TSTP Solution File: SYN424-1 by iProver---3.8
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%------------------------------------------------------------------------------
% File : iProver---3.8
% Problem : SYN424-1 : TPTP v8.1.2. Released v2.1.0.
% Transfm : none
% Format : tptp:raw
% Command : run_iprover %s %d THM
% Computer : n010.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 : Fri Sep 1 03:07:03 EDT 2023
% Result : Satisfiable 7.77s 1.65s
% Output : Model 7.77s
% Verified :
% SZS Type : ERROR: Analysing output (MakeTreeStats fails)
% Comments :
%------------------------------------------------------------------------------
%------ Positive definition of ndr1_0
fof(lit_def,axiom,
( ndr1_0
<=> $true ) ).
%------ Positive definition of c2_0
fof(lit_def_001,axiom,
( c2_0
<=> $false ) ).
%------ Positive definition of ssSkC27
fof(lit_def_002,axiom,
( ssSkC27
<=> $false ) ).
%------ Positive definition of ssSkC47
fof(lit_def_003,axiom,
( ssSkC47
<=> $true ) ).
%------ Positive definition of ssSkC45
fof(lit_def_004,axiom,
( ssSkC45
<=> $true ) ).
%------ Positive definition of ssSkC44
fof(lit_def_005,axiom,
( ssSkC44
<=> $true ) ).
%------ Positive definition of ssSkC43
fof(lit_def_006,axiom,
( ssSkC43
<=> $true ) ).
%------ Positive definition of ssSkC41
fof(lit_def_007,axiom,
( ssSkC41
<=> $false ) ).
%------ Positive definition of ssSkC40
fof(lit_def_008,axiom,
( ssSkC40
<=> $false ) ).
%------ Positive definition of ssSkC39
fof(lit_def_009,axiom,
( ssSkC39
<=> $true ) ).
%------ Positive definition of ssSkC36
fof(lit_def_010,axiom,
( ssSkC36
<=> $false ) ).
%------ Positive definition of ssSkC35
fof(lit_def_011,axiom,
( ssSkC35
<=> $true ) ).
%------ Positive definition of ssSkC30
fof(lit_def_012,axiom,
( ssSkC30
<=> $false ) ).
%------ Positive definition of ssSkC28
fof(lit_def_013,axiom,
( ssSkC28
<=> $true ) ).
%------ Positive definition of ssSkC25
fof(lit_def_014,axiom,
( ssSkC25
<=> $true ) ).
%------ Positive definition of ssSkC24
fof(lit_def_015,axiom,
( ssSkC24
<=> $false ) ).
%------ Positive definition of ssSkC23
fof(lit_def_016,axiom,
( ssSkC23
<=> $true ) ).
%------ Positive definition of ssSkC22
fof(lit_def_017,axiom,
( ssSkC22
<=> $false ) ).
%------ Positive definition of ssSkC20
fof(lit_def_018,axiom,
( ssSkC20
<=> $true ) ).
%------ Positive definition of ssSkC18
fof(lit_def_019,axiom,
( ssSkC18
<=> $true ) ).
%------ Positive definition of ssSkC17
fof(lit_def_020,axiom,
( ssSkC17
<=> $true ) ).
%------ Positive definition of ssSkC16
fof(lit_def_021,axiom,
( ssSkC16
<=> $false ) ).
%------ Positive definition of ssSkC15
fof(lit_def_022,axiom,
( ssSkC15
<=> $true ) ).
%------ Positive definition of ssSkC14
fof(lit_def_023,axiom,
( ssSkC14
<=> $false ) ).
%------ Positive definition of ssSkC13
fof(lit_def_024,axiom,
( ssSkC13
<=> $false ) ).
%------ Positive definition of ssSkC11
fof(lit_def_025,axiom,
( ssSkC11
<=> $true ) ).
%------ Positive definition of ssSkC10
fof(lit_def_026,axiom,
( ssSkC10
<=> $false ) ).
%------ Positive definition of ssSkC8
fof(lit_def_027,axiom,
( ssSkC8
<=> $true ) ).
%------ Positive definition of ssSkC7
fof(lit_def_028,axiom,
( ssSkC7
<=> $true ) ).
%------ Positive definition of ssSkC6
fof(lit_def_029,axiom,
( ssSkC6
<=> $true ) ).
%------ Positive definition of ssSkC3
fof(lit_def_030,axiom,
( ssSkC3
<=> $true ) ).
%------ Positive definition of ssSkC2
fof(lit_def_031,axiom,
( ssSkC2
<=> $true ) ).
%------ Positive definition of ssSkC1
fof(lit_def_032,axiom,
( ssSkC1
<=> $false ) ).
%------ Positive definition of ssSkC0
fof(lit_def_033,axiom,
( ssSkC0
<=> $true ) ).
%------ Negative definition of ndr1_1
fof(lit_def_034,axiom,
! [X0_13] :
( ~ ndr1_1(X0_13)
<=> ( X0_13 = a1139
| X0_13 = a1123
| X0_13 = a1024
| X0_13 = a1020
| X0_13 = a995
| X0_13 = a1124
| X0_13 = a1098 ) ) ).
%------ Negative definition of c3_1
fof(lit_def_035,axiom,
! [X0_13] :
( ~ c3_1(X0_13)
<=> ( X0_13 = a1153
| X0_13 = a1135
| X0_13 = a1118
| X0_13 = a1089
| X0_13 = a1079
| X0_13 = a1040
| X0_13 = a1013
| X0_13 = a997
| X0_13 = a966
| X0_13 = a1154
| X0_13 = a1078
| X0_13 = a1050
| X0_13 = a1031
| X0_13 = a1139
| X0_13 = a1058
| X0_13 = a1173
| X0_13 = a1160
| X0_13 = a1123
| X0_13 = a1095
| X0_13 = a1068
| X0_13 = a1024
| X0_13 = a1020
| X0_13 = a977
| X0_13 = a1042
| X0_13 = a995
| X0_13 = a1124
| X0_13 = a1041
| X0_13 = a962
| X0_13 = a1043
| X0_13 = a971
| X0_13 = a1098 ) ) ).
