeOf(X207,X208)|attributeOf(X205,X206),theory(equality)).
% 0.41/0.62 cnf(c23,axiom,X203!=X202|~existsOnlyByNecessityOfOwnNature(X203)|existsOnlyByNecessityOfOwnNature(X202),theory(equality)).
% 0.41/0.62 cnf(c22,axiom,X200!=X199|~free(X200)|free(X199),theory(equality)).
% 0.41/0.62 cnf(c21,axiom,X193!=X192|~expressesInfiniteEssentiality(X193)|expressesInfiniteEssentiality(X192),theory(equality)).
% 0.41/0.62 cnf(c20,axiom,X190!=X189|~expressesEternalEssentiality(X190)|expressesEternalEssentiality(X189),theory(equality)).
% 0.41/0.62 cnf(c18,axiom,X187!=X186|~constInInfAttributes(X187)|constInInfAttributes(X186),theory(equality)).
% 0.41/0.62 cnf(c13,axiom,X184!=X182|X185!=X183|~existsIn(X184,X185)|existsIn(X182,X183),theory(equality)).
% 0.41/0.62 cnf(c17,axiom,X180!=X179|~absolutelyInfinite(X180)|absolutelyInfinite(X179),theory(equality)).
% 0.41/0.62 cnf(c16,axiom,X177!=X176|~being(X177)|being(X176),theory(equality)).
% 0.41/0.62 cnf(c12,axiom,X173!=X171|X174!=X172|~modification(X173,X174)|modification(X171,X172),theory(equality)).
% 0.41/0.62 cnf(c15,axiom,X170!=X169|~god(X170)|god(X169),theory(equality)).
% 0.41/0.62 cnf(c11,axiom,X167!=X166|~mode(X167)|mode(X166),theory(equality)).
% 0.41/0.62 cnf(c10,axiom,X163!=X162|~intPercAsConstEssSub(X163)|intPercAsConstEssSub(X162),theory(equality)).
% 0.41/0.62 cnf(c9,axiom,X161!=X160|~attribute(X161)|attribute(X160),theory(equality)).
% 0.41/0.62 fof(self_caused,axiom,(![X]:(selfCaused(X)<=>(essenceInvExistence(X)&natureConcOnlyByExistence(X)))),file('/export/starexec/sandbox2/benchmark/Axioms/PHI002+0.ax', self_caused)).
% 0.41/0.62 fof(c191,plain,(![X]:((~selfCaused(X)|(essenceInvExistence(X)&natureConcOnlyByExistence(X)))&((~essenceInvExistence(X)|~natureConcOnlyByExistence(X))|selfCaused(X)))),inference(fof_nnf,[status(thm)],[self_caused])).
% 0.41/0.62 fof(c192,plain,((![X]:(~selfCaused(X)|(essenceInvExistence(X)&natureConcOnlyByExistence(X))))&(![X]:((~essenceInvExistence(X)|~natureConcOnlyByExistence(X))|selfCaused(X)))),inference(shift_quantors,[status(thm)],[c191])).
% 0.41/0.62 fof(c194,plain,(![X65]:(![X66]:((~selfCaused(X65)|(essenceInvExistence(X65)&natureConcOnlyByExistence(X65)))&((~essenceInvExistence(X66)|~natureConcOnlyByExistence(X66))|selfCaused(X66))))),inference(shift_quantors,[status(thm)],[fof(c193,plain,((![X65]:(~selfCaused(X65)|(essenceInvExistence(X65)&natureConcOnlyByExistence(X65))))&(![X66]:((~essenceInvExistence(X66)|~natureConcOnlyByExistence(X66))|selfCaused(X66)))),inference(variable_rename,[status(thm)],[c192])).])).
% 0.41/0.62 fof(c195,plain,(![X65]:(![X66]:(((~selfCaused(X65)|essenceInvExistence(X65))&(~selfCaused(X65)|natureConcOnlyByExistence(X65)))&((~essenceInvExistence(X66)|~natureConcOnlyByExistence(X66))|selfCaused(X66))))),inference(distribute,[status(thm)],[c194])).
% 0.41/0.62 cnf(c198,plain,~essenceInvExistence(X159)|~natureConcOnlyByExistence(X159)|selfCaused(X159),inference(split_conjunct,[status(thm)],[c195])).
