TSTP Solution File: SYN447+1 by iProver---3.8
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- Process Solution
%------------------------------------------------------------------------------
% File : iProver---3.8
% Problem : SYN447+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 03:07:19 EDT 2023
% Result : Theorem 3.45s 1.20s
% Output : CNFRefutation 3.45s
% Verified :
% SZS Type : ERROR: Analysing output (Could not find formula named f325)
% Comments :
%------------------------------------------------------------------------------
fof(f1,conjecture,
~ ( ( hskp63
| hskp56
| hskp62 )
& ( hskp28
| hskp27
| hskp43 )
& ( hskp61
| ! [X92] :
( ndr1_0
=> ( c2_1(X92)
| c3_1(X92)
| ~ c1_1(X92) ) )
| ! [X91] :
( ndr1_0
=> ( c0_1(X91)
| ~ c1_1(X91)
| ~ c3_1(X91) ) ) )
& ( hskp26
| hskp60
| ! [X90] :
( ndr1_0
=> ( c2_1(X90)
| c1_1(X90)
| ~ c0_1(X90) ) ) )
& ( hskp35
| ! [X89] :
( ndr1_0
=> ( ~ c1_1(X89)
| c3_1(X89)
| c2_1(X89) ) )
| ! [X88] :
( ndr1_0
=> ( c0_1(X88)
| ~ c3_1(X88)
| ~ c2_1(X88) ) ) )
& ( ! [X87] :
( ndr1_0
=> ( c2_1(X87)
| c0_1(X87)
| ~ c3_1(X87) ) )
| hskp59
| ! [X86] :
( ndr1_0
=> ( ~ c1_1(X86)
| c2_1(X86)
| ~ c3_1(X86) ) ) )
& ( ! [X85] :
( ndr1_0
=> ( ~ c2_1(X85)
| ~ c1_1(X85)
| ~ c0_1(X85) ) )
| ! [X84] :
( ndr1_0
=> ( ~ c3_1(X84)
| ~ c0_1(X84)
| ~ c2_1(X84) ) )
| ! [X83] :
( ndr1_0
=> ( ~ c2_1(X83)
| ~ c0_1(X83)
| ~ c1_1(X83) ) ) )
& ( ! [X82] :
( ndr1_0
=> ( c2_1(X82)
| c1_1(X82)
| c0_1(X82) ) )
| ! [X81] :
( ndr1_0
=> ( ~ c2_1(X81)
| c1_1(X81)
| c3_1(X81) ) )
| ! [X80] :
( ndr1_0
=> ( ~ c3_1(X80)
| ~ c2_1(X80)
| c0_1(X80) ) ) )
& ( hskp14
| ! [X79] :
( ndr1_0
=> ( c1_1(X79)
| c2_1(X79)
| c0_1(X79) ) )
| hskp48 )
& ( ! [X78] :
( ndr1_0
=> ( c2_1(X78)
| ~ c0_1(X78)
| c1_1(X78) ) )
| ! [X77] :
( ndr1_0
=> ( ~ c2_1(X77)
| ~ c3_1(X77)
| ~ c0_1(X77) ) )
| hskp51 )
& ( ! [X76] :
( ndr1_0
=> ( ~ c3_1(X76)
| ~ c1_1(X76)
| ~ c2_1(X76) ) )
| hskp25
| ! [X75] :
( ndr1_0
=> ( c0_1(X75)
| ~ c1_1(X75)
| c2_1(X75) ) ) )
& ( ! [X74] :
( ndr1_0
=> ( ~ c3_1(X74)
| c0_1(X74)
| ~ c1_1(X74) ) )
| hskp36
| ! [X73] :
( ndr1_0
