TSTP Solution File: SEU119+1 by PyRes---1.3

%------------------------------------------------------------------------------
% File     : PyRes---1.3
% Problem  : SEU119+1 : TPTP v8.1.0. Released v3.3.0.
% Transfm  : none
% Format   : tptp:raw
% Command  : pyres-fof.py -tifbsVp -nlargest -HPickGiven5 %s

% Computer : n015.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 : Tue Jul 19 13:35:42 EDT 2022

% Result   : Theorem 49.70s 49.87s
% Output   : Refutation 49.70s
% Verified : 
% SZS Type : -

% Comments : 
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.12/0.13  % Problem  : SEU119+1 : TPTP v8.1.0. Released v3.3.0.
% 0.12/0.14  % Command  : pyres-fof.py -tifbsVp -nlargest -HPickGiven5 %s
% 0.13/0.35  % Computer : n015.cluster.edu
% 0.13/0.35  % Model    : x86_64 x86_64
% 0.13/0.35  % CPU      : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.35  % Memory   : 8042.1875MB
% 0.13/0.35  % OS       : Linux 3.10.0-693.el7.x86_64
% 0.13/0.35  % CPULimit : 300
% 0.13/0.35  % WCLimit  : 600
% 0.13/0.35  % DateTime : Sun Jun 19 00:09:14 EDT 2022
% 0.13/0.35  % CPUTime  : 
% 49.70/49.87  # Version:  1.3
% 49.70/49.87  # SZS status Theorem
% 49.70/49.87  # SZS output start CNFRefutation
% 49.70/49.87  fof(d3_xboole_0,axiom,(![A]:(![B]:(![C]:(C=set_intersection2(A,B)<=>(![D]:(in(D,C)<=>(in(D,A)&in(D,B)))))))),input).
% 49.70/49.87  fof(c40,axiom,(![A]:(![B]:(![C]:((C!=set_intersection2(A,B)|(![D]:((~in(D,C)|(in(D,A)&in(D,B)))&((~in(D,A)|~in(D,B))|in(D,C)))))&((?[D]:((~in(D,C)|(~in(D,A)|~in(D,B)))&(in(D,C)|(in(D,A)&in(D,B)))))|C=set_intersection2(A,B)))))),inference(fof_nnf,status(thm),[d3_xboole_0])).
% 49.70/49.87  fof(c41,axiom,((![A]:(![B]:(![C]:(C!=set_intersection2(A,B)|((![D]:(~in(D,C)|(in(D,A)&in(D,B))))&(![D]:((~in(D,A)|~in(D,B))|in(D,C))))))))&(![A]:(![B]:(![C]:((?[D]:((~in(D,C)|(~in(D,A)|~in(D,B)))&(in(D,C)|(in(D,A)&in(D,B)))))|C=set_intersection2(A,B)))))),inference(shift_quantors,status(thm),[c40])).
% 49.70/49.87  fof(c42,axiom,((![X17]:(![X18]:(![X19]:(X19!=set_intersection2(X17,X18)|((![X20]:(~in(X20,X19)|(in(X20,X17)&in(X20,X18))))&(![X21]:((~in(X21,X17)|~in(X21,X18))|in(X21,X19))))))))&(![X22]:(![X23]:(![X24]:((?[X25]:((~in(X25,X24)|(~in(X25,X22)|~in(X25,X23)))&(in(X25,X24)|(in(X25,X22)&in(X25,X23)))))|X24=set_intersection2(X22,X23)))))),inference(variable_rename,status(thm),[c41])).
