TSTP Solution File: SYN852-1 by iProver-SAT---3.8
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- Process Solution
%------------------------------------------------------------------------------
% File : iProver-SAT---3.8
% Problem : SYN852-1 : TPTP v8.1.2. Released v2.5.0.
% Transfm : none
% Format : tptp:raw
% Command : run_iprover %s %d SAT
% Computer : n019.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 03:18:53 EDT 2023
% Result : Satisfiable 47.03s 6.64s
% Output : Model 47.03s
% Verified :
% SZS Type : ERROR: Analysing output (MakeTreeStats fails)
% Comments :
%------------------------------------------------------------------------------
%------ Positive definition of ssPv55_2r1r1
fof(lit_def,axiom,
! [X0,X1] :
( ssPv55_2r1r1(X0,X1)
<=> $false ) ).
%------ Positive definition of ssPv47_10r1r1r1r1r1r1r1r1r1r1
fof(lit_def_001,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9] :
( ssPv47_10r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9)
<=> X9 = skc88 ) ).
%------ Positive definition of ssPv42_15r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_002,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14] :
( ssPv42_15r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14)
<=> X14 = skc78 ) ).
%------ Negative definition of ssPv30_27r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_003,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26] :
( ~ ssPv30_27r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26)
<=> ( ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X26 = skc71 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X26 = skc71
& X14 != skc78 )
| ( X8 = skc90
& X10 = skc87
& X25 = skc72
& X26 = skc71 )
| ( X8 = skc90
& X10 = skc87
& X26 = skc71
& X12 != skc83
& X25 != skc72 )
| ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X26 = skc71 )
| ( X8 = skc90
& X14 = skc78
& X25 = skc72
& X26 = skc71 )
| ( X8 = skc90
& X26 = skc71
& X10 != skc87
& ( X10 != skc87
| X12 != skc83 )
& ( X10 != skc87
| X25 != skc72 )
& ( X12 != skc83
| X14 != skc78 )
& ( X14 != skc78
| X25 != skc72 ) )
| ( X12 = skc83
& X8 != skc90
& ( X8 != skc90
| X10 != skc87 )
& X26 != skc70 )
| ( X25 = skc72
& X8 != skc90
& ( X8 != skc90
| X10 != skc87 )
& X26 != skc70 )
| ( X26 = skc71
& X8 != skc90
& ( X8 != skc90
| X10 != skc87 )
& ( X8 != skc90
| X12 != skc83
| X14 != skc78 ) ) ) ) ).
%------ Positive definition of ssPv27_30r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_004,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29] :
( ssPv27_30r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29)
<=> X29 = skc64 ) ).
%------ Negative definition of ssPv25_32r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_005,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31] :
( ~ ssPv25_32r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31)
<=> X31 = skc61 ) ).
%------ Positive definition of ssPv40_32r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_006,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31] :
( ssPv40_32r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31)
<=> $true ) ).
%------ Positive definition of ssPv35_32r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_007,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31] :
( ssPv35_32r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31)
<=> $true ) ).
%------ Positive definition of ssPv33_32r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_008,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31] :
( ssPv33_32r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31)
<=> $true ) ).
%------ Negative definition of ssPv24_33r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_009,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32] :
( ~ ssPv24_33r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32)
<=> ( ( X8 = skc90
& ( X10 != skc87
| X12 != skc83
| X14 != skc78
| X25 != skc72
| X29 != skc64
| X31 != skc61 )
& ( X10 != skc87
| X31 != skc61 )
& ( X12 != skc83
| X14 != skc78
| X25 != skc72
| X29 != skc64
| X31 != skc61 )
& ( X12 != skc83
| X14 != skc78
| X29 != skc64
| X31 != skc61 )
& ( X14 != skc78
| X25 != skc72
| X26 != skc71
| X29 != skc64
| X31 != skc61 )
& ( X14 != skc78
| X25 != skc72
| X29 != skc64
| X31 != skc61 )
& X31 != skc61 )
| ( X8 = skc90
& X31 = skc61
& X10 != skc87
& ( X10 != skc87
| X12 != skc83
| X14 != skc78
| X25 != skc72
| X29 != skc64 )
& ( X12 != skc83
| X14 != skc78
| X25 != skc72
| X29 != skc64 )
& ( X12 != skc83
| X14 != skc78
| X29 != skc64 )
& ( X14 != skc78
| X25 != skc72
| X26 != skc71
| X29 != skc64 )
& ( X14 != skc78
| X25 != skc72
| X29 != skc64 )
& X29 != skc64 ) ) ) ).
%------ Positive definition of ssPv20_41r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_010,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40] :
( ssPv20_41r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40)
<=> $true ) ).
%------ Positive definition of ssPv22_46r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_011,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45] :
( ssPv22_46r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45)
<=> $true ) ).
%------ Positive definition of ssPv37_48r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_012,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47] :
( ssPv37_48r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47)
<=> $true ) ).
%------ Negative definition of ssPv15_52r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_013,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47,X48,X49,X50,X51] :
( ~ ssPv15_52r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47,X48,X49,X50,X51)
<=> X41 = skc57 ) ).
%------ Positive definition of ssPv34_54r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_014,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47,X48,X49,X50,X51,X52,X53] :
( ssPv34_54r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47,X48,X49,X50,X51,X52,X53)
<=> $true ) ).
%------ Positive definition of ssPv7_55r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_015,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47,X48,X49,X50,X51,X52,X53,X54] :
( ssPv7_55r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47,X48,X49,X50,X51,X52,X53,X54)
<=> $true ) ).
%------ Negative definition of ssPv27_56r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_016,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47,X48,X49,X50,X51,X52,X53,X54,X55] :
( ~ ssPv27_56r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47,X48,X49,X50,X51,X52,X53,X54,X55)
<=> ( X29 != skc64
| ( X8 = skc90
& X31 = skc61
& X45 = skc51
& ( X12 != skc83
| X14 != skc78
| X25 != skc72
| X29 != skc64
| X43 != skc55 )
& ( X12 != skc83
| X14 != skc78
| X29 != skc64
| X43 != skc55 )
& ( X14 != skc78
| X25 != skc72
| X29 != skc64
| X43 != skc55 )
& ( X14 != skc78
| X26 != skc71
| X29 != skc64
| X43 != skc55 )
& X29 != skc64 ) ) ) ).