%------ Positive definition of c8_0
fof(lit_def_036,axiom,
( c8_0
<=> $false ) ).
%------ Positive definition of c4_0
fof(lit_def_037,axiom,
( c4_0
<=> $true ) ).
%------ Positive definition of c7_0
fof(lit_def_038,axiom,
( c7_0
<=> $true ) ).
%------ Positive definition of c6_0
fof(lit_def_039,axiom,
( c6_0
<=> $false ) ).
%------ Positive definition of ssSkC38
fof(lit_def_040,axiom,
( ssSkC38
<=> $false ) ).
%------ Positive definition of c10_0
fof(lit_def_041,axiom,
( c10_0
<=> $false ) ).
%------ Positive definition of c5_0
fof(lit_def_042,axiom,
( c5_0
<=> $false ) ).
%------ Positive definition of ssSkC26
fof(lit_def_043,axiom,
( ssSkC26
<=> $true ) ).
%------ Positive definition of c1_0
fof(lit_def_044,axiom,
( c1_0
<=> $true ) ).
%------ Positive definition of ssSkC21
fof(lit_def_045,axiom,
( ssSkC21
<=> $false ) ).
%------ Positive definition of ssSkC19
fof(lit_def_046,axiom,
( ssSkC19
<=> $false ) ).
%------ Positive definition of c9_0
fof(lit_def_047,axiom,
( c9_0
<=> $true ) ).
%------ Positive definition of ssSkC12
fof(lit_def_048,axiom,
( ssSkC12
<=> $true ) ).
%------ Positive definition of c3_0
fof(lit_def_049,axiom,
( c3_0
<=> $false ) ).
%------ Negative definition of ssSkP11
fof(lit_def_050,axiom,
! [X0_13] :
( ~ ssSkP11(X0_13)
<=> ( X0_13 = a1013
| X0_13 = a1125
| X0_13 = a1095
| X0_13 = a1008
| X0_13 = a1041 ) ) ).
%------ Positive definition of ssSkP10
fof(lit_def_051,axiom,
! [X0_13] :
( ssSkP10(X0_13)
<=> $true ) ).
%------ Positive definition of ssSkP9
fof(lit_def_052,axiom,
! [X0_13] :
( ssSkP9(X0_13)
<=> $true ) ).
%------ Positive definition of c10_1
fof(lit_def_053,axiom,
! [X0_13] :
( c10_1(X0_13)
<=> X0_13 = a1062 ) ).
%------ Positive definition of ssSkP8
fof(lit_def_054,axiom,
! [X0] :
( ssSkP8(X0)
<=> $true ) ).
%------ Positive definition of ssSkP7
fof(lit_def_055,axiom,
! [X0] :
( ssSkP7(X0)
<=> $true ) ).
%------ Positive definition of c6_1
fof(lit_def_056,axiom,
! [X0_13] :
( c6_1(X0_13)
<=> ( X0_13 = a1118
| X0_13 = a1013
| X0_13 = a966 ) ) ).
%------ Negative definition of c4_1
fof(lit_def_057,axiom,
! [X0_13] :
( ~ c4_1(X0_13)
<=> ( X0_13 = a966
| X0_13 = a1125
| X0_13 = a1024
| X0_13 = a971 ) ) ).
%------ Positive definition of ssSkP6
fof(lit_def_058,axiom,
! [X0_13] :
( ssSkP6(X0_13)
<=> $true ) ).
%------ Positive definition of c9_1
fof(lit_def_059,axiom,
! [X0_13] :
( c9_1(X0_13)
<=> ( X0_13 = a1135
| X0_13 = a1020
| X0_13 = a1080 ) ) ).
%------ Negative definition of ssSkP5
fof(lit_def_060,axiom,
! [X0_13] :
( ~ ssSkP5(X0_13)
<=> $false ) ).
%------ Positive definition of c7_1
fof(lit_def_061,axiom,
! [X0_13] :
( c7_1(X0_13)
<=> ( X0_13 = a1118
| X0_13 = a997
| X0_13 = a1133
| X0_13 = a1124 ) ) ).
%------ Negative definition of ssSkP4
fof(lit_def_062,axiom,
! [X0_13] :
( ~ ssSkP4(X0_13)
<=> ( X0_13 = a1118
| X0_13 = a1013
| X0_13 = a966 ) ) ).
%------ Negative definition of c5_1
fof(lit_def_063,axiom,
! [X0_13] :
( ~ c5_1(X0_13)
<=> ( X0_13 = a1186
| X0_13 = a1118
| X0_13 = a1066
| X0_13 = a1062
| X0_13 = a1028
| X0_13 = a1013
| X0_13 = a1003
| X0_13 = a966
| X0_13 = a1167
| X0_13 = a1154
| X0_13 = a1078
| X0_13 = a1050
| X0_13 = a1031
| X0_13 = a963
| X0_13 = a1139
| X0_13 = a1058
| X0_13 = a1173
| X0_13 = a1160
| X0_13 = a1133
| X0_13 = a1125
| X0_13 = a1095
| X0_13 = a1020
| X0_13 = a977
| X0_13 = a1008
| X0_13 = a995
| X0_13 = a1098
| X0_13 = a1080 ) ) ).
%------ Positive definition of ssSkP3
fof(lit_def_064,axiom,
! [X0_13] :
( ssSkP3(X0_13)
<=> $true ) ).
%------ Positive definition of c1_1
fof(lit_def_065,axiom,
! [X0_13] :
( c1_1(X0_13)
<=> $false ) ).