% 0.41/0.62 cnf(c8,axiom,X157!=X156|~conceivedThruItself(X157)|conceivedThruItself(X156),theory(equality)).
% 0.41/0.62 fof(substance,axiom,(![X]:(substance(X)<=>(inItself(X)&conceivedThruItself(X)))),file('/export/starexec/sandbox2/benchmark/Axioms/PHI002+0.ax', substance)).
% 0.41/0.62 fof(c175,plain,(![X]:((~substance(X)|(inItself(X)&conceivedThruItself(X)))&((~inItself(X)|~conceivedThruItself(X))|substance(X)))),inference(fof_nnf,[status(thm)],[substance])).
% 0.41/0.62 fof(c176,plain,((![X]:(~substance(X)|(inItself(X)&conceivedThruItself(X))))&(![X]:((~inItself(X)|~conceivedThruItself(X))|substance(X)))),inference(shift_quantors,[status(thm)],[c175])).
% 0.41/0.62 fof(c178,plain,(![X58]:(![X59]:((~substance(X58)|(inItself(X58)&conceivedThruItself(X58)))&((~inItself(X59)|~conceivedThruItself(X59))|substance(X59))))),inference(shift_quantors,[status(thm)],[fof(c177,plain,((![X58]:(~substance(X58)|(inItself(X58)&conceivedThruItself(X58))))&(![X59]:((~inItself(X59)|~conceivedThruItself(X59))|substance(X59)))),inference(variable_rename,[status(thm)],[c176])).])).
% 0.41/0.62 fof(c179,plain,(![X58]:(![X59]:(((~substance(X58)|inItself(X58))&(~substance(X58)|conceivedThruItself(X58)))&((~inItself(X59)|~conceivedThruItself(X59))|substance(X59))))),inference(distribute,[status(thm)],[c178])).
% 0.41/0.62 cnf(c182,plain,~inItself(X155)|~conceivedThruItself(X155)|substance(X155),inference(split_conjunct,[status(thm)],[c179])).
% 0.41/0.62 fof(god,axiom,(![X]:(god(X)<=>(being(X)&absolutelyInfinite(X)))),file('/export/starexec/sandbox2/benchmark/Axioms/PHI002+0.ax', god)).
% 0.41/0.62 fof(c150,plain,(![X]:((~god(X)|(being(X)&absolutelyInfinite(X)))&((~being(X)|~absolutelyInfinite(X))|god(X)))),inference(fof_nnf,[status(thm)],[god])).
% 0.41/0.62 fof(c151,plain,((![X]:(~god(X)|(being(X)&absolutelyInfinite(X))))&(![X]:((~being(X)|~absolutelyInfinite(X))|god(X)))),inference(shift_quantors,[status(thm)],[c150])).
% 0.41/0.62 fof(c153,plain,(![X46]:(![X47]:((~god(X46)|(being(X46)&absolutelyInfinite(X46)))&((~being(X47)|~absolutelyInfinite(X47))|god(X47))))),inference(shift_quantors,[status(thm)],[fof(c152,plain,((![X46]:(~god(X46)|(being(X46)&absolutelyInfinite(X46))))&(![X47]:((~being(X47)|~absolutelyInfinite(X47))|god(X47)))),inference(variable_rename,[status(thm)],[c151])).])).
% 0.41/0.62 fof(c154,plain,(![X46]:(![X47]:(((~god(X46)|being(X46))&(~god(X46)|absolutelyInfinite(X46)))&((~being(X47)|~absolutelyInfinite(X47))|god(X47))))),inference(distribute,[status(thm)],[c153])).
% 0.41/0.62 cnf(c157,plain,~being(X154)|~absolutelyInfinite(X154)|god(X154),inference(split_conjunct,[status(thm)],[c154])).
% 0.41/0.62 cnf(c127,plain,~necessary(X153)|isMethodAction(X152)|isMethodExistence(X152),inference(split_conjunct,[status(thm)],[c123])).
% 0.41/0.62 fof(essence_involves_existence_exists,axiom,(![X]:((essenceInvExistence(X)&hasEssence(X))=>exists(X))),file('/export/starexec/sandbox2/benchmark/theBenchmark.p', essence_involves_existence_exists)).