%------ Negative definition of ssPv17_56r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_017,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47,X48,X49,X50,X51,X52,X53,X54,X55] :
( ~ ssPv17_56r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47,X48,X49,X50,X51,X52,X53,X54,X55)
<=> ( ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X43 = skc55 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& ( X40 != skc59
| X43 != skc55
| X45 != skc51 ) )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& ( X40 != skc59
| X45 != skc51 ) )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X45 = skc51
& X40 != skc59 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& ( X40 != skc59
| X43 != skc55
| X45 != skc51 ) )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X43 = skc55 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X45 = skc51
& ( X25 != skc72
| X40 != skc59 ) )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& ( X25 != skc72
| X40 != skc59
| X43 != skc55
| X45 != skc51 ) )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51
& X25 != skc72
& X28 != skc67 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X25 != skc72
& ( X25 != skc72
| X40 != skc59
| X45 != skc51 )
& X28 != skc67
& ( X40 != skc59
| X45 != skc51 ) )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X45 = skc51
& X25 != skc72
& ( X25 != skc72
| X40 != skc59 )
& ( X28 != skc67
| X40 != skc59 )
& X40 != skc59 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X26 = skc71
& X31 = skc61
& ( X14 != skc78
| X25 != skc72
| X29 != skc64
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X14 != skc78
| X25 != skc72
| X29 != skc64
| X43 != skc55 )
& ( X14 != skc78
| X29 != skc64
| X43 != skc55 ) )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& ( X40 != skc59
| X43 != skc55
| X45 != skc51 ) )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X43 = skc55 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X12 != skc83
& ( X12 != skc83
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X28 != skc67
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X40 != skc59
| X43 != skc55
| X45 != skc51 ) )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51
& X12 != skc83 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X45 = skc51
& ( X12 != skc83
| X43 != skc55 )
& X43 != skc55 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& ( X40 != skc59
| X45 != skc51 ) )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X45 = skc51
& X12 != skc83
& ( X12 != skc83
| X40 != skc59 )
& ( X28 != skc67
| X40 != skc59 )
& X40 != skc59 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X12 != skc83
& ( X12 != skc83
| X25 != skc72
| X40 != skc59
| X45 != skc51 )
& X25 != skc72 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51
& X12 != skc83
& ( X12 != skc83
| X25 != skc72 )
& X25 != skc72 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X12 != skc83
& ( X12 != skc83
| X25 != skc72 )
& ( X12 != skc83
| X25 != skc72
| X40 != skc59
| X45 != skc51 )
& ( X12 != skc83
| X28 != skc67 )
& X25 != skc72
& ( X25 != skc72
| X40 != skc59
| X45 != skc51 )
& X28 != skc67
& ( X40 != skc59
| X45 != skc51 )
& X45 != skc51 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X45 = skc51
& ( X12 != skc83
| X25 != skc72 )
& ( X12 != skc83
| X25 != skc72
| X40 != skc59 )
& ( X12 != skc83
| X28 != skc67 ) )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X26 = skc71
& X31 = skc61
& X43 = skc55
& ( X12 != skc83
| X25 != skc72
| X29 != skc64 )
& ( X12 != skc83
| X25 != skc72
| X29 != skc64
| X40 != skc59
| X45 != skc51 )
& ( X12 != skc83
| X28 != skc67
| X29 != skc64 )
& ( X12 != skc83
| X29 != skc64 )
& ( X25 != skc72
| X29 != skc64 )
& ( X25 != skc72
| X29 != skc64
| X40 != skc59
| X45 != skc51 )
& X29 != skc64 )
| ( X8 = skc90
& X10 = skc87
& X25 = skc72
& X26 = skc71
& X31 = skc61
& ( X12 != skc83
| X14 != skc78
| X29 != skc64
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X12 != skc83
| X14 != skc78
| X29 != skc64
| X43 != skc55 )
& ( X14 != skc78
| X29 != skc64
| X43 != skc55 ) )
| ( X8 = skc90
& X10 = skc87
& X26 = skc71
& X29 = skc64
& X31 = skc61
& ( X12 != skc83
| X14 != skc78
| X25 != skc72
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X12 != skc83
| X14 != skc78
| X25 != skc72
| X43 != skc55 )
& ( X12 != skc83
| X14 != skc78
| X43 != skc55 )
& ( X14 != skc78
| X25 != skc72
| X43 != skc55 )
& ( X14 != skc78
| X43 != skc55 ) )
| ( X8 = skc90
& X10 = skc87
& X26 = skc71
& X31 = skc61
& ( X12 != skc83
| X14 != skc78
| X25 != skc72
| X29 != skc64
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X12 != skc83
| X14 != skc78
| X25 != skc72
| X29 != skc64
| X43 != skc55 )
& ( X12 != skc83
| X14 != skc78
| X29 != skc64
| X43 != skc55 )
& ( X14 != skc78
| X25 != skc72
| X29 != skc64
| X43 != skc55 )
& ( X14 != skc78
| X29 != skc64
| X43 != skc55 )
& ( X14 != skc78
| X43 != skc55 )
& X29 != skc64 )
| ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& ( X40 != skc59
| X43 != skc55 )
& ( X43 != skc55
| X45 != skc51 ) )
| ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& ( X10 != skc87
| X45 != skc51 )
& X45 != skc51 )
| ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51
& X10 != skc87 )
| ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X40 != skc59
& X45 != skc51 )
| ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X45 = skc51
& ( X10 != skc87
| X40 != skc59 )
& X40 != skc59 )
| ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& ( X25 != skc72
| X40 != skc59
| X43 != skc55 )
& ( X25 != skc72
| X43 != skc55
| X45 != skc51 )
& ( X43 != skc55
| X45 != skc51 ) )
| ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51
& ( X10 != skc87
| X25 != skc72 )
& X25 != skc72 )
| ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& ( X25 != skc72
| X40 != skc59 )
& ( X25 != skc72
| X45 != skc51 )
& X45 != skc51 )
| ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X45 = skc51
& X10 != skc87
& ( X10 != skc87
| X25 != skc72
| X40 != skc59 )
& ( X10 != skc87
| X28 != skc67
| X40 != skc59 )
& ( X10 != skc87
| X40 != skc59 )
& X25 != skc72
& ( X25 != skc72
| X40 != skc59 ) )
| ( X8 = skc90
& X12 = skc83
& X29 = skc64
& X31 = skc61
& ( X10 != skc87
| X14 != skc78 )
& ( X10 != skc87
| X14 != skc78
| X25 != skc72 )
& ( X10 != skc87
| X14 != skc78
| X25 != skc72
| X28 != skc67 )
& ( X10 != skc87
| X14 != skc78
| X25 != skc72
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X10 != skc87
| X14 != skc78
| X25 != skc72
| X43 != skc55 )
& ( X10 != skc87
| X14 != skc78
| X26 != skc71
| X28 != skc67
| X43 != skc55 )
& ( X10 != skc87
| X14 != skc78
| X26 != skc71
| X43 != skc55 )
& ( X10 != skc87
| X14 != skc78
| X28 != skc67
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X10 != skc87
| X14 != skc78
| X28 != skc67
| X43 != skc55 )
& ( X10 != skc87
| X14 != skc78
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X10 != skc87
| X14 != skc78
| X43 != skc55 )
& X14 != skc78
& ( X14 != skc78
| X25 != skc72 )
& ( X14 != skc78
| X25 != skc72
| X26 != skc71 )
& ( X14 != skc78
| X25 != skc72
| X26 != skc71
| X43 != skc55 )
& ( X14 != skc78
| X25 != skc72
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X14 != skc78
| X25 != skc72
| X43 != skc55 )
& ( X14 != skc78
| X26 != skc71 )
& ( X14 != skc78
| X26 != skc71
| X43 != skc55 )
& ( X14 != skc78
| X43 != skc55 ) )
| ( X8 = skc90
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X10 != skc87
& ( X10 != skc87
| X12 != skc83 )
& ( X10 != skc87
| X12 != skc83
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X10 != skc87
| X28 != skc67
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X12 != skc83
| X40 != skc59
| X43 != skc55 )
& ( X12 != skc83
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X12 != skc83
| X43 != skc55
| X45 != skc51 )
& ( X40 != skc59
| X43 != skc55
| X45 != skc51 ) )
| ( X8 = skc90
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51
& X10 != skc87
& ( X10 != skc87
| X12 != skc83 )
& X12 != skc83 )
| ( X8 = skc90
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& ( X10 != skc87
| X12 != skc83
| X40 != skc59
| X45 != skc51 )
& ( X10 != skc87
| X28 != skc67
| X40 != skc59
| X45 != skc51 )
& ( X12 != skc83
| X40 != skc59 )
& ( X12 != skc83
| X40 != skc59
| X45 != skc51 )
& ( X12 != skc83
| X45 != skc51 )
& ( X40 != skc59
| X45 != skc51 ) )
| ( X8 = skc90
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X45 = skc51
& ( X10 != skc87
| X12 != skc83
| X40 != skc59 )
& ( X10 != skc87
| X28 != skc67
| X40 != skc59 )
& X12 != skc83
& ( X12 != skc83
| X40 != skc59 )
& X40 != skc59 )
| ( X8 = skc90
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51
& X10 != skc87
& ( X10 != skc87
| X12 != skc83 )
& ( X10 != skc87
| X12 != skc83
| X25 != skc72 )
& ( X10 != skc87
| X12 != skc83
| X28 != skc67 )
& ( X10 != skc87
| X25 != skc72 )
& ( X10 != skc87
| X25 != skc72
| X28 != skc67 )
& X12 != skc83
& ( X12 != skc83
| X25 != skc72 )
& X25 != skc72 )
| ( X8 = skc90
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X45 = skc51
& ( X10 != skc87
| X12 != skc83
| X25 != skc72
| X43 != skc55 )
& ( X10 != skc87
| X43 != skc55 )
& X43 != skc55 )
| ( X8 = skc90
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X10 != skc87
& ( X10 != skc87
| X12 != skc83
| X28 != skc67 )
& X12 != skc83
& ( X12 != skc83
| X25 != skc72 )
& ( X12 != skc83
| X25 != skc72
| X45 != skc51 )
& ( X12 != skc83
| X45 != skc51 )
& X25 != skc72
& ( X25 != skc72
| X45 != skc51 )
& ( X40 != skc59
| X45 != skc51 ) )
| ( X8 = skc90
& X25 = skc72
& X29 = skc64
& X31 = skc61
& ( X10 != skc87
| X12 != skc83
| X14 != skc78 )
& ( X10 != skc87
| X12 != skc83
| X14 != skc78
| X28 != skc67 )
& ( X10 != skc87
| X12 != skc83
| X14 != skc78
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X10 != skc87
| X12 != skc83
| X14 != skc78
| X43 != skc55 )
& ( X10 != skc87
| X14 != skc78 )
& ( X10 != skc87
| X14 != skc78
| X26 != skc71
| X43 != skc55 )
& ( X10 != skc87
| X14 != skc78
| X28 != skc67
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X10 != skc87
| X14 != skc78
| X28 != skc67
| X43 != skc55 )
& ( X10 != skc87
| X14 != skc78
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X10 != skc87
| X14 != skc78
| X43 != skc55 )
& ( X12 != skc83
| X14 != skc78 )
& ( X12 != skc83
| X14 != skc78
| X26 != skc71 )
& ( X12 != skc83
| X14 != skc78
| X26 != skc71
| X43 != skc55 )
& ( X12 != skc83
| X14 != skc78
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X12 != skc83
| X14 != skc78
| X43 != skc55 )
& X14 != skc78
& ( X14 != skc78
| X26 != skc71 )
& ( X14 != skc78
| X26 != skc71
| X43 != skc55 )
& ( X14 != skc78
| X43 != skc55 ) )
| ( X8 = skc90
& X26 = skc71
& X29 = skc64
& X31 = skc61
& ( X10 != skc87
| X12 != skc83
| X14 != skc78
| X25 != skc72
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X10 != skc87
| X12 != skc83
| X14 != skc78
| X25 != skc72
| X43 != skc55 )
& ( X10 != skc87
| X12 != skc83
| X14 != skc78
| X28 != skc67
| X43 != skc55 )
& ( X10 != skc87
| X12 != skc83
| X14 != skc78
| X43 != skc55 )
& ( X10 != skc87
| X14 != skc78
| X25 != skc72
| X43 != skc55 )
& ( X10 != skc87
| X14 != skc78
| X43 != skc55 )
& ( X12 != skc83
| X14 != skc78 )
& ( X12 != skc83
| X14 != skc78
| X25 != skc72 )
& ( X12 != skc83
| X14 != skc78
| X25 != skc72
| X43 != skc55 )
& ( X12 != skc83
| X14 != skc78
| X43 != skc55 )
& ( X14 != skc78
| X25 != skc72 )
& ( X14 != skc78
| X25 != skc72
| X43 != skc55 )
& ( X14 != skc78
| X40 != skc59
| X43 != skc55
| X45 != skc51 )
& ( X14 != skc78
| X43 != skc55 ) ) ) ) ).