%------ Negative definition of ssSkP2
fof(lit_def_066,axiom,
! [X0_13] :
( ~ ssSkP2(X0_13)
<=> ( X0_13 = a1089
| X0_13 = a1079
| X0_13 = a1003
| X0_13 = a997
| X0_13 = a972
| X0_13 = a1033
| X0_13 = a1008
| X0_13 = a1080 ) ) ).
%------ Positive definition of ssSkP1
fof(lit_def_067,axiom,
! [X0_13] :
( ssSkP1(X0_13)
<=> $true ) ).
%------ Negative definition of c2_1
fof(lit_def_068,axiom,
! [X0_13] :
( ~ c2_1(X0_13)
<=> ( X0_13 = a1186
| X0_13 = a1153
| X0_13 = a1135
| X0_13 = a1118
| X0_13 = a1089
| X0_13 = a1079
| X0_13 = a1062
| X0_13 = a1040
| X0_13 = a1028
| X0_13 = a1013
| X0_13 = a997
| X0_13 = a966
| X0_13 = a1154
| X0_13 = a1078
| X0_13 = a1050
| X0_13 = a1031
| X0_13 = a963
| X0_13 = a1139
| X0_13 = a1058
| X0_13 = a1173
| X0_13 = a1160
| X0_13 = a1133
| X0_13 = a1125
| X0_13 = a1123
| X0_13 = a1095
| X0_13 = a1068
| X0_13 = a1024
| X0_13 = a1020
| X0_13 = a977
| X0_13 = a1042
| X0_13 = a1008
| X0_13 = a995
| X0_13 = a1124
| X0_13 = a1041
| X0_13 = a962
| X0_13 = a1043
| X0_13 = a1026
| X0_13 = a971
| X0_13 = a1098 ) ) ).
%------ Negative definition of ssSkP0
fof(lit_def_069,axiom,
! [X0_13] :
( ~ ssSkP0(X0_13)
<=> ( X0_13 = a1118
| X0_13 = a1013
| X0_13 = a966 ) ) ).
%------ Positive definition of c3_2
fof(lit_def_070,axiom,
! [X0_13,X0_14] :
( c3_2(X0_13,X0_14)
<=> ( ( X0_13 = a1186
& X0_14 = a1188 )
| ( X0_13 = a1186
& X0_14 = a1187 )
| ( X0_13 = a1028
& X0_14 = a1181 )
| ( X0_13 = a1013
& X0_14 = a1181 )
| ( X0_13 = a997
& X0_14 = a998 )
| ( X0_13 = a963
& X0_14 != a964 )
| ( X0_13 = a1125
& X0_14 = a1181 )
| ( X0_13 = a1046
& X0_14 = a1181 )
| ( X0_13 = a1042
& X0_14 = a1181 )
| ( X0_13 = a1008
& X0_14 = a1181 )
| ( X0_13 = a1008
& X0_14 = a1009 )
| ( X0_13 = a1041
& X0_14 = a1181 )
| ( X0_13 = a1053
& X0_14 = a1181 )
| ( X0_14 = a1181
& X0_13 != a1089
& X0_13 != a1028
& X0_13 != a1013
& X0_13 != a997
& X0_13 != a1050
& X0_13 != a1125
& X0_13 != a1046
& X0_13 != a1042
& X0_13 != a1008
& X0_13 != a1124
& X0_13 != a1041
& X0_13 != a962
& X0_13 != a1053 ) ) ) ).
%------ Positive definition of ssSkC46
fof(lit_def_071,axiom,
( ssSkC46
<=> $false ) ).
%------ Positive definition of c8_1
fof(lit_def_072,axiom,
! [X0_13] :
( c8_1(X0_13)
<=> $false ) ).
%------ Positive definition of ssSkC37
fof(lit_def_073,axiom,
( ssSkC37
<=> $true ) ).
%------ Positive definition of ssSkC5
fof(lit_def_074,axiom,
( ssSkC5
<=> $true ) ).
%------ Negative definition of c9_2
fof(lit_def_075,axiom,
! [X0_13,X0_14] :
( ~ c9_2(X0_13,X0_14)
<=> ( ( X0_13 = a1118
& X0_14 = a988 )
| ( X0_13 = a1118
& X0_14 = a1112 )
| ( X0_13 = a1118
& X0_14 = a1084 )
| ( X0_13 = a1089
& X0_14 = a1076 )
| ( X0_13 = a1089
& X0_14 = a1084 )
| ( X0_13 = a1079
& X0_14 = a1076 )
| ( X0_13 = a1062
& X0_14 = a1021 )
| ( X0_13 = a1028
& X0_14 = a1030 )
| ( X0_13 = a1028
& X0_14 = a1029 )
| ( X0_13 = a1013
& X0_14 = a988 )
| ( X0_13 = a1013
& X0_14 = a1112 )
| ( X0_13 = a1013
& X0_14 = a1084 )
| ( X0_13 = a1003
& X0_14 = a1076 )
| ( X0_13 = a1003
& X0_14 = a1004 )
| ( X0_13 = a1003
& X0_14 = a1084 )
| ( X0_13 = a997
& X0_14 = a1076 )
| ( X0_13 = a972
& X0_14 = a1076 )
| ( X0_13 = a966
& X0_14 = a988 )
| ( X0_13 = a966
& X0_14 = a1112 )
| ( X0_13 = a966
& X0_14 = a1084 )
| ( X0_13 = a1154
& X0_14 != a1181 )
| X0_13 = a1050
| ( X0_13 = a1033
& X0_14 = a1076 )
| ( X0_13 = a963
& X0_14 = a964 )
| ( X0_13 = a963
& X0_14 = a1084 )
| ( X0_13 = a1173
& X0_14 != a1181 )
| ( X0_13 = a1160
& X0_14 != a1181 )
| ( X0_13 = a1125
& X0_14 != a1181 )
| ( X0_13 = a1095
& X0_14 != a1181 )
| ( X0_13 = a977
& X0_14 != a1181 )
| ( X0_13 = a1008
& X0_14 != a1181 )
| ( X0_13 = a1008
& X0_14 = a1076 )
| X0_13 = a995
| X0_13 = a1098
| ( X0_13 = a1080
& X0_14 != a1181 )
| ( X0_13 = a1080
& X0_14 = a1076 )
| X0_14 = a1182
| X0_14 = a1049
| X0_14 = a1159 ) ) ).