=> ( ~ c3_1(X73)
| ~ c2_1(X73)
| ~ c1_1(X73) ) ) )
& ( hskp24
| ! [X72] :
( ndr1_0
=> ( c3_1(X72)
| c0_1(X72)
| c1_1(X72) ) )
| ! [X71] :
( ndr1_0
=> ( ~ c3_1(X71)
| ~ c1_1(X71)
| c0_1(X71) ) ) )
& ( ! [X70] :
( ndr1_0
=> ( ~ c3_1(X70)
| ~ c2_1(X70)
| ~ c0_1(X70) ) )
| hskp23
| hskp33 )
& ( hskp58
| ! [X69] :
( ndr1_0
=> ( c2_1(X69)
| c1_1(X69)
| ~ c3_1(X69) ) )
| ! [X68] :
( ndr1_0
=> ( ~ c3_1(X68)
| ~ c1_1(X68)
| c2_1(X68) ) ) )
& ( hskp57
| ! [X67] :
( ndr1_0
=> ( c1_1(X67)
| ~ c3_1(X67)
| ~ c2_1(X67) ) )
| ! [X66] :
( ndr1_0
=> ( c2_1(X66)
| ~ c3_1(X66)
| ~ c0_1(X66) ) ) )
& ( ! [X65] :
( ndr1_0
=> ( c2_1(X65)
| ~ c1_1(X65)
| c3_1(X65) ) )
| ! [X64] :
( ndr1_0
=> ( c1_1(X64)
| c3_1(X64)
| c0_1(X64) ) )
| ! [X63] :
( ndr1_0
=> ( c2_1(X63)
| c0_1(X63)
| ~ c1_1(X63) ) ) )
& ( hskp56
| ! [X62] :
( ndr1_0
=> ( ~ c3_1(X62)
| c2_1(X62)
| ~ c1_1(X62) ) )
| hskp22 )
& ( hskp21
| ! [X61] :
( ndr1_0
=> ( c1_1(X61)
| c2_1(X61)
| ~ c0_1(X61) ) )
| hskp55 )
& ( hskp20
| ! [X60] :
( ndr1_0
=> ( c3_1(X60)
| ~ c0_1(X60)
| c1_1(X60) ) )
| hskp19 )
& ( hskp18
| hskp17
| hskp39 )
& ( ! [X59] :
( ndr1_0
=> ( c3_1(X59)
| ~ c1_1(X59)
| ~ c0_1(X59) ) )
| ! [X58] :
( ndr1_0
=> ( c1_1(X58)
| ~ c0_1(X58)
| c3_1(X58) ) )
| ! [X57] :
( ndr1_0
=> ( ~ c3_1(X57)
| ~ c1_1(X57)
| ~ c2_1(X57) ) ) )
& ( ! [X56] :
( ndr1_0
=> ( ~ c1_1(X56)
| ~ c2_1(X56)
| ~ c3_1(X56) ) )
| hskp47
| hskp54 )
& ( ! [X55] :
( ndr1_0
=> ( ~ c2_1(X55)
| c1_1(X55)
| ~ c3_1(X55) ) )
| hskp53
| ! [X54] :
( ndr1_0
=> ( ~ c0_1(X54)
| ~ c3_1(X54)
| ~ c2_1(X54) ) ) )
& ( ! [X53] :
( ndr1_0
=> ( ~ c0_1(X53)
| c1_1(X53)
| ~ c3_1(X53) ) )
| hskp34
| hskp52 )
& ( ! [X52] :
( ndr1_0
=> ( c2_1(X52)
| c1_1(X52)
| c3_1(X52) ) )
| ! [X51] :
( ndr1_0
=> ( c1_1(X51)
| c3_1(X51)
| ~ c0_1(X51) ) )
| ! [X50] :
( ndr1_0
=> ( c1_1(X50)
| c0_1(X50)
| ~ c2_1(X50) ) ) )
& ( hskp51
| hskp50
| ! [X49] :
( ndr1_0
=> ( ~ c1_1(X49)
| ~ c2_1(X49)
| c0_1(X49) ) ) )
& ( hskp12
| ! [X48] :
( ndr1_0
=> ( c3_1(X48)
| ~ c1_1(X48)
| ~ c2_1(X48) ) )
| hskp7 )
& ( ! [X47] :
( ndr1_0
=> ( ~ c2_1(X47)
| c1_1(X47)