%------ Negative definition of ssPv16_56r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_018,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47,X48,X49,X50,X51,X52,X53,X54,X55] :
( ~ ssPv16_56r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47,X48,X49,X50,X51,X52,X53,X54,X55)
<=> ( ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55 )
| ( X8 = skc90
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X45 = skc51 )
| ( X40 = skc59
& ( X8 != skc90
| X12 != skc83
| X14 != skc78
| X25 != skc72
| X29 != skc64
| X31 != skc61
| X43 != skc55 )
& ( X8 != skc90
| X29 != skc64
| X31 != skc61
| X45 != skc51 ) ) ) ) ).
%------ Negative definition of ssPv11_56r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_019,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47,X48,X49,X50,X51,X52,X53,X54,X55] :
( ~ ssPv11_56r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47,X48,X49,X50,X51,X52,X53,X54,X55)
<=> X45 = skc51 ) ).
%------ Positive definition of ssPv1_56r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1
fof(lit_def_020,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47,X48,X49,X50,X51,X52,X53,X54,X55] :
( ssPv1_56r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1r1(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47,X48,X49,X50,X51,X52,X53,X54,X55)
<=> ( ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 != skc51 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X43 = skc55
& ( X40 != skc59
| X45 != skc51 ) )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X45 = skc51
& X40 != skc59 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51
& X28 != skc67 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X28 != skc67
& ( X40 != skc59
| X45 != skc51 ) )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X45 = skc51 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X43 = skc55
& ( X25 != skc72
| X40 != skc59 ) )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X45 = skc51
& X25 != skc72
& X40 != skc59 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51
& X28 != skc67 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& ( X25 != skc72
| X28 != skc67 )
& ( X25 != skc72
| X40 != skc59 )
& X28 != skc67
& ( X40 != skc59
| X45 != skc51 )
& X45 != skc51 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X45 = skc51
& X25 != skc72
& ( X25 != skc72
| X28 != skc67 )
& ( X25 != skc72
| X28 != skc67
| X40 != skc59 )
& ( X25 != skc72
| X40 != skc59 )
& X28 != skc67
& ( X28 != skc67
| X40 != skc59 )
& X40 != skc59 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51
& X12 != skc83 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X45 != skc51 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X45 = skc51
& X12 != skc83
& ( X12 != skc83
| X40 != skc59 ) )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51
& ( X12 != skc83
| X28 != skc67 ) )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X45 = skc51
& X43 != skc55 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X12 != skc83
& ( X12 != skc83
| X28 != skc67 )
& X45 != skc51 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X45 = skc51
& X12 != skc83
& ( X12 != skc83
| X28 != skc67 )
& ( X12 != skc83
| X28 != skc67
| X40 != skc59 )
& X28 != skc67 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X26 = skc71
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X12 != skc83
& ( X12 != skc83
| X25 != skc72 ) )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X26 = skc71
& X28 = skc67
& X31 = skc61
& X43 = skc55
& ( X12 != skc83
| X25 != skc72
| X29 != skc64 )
& ( X12 != skc83
| X25 != skc72
| X29 != skc64
| X45 != skc51 )
& ( X12 != skc83
| X29 != skc64 )
& ( X12 != skc83
| X29 != skc64
| X45 != skc51 )
& X29 != skc64 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51
& ( X12 != skc83
| X28 != skc67 )
& X25 != skc72 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X12 != skc83
& ( X12 != skc83
| X25 != skc72 )
& ( X12 != skc83
| X25 != skc72
| X28 != skc67 )
& ( X12 != skc83
| X28 != skc67 )
& X25 != skc72
& ( X25 != skc72
| X40 != skc59
| X45 != skc51 )
& X28 != skc67
& ( X40 != skc59
| X45 != skc51 ) )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X45 = skc51
& ( X12 != skc83
| X25 != skc72
| X43 != skc55 )
& X28 != skc67
& X40 != skc59
& X43 != skc55 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X26 = skc71
& X31 = skc61
& X43 = skc55
& ( X12 != skc83
| X25 != skc72
| X28 != skc67
| X29 != skc64 )
& ( X12 != skc83
| X25 != skc72
| X29 != skc64 )
& ( X12 != skc83
| X25 != skc72
| X29 != skc64
| X45 != skc51 )
& ( X12 != skc83
| X28 != skc67
| X29 != skc64 )
& ( X25 != skc72
| X29 != skc64
| X40 != skc59
| X45 != skc51 )
& X28 != skc67
& X29 != skc64
& ( X29 != skc64
| X40 != skc59
| X45 != skc51 ) )
| ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& ( X10 != skc87
| X28 != skc67 )
& ( X10 != skc87
| X28 != skc67
| X45 != skc51 ) )
| ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X45 = skc51
& X10 != skc87
& ( X10 != skc87
| X28 != skc67 )
& ( X10 != skc87
| X28 != skc67
| X40 != skc59 ) )
| ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X10 != skc87
& ( X10 != skc87
| X28 != skc67
| X40 != skc59
| X45 != skc51 )
& ( X10 != skc87
| X40 != skc59
| X45 != skc51 )
& ( X26 != skc71
| X40 != skc59
| X45 != skc51 )
& X40 != skc59
& ( X40 != skc59
| X45 != skc51 )
& X45 != skc51 )
| ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51 )
| ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X10 != skc87
& ( X10 != skc87
| X28 != skc67 )
& ( X25 != skc72
| X40 != skc59 )
& ( X25 != skc72
| X40 != skc59
| X45 != skc51 )
& ( X25 != skc72
| X45 != skc51 )
& ( X40 != skc59
| X45 != skc51 ) )
| ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X45 = skc51
& ( X10 != skc87
| X25 != skc72 )
& ( X10 != skc87
| X25 != skc72
| X28 != skc67 )
& ( X10 != skc87
| X25 != skc72
| X28 != skc67
| X40 != skc59 )
& X40 != skc59 )
| ( X8 = skc90
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51 )
| ( X8 = skc90
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X10 != skc87
& ( X10 != skc87
| X12 != skc83
| X28 != skc67 )
& ( X10 != skc87
| X12 != skc83
| X28 != skc67
| X40 != skc59
| X45 != skc51 )
& ( X10 != skc87
| X12 != skc83
| X40 != skc59
| X45 != skc51 )
& ( X10 != skc87
| X28 != skc67 )
& ( X10 != skc87
| X40 != skc59
| X45 != skc51 )
& ( X12 != skc83
| X40 != skc59
| X45 != skc51 )
& ( X40 != skc59
| X45 != skc51 )
& X45 != skc51 )
| ( X8 = skc90
& X14 = skc78
& X25 = skc72
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X45 = skc51