% 0.41/0.62 fof(c54,plain,(![X]:((~essenceInvExistence(X)|~hasEssence(X))|exists(X))),inference(fof_nnf,[status(thm)],[essence_involves_existence_exists])).
% 0.41/0.62 fof(c55,plain,(![X3]:((~essenceInvExistence(X3)|~hasEssence(X3))|exists(X3))),inference(variable_rename,[status(thm)],[c54])).
% 0.41/0.62 cnf(c56,plain,~essenceInvExistence(X151)|~hasEssence(X151)|exists(X151),inference(split_conjunct,[status(thm)],[c55])).
% 0.41/0.62 cnf(c7,axiom,X149!=X148|~inItself(X149)|inItself(X148),theory(equality)).
% 0.41/0.62 cnf(c6,axiom,X140!=X139|~substance(X140)|substance(X139),theory(equality)).
% 0.41/0.62 fof(have_nothing_in_common,axiom,(![X]:(![Y]:(haveNothingInCommon(X,Y)=>((((~canBeUnderstoodInTermsOf(X,Y))&(~canBeUnderstoodInTermsOf(Y,X)))&(~conceptionInvolves(X,Y)))&(~conceptionInvolves(Y,X)))))),file('/export/starexec/sandbox2/benchmark/Axioms/PHI002+1.ax', have_nothing_in_common)).
% 0.41/0.62 fof(c74,plain,(![X]:(![Y]:(haveNothingInCommon(X,Y)=>(((~canBeUnderstoodInTermsOf(X,Y)&~canBeUnderstoodInTermsOf(Y,X))&~conceptionInvolves(X,Y))&~conceptionInvolves(Y,X))))),inference(fof_simplification,[status(thm)],[have_nothing_in_common])).
% 0.41/0.62 fof(c75,plain,(![X]:(![Y]:(~haveNothingInCommon(X,Y)|(((~canBeUnderstoodInTermsOf(X,Y)&~canBeUnderstoodInTermsOf(Y,X))&~conceptionInvolves(X,Y))&~conceptionInvolves(Y,X))))),inference(fof_nnf,[status(thm)],[c74])).
% 0.41/0.62 fof(c76,plain,(![X10]:(![X11]:(~haveNothingInCommon(X10,X11)|(((~canBeUnderstoodInTermsOf(X10,X11)&~canBeUnderstoodInTermsOf(X11,X10))&~conceptionInvolves(X10,X11))&~conceptionInvolves(X11,X10))))),inference(variable_rename,[status(thm)],[c75])).
% 0.41/0.62 fof(c77,plain,(![X10]:(![X11]:((((~haveNothingInCommon(X10,X11)|~canBeUnderstoodInTermsOf(X10,X11))&(~haveNothingInCommon(X10,X11)|~canBeUnderstoodInTermsOf(X11,X10)))&(~haveNothingInCommon(X10,X11)|~conceptionInvolves(X10,X11)))&(~haveNothingInCommon(X10,X11)|~conceptionInvolves(X11,X10))))),inference(distribute,[status(thm)],[c76])).
% 0.41/0.62 cnf(c81,plain,~haveNothingInCommon(X135,X136)|~conceptionInvolves(X136,X135),inference(split_conjunct,[status(thm)],[c77])).
% 0.41/0.62 cnf(c80,plain,~haveNothingInCommon(X133,X134)|~conceptionInvolves(X133,X134),inference(split_conjunct,[status(thm)],[c77])).
% 0.41/0.62 cnf(c79,plain,~haveNothingInCommon(X131,X132)|~canBeUnderstoodInTermsOf(X132,X131),inference(split_conjunct,[status(thm)],[c77])).
% 0.41/0.62 cnf(c78,plain,~haveNothingInCommon(X129,X130)|~canBeUnderstoodInTermsOf(X129,X130),inference(split_conjunct,[status(thm)],[c77])).
% 0.41/0.62 cnf(c5,axiom,X127!=X125|X128!=X126|~sameKind(X127,X128)|sameKind(X125,X126),theory(equality)).