% 49.70/49.88  fof(c44,axiom,(![X17]:(![X18]:(![X19]:(![X20]:(![X21]:(![X22]:(![X23]:(![X24]:((X19!=set_intersection2(X17,X18)|((~in(X20,X19)|(in(X20,X17)&in(X20,X18)))&((~in(X21,X17)|~in(X21,X18))|in(X21,X19))))&(((~in(skolem0008(X22,X23,X24),X24)|(~in(skolem0008(X22,X23,X24),X22)|~in(skolem0008(X22,X23,X24),X23)))&(in(skolem0008(X22,X23,X24),X24)|(in(skolem0008(X22,X23,X24),X22)&in(skolem0008(X22,X23,X24),X23))))|X24=set_intersection2(X22,X23))))))))))),inference(shift_quantors,status(thm),[fof(c43,axiom,((![X17]:(![X18]:(![X19]:(X19!=set_intersection2(X17,X18)|((![X20]:(~in(X20,X19)|(in(X20,X17)&in(X20,X18))))&(![X21]:((~in(X21,X17)|~in(X21,X18))|in(X21,X19))))))))&(![X22]:(![X23]:(![X24]:(((~in(skolem0008(X22,X23,X24),X24)|(~in(skolem0008(X22,X23,X24),X22)|~in(skolem0008(X22,X23,X24),X23)))&(in(skolem0008(X22,X23,X24),X24)|(in(skolem0008(X22,X23,X24),X22)&in(skolem0008(X22,X23,X24),X23))))|X24=set_intersection2(X22,X23)))))),inference(skolemize,status(esa),[c42])).])).
% 49.70/49.88  fof(c45,axiom,(![X17]:(![X18]:(![X19]:(![X20]:(![X21]:(![X22]:(![X23]:(![X24]:((((X19!=set_intersection2(X17,X18)|(~in(X20,X19)|in(X20,X17)))&(X19!=set_intersection2(X17,X18)|(~in(X20,X19)|in(X20,X18))))&(X19!=set_intersection2(X17,X18)|((~in(X21,X17)|~in(X21,X18))|in(X21,X19))))&(((~in(skolem0008(X22,X23,X24),X24)|(~in(skolem0008(X22,X23,X24),X22)|~in(skolem0008(X22,X23,X24),X23)))|X24=set_intersection2(X22,X23))&(((in(skolem0008(X22,X23,X24),X24)|in(skolem0008(X22,X23,X24),X22))|X24=set_intersection2(X22,X23))&((in(skolem0008(X22,X23,X24),X24)|in(skolem0008(X22,X23,X24),X23))|X24=set_intersection2(X22,X23))))))))))))),inference(distribute,status(thm),[c44])).
% 49.70/49.88  cnf(c46,axiom,X106!=set_intersection2(X108,X105)|~in(X107,X106)|in(X107,X108),inference(split_conjunct,status(thm),[c45])).
% 49.70/49.88  cnf(transitivity,axiom,X42!=X43|X43!=X41|X42=X41,eq_axiom).
% 49.70/49.88  cnf(symmetry,axiom,X35!=X36|X36=X35,eq_axiom).
% 49.70/49.88  fof(d7_xboole_0,axiom,(![A]:(![B]:(disjoint(A,B)<=>set_intersection2(A,B)=empty_set))),input).
% 49.70/49.88  fof(c34,axiom,(![A]:(![B]:((~disjoint(A,B)|set_intersection2(A,B)=empty_set)&(set_intersection2(A,B)!=empty_set|disjoint(A,B))))),inference(fof_nnf,status(thm),[d7_xboole_0])).
% 49.70/49.88  fof(c35,axiom,((![A]:(![B]:(~disjoint(A,B)|set_intersection2(A,B)=empty_set)))&(![A]:(![B]:(set_intersection2(A,B)!=empty_set|disjoint(A,B))))),inference(shift_quantors,status(thm),[c34])).
% 49.70/49.88  fof(c37,axiom,(![X13]:(![X14]:(![X15]:(![X16]:((~disjoint(X13,X14)|set_intersection2(X13,X14)=empty_set)&(set_intersection2(X15,X16)!=empty_set|disjoint(X15,X16))))))),inference(shift_quantors,status(thm),[fof(c36,axiom,((![X13]:(![X14]:(~disjoint(X13,X14)|set_intersection2(X13,X14)=empty_set)))&(![X15]:(![X16]:(set_intersection2(X15,X16)!=empty_set|disjoint(X15,X16))))),inference(variable_rename,status(thm),[c35])).])).