%------ Positive definition of c8_2
fof(lit_def_076,axiom,
! [X0_13,X0_14] :
( c8_2(X0_13,X0_14)
<=> ( ( X0_13 = a1089
& X0_14 = a1076 )
| ( X0_13 = a1089
& X0_14 = a1182 )
| ( X0_13 = a1013
& X0_14 = a1014 )
| ( X0_13 = a1003
& X0_14 = a1076 )
| ( X0_13 = a997
& X0_14 = a1076 )
| ( X0_13 = a997
& X0_14 = a1182 )
| ( X0_13 = a1087
& X0_14 = a1182 )
| ( X0_13 = a1087
& X0_14 = a1049 )
| ( X0_13 = a1125
& X0_14 = a1126 )
| ( X0_13 = a1095
& X0_14 = a1076 )
| ( X0_13 = a1008
& X0_14 = a1009 )
| ( X0_14 = a1076
& X0_13 != a1089
& X0_13 != a1003
& X0_13 != a997
& X0_13 != a1087
& X0_13 != a1050
& X0_13 != a1123
& X0_13 != a1095
& X0_13 != a1124
& X0_13 != a1041 )
| ( X0_14 = a1182
& X0_13 != a1089
& X0_13 != a997
& X0_13 != a1087
& X0_13 != a1050
& X0_13 != a1123
& X0_13 != a1095
& X0_13 != a1124
& X0_13 != a1041 )
| ( X0_14 = a1049
& X0_13 != a1089
& X0_13 != a997
& X0_13 != a1087
& X0_13 != a1050
& X0_13 != a1123
& X0_13 != a1095
& X0_13 != a1124
& X0_13 != a1041 ) ) ) ).
%------ Negative definition of c6_2
fof(lit_def_077,axiom,
! [X0_13,X0_14] :
( ~ c6_2(X0_13,X0_14)
<=> ( ( X0_13 = a1186
& X0_14 = a1187 )
| ( X0_13 = a1118
& X0_14 = a989 )
| ( X0_13 = a1089
& X0_14 = a1076 )
| ( X0_13 = a1013
& X0_14 = a989 )
| ( X0_13 = a1003
& X0_14 = a1076 )
| ( X0_13 = a1003
& X0_14 = a1004 )
| ( X0_13 = a1003
& X0_14 = a1077 )
| ( X0_13 = a997
& X0_14 = a1076 )
| ( X0_13 = a966
& X0_14 = a989 )
| X0_13 = a1078
| X0_13 = a1031
| X0_13 = a1139
| ( X0_13 = a1133
& X0_14 = a1134 )
| ( X0_13 = a1008
& X0_14 = a1010 )
| X0_13 = a1026
| ( X0_14 = a1076
& X0_13 != a1089
& X0_13 != a1003
& X0_13 != a997 )
| ( X0_14 = a1077
& X0_13 != a1089
& X0_13 != a1003
& X0_13 != a997
& X0_13 != a1080 )
| ( X0_14 = a1129
& X0_13 != a1089
& X0_13 != a997 )
| ( X0_14 = a1097
& X0_13 != a1153
& X0_13 != a1135 ) ) ) ).
%------ Negative definition of c4_2
fof(lit_def_078,axiom,
! [X0_13,X0_14] :
( ~ c4_2(X0_13,X0_14)
<=> ( ( X0_13 = a1089
& X0_14 != a1090
& X0_14 != a1076 )
| X0_13 = a1079
| ( X0_13 = a1066
& X0_14 = a1067 )
| ( X0_13 = a1028
& X0_14 = a1029 )
| X0_13 = a1003
| ( X0_13 = a1003
& X0_14 = a1142 )
| X0_13 = a997
| X0_13 = a972
| ( X0_13 = a1087
& X0_14 = a1088 )
| X0_13 = a1033
| X0_13 = a1123
| X0_13 = a1008
| ( X0_13 = a1026
& X0_14 = a1027 )
| ( X0_13 = a1080
& X0_14 = a1142 )
| ( X0_14 = a1076
& X0_13 != a1089 )
| ( X0_14 = a1142
& X0_13 != a1003
& X0_13 != a1080 )
| X0_14 = a1182
| X0_14 = a1049
| X0_14 = a1159
| X0_14 = a1102
| X0_14 = a1129
| X0_14 = a965
| X0_14 = a1097 ) ) ).
%------ Positive definition of c2_2
fof(lit_def_079,axiom,
! [X0_13,X0_14] :
( c2_2(X0_13,X0_14)
<=> ( X0_13 = a1095
& X0_14 = a1181 ) ) ).
%------ Positive definition of c10_2
fof(lit_def_080,axiom,
! [X0_13,X0_14] :
( c10_2(X0_13,X0_14)
<=> ( ( X0_13 = a1118
& X0_14 = a1111 )
| ( X0_13 = a1118
& X0_14 = a988 )
| ( X0_13 = a1089
& X0_14 = a1090 )
| ( X0_13 = a1013
& X0_14 = a1111 )
| ( X0_13 = a1013
& X0_14 = a988 )
| ( X0_13 = a966
& X0_14 = a1111 )
| ( X0_13 = a966
& X0_14 = a988 )
| ( X0_13 = a1095
& X0_14 = a1181 ) ) ) ).