& X10 != skc87
& ( X10 != skc87
| X12 != skc83 )
& ( X10 != skc87
| X12 != skc83
| X28 != skc67 )
& ( X10 != skc87
| X12 != skc83
| X28 != skc67
| X40 != skc59 )
& ( X10 != skc87
| X28 != skc67 )
& X40 != skc59 )
| ( X8 = skc90
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X43 = skc55
& X45 = skc51
& X10 != skc87
& ( X10 != skc87
| X12 != skc83 )
& ( X10 != skc87
| X12 != skc83
| X25 != skc72 )
& ( X10 != skc87
| X12 != skc83
| X25 != skc72
| X28 != skc67 )
& ( X10 != skc87
| X12 != skc83
| X28 != skc67 )
& ( X10 != skc87
| X25 != skc72 )
& ( X10 != skc87
| X25 != skc72
| X28 != skc67 )
& X12 != skc83
& ( X12 != skc83
| X25 != skc72 )
& X25 != skc72 )
| ( X8 = skc90
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X40 = skc59
& X45 = skc51
& X10 != skc87
& ( X10 != skc87
| X12 != skc83
| X28 != skc67 )
& ( X12 != skc83
| X43 != skc55 )
& ( X25 != skc72
| X43 != skc55 ) )
| ( X8 = skc90
& X14 = skc78
& X26 = skc71
& X29 = skc64
& X31 = skc61
& X43 = skc55
& X10 != skc87
& ( X10 != skc87
| X12 != skc83 )
& ( X10 != skc87
| X12 != skc83
| X25 != skc72
| X28 != skc67 )
& ( X10 != skc87
| X12 != skc83
| X28 != skc67 )
& ( X10 != skc87
| X25 != skc72 )
& ( X10 != skc87
| X28 != skc67 )
& ( X10 != skc87
| X40 != skc59
| X45 != skc51 )
& ( X12 != skc83
| X25 != skc72
| X40 != skc59
| X45 != skc51 )
& ( X12 != skc83
| X40 != skc59
| X45 != skc51 )
& ( X12 != skc83
| X45 != skc51 )
& X25 != skc72
& ( X25 != skc72
| X40 != skc59
| X45 != skc51 )
& ( X25 != skc72
| X45 != skc51 )
& ( X40 != skc59
| X45 != skc51 ) )
| ( X8 = skc90
& X31 = skc61
& X45 = skc51
& X10 != skc87
& ( X12 != skc83
| X14 != skc78
| X29 != skc64
| X43 != skc55 )
& ( X14 != skc78
| X25 != skc72
| X29 != skc64
| X43 != skc55 )
& ( X29 != skc64
| X40 != skc59 ) ) ) ) ).
%------ Positive definition of sP0_iProver_split
fof(lit_def_021,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45] :
( sP0_iProver_split(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45)
<=> X45 = skc51 ) ).
%------ Positive definition of sP1_iProver_split
fof(lit_def_022,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40] :
( sP1_iProver_split(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40)
<=> X40 = skc59 ) ).
%------ Negative definition of sP2_iProver_split
fof(lit_def_023,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39] :
( ~ sP2_iProver_split(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39)
<=> ( ( ( X8 != skc90
| X10 != skc87
| X12 != skc83
| X14 != skc78
| X25 != skc72
| X26 != skc71
| X28 != skc67
| X29 != skc64
| X31 != skc61 )
& ( X8 != skc90
| X10 != skc87
| X12 != skc83
| X14 != skc78
| X26 != skc71
| X29 != skc64
| X31 != skc61 )
& ( X8 != skc90
| X10 != skc87
| X26 != skc71
| X29 != skc64
| X31 != skc61 )
& ( X8 != skc90
| X10 != skc87
| X26 != skc71
| X31 != skc61 )
& ( X8 != skc90
| X12 != skc83
| X14 != skc78
| X25 != skc72
| X26 != skc71
| X29 != skc64
| X31 != skc61 )
& ( X8 != skc90
| X12 != skc83
| X14 != skc78
| X25 != skc72
| X29 != skc64
| X31 != skc61 )
& ( X8 != skc90
| X12 != skc83
| X14 != skc78
| X26 != skc71
| X29 != skc64
| X31 != skc61 )
& ( X8 != skc90
| X12 != skc83
| X29 != skc64
| X31 != skc61 )
& ( X8 != skc90
| X14 != skc78
| X25 != skc72
| X26 != skc71
| X29 != skc64
| X31 != skc61 )
& ( X8 != skc90
| X25 != skc72
| X29 != skc64
| X31 != skc61 )
& ( X8 != skc90
| X26 != skc71
| X29 != skc64
| X31 != skc61 ) )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X26 != skc71 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X29 = skc64
& X31 = skc61
& X26 != skc71
& ( X26 != skc71
| X28 != skc67 ) )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X25 != skc72
& ( X25 != skc72
| X26 != skc71 )
& X26 != skc71 )
| ( X8 = skc90
& X10 = skc87
& X12 = skc83
& X14 = skc78
& X29 = skc64
& X31 = skc61
& X25 != skc72
& ( X25 != skc72
| X26 != skc71 )
& ( X25 != skc72
| X26 != skc71
| X28 != skc67 )
& X26 != skc71
& ( X26 != skc71
| X28 != skc67 )
& X28 != skc67 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X25 = skc72
& X28 = skc67
& X29 = skc64
& X31 = skc61
& X12 != skc83
& ( X12 != skc83
| X26 != skc71 )
& X26 != skc71 )
| ( X8 = skc90
& X10 = skc87
& X14 = skc78
& X25 = skc72
& X29 = skc64
& X31 = skc61
& X12 != skc83
& ( X12 != skc83
| X26 != skc71 )
& ( X12 != skc83
| X26 != skc71
| X28 != skc67 )
& ( X12 != skc83
| X28 != skc67 )
& X26 != skc71
& ( X26 != skc71
| X28 != skc67 )
& X28 != skc67 )
| ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X25 = skc72
& X29 = skc64
& X31 = skc61
& X10 != skc87
& ( X10 != skc87
| X26 != skc71 )
& ( X10 != skc87
| X26 != skc71
| X28 != skc67 )
& X26 != skc71 )
| ( X8 = skc90
& X12 = skc83
& X14 = skc78
& X29 = skc64
& X31 = skc61
& X10 != skc87
& ( X10 != skc87
| X25 != skc72 )
& ( X10 != skc87
| X25 != skc72
| X26 != skc71 )
& ( X10 != skc87
| X25 != skc72
| X26 != skc71
| X28 != skc67 )
& ( X10 != skc87
| X26 != skc71 )
& ( X10 != skc87
| X26 != skc71
| X28 != skc67 )
& X25 != skc72
& ( X25 != skc72
| X26 != skc71 )
& X26 != skc71 )
| ( X8 = skc90
& X14 = skc78
& X25 = skc72
& X29 = skc64
& X31 = skc61
& X10 != skc87
& ( X10 != skc87
| X12 != skc83 )
& ( X10 != skc87
| X12 != skc83
| X26 != skc71 )
& ( X10 != skc87
| X12 != skc83
| X26 != skc71
| X28 != skc67 )
& ( X10 != skc87
| X26 != skc71 )
& ( X10 != skc87
| X26 != skc71
| X28 != skc67 )
& X12 != skc83
& ( X12 != skc83
| X26 != skc71 )
& X26 != skc71 ) ) ) ).
%------ Positive definition of sP3_iProver_split
fof(lit_def_024,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47,X48,X49] :
( sP3_iProver_split(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41,X42,X43,X44,X45,X46,X47,X48,X49)
<=> $false ) ).
%------ Positive definition of sP4_iProver_split
fof(lit_def_025,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34] :
( sP4_iProver_split(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34)
<=> $false ) ).
%------ Positive definition of sP5_iProver_split
fof(lit_def_026,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22] :
( sP5_iProver_split(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22)
<=> $false ) ).
%------ Positive definition of sP6_iProver_split
fof(lit_def_027,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41] :
( sP6_iProver_split(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36,X37,X38,X39,X40,X41)
<=> X41 = skc57 ) ).
%------ Positive definition of sP7_iProver_split
fof(lit_def_028,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21] :
( sP7_iProver_split(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21)
<=> $false ) ).