% 0.41/0.62 cnf(c189,plain,~finiteAfterItsKind(X124)|sameKind(X124,X123),inference(split_conjunct,[status(thm)],[c187])).
% 0.41/0.62 cnf(c188,plain,~finiteAfterItsKind(X122)|canBeLimitedBy(X122,X121),inference(split_conjunct,[status(thm)],[c187])).
% 0.41/0.62 cnf(c126,plain,~necessary(X119)|determinedByDefiniteMethod(X119,X120),inference(split_conjunct,[status(thm)],[c123])).
% 0.41/0.62 cnf(c125,plain,~necessary(X117)|determinedByFixedMethod(X117,X118),inference(split_conjunct,[status(thm)],[c123])).
% 0.41/0.62 cnf(c124,plain,~necessary(X116)|externalTo(X115,X116),inference(split_conjunct,[status(thm)],[c123])).
% 0.41/0.62 cnf(c4,axiom,X113!=X111|X114!=X112|~canBeLimitedBy(X113,X114)|canBeLimitedBy(X111,X112),theory(equality)).
% 0.41/0.62 cnf(c111,plain,~existsIn(X110,X110)|exists(X110),inference(split_conjunct,[status(thm)],[c108])).
% 0.41/0.62 fof(definite_cause,axiom,(![X]:(![Y]:(definiteCause(X)=>(effectNecessarilyFollowsFrom(Y,X)&((~definiteCause(X))=>(~effectNecessarilyFollowsFrom(Y,X))))))),file('/export/starexec/sandbox2/benchmark/Axioms/PHI002+1.ax', definite_cause)).
% 0.41/0.62 fof(c88,plain,(![X]:(![Y]:(definiteCause(X)=>(effectNecessarilyFollowsFrom(Y,X)&(~definiteCause(X)=>~effectNecessarilyFollowsFrom(Y,X)))))),inference(fof_simplification,[status(thm)],[definite_cause])).
% 0.41/0.62 fof(c89,plain,(![X]:(![Y]:(~definiteCause(X)|(effectNecessarilyFollowsFrom(Y,X)&(definiteCause(X)|~effectNecessarilyFollowsFrom(Y,X)))))),inference(fof_nnf,[status(thm)],[c88])).
% 0.41/0.62 fof(c90,plain,(![X]:(~definiteCause(X)|((![Y]:effectNecessarilyFollowsFrom(Y,X))&(definiteCause(X)|(![Y]:~effectNecessarilyFollowsFrom(Y,X)))))),inference(shift_quantors,[status(thm)],[c89])).
% 0.41/0.62 fof(c92,plain,(![X16]:(![X17]:(![X18]:(~definiteCause(X16)|(effectNecessarilyFollowsFrom(X17,X16)&(definiteCause(X16)|~effectNecessarilyFollowsFrom(X18,X16))))))),inference(shift_quantors,[status(thm)],[fof(c91,plain,(![X16]:(~definiteCause(X16)|((![X17]:effectNecessarilyFollowsFrom(X17,X16))&(definiteCause(X16)|(![X18]:~effectNecessarilyFollowsFrom(X18,X16)))))),inference(variable_rename,[status(thm)],[c90])).])).
% 0.41/0.62 fof(c93,plain,(![X16]:(![X17]:(![X18]:((~definiteCause(X16)|effectNecessarilyFollowsFrom(X17,X16))&(~definiteCause(X16)|(definiteCause(X16)|~effectNecessarilyFollowsFrom(X18,X16))))))),inference(distribute,[status(thm)],[c92])).
% 0.41/0.62 cnf(c94,plain,~definiteCause(X109)|effectNecessarilyFollowsFrom(X108,X109),inference(split_conjunct,[status(thm)],[c93])).
% 0.41/0.62 fof(knowledge_of_effect,axiom,(![X]:(![Y]:(knowledgeOfEffect(X,Y)<=>knowledgeOfACause(X)))),file('/export/starexec/sandbox2/benchmark/Axioms/PHI002+1.ax', knowledge_of_effect)).
% 0.41/0.62 fof(c82,plain,(![X]:(![Y]:((~knowledgeOfEffect(X,Y)|knowledgeOfACause(X))&(~knowledgeOfACause(X)|knowledgeOfEffect(X,Y))))),inference(fof_nnf,[status(thm)],[knowledge_of_effect])).