%------ Positive definition of c1_2
fof(lit_def_081,axiom,
! [X0_13,X0_14] :
( c1_2(X0_13,X0_14)
<=> ( ( X0_13 = a1118
& X0_14 = a988 )
| ( X0_13 = a1089
& X0_14 = a1091 )
| ( X0_13 = a1066
& X0_14 = a1067 )
| ( X0_13 = a1013
& X0_14 = a988 )
| ( X0_13 = a1003
& X0_14 = a1004 )
| ( X0_13 = a966
& X0_14 = a988 )
| ( X0_13 = a963
& X0_14 = a964 ) ) ) ).
%------ Positive definition of c7_2
fof(lit_def_082,axiom,
! [X0_13,X0_14] :
( c7_2(X0_13,X0_14)
<=> ( ( X0_13 = a1186
& X0_14 = a979 )
| ( X0_13 = a1089
& X0_14 = a1090 )
| ( X0_13 = a1089
& X0_14 = a1076 )
| ( X0_14 = a979
& X0_13 != a1186
& X0_13 != a1135
& X0_13 != a1118
& X0_13 != a1089
& X0_13 != a1079
& X0_13 != a1040
& X0_13 != a1013
& X0_13 != a997
& X0_13 != a966
& X0_13 != a1050
& X0_13 != a1173
& X0_13 != a1123
& X0_13 != a1095
& X0_13 != a1024
& X0_13 != a1020
& X0_13 != a1124
& X0_13 != a1041
& X0_13 != a962
& X0_13 != a971
& X0_13 != a1080 )
| ( X0_14 = a1097
& X0_13 != a1135
& X0_13 != a1118
& X0_13 != a1089
& X0_13 != a1079
& X0_13 != a1040
& X0_13 != a1013
& X0_13 != a997
& X0_13 != a966
& X0_13 != a1050
& X0_13 != a1123
& X0_13 != a1095
& X0_13 != a1024
& X0_13 != a1020
& X0_13 != a1124
& X0_13 != a1041
& X0_13 != a962
& X0_13 != a971 ) ) ) ).
%------ Positive definition of c5_2
fof(lit_def_083,axiom,
! [X0_13,X0_14] :
( c5_2(X0_13,X0_14)
<=> ( ( X0_13 = a1062
& X0_14 = a1021 )
| ( X0_13 = a1133
& X0_14 = a1134 )
| ( X0_13 = a1125
& X0_14 = a1127 ) ) ) ).
%------ Positive definition of ssSkC48
fof(lit_def_084,axiom,
( ssSkC48
<=> $false ) ).
%------ Positive definition of ssSkC33
fof(lit_def_085,axiom,
( ssSkC33
<=> $true ) ).
%------ Positive definition of ssSkC32
fof(lit_def_086,axiom,
( ssSkC32
<=> $false ) ).
%------ Positive definition of ssSkC34
fof(lit_def_087,axiom,
( ssSkC34
<=> $false ) ).
%------ Positive definition of ssSkC31
fof(lit_def_088,axiom,
( ssSkC31
<=> $true ) ).
%------ Positive definition of ssSkC4
fof(lit_def_089,axiom,
( ssSkC4
<=> $true ) ).
%------ Positive definition of ssSkC49
fof(lit_def_090,axiom,
( ssSkC49
<=> $true ) ).
%------ Positive definition of ssSkC50
fof(lit_def_091,axiom,
( ssSkC50
<=> $false ) ).
%------ Positive definition of ssSkC29
fof(lit_def_092,axiom,
( ssSkC29
<=> $false ) ).
%------ Positive definition of ssSkC51
fof(lit_def_093,axiom,
( ssSkC51
<=> $false ) ).
%------ Positive definition of ssSkC9
fof(lit_def_094,axiom,
( ssSkC9
<=> $true ) ).
%------ Positive definition of sP9_iProver_split
fof(lit_def_095,axiom,
( sP9_iProver_split
<=> $false ) ).
%------ Positive definition of sP10_iProver_split
fof(lit_def_096,axiom,
( sP10_iProver_split
<=> $false ) ).
%------ Positive definition of sP11_iProver_split
fof(lit_def_097,axiom,
( sP11_iProver_split
<=> $false ) ).
%------ Positive definition of sP12_iProver_split
fof(lit_def_098,axiom,
( sP12_iProver_split
<=> $true ) ).
%------ Positive definition of sP16_iProver_split
fof(lit_def_099,axiom,
( sP16_iProver_split
<=> $false ) ).
%------ Positive definition of sP17_iProver_split
fof(lit_def_100,axiom,
( sP17_iProver_split
<=> $true ) ).
%------ Positive definition of sP21_iProver_split
fof(lit_def_101,axiom,
( sP21_iProver_split
<=> $false ) ).
%------ Positive definition of sP24_iProver_split
fof(lit_def_102,axiom,
( sP24_iProver_split
<=> $false ) ).
%------ Positive definition of sP25_iProver_split
fof(lit_def_103,axiom,
( sP25_iProver_split
<=> $false ) ).
%------ Positive definition of sP26_iProver_split
fof(lit_def_104,axiom,
( sP26_iProver_split
<=> $false ) ).
%------ Positive definition of sP27_iProver_split
fof(lit_def_105,axiom,
( sP27_iProver_split
<=> $false ) ).
%------ Positive definition of sP28_iProver_split
fof(lit_def_106,axiom,
( sP28_iProver_split
<=> $false ) ).
%------ Positive definition of sP29_iProver_split
fof(lit_def_107,axiom,
( sP29_iProver_split
<=> $false ) ).
%------ Positive definition of sP30_iProver_split
fof(lit_def_108,axiom,
( sP30_iProver_split
<=> $false ) ).