%------ Positive definition of sP8_iProver_split
fof(lit_def_029,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19] :
( sP8_iProver_split(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19)
<=> $false ) ).
%------ Positive definition of sP9_iProver_split
fof(lit_def_030,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16] :
( sP9_iProver_split(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16)
<=> $false ) ).
%------ Positive definition of sP10_iProver_split
fof(lit_def_031,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36] :
( sP10_iProver_split(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23,X24,X25,X26,X27,X28,X29,X30,X31,X32,X33,X34,X35,X36)
<=> $false ) ).
%------ Positive definition of sP11_iProver_split
fof(lit_def_032,axiom,
! [X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23] :
( sP11_iProver_split(X0,X1,X2,X3,X4,X5,X6,X7,X8,X9,X10,X11,X12,X13,X14,X15,X16,X17,X18,X19,X20,X21,X22,X23)
<=> $false ) ).
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.00/0.12 % Problem : SYN852-1 : TPTP v8.1.2. Released v2.5.0.
% 0.00/0.14 % Command : run_iprover %s %d SAT
% 0.14/0.35 % Computer : n019.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 : Sat Aug 26 19:19:13 EDT 2023
% 0.14/0.35 % CPUTime :
% 0.21/0.47 Running model finding
% 0.21/0.47 Running: /export/starexec/sandbox2/solver/bin/run_problem --no_cores 8 --heuristic_context fnt --schedule fnt_schedule /export/starexec/sandbox2/benchmark/theBenchmark.p 300
% 47.03/6.64 % SZS status Started for theBenchmark.p
% 47.03/6.64 % SZS status Satisfiable for theBenchmark.p
% 47.03/6.64
% 47.03/6.64 %---------------- iProver v3.8 (pre SMT-COMP 2023/CASC 2023) ----------------%
% 47.03/6.64
% 47.03/6.64 ------ iProver source info
% 47.03/6.64
% 47.03/6.64 git: date: 2023-05-31 18:12:56 +0000
% 47.03/6.64 git: sha1: 8abddc1f627fd3ce0bcb8b4cbf113b3cc443d7b6
% 47.03/6.64 git: non_committed_changes: false
% 47.03/6.64 git: last_make_outside_of_git: false
% 47.03/6.64
% 47.03/6.64 ------ Parsing...successful
% 47.03/6.64
% 47.03/6.64
% 47.03/6.64
% 47.03/6.64 ------ Preprocessing... pe_s pe:1:0s pe:2:0s pe:4:0s pe:8:0s pe:16:0s pe:32:0s pe:64:0s pe:128:0s pe:256:0s pe:512:0s pe:1024:0s pe_e pe_s pe:1:0s pe:2:0s pe:4:0s pe_e pe_s pe:1:0s pe_e pe_s pe_e
% 47.03/6.64
% 47.03/6.64 ------ Preprocessing... scvd_s sp: 12 1s scvd_e snvd_s sp: 0 0s snvd_e
% 47.03/6.64 ------ Proving...
% 47.03/6.64 ------ Problem Properties
% 47.03/6.64
% 47.03/6.64
% 47.03/6.64 clauses 52
% 47.03/6.64 conjectures 13
% 47.03/6.64 EPR 52
% 47.03/6.64 Horn 34
% 47.03/6.64 unary 16
% 47.03/6.64 binary 27
% 47.03/6.64 lits 102
% 47.03/6.64 lits eq 0
% 47.03/6.64 fd_pure 0
% 47.03/6.64 fd_pseudo 0
% 47.03/6.64 fd_cond 0
% 47.03/6.64 fd_pseudo_cond 0
% 47.03/6.64 AC symbols 0
% 47.03/6.64
% 47.03/6.64 ------ Input Options Time Limit: Unbounded
% 47.03/6.64
% 47.03/6.64
% 47.03/6.64 ------ Finite Models:
% 47.03/6.64
% 47.03/6.64 ------ lit_activity_flag true
% 47.03/6.64
% 47.03/6.64 ------
% 47.03/6.64 Current options:
% 47.03/6.64 ------
% 47.03/6.64
% 47.03/6.64 ------ Input Options
% 47.03/6.64
% 47.03/6.64 --out_options all
% 47.03/6.64 --tptp_safe_out true
% 47.03/6.64 --problem_path ""
% 47.03/6.64 --include_path ""
% 47.03/6.64 --clausifier res/vclausify_rel
% 47.03/6.64 --clausifier_options --mode clausify -t 300.00
% 47.03/6.64 --stdin false
% 47.03/6.64 --proof_out true
% 47.03/6.64 --proof_dot_file ""
% 47.03/6.64 --proof_reduce_dot []
% 47.03/6.64 --suppress_sat_res false
% 47.03/6.64 --suppress_unsat_res true
% 47.03/6.64 --stats_out all
% 47.03/6.64 --stats_mem false
% 47.03/6.64 --theory_stats_out false
% 47.03/6.64
% 47.03/6.64 ------ General Options
% 47.03/6.64
% 47.03/6.64 --fof false
% 47.03/6.64 --time_out_real 300.
% 47.03/6.64 --time_out_virtual -1.
% 47.03/6.64 --rnd_seed 13
% 47.03/6.64 --symbol_type_check false
% 47.03/6.64 --clausify_out false
% 47.03/6.64 --sig_cnt_out false
% 47.03/6.64 --trig_cnt_out false
% 47.03/6.64 --trig_cnt_out_tolerance 1.
% 47.03/6.64 --trig_cnt_out_sk_spl false
% 47.03/6.64 --abstr_cl_out false
% 47.03/6.64
% 47.03/6.64 ------ Interactive Mode
% 47.03/6.64
% 47.03/6.64 --interactive_mode false
% 47.03/6.64 --external_ip_address ""
% 47.03/6.64 --external_port 0
% 47.03/6.64
% 47.03/6.64 ------ Global Options
% 47.03/6.64
% 47.03/6.64 --schedule none
% 47.03/6.64 --add_important_lit false
% 47.03/6.64 --prop_solver_per_cl 500
% 47.03/6.64 --subs_bck_mult 8
% 47.03/6.64 --min_unsat_core false
% 47.03/6.64 --soft_assumptions false
% 47.03/6.64 --soft_lemma_size 3
% 47.03/6.64 --prop_impl_unit_size 0
% 47.03/6.64 --prop_impl_unit []
% 47.03/6.64 --share_sel_clauses true
% 47.03/6.64 --reset_solvers false
% 47.03/6.64 --bc_imp_inh [conj_cone]
% 47.03/6.64 --conj_cone_tolerance 3.