% 0.41/0.62 fof(c83,plain,((![X]:((![Y]:~knowledgeOfEffect(X,Y))|knowledgeOfACause(X)))&(![X]:(~knowledgeOfACause(X)|(![Y]:knowledgeOfEffect(X,Y))))),inference(shift_quantors,[status(thm)],[c82])).
% 0.41/0.62 fof(c85,plain,(![X12]:(![X13]:(![X14]:(![X15]:((~knowledgeOfEffect(X12,X13)|knowledgeOfACause(X12))&(~knowledgeOfACause(X14)|knowledgeOfEffect(X14,X15))))))),inference(shift_quantors,[status(thm)],[fof(c84,plain,((![X12]:((![X13]:~knowledgeOfEffect(X12,X13))|knowledgeOfACause(X12)))&(![X14]:(~knowledgeOfACause(X14)|(![X15]:knowledgeOfEffect(X14,X15))))),inference(variable_rename,[status(thm)],[c83])).])).
% 0.41/0.62 cnf(c87,plain,~knowledgeOfACause(X107)|knowledgeOfEffect(X107,X106),inference(split_conjunct,[status(thm)],[c85])).
% 0.41/0.62 cnf(c86,plain,~knowledgeOfEffect(X104,X105)|knowledgeOfACause(X104),inference(split_conjunct,[status(thm)],[c85])).
% 0.41/0.62 cnf(c3,axiom,X102!=X101|~finiteAfterItsKind(X102)|finiteAfterItsKind(X101),theory(equality)).
% 0.41/0.62 cnf(c72,plain,~trueIdea(X100)|correspondWith(X100,X99),inference(split_conjunct,[status(thm)],[c71])).
% 0.41/0.62 fof(is_in_itself_is_self_caused,axiom,(![X]:(inItself(X)=>selfCaused(X))),file('/export/starexec/sandbox2/benchmark/theBenchmark.p', is_in_itself_is_self_caused)).
% 0.41/0.62 fof(c60,plain,(![X]:(~inItself(X)|selfCaused(X))),inference(fof_nnf,[status(thm)],[is_in_itself_is_self_caused])).
% 0.41/0.62 fof(c61,plain,(![X5]:(~inItself(X5)|selfCaused(X5))),inference(variable_rename,[status(thm)],[c60])).
% 0.41/0.62 cnf(c62,plain,~inItself(X69)|selfCaused(X69),inference(split_conjunct,[status(thm)],[c61])).
% 0.41/0.62 fof(has_substance_exists,conjecture,(![X]:(substance(X)=>exists(X))),file('/export/starexec/sandbox2/benchmark/theBenchmark.p', has_substance_exists)).
% 0.41/0.62 fof(c48,negated_conjecture,(~(![X]:(substance(X)=>exists(X)))),inference(assume_negation,[status(cth)],[has_substance_exists])).
% 0.41/0.62 fof(c49,negated_conjecture,(?[X]:(substance(X)&~exists(X))),inference(fof_nnf,[status(thm)],[c48])).
% 0.41/0.62 fof(c50,negated_conjecture,(?[X2]:(substance(X2)&~exists(X2))),inference(variable_rename,[status(thm)],[c49])).
% 0.41/0.62 fof(c51,negated_conjecture,(substance(skolem0001)&~exists(skolem0001)),inference(skolemize,[status(esa)],[c50])).
% 0.41/0.62 cnf(c52,negated_conjecture,substance(skolem0001),inference(split_conjunct,[status(thm)],[c51])).
% 0.41/0.62 cnf(c180,plain,~substance(X88)|inItself(X88),inference(split_conjunct,[status(thm)],[c179])).
% 0.41/0.62 cnf(c203,plain,inItself(skolem0001),inference(resolution,[status(thm)],[c180, c52])).
% 0.41/0.62 cnf(c204,plain,selfCaused(skolem0001),inference(resolution,[status(thm)],[c203, c62])).
% 0.41/0.62 cnf(c197,plain,~selfCaused(X93)|natureConcOnlyByExistence(X93),inference(split_conjunct,[status(thm)],[c195])).