% 49.70/49.88  cnf(c38,axiom,~disjoint(X89,X90)|set_intersection2(X89,X90)=empty_set,inference(split_conjunct,status(thm),[c37])).
% 49.70/49.88  cnf(reflexivity,axiom,X34=X34,eq_axiom).
% 49.70/49.88  fof(d1_xboole_0,axiom,(![A]:(A=empty_set<=>(![B]:(~in(B,A))))),input).
% 49.70/49.88  fof(c52,axiom,(![A]:(A=empty_set<=>(![B]:~in(B,A)))),inference(fof_simplification,status(thm),[d1_xboole_0])).
% 49.70/49.88  fof(c53,axiom,(![A]:((A!=empty_set|(![B]:~in(B,A)))&((?[B]:in(B,A))|A=empty_set))),inference(fof_nnf,status(thm),[c52])).
% 49.70/49.88  fof(c54,axiom,((![A]:(A!=empty_set|(![B]:~in(B,A))))&(![A]:((?[B]:in(B,A))|A=empty_set))),inference(shift_quantors,status(thm),[c53])).
% 49.70/49.88  fof(c55,axiom,((![X26]:(X26!=empty_set|(![X27]:~in(X27,X26))))&(![X28]:((?[X29]:in(X29,X28))|X28=empty_set))),inference(variable_rename,status(thm),[c54])).
% 49.70/49.88  fof(c57,axiom,(![X26]:(![X27]:(![X28]:((X26!=empty_set|~in(X27,X26))&(in(skolem0009(X28),X28)|X28=empty_set))))),inference(shift_quantors,status(thm),[fof(c56,axiom,((![X26]:(X26!=empty_set|(![X27]:~in(X27,X26))))&(![X28]:(in(skolem0009(X28),X28)|X28=empty_set))),inference(skolemize,status(esa),[c55])).])).
% 49.70/49.88  cnf(c58,axiom,X50!=empty_set|~in(X51,X50),inference(split_conjunct,status(thm),[c57])).
% 49.70/49.88  fof(commutativity_k3_xboole_0,axiom,(![A]:(![B]:set_intersection2(A,B)=set_intersection2(B,A))),input).
% 49.70/49.88  fof(c60,axiom,(![X30]:(![X31]:set_intersection2(X30,X31)=set_intersection2(X31,X30))),inference(variable_rename,status(thm),[commutativity_k3_xboole_0])).
% 49.70/49.88  cnf(c61,axiom,set_intersection2(X65,X66)=set_intersection2(X66,X65),inference(split_conjunct,status(thm),[c60])).
% 49.70/49.88  cnf(c159,plain,~in(X128,set_intersection2(X130,X129))|in(X128,X129),inference(resolution,status(thm),[c46, c61])).
% 49.70/49.88  cnf(c59,axiom,in(skolem0009(X69),X69)|X69=empty_set,inference(split_conjunct,status(thm),[c57])).
% 49.70/49.88  cnf(c39,axiom,set_intersection2(X93,X92)!=empty_set|disjoint(X93,X92),inference(split_conjunct,status(thm),[c37])).
% 49.70/49.88  cnf(c116,plain,disjoint(X302,X301)|in(skolem0009(set_intersection2(X302,X301)),set_intersection2(X302,X301)),inference(resolution,status(thm),[c39, c59])).
% 49.70/49.88  cnf(c777,plain,disjoint(X317,X318)|in(skolem0009(set_intersection2(X317,X318)),X318),inference(resolution,status(thm),[c116, c159])).
% 49.70/49.88  cnf(c875,plain,disjoint(X319,X320)|X320!=empty_set,inference(resolution,status(thm),[c777, c58])).