% 47.03/6.64 --extra_neg_conj all_pos_neg
% 47.03/6.64 --large_theory_mode true
% 47.03/6.64 --prolific_symb_bound 500
% 47.03/6.64 --lt_threshold 2000
% 47.03/6.64 --clause_weak_htbl true
% 47.03/6.64 --gc_record_bc_elim false
% 47.03/6.64
% 47.03/6.64 ------ Preprocessing Options
% 47.03/6.64
% 47.03/6.64 --preprocessing_flag true
% 47.03/6.64 --time_out_prep_mult 0.2
% 47.03/6.64 --splitting_mode input
% 47.03/6.64 --splitting_grd false
% 47.03/6.64 --splitting_cvd true
% 47.03/6.64 --splitting_cvd_svl true
% 47.03/6.64 --splitting_nvd 256
% 47.03/6.64 --sub_typing false
% 47.03/6.64 --prep_gs_sim false
% 47.03/6.64 --prep_unflatten true
% 47.03/6.64 --prep_res_sim true
% 47.03/6.64 --prep_sup_sim_all true
% 47.03/6.64 --prep_sup_sim_sup false
% 47.03/6.64 --prep_upred true
% 47.03/6.64 --prep_well_definedness true
% 47.03/6.64 --prep_sem_filter none
% 47.03/6.64 --prep_sem_filter_out false
% 47.03/6.64 --pred_elim true
% 47.03/6.64 --res_sim_input false
% 47.03/6.64 --eq_ax_congr_red true
% 47.03/6.64 --pure_diseq_elim false
% 47.03/6.64 --brand_transform false
% 47.03/6.64 --non_eq_to_eq false
% 47.03/6.64 --prep_def_merge false
% 47.03/6.64 --prep_def_merge_prop_impl false
% 47.03/6.64 --prep_def_merge_mbd true
% 47.03/6.64 --prep_def_merge_tr_red false
% 47.03/6.64 --prep_def_merge_tr_cl false
% 47.03/6.64 --smt_preprocessing false
% 47.03/6.64 --smt_ac_axioms fast
% 47.03/6.64 --preprocessed_out false
% 47.03/6.64 --preprocessed_stats false
% 47.03/6.64
% 47.03/6.64 ------ Abstraction refinement Options
% 47.03/6.64
% 47.03/6.64 --abstr_ref []
% 47.03/6.64 --abstr_ref_prep false
% 47.03/6.64 --abstr_ref_until_sat false
% 47.03/6.64 --abstr_ref_sig_restrict funpre
% 47.03/6.64 --abstr_ref_af_restrict_to_split_sk false
% 47.03/6.64 --abstr_ref_under []
% 47.03/6.64
% 47.03/6.64 ------ SAT Options
% 47.03/6.64
% 47.03/6.64 --sat_mode true
% 47.03/6.64 --sat_fm_restart_options ""
% 47.03/6.64 --sat_gr_def false
% 47.03/6.64 --sat_epr_types false
% 47.03/6.64 --sat_non_cyclic_types true
% 47.03/6.64 --sat_finite_models true
% 47.03/6.64 --sat_fm_lemmas false
% 47.03/6.64 --sat_fm_prep false
% 47.03/6.64 --sat_fm_uc_incr true
% 47.03/6.64 --sat_out_model small
% 47.03/6.64 --sat_out_clauses false
% 47.03/6.64
% 47.03/6.64 ------ QBF Options
% 47.03/6.64
% 47.03/6.64 --qbf_mode false
% 47.03/6.64 --qbf_elim_univ false
% 47.03/6.64 --qbf_dom_inst none
% 47.03/6.64 --qbf_dom_pre_inst false
% 47.03/6.64 --qbf_sk_in false
% 47.03/6.64 --qbf_pred_elim true
% 47.03/6.64 --qbf_split 512
% 47.03/6.64
% 47.03/6.64 ------ BMC1 Options
% 47.03/6.64
% 47.03/6.64 --bmc1_incremental false
% 47.03/6.64 --bmc1_axioms reachable_all
% 47.03/6.64 --bmc1_min_bound 0
% 47.03/6.64 --bmc1_max_bound -1
% 47.03/6.64 --bmc1_max_bound_default -1
% 47.03/6.64 --bmc1_symbol_reachability false
% 47.03/6.64 --bmc1_property_lemmas false
% 47.03/6.64 --bmc1_k_induction false
% 47.03/6.64 --bmc1_non_equiv_states false
% 47.03/6.64 --bmc1_deadlock false
% 47.03/6.64 --bmc1_ucm false
% 47.03/6.64 --bmc1_add_unsat_core none
% 47.03/6.64 --bmc1_unsat_core_children false
% 47.03/6.64 --bmc1_unsat_core_extrapolate_axioms false
% 47.03/6.64 --bmc1_out_stat full
% 47.03/6.64 --bmc1_ground_init false
% 47.03/6.64 --bmc1_pre_inst_next_state false
% 47.03/6.64 --bmc1_pre_inst_state false
% 47.03/6.64 --bmc1_pre_inst_reach_state false
% 47.03/6.64 --bmc1_out_unsat_core false
% 47.03/6.64 --bmc1_aig_witness_out false
% 47.03/6.64 --bmc1_verbose false
% 47.03/6.64 --bmc1_dump_clauses_tptp false
% 47.03/6.64 --bmc1_dump_unsat_core_tptp false
% 47.03/6.64 --bmc1_dump_file -
% 47.03/6.64 --bmc1_ucm_expand_uc_limit 128
% 47.03/6.64 --bmc1_ucm_n_expand_iterations 6
% 47.03/6.64 --bmc1_ucm_extend_mode 1
% 47.03/6.64 --bmc1_ucm_init_mode 2
% 47.03/6.64 --bmc1_ucm_cone_mode none
% 47.03/6.64 --bmc1_ucm_reduced_relation_type 0
% 47.03/6.64 --bmc1_ucm_relax_model 4
% 47.03/6.64 --bmc1_ucm_full_tr_after_sat true
% 47.03/6.64 --bmc1_ucm_expand_neg_assumptions false
% 47.03/6.64 --bmc1_ucm_layered_model none
% 47.03/6.64 --bmc1_ucm_max_lemma_size 10
% 47.03/6.64
% 47.03/6.64 ------ AIG Options
% 47.03/6.64
% 47.03/6.64 --aig_mode false
% 47.03/6.64
% 47.03/6.64 ------ Instantiation Options
% 47.03/6.64
% 47.03/6.64 --instantiation_flag true
% 47.03/6.64 --inst_sos_flag false
% 47.03/6.64 --inst_sos_phase true
% 47.03/6.64 --inst_sos_sth_lit_sel [+prop;+non_prol_conj_symb;-eq;+ground;-num_var;-num_symb]
% 47.03/6.64 --inst_lit_sel [-sign;+num_symb;+non_prol_conj_symb]
% 47.03/6.64 --inst_lit_sel_side num_lit
% 47.03/6.64 --inst_solver_per_active 1400
% 47.03/6.64 --inst_solver_calls_frac 0.01
% 47.03/6.64 --inst_to_smt_solver true
% 47.03/6.64 --inst_passive_queue_type priority_queues
% 47.03/6.64 --inst_passive_queues [[+conj_dist;+num_lits;-age];[-conj_symb;-min_def_symb;+bc_imp_inh]]
% 47.03/6.64 --inst_passive_queues_freq [512;64]
% 47.03/6.64 --inst_dismatching true
% 47.03/6.64 --inst_eager_unprocessed_to_passive false
% 47.03/6.64 --inst_unprocessed_bound 1000
% 47.03/6.64 --inst_prop_sim_given true
% 47.03/6.64 --inst_prop_sim_new true
% 47.03/6.64 --inst_subs_new false
% 47.03/6.64 --inst_eq_res_simp false
% 47.03/6.64 --inst_subs_given true
% 47.03/6.64 --inst_orphan_elimination false
% 47.03/6.64 --inst_learning_loop_flag true
% 47.03/6.64 --inst_learning_start 5
% 47.03/6.64 --inst_learning_factor 8
% 47.03/6.64 --inst_start_prop_sim_after_learn 0
% 47.03/6.64 --inst_sel_renew solver
% 47.03/6.64 --inst_lit_activity_flag true
% 47.03/6.64 --inst_restr_to_given false
% 47.03/6.64 --inst_activity_threshold 10000
% 47.03/6.64
% 47.03/6.64 ------ Resolution Options
% 47.03/6.64
% 47.03/6.64 --resolution_flag false
% 47.03/6.64 --res_lit_sel neg_max
% 47.03/6.64 --res_lit_sel_side num_lit
% 47.03/6.64 --res_ordering kbo
% 47.03/6.64 --res_to_prop_solver passive
% 47.03/6.64 --res_prop_simpl_new true
% 47.03/6.64 --res_prop_simpl_given true
% 47.03/6.64 --res_to_smt_solver true
% 47.03/6.64 --res_passive_queue_type priority_queues
% 47.03/6.64 --res_passive_queues [[-has_eq;-conj_non_prolific_symb;+ground];[-bc_imp_inh;-conj_symb]]
% 47.03/6.64 --res_passive_queues_freq [1024;32]
% 47.03/6.64 --res_forward_subs subset_subsumption
% 47.03/6.64 --res_backward_subs subset_subsumption
% 47.03/6.64 --res_forward_subs_resolution true
% 47.03/6.64 --res_backward_subs_resolution false
% 47.03/6.64 --res_orphan_elimination false
% 47.03/6.64 --res_time_limit 10.