% 0.41/0.62 cnf(c209,plain,natureConcOnlyByExistence(skolem0001),inference(resolution,[status(thm)],[c197, c204])).
% 0.41/0.62 cnf(c2,axiom,X95!=X94|~natureConcOnlyByExistence(X95)|natureConcOnlyByExistence(X94),theory(equality)).
% 0.41/0.62 fof(can_be_conceived_as_non_existing,axiom,(![X]:(canBeConceivedAsNonExisting(X)=>(~essenceInvExistence(X)))),file('/export/starexec/sandbox2/benchmark/Axioms/PHI002+1.ax', can_be_conceived_as_non_existing)).
% 0.41/0.62 fof(c63,plain,(![X]:(canBeConceivedAsNonExisting(X)=>~essenceInvExistence(X))),inference(fof_simplification,[status(thm)],[can_be_conceived_as_non_existing])).
% 0.41/0.62 fof(c64,plain,(![X]:(~canBeConceivedAsNonExisting(X)|~essenceInvExistence(X))),inference(fof_nnf,[status(thm)],[c63])).
% 0.41/0.62 fof(c65,plain,(![X6]:(~canBeConceivedAsNonExisting(X6)|~essenceInvExistence(X6))),inference(variable_rename,[status(thm)],[c64])).
% 0.41/0.62 cnf(c66,plain,~canBeConceivedAsNonExisting(X73)|~essenceInvExistence(X73),inference(split_conjunct,[status(thm)],[c65])).
% 0.41/0.62 cnf(c196,plain,~selfCaused(X92)|essenceInvExistence(X92),inference(split_conjunct,[status(thm)],[c195])).
% 0.41/0.62 cnf(c207,plain,essenceInvExistence(skolem0001),inference(resolution,[status(thm)],[c196, c204])).
% 0.41/0.62 cnf(c208,plain,~canBeConceivedAsNonExisting(skolem0001),inference(resolution,[status(thm)],[c207, c66])).
% 0.41/0.62 cnf(c181,plain,~substance(X89)|conceivedThruItself(X89),inference(split_conjunct,[status(thm)],[c179])).
% 0.41/0.62 cnf(c205,plain,conceivedThruItself(skolem0001),inference(resolution,[status(thm)],[c181, c52])).
% 0.41/0.62 cnf(c1,axiom,X91!=X90|~essenceInvExistence(X91)|essenceInvExistence(X90),theory(equality)).
% 0.41/0.62 fof(attribute,axiom,(![X]:(attribute(X)<=>intPercAsConstEssSub(X))),file('/export/starexec/sandbox2/benchmark/Axioms/PHI002+0.ax', attribute)).
% 0.41/0.62 fof(c169,plain,(![X]:((~attribute(X)|intPercAsConstEssSub(X))&(~intPercAsConstEssSub(X)|attribute(X)))),inference(fof_nnf,[status(thm)],[attribute])).
% 0.41/0.62 fof(c170,plain,((![X]:(~attribute(X)|intPercAsConstEssSub(X)))&(![X]:(~intPercAsConstEssSub(X)|attribute(X)))),inference(shift_quantors,[status(thm)],[c169])).
% 0.41/0.62 fof(c172,plain,(![X56]:(![X57]:((~attribute(X56)|intPercAsConstEssSub(X56))&(~intPercAsConstEssSub(X57)|attribute(X57))))),inference(shift_quantors,[status(thm)],[fof(c171,plain,((![X56]:(~attribute(X56)|intPercAsConstEssSub(X56)))&(![X57]:(~intPercAsConstEssSub(X57)|attribute(X57)))),inference(variable_rename,[status(thm)],[c170])).])).
% 0.41/0.62 cnf(c174,plain,~intPercAsConstEssSub(X87)|attribute(X87),inference(split_conjunct,[status(thm)],[c172])).
% 0.41/0.62 cnf(c0,axiom,X86!=X85|~selfCaused(X86)|selfCaused(X85),theory(equality)).
% 0.41/0.62 cnf(c173,plain,~attribute(X84)|intPercAsConstEssSub(X84),inference(split_conjunct,[status(thm)],[c172])).