%------ Positive definition of sP31_iProver_split
fof(lit_def_109,axiom,
( sP31_iProver_split
<=> $true ) ).
%------ Positive definition of sP32_iProver_split
fof(lit_def_110,axiom,
( sP32_iProver_split
<=> $true ) ).
%------ Positive definition of sP33_iProver_split
fof(lit_def_111,axiom,
( sP33_iProver_split
<=> $false ) ).
%------ Positive definition of sP34_iProver_split
fof(lit_def_112,axiom,
( sP34_iProver_split
<=> $true ) ).
%------ Positive definition of sP35_iProver_split
fof(lit_def_113,axiom,
( sP35_iProver_split
<=> $false ) ).
%------ Positive definition of sP36_iProver_split
fof(lit_def_114,axiom,
( sP36_iProver_split
<=> $false ) ).
%------ Positive definition of sP37_iProver_split
fof(lit_def_115,axiom,
( sP37_iProver_split
<=> $false ) ).
%------ Positive definition of sP38_iProver_split
fof(lit_def_116,axiom,
( sP38_iProver_split
<=> $false ) ).
%------ Positive definition of sP39_iProver_split
fof(lit_def_117,axiom,
( sP39_iProver_split
<=> $false ) ).
%------ Positive definition of sP40_iProver_split
fof(lit_def_118,axiom,
( sP40_iProver_split
<=> $true ) ).
%------ Positive definition of sP41_iProver_split
fof(lit_def_119,axiom,
( sP41_iProver_split
<=> $false ) ).
%------ Positive definition of sP42_iProver_split
fof(lit_def_120,axiom,
( sP42_iProver_split
<=> $true ) ).
%------ Positive definition of sP43_iProver_split
fof(lit_def_121,axiom,
( sP43_iProver_split
<=> $true ) ).
%------ Positive definition of sP44_iProver_split
fof(lit_def_122,axiom,
( sP44_iProver_split
<=> $false ) ).
%------ Positive definition of sP45_iProver_split
fof(lit_def_123,axiom,
( sP45_iProver_split
<=> $false ) ).
%------ Positive definition of sP46_iProver_split
fof(lit_def_124,axiom,
( sP46_iProver_split
<=> $false ) ).
%------ Positive definition of sP47_iProver_split
fof(lit_def_125,axiom,
( sP47_iProver_split
<=> $true ) ).
%------ Positive definition of sP48_iProver_split
fof(lit_def_126,axiom,
( sP48_iProver_split
<=> $false ) ).
%------ Positive definition of sP49_iProver_split
fof(lit_def_127,axiom,
( sP49_iProver_split
<=> $false ) ).
%------ Positive definition of sP50_iProver_split
fof(lit_def_128,axiom,
( sP50_iProver_split
<=> $false ) ).
%------ Positive definition of sP51_iProver_split
fof(lit_def_129,axiom,
( sP51_iProver_split
<=> $true ) ).
%------ Positive definition of sP52_iProver_split
fof(lit_def_130,axiom,
( sP52_iProver_split
<=> $true ) ).
%------ Positive definition of sP53_iProver_split
fof(lit_def_131,axiom,
( sP53_iProver_split
<=> $true ) ).
%------ Positive definition of sP54_iProver_split
fof(lit_def_132,axiom,
( sP54_iProver_split
<=> $false ) ).
%------ Positive definition of sP55_iProver_split
fof(lit_def_133,axiom,
( sP55_iProver_split
<=> $false ) ).
%------ Positive definition of sP56_iProver_split
fof(lit_def_134,axiom,
( sP56_iProver_split
<=> $true ) ).
%------ Positive definition of sP57_iProver_split
fof(lit_def_135,axiom,
( sP57_iProver_split
<=> $false ) ).
%------ Positive definition of sP58_iProver_split
fof(lit_def_136,axiom,
( sP58_iProver_split
<=> $false ) ).
%------ Positive definition of sP59_iProver_split
fof(lit_def_137,axiom,
( sP59_iProver_split
<=> $false ) ).
%------ Positive definition of sP60_iProver_split
fof(lit_def_138,axiom,
( sP60_iProver_split
<=> $true ) ).
%------ Positive definition of sP61_iProver_split
fof(lit_def_139,axiom,
( sP61_iProver_split
<=> $true ) ).
%------ Positive definition of sP62_iProver_split
fof(lit_def_140,axiom,
( sP62_iProver_split
<=> $false ) ).
%------ Positive definition of sP63_iProver_split
fof(lit_def_141,axiom,
( sP63_iProver_split
<=> $false ) ).
%------ Positive definition of sP64_iProver_split
fof(lit_def_142,axiom,
( sP64_iProver_split
<=> $false ) ).
%------ Positive definition of sP65_iProver_split
fof(lit_def_143,axiom,
( sP65_iProver_split
<=> $true ) ).
%------ Positive definition of sP66_iProver_split
fof(lit_def_144,axiom,
( sP66_iProver_split
<=> $true ) ).
%------ Positive definition of sP68_iProver_split
fof(lit_def_145,axiom,
( sP68_iProver_split
<=> $true ) ).
%------ Positive definition of sP69_iProver_split
fof(lit_def_146,axiom,
( sP69_iProver_split
<=> $true ) ).
%------ Positive definition of sP70_iProver_split
fof(lit_def_147,axiom,
( sP70_iProver_split
<=> $false ) ).
%------ Positive definition of sP74_iProver_split
fof(lit_def_148,axiom,
( sP74_iProver_split
<=> $false ) ).
%------ Positive definition of sP75_iProver_split
fof(lit_def_149,axiom,
( sP75_iProver_split
<=> $true ) ).
%------ Positive definition of sP76_iProver_split
fof(lit_def_150,axiom,
( sP76_iProver_split
<=> $false ) ).