% 49.70/49.88  cnf(c877,plain,disjoint(X321,empty_set),inference(resolution,status(thm),[c875, reflexivity])).
% 49.70/49.88  cnf(c885,plain,set_intersection2(X328,empty_set)=empty_set,inference(resolution,status(thm),[c877, c38])).
% 49.70/49.88  cnf(c930,plain,empty_set=set_intersection2(X351,empty_set),inference(resolution,status(thm),[c885, symmetry])).
% 49.70/49.88  cnf(c1024,plain,X805!=empty_set|X805=set_intersection2(X806,empty_set),inference(resolution,status(thm),[c930, transitivity])).
% 49.70/49.88  fof(symmetry_r1_xboole_0,axiom,(![A]:(![B]:(disjoint(A,B)=>disjoint(B,A)))),input).
% 49.70/49.88  fof(c18,axiom,(![A]:(![B]:(~disjoint(A,B)|disjoint(B,A)))),inference(fof_nnf,status(thm),[symmetry_r1_xboole_0])).
% 49.70/49.88  fof(c19,axiom,(![X8]:(![X9]:(~disjoint(X8,X9)|disjoint(X9,X8)))),inference(variable_rename,status(thm),[c18])).
% 49.70/49.88  cnf(c20,axiom,~disjoint(X44,X45)|disjoint(X45,X44),inference(split_conjunct,status(thm),[c19])).
% 49.70/49.88  fof(t3_xboole_0,conjecture,(![A]:(![B]:((~((~disjoint(A,B))&(![C]:(~(in(C,A)&in(C,B))))))&(~((?[C]:(in(C,A)&in(C,B)))&disjoint(A,B)))))),input).
% 49.70/49.88  fof(c4,negated_conjecture,(~(![A]:(![B]:((~((~disjoint(A,B))&(![C]:(~(in(C,A)&in(C,B))))))&(~((?[C]:(in(C,A)&in(C,B)))&disjoint(A,B))))))),inference(assume_negation,status(cth),[t3_xboole_0])).
% 49.70/49.88  fof(c5,negated_conjecture,(~(![A]:(![B]:((~(~disjoint(A,B)&(![C]:(~(in(C,A)&in(C,B))))))&(~((?[C]:(in(C,A)&in(C,B)))&disjoint(A,B))))))),inference(fof_simplification,status(thm),[c4])).
% 49.70/49.88  fof(c6,negated_conjecture,(?[A]:(?[B]:((~disjoint(A,B)&(![C]:(~in(C,A)|~in(C,B))))|((?[C]:(in(C,A)&in(C,B)))&disjoint(A,B))))),inference(fof_nnf,status(thm),[c5])).
% 49.70/49.88  fof(c7,negated_conjecture,((?[A]:(?[B]:(~disjoint(A,B)&(![C]:(~in(C,A)|~in(C,B))))))|(?[A]:(?[B]:((?[C]:(in(C,A)&in(C,B)))&disjoint(A,B))))),inference(shift_quantors,status(thm),[c6])).
% 49.70/49.88  fof(c8,negated_conjecture,((?[X2]:(?[X3]:(~disjoint(X2,X3)&(![X4]:(~in(X4,X2)|~in(X4,X3))))))|(?[X5]:(?[X6]:((?[X7]:(in(X7,X5)&in(X7,X6)))&disjoint(X5,X6))))),inference(variable_rename,status(thm),[c7])).
% 49.70/49.88  fof(c10,negated_conjecture,(![X4]:((~disjoint(skolem0001,skolem0002)&(~in(X4,skolem0001)|~in(X4,skolem0002)))|((in(skolem0005,skolem0003)&in(skolem0005,skolem0004))&disjoint(skolem0003,skolem0004)))),inference(shift_quantors,status(thm),[fof(c9,negated_conjecture,((~disjoint(skolem0001,skolem0002)&(![X4]:(~in(X4,skolem0001)|~in(X4,skolem0002))))|((in(skolem0005,skolem0003)&in(skolem0005,skolem0004))&disjoint(skolem0003,skolem0004))),inference(skolemize,status(esa),[c8])).])).