% 47.03/6.64
% 47.03/6.64 ------ Superposition Options
% 47.03/6.64
% 47.03/6.64 --superposition_flag false
% 47.03/6.64 --sup_passive_queue_type priority_queues
% 47.03/6.64 --sup_passive_queues [[-conj_dist;-num_symb];[+score;+min_def_symb;-max_atom_input_occur;+conj_non_prolific_symb];[+age;-num_symb];[+score;-num_symb]]
% 47.03/6.64 --sup_passive_queues_freq [8;1;4;4]
% 47.03/6.64 --demod_completeness_check fast
% 47.03/6.64 --demod_use_ground true
% 47.03/6.64 --sup_unprocessed_bound 0
% 47.03/6.64 --sup_to_prop_solver passive
% 47.03/6.64 --sup_prop_simpl_new true
% 47.03/6.64 --sup_prop_simpl_given true
% 47.03/6.64 --sup_fun_splitting false
% 47.03/6.64 --sup_iter_deepening 2
% 47.03/6.64 --sup_restarts_mult 12
% 47.03/6.64 --sup_score sim_d_gen
% 47.03/6.64 --sup_share_score_frac 0.2
% 47.03/6.64 --sup_share_max_num_cl 500
% 47.03/6.64 --sup_ordering kbo
% 47.03/6.64 --sup_symb_ordering invfreq
% 47.03/6.64 --sup_term_weight default
% 47.03/6.64
% 47.03/6.64 ------ Superposition Simplification Setup
% 47.03/6.64
% 47.03/6.64 --sup_indices_passive [LightNormIndex;FwDemodIndex]
% 47.03/6.64 --sup_full_triv [SMTSimplify;PropSubs]
% 47.03/6.64 --sup_full_fw [ACNormalisation;FwLightNorm;FwDemod;FwUnitSubsAndRes;FwSubsumption;FwSubsumptionRes;FwGroundJoinability]
% 47.03/6.64 --sup_full_bw [BwDemod;BwUnitSubsAndRes;BwSubsumption;BwSubsumptionRes]
% 47.03/6.64 --sup_immed_triv []
% 47.03/6.64 --sup_immed_fw_main [ACNormalisation;FwLightNorm;FwUnitSubsAndRes]
% 47.03/6.64 --sup_immed_fw_immed [ACNormalisation;FwUnitSubsAndRes]
% 47.03/6.64 --sup_immed_bw_main [BwUnitSubsAndRes;BwDemod]
% 47.03/6.64 --sup_immed_bw_immed [BwUnitSubsAndRes;BwSubsumption;BwSubsumptionRes]
% 47.03/6.64 --sup_input_triv [Unflattening;SMTSimplify]
% 47.03/6.64 --sup_input_fw [FwACDemod;ACNormalisation;FwLightNorm;FwDemod;FwUnitSubsAndRes;FwSubsumption;FwSubsumptionRes;FwGroundJoinability]
% 47.03/6.64 --sup_input_bw [BwACDemod;BwDemod;BwUnitSubsAndRes;BwSubsumption;BwSubsumptionRes]
% 47.03/6.64 --sup_full_fixpoint true
% 47.03/6.64 --sup_main_fixpoint true
% 47.03/6.64 --sup_immed_fixpoint false
% 47.03/6.64 --sup_input_fixpoint true
% 47.03/6.64 --sup_cache_sim none
% 47.03/6.64 --sup_smt_interval 500
% 47.03/6.64 --sup_bw_gjoin_interval 0
% 47.03/6.64
% 47.03/6.64 ------ Combination Options
% 47.03/6.64
% 47.03/6.64 --comb_mode clause_based
% 47.03/6.64 --comb_inst_mult 1000
% 47.03/6.64 --comb_res_mult 10
% 47.03/6.64 --comb_sup_mult 8
% 47.03/6.64 --comb_sup_deep_mult 2
% 47.03/6.64
% 47.03/6.64 ------ Debug Options
% 47.03/6.64
% 47.03/6.64 --dbg_backtrace false
% 47.03/6.64 --dbg_dump_prop_clauses false
% 47.03/6.64 --dbg_dump_prop_clauses_file -
% 47.03/6.64 --dbg_out_stat false
% 47.03/6.64 --dbg_just_parse false
% 47.03/6.64
% 47.03/6.64
% 47.03/6.64
% 47.03/6.64
% 47.03/6.64 ------ Proving...
% 47.03/6.64
% 47.03/6.64
% 47.03/6.64 % SZS status Satisfiable for theBenchmark.p
% 47.03/6.64
% 47.03/6.64 ------ Building Model...Done
% 47.03/6.64
% 47.03/6.64 %------ The model is defined over ground terms (initial term algebra).
% 47.03/6.64 %------ Predicates are defined as (\forall x_1,..,x_n ((~)P(x_1,..,x_n) <=> (\phi(x_1,..,x_n))))
% 47.03/6.64 %------ where \phi is a formula over the term algebra.
% 47.03/6.64 %------ If we have equality in the problem then it is also defined as a predicate above,
% 47.03/6.64 %------ with "=" on the right-hand-side of the definition interpreted over the term algebra term_algebra_type
% 47.03/6.64 %------ See help for --sat_out_model for different model outputs.
% 47.03/6.64 %------ equality_sorted(X0,X1,X2) can be used in the place of usual "="
% 47.03/6.64 %------ where the first argument stands for the sort ($i in the unsorted case)
% 47.03/6.64 % SZS output start Model for theBenchmark.p
% See solution above
% 47.03/6.64 ------ Statistics
% 47.03/6.64
% 47.03/6.64 ------ Problem properties
% 47.03/6.64
% 47.03/6.64 clauses: 52
% 47.03/6.64 conjectures: 13
% 47.03/6.64 epr: 52
% 47.03/6.64 horn: 34
% 47.03/6.64 ground: 0
% 47.03/6.64 unary: 16
% 47.03/6.64 binary: 27
% 47.03/6.64 lits: 102
% 47.03/6.64 lits_eq: 0
% 47.03/6.64 fd_pure: 0
% 47.03/6.64 fd_pseudo: 0
% 47.03/6.64 fd_cond: 0
% 47.03/6.64 fd_pseudo_cond: 0
% 47.03/6.64 ac_symbols: 0
% 47.03/6.64
% 47.03/6.64 ------ General
% 47.03/6.64
% 47.03/6.64 abstr_ref_over_cycles: 0
% 47.03/6.64 abstr_ref_under_cycles: 0
% 47.03/6.64 gc_basic_clause_elim: 0
% 47.03/6.64 num_of_symbols: 1971
% 47.03/6.64 num_of_terms: 11818
% 47.03/6.64
% 47.03/6.64 parsing_time: 1.69
% 47.03/6.64 unif_index_cands_time: 0.016
% 47.03/6.64 unif_index_add_time: 0.004
% 47.03/6.64 orderings_time: 0.
% 47.03/6.64 out_proof_time: 0.
% 47.03/6.64 total_time: 6.013
% 47.03/6.64
% 47.03/6.64 ------ Preprocessing
% 47.03/6.64
% 47.03/6.64 num_of_splits: 12
% 47.03/6.64 num_of_split_atoms: 12
% 47.03/6.64 num_of_reused_defs: 0
% 47.03/6.64 num_eq_ax_congr_red: 0
% 47.03/6.64 num_of_sem_filtered_clauses: 0
% 47.03/6.64 num_of_subtypes: 0
% 47.03/6.64 monotx_restored_types: 0
% 47.03/6.64 sat_num_of_epr_types: 1
% 47.03/6.64 sat_num_of_non_cyclic_types: 1
% 47.03/6.64 sat_guarded_non_collapsed_types: 0
% 47.03/6.64 num_pure_diseq_elim: 0
% 47.03/6.64 simp_replaced_by: 0
% 47.03/6.64 res_preprocessed: 0
% 47.03/6.64 sup_preprocessed: 0
% 47.03/6.64 prep_upred: 0
% 47.03/6.64 prep_unflattend: 0
% 47.03/6.64 prep_well_definedness: 0
% 47.03/6.64 smt_new_axioms: 0
% 47.03/6.64 pred_elim_cands: 21
% 47.03/6.64 pred_elim: 1796
% 47.03/6.64 pred_elim_cl: 3199
% 47.03/6.64 pred_elim_cycles: 1886
% 47.03/6.64 merged_defs: 0
% 47.03/6.64 merged_defs_ncl: 0
% 47.03/6.64 bin_hyper_res: 0
% 47.03/6.64 prep_cycles: 4
% 47.03/6.64
% 47.03/6.64 splitting_time: 1.334
% 47.03/6.64 sem_filter_time: 0.
% 47.03/6.64 monotx_time: 0.
% 47.03/6.64 subtype_inf_time: 0.
% 47.03/6.64 res_prep_time: 0.918
% 47.03/6.64 sup_prep_time: 0.
% 47.03/6.64 pred_elim_time: 0.267
% 47.03/6.64 bin_hyper_res_time: 0.
% 47.03/6.64 prep_time_total: 1.861
% 47.03/6.64
% 47.03/6.64 ------ Propositional Solver
% 47.03/6.64
% 47.03/6.64 prop_solver_calls: 188
% 47.03/6.64 prop_fast_solver_calls: 153243
% 47.03/6.64 smt_solver_calls: 0
% 47.03/6.64 smt_fast_solver_calls: 0
% 47.03/6.64 prop_num_of_clauses: 14821
% 47.03/6.64 prop_preprocess_simplified: 61498
% 47.03/6.64 prop_fo_subsumed: 120579
% 47.03/6.64
% 47.03/6.64 prop_solver_time: 0.073
% 47.03/6.64 prop_fast_solver_time: 0.178
% 47.03/6.64 prop_unsat_core_time: 0.