%------ Positive definition of sP78_iProver_split
fof(lit_def_151,axiom,
( sP78_iProver_split
<=> $false ) ).
%------ Positive definition of sP79_iProver_split
fof(lit_def_152,axiom,
( sP79_iProver_split
<=> $false ) ).
%------ Positive definition of sP81_iProver_split
fof(lit_def_153,axiom,
( sP81_iProver_split
<=> $false ) ).
%------ Positive definition of sP82_iProver_split
fof(lit_def_154,axiom,
( sP82_iProver_split
<=> $false ) ).
%------ Positive definition of sP83_iProver_split
fof(lit_def_155,axiom,
( sP83_iProver_split
<=> $false ) ).
%------ Positive definition of sP84_iProver_split
fof(lit_def_156,axiom,
( sP84_iProver_split
<=> $false ) ).
%------ Positive definition of sP85_iProver_split
fof(lit_def_157,axiom,
( sP85_iProver_split
<=> $false ) ).
%------ Positive definition of sP86_iProver_split
fof(lit_def_158,axiom,
( sP86_iProver_split
<=> $false ) ).
%------ Positive definition of sP87_iProver_split
fof(lit_def_159,axiom,
( sP87_iProver_split
<=> $true ) ).
%------ Positive definition of sP88_iProver_split
fof(lit_def_160,axiom,
( sP88_iProver_split
<=> $false ) ).
%------ Positive definition of sP89_iProver_split
fof(lit_def_161,axiom,
( sP89_iProver_split
<=> $true ) ).
%------ Positive definition of sP90_iProver_split
fof(lit_def_162,axiom,
( sP90_iProver_split
<=> $false ) ).
%------ Positive definition of sP91_iProver_split
fof(lit_def_163,axiom,
( sP91_iProver_split
<=> $true ) ).
%------ Positive definition of sP92_iProver_split
fof(lit_def_164,axiom,
( sP92_iProver_split
<=> $false ) ).
%------ Positive definition of sP93_iProver_split
fof(lit_def_165,axiom,
( sP93_iProver_split
<=> $true ) ).
%------ Positive definition of sP94_iProver_split
fof(lit_def_166,axiom,
( sP94_iProver_split
<=> $true ) ).
%------ Positive definition of sP95_iProver_split
fof(lit_def_167,axiom,
( sP95_iProver_split
<=> $false ) ).
%------ Positive definition of sP96_iProver_split
fof(lit_def_168,axiom,
( sP96_iProver_split
<=> $false ) ).
%------ Positive definition of sP97_iProver_split
fof(lit_def_169,axiom,
( sP97_iProver_split
<=> $false ) ).
%------ Positive definition of sP98_iProver_split
fof(lit_def_170,axiom,
( sP98_iProver_split
<=> $true ) ).
%------ Positive definition of sP99_iProver_split
fof(lit_def_171,axiom,
( sP99_iProver_split
<=> $false ) ).
%------ Positive definition of sP100_iProver_split
fof(lit_def_172,axiom,
( sP100_iProver_split
<=> $true ) ).
%------ Positive definition of sP101_iProver_split
fof(lit_def_173,axiom,
( sP101_iProver_split
<=> $true ) ).
%------ Positive definition of sP103_iProver_split
fof(lit_def_174,axiom,
( sP103_iProver_split
<=> $true ) ).
%------ Positive definition of sP104_iProver_split
fof(lit_def_175,axiom,
( sP104_iProver_split
<=> $false ) ).
%------ Positive definition of sP105_iProver_split
fof(lit_def_176,axiom,
( sP105_iProver_split
<=> $false ) ).
%------ Positive definition of sP106_iProver_split
fof(lit_def_177,axiom,
( sP106_iProver_split
<=> $true ) ).
%------ Positive definition of sP107_iProver_split
fof(lit_def_178,axiom,
( sP107_iProver_split
<=> $true ) ).
%------ Positive definition of sP109_iProver_split
fof(lit_def_179,axiom,
( sP109_iProver_split
<=> $false ) ).
%------ Positive definition of sP110_iProver_split
fof(lit_def_180,axiom,
( sP110_iProver_split
<=> $false ) ).
%------ Positive definition of sP112_iProver_split
fof(lit_def_181,axiom,
( sP112_iProver_split
<=> $false ) ).
%------ Positive definition of sP113_iProver_split
fof(lit_def_182,axiom,
( sP113_iProver_split
<=> $false ) ).
%------ Positive definition of sP116_iProver_split
fof(lit_def_183,axiom,
( sP116_iProver_split
<=> $false ) ).
%------ Positive definition of sP117_iProver_split
fof(lit_def_184,axiom,
( sP117_iProver_split
<=> $false ) ).
%------ Positive definition of sP118_iProver_split
fof(lit_def_185,axiom,
( sP118_iProver_split
<=> $false ) ).
%------ Positive definition of sP119_iProver_split
fof(lit_def_186,axiom,
( sP119_iProver_split
<=> $false ) ).
%------ Positive definition of sP120_iProver_split
fof(lit_def_187,axiom,
( sP120_iProver_split
<=> $false ) ).
%------ Positive definition of sP123_iProver_split
fof(lit_def_188,axiom,
( sP123_iProver_split
<=> $true ) ).
%------ Positive definition of sP125_iProver_split
fof(lit_def_189,axiom,
( sP125_iProver_split
<=> $true ) ).
%------ Positive definition of sP126_iProver_split
fof(lit_def_190,axiom,
( sP126_iProver_split
<=> $true ) ).
%------ Positive definition of sP127_iProver_split
fof(lit_def_191,axiom,
( sP127_iProver_split
<=> $false ) ).
%------ Positive definition of sP128_iProver_split
fof(lit_def_192,axiom,
( sP128_iProver_split
<=> $true ) ).