% 0.41/0.62 cnf(c156,plain,~god(X83)|absolutelyInfinite(X83),inference(split_conjunct,[status(thm)],[c154])).
% 0.41/0.62 cnf(c155,plain,~god(X82)|being(X82),inference(split_conjunct,[status(thm)],[c154])).
% 0.41/0.62 cnf(c145,plain,~absolutelyInfinite(X81)|constInInfAttributes(X81),inference(split_conjunct,[status(thm)],[c143])).
% 0.41/0.62 cnf(c144,plain,~absolutelyInfinite(X80)|substance(X80),inference(split_conjunct,[status(thm)],[c143])).
% 0.41/0.62 cnf(transitivity,axiom,X77!=X79|X79!=X78|X77=X78,theory(equality)).
% 0.41/0.62 cnf(c135,plain,~free(X76)|existsOnlyByNecessityOfOwnNature(X76),inference(split_conjunct,[status(thm)],[c134])).
% 0.41/0.62 fof(eternity,axiom,(![X]:(eternity(X)<=>existConcFollowFromDefEternal(X))),file('/export/starexec/sandbox2/benchmark/Axioms/PHI002+0.ax', eternity)).
% 0.41/0.62 fof(c113,plain,(![X]:((~eternity(X)|existConcFollowFromDefEternal(X))&(~existConcFollowFromDefEternal(X)|eternity(X)))),inference(fof_nnf,[status(thm)],[eternity])).
% 0.41/0.62 fof(c114,plain,((![X]:(~eternity(X)|existConcFollowFromDefEternal(X)))&(![X]:(~existConcFollowFromDefEternal(X)|eternity(X)))),inference(shift_quantors,[status(thm)],[c113])).
% 0.41/0.62 fof(c116,plain,(![X27]:(![X28]:((~eternity(X27)|existConcFollowFromDefEternal(X27))&(~existConcFollowFromDefEternal(X28)|eternity(X28))))),inference(shift_quantors,[status(thm)],[fof(c115,plain,((![X27]:(~eternity(X27)|existConcFollowFromDefEternal(X27)))&(![X28]:(~existConcFollowFromDefEternal(X28)|eternity(X28)))),inference(variable_rename,[status(thm)],[c114])).])).
% 0.41/0.62 cnf(c118,plain,~existConcFollowFromDefEternal(X75)|eternity(X75),inference(split_conjunct,[status(thm)],[c116])).
% 0.41/0.62 cnf(c117,plain,~eternity(X74)|existConcFollowFromDefEternal(X74),inference(split_conjunct,[status(thm)],[c116])).
% 0.41/0.62 cnf(symmetry,axiom,X70!=X71|X71=X70,theory(equality)).
% 0.41/0.62 fof(being_has_essense,axiom,(![X]:(being(X)=>hasEssence(X))),file('/export/starexec/sandbox2/benchmark/theBenchmark.p', being_has_essense)).
% 0.41/0.62 fof(c57,plain,(![X]:(~being(X)|hasEssence(X))),inference(fof_nnf,[status(thm)],[being_has_essense])).
% 0.41/0.62 fof(c58,plain,(![X4]:(~being(X4)|hasEssence(X4))),inference(variable_rename,[status(thm)],[c57])).
% 0.41/0.62 cnf(c59,plain,~being(X68)|hasEssence(X68),inference(split_conjunct,[status(thm)],[c58])).
% 0.41/0.62 cnf(c53,negated_conjecture,~exists(skolem0001),inference(split_conjunct,[status(thm)],[c51])).
% 0.41/0.62 % SZS output end Saturation
% 0.41/0.62
% 0.41/0.62 % Initial clauses : 111
% 0.41/0.62 % Processed clauses : 120
% 0.41/0.62 % Factors computed : 3
% 0.41/0.62 % Resolvents computed: 44
% 0.41/0.62 % Tautologies deleted: 32
% 0.41/0.62 % Forward subsumed : 6
% 0.41/0.62 % Backward subsumed : 3
% 0.41/0.62 % -------- CPU Time ---------
% 0.41/0.62 % User time : 0.252 s
% 0.41/0.62 % System time : 0.013 s
% 0.41/0.62 % Total time : 0.265 s
%------------------------------------------------------------------------------