% 47.03/6.64 smt_solver_time: 0.
% 47.03/6.64 smt_fast_solver_time: 0.
% 47.03/6.64
% 47.03/6.64 ------ QBF
% 47.03/6.64
% 47.03/6.64 qbf_q_res: 0
% 47.03/6.64 qbf_num_tautologies: 0
% 47.03/6.64 qbf_prep_cycles: 0
% 47.03/6.64
% 47.03/6.64 ------ BMC1
% 47.03/6.64
% 47.03/6.64 bmc1_current_bound: -1
% 47.03/6.64 bmc1_last_solved_bound: -1
% 47.03/6.64 bmc1_unsat_core_size: -1
% 47.03/6.64 bmc1_unsat_core_parents_size: -1
% 47.03/6.64 bmc1_merge_next_fun: 0
% 47.03/6.64
% 47.03/6.64 bmc1_unsat_core_clauses_time: 0.
% 47.03/6.64
% 47.03/6.64 ------ Instantiation
% 47.03/6.64
% 47.03/6.64 inst_num_of_clauses: 331
% 47.03/6.64 inst_num_in_passive: 0
% 47.03/6.64 inst_num_in_active: 644
% 47.03/6.64 inst_num_of_loops: 868
% 47.03/6.64 inst_num_in_unprocessed: 0
% 47.03/6.64 inst_num_of_learning_restarts: 3
% 47.03/6.64 inst_num_moves_active_passive: 179
% 47.03/6.64 inst_lit_activity: 0
% 47.03/6.64 inst_lit_activity_moves: 0
% 47.03/6.64 inst_num_tautologies: 0
% 47.03/6.64 inst_num_prop_implied: 0
% 47.03/6.64 inst_num_existing_simplified: 0
% 47.03/6.64 inst_num_eq_res_simplified: 0
% 47.03/6.64 inst_num_child_elim: 0
% 47.03/6.64 inst_num_of_dismatching_blockings: 2173
% 47.03/6.64 inst_num_of_non_proper_insts: 2002
% 47.03/6.64 inst_num_of_duplicates: 0
% 47.03/6.64 inst_inst_num_from_inst_to_res: 0
% 47.03/6.64
% 47.03/6.64 inst_time_sim_new: 0.039
% 47.03/6.64 inst_time_sim_given: 0.032
% 47.03/6.64 inst_time_dismatching_checking: 0.092
% 47.03/6.64 inst_time_total: 0.927
% 47.03/6.64
% 47.03/6.64 ------ Resolution
% 47.03/6.64
% 47.03/6.64 res_num_of_clauses: 40
% 47.03/6.64 res_num_in_passive: 0
% 47.03/6.64 res_num_in_active: 0
% 47.03/6.64 res_num_of_loops: 3378
% 47.03/6.64 res_forward_subset_subsumed: 1360
% 47.03/6.64 res_backward_subset_subsumed: 26
% 47.03/6.64 res_forward_subsumed: 55
% 47.03/6.64 res_backward_subsumed: 0
% 47.03/6.64 res_forward_subsumption_resolution: 0
% 47.03/6.64 res_backward_subsumption_resolution: 0
% 47.03/6.64 res_clause_to_clause_subsumption: 14310
% 47.03/6.64 res_subs_bck_cnt: 1
% 47.03/6.64 res_orphan_elimination: 0
% 47.03/6.64 res_tautology_del: 1491
% 47.03/6.64 res_num_eq_res_simplified: 0
% 47.03/6.64 res_num_sel_changes: 0
% 47.03/6.64 res_moves_from_active_to_pass: 0
% 47.03/6.64
% 47.03/6.64 res_time_sim_new: 0.626
% 47.03/6.64 res_time_sim_fw_given: 0.114
% 47.03/6.64 res_time_sim_bw_given: 0.14
% 47.03/6.64 res_time_total: 0.63
% 47.03/6.64
% 47.03/6.64 ------ Superposition
% 47.03/6.64
% 47.03/6.64 sup_num_of_clauses: undef
% 47.03/6.64 sup_num_in_active: undef
% 47.03/6.64 sup_num_in_passive: undef
% 47.03/6.64 sup_num_of_loops: 0
% 47.03/6.64 sup_fw_superposition: 0
% 47.03/6.64 sup_bw_superposition: 0
% 47.03/6.64 sup_eq_factoring: 0
% 47.03/6.64 sup_eq_resolution: 0
% 47.03/6.64 sup_immediate_simplified: 0
% 47.03/6.64 sup_given_eliminated: 0
% 47.03/6.64 comparisons_done: 0
% 47.03/6.64 comparisons_avoided: 0
% 47.03/6.64 comparisons_inc_criteria: 0
% 47.03/6.64 sup_deep_cl_discarded: 0
% 47.03/6.64 sup_num_of_deepenings: 0
% 47.03/6.64 sup_num_of_restarts: 0
% 47.03/6.64
% 47.03/6.64 sup_time_generating: 0.
% 47.03/6.64 sup_time_sim_fw_full: 0.
% 47.03/6.64 sup_time_sim_bw_full: 0.
% 47.03/6.64 sup_time_sim_fw_immed: 0.
% 47.03/6.64 sup_time_sim_bw_immed: 0.
% 47.03/6.64 sup_time_prep_sim_fw_input: 0.
% 47.03/6.64 sup_time_prep_sim_bw_input: 0.
% 47.03/6.64 sup_time_total: 0.
% 47.03/6.64
% 47.03/6.64 ------ Simplifications
% 47.03/6.64
% 47.03/6.64 sim_repeated: 0
% 47.03/6.64 sim_fw_subset_subsumed: 0
% 47.03/6.64 sim_bw_subset_subsumed: 0
% 47.03/6.64 sim_fw_subsumed: 0
% 47.03/6.64 sim_bw_subsumed: 0
% 47.03/6.64 sim_fw_subsumption_res: 0
% 47.03/6.64 sim_bw_subsumption_res: 0
% 47.03/6.64 sim_fw_unit_subs: 0
% 47.03/6.64 sim_bw_unit_subs: 0
% 47.03/6.64 sim_tautology_del: 0
% 47.03/6.64 sim_eq_tautology_del: 0
% 47.03/6.64 sim_eq_res_simp: 0
% 47.03/6.64 sim_fw_demodulated: 0
% 47.03/6.64 sim_bw_demodulated: 0
% 47.03/6.64 sim_encompassment_demod: 0
% 47.03/6.64 sim_light_normalised: 0
% 47.03/6.64 sim_ac_normalised: 0
% 47.03/6.64 sim_joinable_taut: 0
% 47.03/6.64 sim_joinable_simp: 0
% 47.03/6.64 sim_fw_ac_demod: 0
% 47.03/6.64 sim_bw_ac_demod: 0
% 47.03/6.64 sim_smt_subsumption: 0
% 47.03/6.64 sim_smt_simplified: 0
% 47.03/6.64 sim_ground_joinable: 0
% 47.03/6.64 sim_bw_ground_joinable: 0
% 47.03/6.64 sim_connectedness: 0
% 47.03/6.64
% 47.03/6.64 sim_time_fw_subset_subs: 0.
% 47.03/6.64 sim_time_bw_subset_subs: 0.
% 47.03/6.64 sim_time_fw_subs: 0.
% 47.03/6.64 sim_time_bw_subs: 0.
% 47.03/6.64 sim_time_fw_subs_res: 0.
% 47.03/6.64 sim_time_bw_subs_res: 0.
% 47.03/6.64 sim_time_fw_unit_subs: 0.
% 47.03/6.64 sim_time_bw_unit_subs: 0.
% 47.03/6.64 sim_time_tautology_del: 0.
% 47.03/6.64 sim_time_eq_tautology_del: 0.
% 47.03/6.64 sim_time_eq_res_simp: 0.
% 47.03/6.64 sim_time_fw_demod: 0.
% 47.03/6.64 sim_time_bw_demod: 0.
% 47.03/6.64 sim_time_light_norm: 0.
% 47.03/6.64 sim_time_joinable: 0.
% 47.03/6.64 sim_time_ac_norm: 0.
% 47.03/6.64 sim_time_fw_ac_demod: 0.
% 47.03/6.64 sim_time_bw_ac_demod: 0.
% 47.03/6.64 sim_time_smt_subs: 0.
% 47.03/6.64 sim_time_fw_gjoin: 0.
% 47.03/6.64 sim_time_fw_connected: 0.
% 47.03/6.64
% 47.03/6.65
%------------------------------------------------------------------------------