% 49.70/49.88  fof(c11,negated_conjecture,(![X4]:((((~disjoint(skolem0001,skolem0002)|in(skolem0005,skolem0003))&(~disjoint(skolem0001,skolem0002)|in(skolem0005,skolem0004)))&(~disjoint(skolem0001,skolem0002)|disjoint(skolem0003,skolem0004)))&((((~in(X4,skolem0001)|~in(X4,skolem0002))|in(skolem0005,skolem0003))&((~in(X4,skolem0001)|~in(X4,skolem0002))|in(skolem0005,skolem0004)))&((~in(X4,skolem0001)|~in(X4,skolem0002))|disjoint(skolem0003,skolem0004))))),inference(distribute,status(thm),[c10])).
% 49.70/49.88  cnf(c14,negated_conjecture,~disjoint(skolem0001,skolem0002)|disjoint(skolem0003,skolem0004),inference(split_conjunct,status(thm),[c11])).
% 49.70/49.88  cnf(c155,plain,~in(X120,set_intersection2(X119,X121))|in(X120,X119),inference(resolution,status(thm),[c46, reflexivity])).
% 49.70/49.88  cnf(c779,plain,disjoint(X651,X652)|in(skolem0009(set_intersection2(X651,X652)),X651),inference(resolution,status(thm),[c116, c155])).
% 49.70/49.88  cnf(c17,negated_conjecture,~in(X100,skolem0001)|~in(X100,skolem0002)|disjoint(skolem0003,skolem0004),inference(split_conjunct,status(thm),[c11])).
% 49.70/49.88  cnf(c869,plain,disjoint(X5897,skolem0002)|~in(skolem0009(set_intersection2(X5897,skolem0002)),skolem0001)|disjoint(skolem0003,skolem0004),inference(resolution,status(thm),[c777, c17])).
% 49.70/49.88  cnf(c48850,plain,disjoint(skolem0001,skolem0002)|disjoint(skolem0003,skolem0004),inference(resolution,status(thm),[c869, c779])).
% 49.70/49.88  cnf(c49179,plain,disjoint(skolem0003,skolem0004),inference(resolution,status(thm),[c48850, c14])).
% 49.70/49.88  cnf(c49185,plain,disjoint(skolem0004,skolem0003),inference(resolution,status(thm),[c49179, c20])).
% 49.70/49.88  cnf(c49187,plain,set_intersection2(skolem0004,skolem0003)=empty_set,inference(resolution,status(thm),[c49185, c38])).
% 49.70/49.88  cnf(c49528,plain,set_intersection2(skolem0004,skolem0003)=set_intersection2(X6133,empty_set),inference(resolution,status(thm),[c49187, c1024])).
% 49.70/49.88  cnf(c54831,plain,~in(X6270,set_intersection2(skolem0004,skolem0003))|in(X6270,X6269),inference(resolution,status(thm),[c49528, c46])).
% 49.70/49.88  cnf(c13,negated_conjecture,~disjoint(skolem0001,skolem0002)|in(skolem0005,skolem0004),inference(split_conjunct,status(thm),[c11])).
% 49.70/49.88  cnf(c16,negated_conjecture,~in(X96,skolem0001)|~in(X96,skolem0002)|in(skolem0005,skolem0004),inference(split_conjunct,status(thm),[c11])).
% 49.70/49.88  cnf(c870,plain,disjoint(X5898,skolem0002)|~in(skolem0009(set_intersection2(X5898,skolem0002)),skolem0001)|in(skolem0005,skolem0004),inference(resolution,status(thm),[c777, c16])).
% 49.70/49.88  cnf(c48888,plain,disjoint(skolem0001,skolem0002)|in(skolem0005,skolem0004),inference(resolution,status(thm),[c870, c779])).