%------ Positive definition of sP132_iProver_split
fof(lit_def_193,axiom,
( sP132_iProver_split
<=> $false ) ).
%------ Positive definition of sP133_iProver_split
fof(lit_def_194,axiom,
( sP133_iProver_split
<=> $true ) ).
%------ Positive definition of sP134_iProver_split
fof(lit_def_195,axiom,
( sP134_iProver_split
<=> $false ) ).
%------ Positive definition of sP135_iProver_split
fof(lit_def_196,axiom,
( sP135_iProver_split
<=> $true ) ).
%------ Positive definition of sP136_iProver_split
fof(lit_def_197,axiom,
( sP136_iProver_split
<=> $false ) ).
%------ Positive definition of sP137_iProver_split
fof(lit_def_198,axiom,
( sP137_iProver_split
<=> $false ) ).
%------ Positive definition of sP138_iProver_split
fof(lit_def_199,axiom,
( sP138_iProver_split
<=> $true ) ).
%------ Positive definition of sP139_iProver_split
fof(lit_def_200,axiom,
( sP139_iProver_split
<=> $true ) ).
%------ Positive definition of sP140_iProver_split
fof(lit_def_201,axiom,
( sP140_iProver_split
<=> $false ) ).
%------ Positive definition of sP141_iProver_split
fof(lit_def_202,axiom,
( sP141_iProver_split
<=> $false ) ).
%------ Positive definition of sP143_iProver_split
fof(lit_def_203,axiom,
( sP143_iProver_split
<=> $true ) ).
%------ Positive definition of sP146_iProver_split
fof(lit_def_204,axiom,
( sP146_iProver_split
<=> $true ) ).
%------ Positive definition of sP147_iProver_split
fof(lit_def_205,axiom,
( sP147_iProver_split
<=> $false ) ).
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.00/0.12 % Problem : SYN424-1 : TPTP v8.1.2. Released v2.1.0.
% 0.00/0.13 % Command : run_iprover %s %d THM
% 0.13/0.34 % Computer : n010.cluster.edu
% 0.13/0.34 % Model : x86_64 x86_64
% 0.13/0.34 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.34 % Memory : 8042.1875MB
% 0.13/0.34 % OS : Linux 3.10.0-693.el7.x86_64
% 0.13/0.34 % CPULimit : 300
% 0.13/0.34 % WCLimit : 300
% 0.13/0.34 % DateTime : Sat Aug 26 20:18:05 EDT 2023
% 0.13/0.34 % CPUTime :
% 0.19/0.47 Running first-order theorem proving
% 0.19/0.47 Running: /export/starexec/sandbox2/solver/bin/run_problem --schedule fof_schedule --no_cores 8 /export/starexec/sandbox2/benchmark/theBenchmark.p 300
% 7.77/1.65 % SZS status Started for theBenchmark.p
% 7.77/1.65 % SZS status Satisfiable for theBenchmark.p
% 7.77/1.65
% 7.77/1.65 %---------------- iProver v3.8 (pre SMT-COMP 2023/CASC 2023) ----------------%
% 7.77/1.65
% 7.77/1.65 ------ iProver source info
% 7.77/1.65
% 7.77/1.65 git: date: 2023-05-31 18:12:56 +0000
% 7.77/1.65 git: sha1: 8abddc1f627fd3ce0bcb8b4cbf113b3cc443d7b6
% 7.77/1.65 git: non_committed_changes: false
% 7.77/1.65 git: last_make_outside_of_git: false
% 7.77/1.65
% 7.77/1.65 ------ Parsing...successful
% 7.77/1.65
% 7.77/1.65
% 7.77/1.65
% 7.77/1.65 ------ Preprocessing... sf_s rm: 33 0s sf_e pe_s pe_e
% 7.77/1.65
% 7.77/1.65 ------ Preprocessing... gs_s sp: 200 0s gs_e snvd_s sp: 0 0s snvd_e
% 7.77/1.65 ------ Proving...
% 7.77/1.65 ------ Problem Properties
% 7.77/1.65
% 7.77/1.65
% 7.77/1.65 clauses 744
% 7.77/1.65 conjectures 744
% 7.77/1.65 EPR 744
% 7.77/1.65 Horn 326
% 7.77/1.65 unary 0
% 7.77/1.65 binary 234
% 7.77/1.65 lits 2500
% 7.77/1.65 lits eq 0
% 7.77/1.65 fd_pure 0
% 7.77/1.65 fd_pseudo 0
% 7.77/1.65 fd_cond 0
% 7.77/1.65 fd_pseudo_cond 0
% 7.77/1.65 AC symbols 0
% 7.77/1.65
% 7.77/1.65 ------ Input Options Time Limit: Unbounded
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% 7.77/1.65 ------
% 7.77/1.65 Current options:
% 7.77/1.65 ------
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% 7.77/1.65 ------ Proving...
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% 7.77/1.65 % SZS status Satisfiable for theBenchmark.p
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% 7.77/1.65 ------ Building Model...Done
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% 7.77/1.65 %------ The model is defined over ground terms (initial term algebra).
% 7.77/1.65 %------ Predicates are defined as (\forall x_1,..,x_n ((~)P(x_1,..,x_n) <=> (\phi(x_1,..,x_n))))
% 7.77/1.65 %------ where \phi is a formula over the term algebra.
% 7.77/1.65 %------ If we have equality in the problem then it is also defined as a predicate above,
% 7.77/1.65 %------ with "=" on the right-hand-side of the definition interpreted over the term algebra term_algebra_type
% 7.77/1.65 %------ See help for --sat_out_model for different model outputs.
% 7.77/1.65 %------ equality_sorted(X0,X1,X2) can be used in the place of usual "="
% 7.77/1.65 %------ where the first argument stands for the sort ($i in the unsorted case)
% 7.77/1.65 % SZS output start Model for theBenchmark.p
% See solution above
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