% 49.70/49.88  cnf(c50959,plain,in(skolem0005,skolem0004),inference(resolution,status(thm),[c48888, c13])).
% 49.70/49.88  cnf(c48,axiom,X124!=set_intersection2(X125,X122)|~in(X123,X125)|~in(X123,X122)|in(X123,X124),inference(split_conjunct,status(thm),[c45])).
% 49.70/49.88  cnf(c176,plain,~in(X562,X561)|~in(X562,X560)|in(X562,set_intersection2(X561,X560)),inference(resolution,status(thm),[c48, reflexivity])).
% 49.70/49.88  cnf(c12,negated_conjecture,~disjoint(skolem0001,skolem0002)|in(skolem0005,skolem0003),inference(split_conjunct,status(thm),[c11])).
% 49.70/49.88  cnf(c15,negated_conjecture,~in(X91,skolem0001)|~in(X91,skolem0002)|in(skolem0005,skolem0003),inference(split_conjunct,status(thm),[c11])).
% 49.70/49.88  cnf(c868,plain,disjoint(X5896,skolem0002)|~in(skolem0009(set_intersection2(X5896,skolem0002)),skolem0001)|in(skolem0005,skolem0003),inference(resolution,status(thm),[c777, c15])).
% 49.70/49.88  cnf(c48756,plain,disjoint(skolem0001,skolem0002)|in(skolem0005,skolem0003),inference(resolution,status(thm),[c868, c779])).
% 49.70/49.88  cnf(c48768,plain,in(skolem0005,skolem0003),inference(resolution,status(thm),[c48756, c12])).
% 49.70/49.88  cnf(c48801,plain,~in(skolem0005,X6644)|in(skolem0005,set_intersection2(X6644,skolem0003)),inference(resolution,status(thm),[c48768, c176])).
% 49.70/49.88  cnf(c58708,plain,in(skolem0005,set_intersection2(skolem0004,skolem0003)),inference(resolution,status(thm),[c48801, c50959])).
% 49.70/49.88  cnf(c58721,plain,in(skolem0005,X6646),inference(resolution,status(thm),[c58708, c54831])).
% 49.70/49.88  fof(antisymmetry_r2_hidden,axiom,(![A]:(![B]:(in(A,B)=>(~in(B,A))))),input).
% 49.70/49.88  fof(c62,axiom,(![A]:(![B]:(in(A,B)=>~in(B,A)))),inference(fof_simplification,status(thm),[antisymmetry_r2_hidden])).
% 49.70/49.88  fof(c63,axiom,(![A]:(![B]:(~in(A,B)|~in(B,A)))),inference(fof_nnf,status(thm),[c62])).
% 49.70/49.88  fof(c64,axiom,(![X32]:(![X33]:(~in(X32,X33)|~in(X33,X32)))),inference(variable_rename,status(thm),[c63])).
% 49.70/49.88  cnf(c65,axiom,~in(X47,X46)|~in(X46,X47),inference(split_conjunct,status(thm),[c64])).
% 49.70/49.88  cnf(c58820,plain,~in(X6677,skolem0005),inference(resolution,status(thm),[c58721, c65])).
% 49.70/49.88  cnf(c59315,plain,$false,inference(resolution,status(thm),[c58820, c58721])).
% 49.70/49.88  # SZS output end CNFRefutation
% 49.70/49.88  
% 49.70/49.88  # Initial clauses    : 32
% 49.70/49.88  # Processed clauses  : 1072
% 49.70/49.88  # Factors computed   : 49
% 49.70/49.88  # Resolvents computed: 59258
% 49.70/49.88  # Tautologies deleted: 27
% 49.70/49.88  # Forward subsumed   : 3037
% 49.70/49.88  # Backward subsumed  : 145
% 49.70/49.88  # -------- CPU Time ---------
% 49.70/49.88  # User time          : 49.384 s
% 49.70/49.88  # System time        : 0.121 s
% 49.70/49.88  # Total time         : 49.505 s
%------------------------------------------------------------------------------