| c3_1(X47) ) )
| ! [X46] :
( ndr1_0
=> ( c1_1(X46)
| ~ c2_1(X46)
| c0_1(X46) ) )
| ! [X45] :
( ndr1_0
=> ( c0_1(X45)
| c3_1(X45)
| c1_1(X45) ) ) )
& ( ! [X44] :
( ndr1_0
=> ( ~ c0_1(X44)
| c2_1(X44)
| c1_1(X44) ) )
| hskp1
| ! [X43] :
( ndr1_0
=> ( c0_1(X43)
| c2_1(X43)
| c3_1(X43) ) ) )
& ( hskp49
| ! [X42] :
( ndr1_0
=> ( c0_1(X42)
| c1_1(X42)
| c3_1(X42) ) )
| ! [X41] :
( ndr1_0
=> ( ~ c0_1(X41)
| c2_1(X41)
| ~ c3_1(X41) ) ) )
& ( hskp16
| hskp42
| ! [X40] :
( ndr1_0
=> ( c2_1(X40)
| c3_1(X40)
| ~ c1_1(X40) ) ) )
& ( hskp48
| hskp36
| ! [X39] :
( ndr1_0
=> ( c3_1(X39)
| ~ c1_1(X39)
| c0_1(X39) ) ) )
& ( hskp33
| hskp15
| ! [X38] :
( ndr1_0
=> ( c0_1(X38)
| c2_1(X38)
| ~ c3_1(X38) ) ) )
& ( hskp43
| ! [X37] :
( ndr1_0
=> ( ~ c2_1(X37)
| c0_1(X37)
| ~ c1_1(X37) ) )
| hskp10 )
& ( ! [X36] :
( ndr1_0
=> ( c3_1(X36)
| ~ c0_1(X36)
| ~ c2_1(X36) ) )
| hskp47
| ! [X35] :
( ndr1_0
=> ( c1_1(X35)
| ~ c2_1(X35)
| ~ c0_1(X35) ) ) )
& ( hskp14
| hskp38
| hskp46 )
& ( hskp45
| hskp44
| ! [X34] :
( ndr1_0
=> ( c2_1(X34)
| c3_1(X34)
| c1_1(X34) ) ) )
& ( hskp7
| ! [X33] :
( ndr1_0
=> ( ~ c2_1(X33)
| ~ c3_1(X33)
| ~ c0_1(X33) ) )
| ! [X32] :
( ndr1_0
=> ( ~ c3_1(X32)
| ~ c2_1(X32)
| c0_1(X32) ) ) )
& ( hskp43
| hskp13
| ! [X31] :
( ndr1_0
=> ( c3_1(X31)
| ~ c2_1(X31)
| ~ c0_1(X31) ) ) )
& ( hskp4
| ! [X30] :
( ndr1_0
=> ( ~ c3_1(X30)
| ~ c0_1(X30)
| c1_1(X30) ) )
| ! [X29] :
( ndr1_0
=> ( ~ c1_1(X29)
| c2_1(X29)
| ~ c0_1(X29) ) ) )
& ( ! [X28] :
( ndr1_0
=> ( c2_1(X28)
| ~ c3_1(X28)
| ~ c1_1(X28) ) )
| ! [X27] :
( ndr1_0
=> ( ~ c2_1(X27)
| c0_1(X27)
| c1_1(X27) ) )
| hskp42 )
& ( ! [X26] :
( ndr1_0
=> ( ~ c2_1(X26)
| c1_1(X26)
| ~ c0_1(X26) ) )
| hskp41
| hskp40 )
& ( ! [X25] :
( ndr1_0
=> ( ~ c0_1(X25)
| c2_1(X25)
| ~ c3_1(X25) ) )
| ! [X24] :
( ndr1_0
=> ( ~ c0_1(X24)
| ~ c1_1(X24)
| ~ c2_1(X24) ) )
| hskp12 )
& ( hskp39
| ! [X23] :
( ndr1_0
=> ( ~ c1_1(X23)
| ~ c3_1(X23)
| ~ c0_1(X23) ) )
| hskp11 )
& ( ! [X22] :
( ndr1_0
=> ( c1_1(X22)
| ~ c3_1(X22)
| ~ c0_1(X22) ) )
| hskp38
| ! [X21] :
( ndr1_0
=> ( ~ c0_1(X21)
| c2_1(X21)
| ~ c3_1(X21) ) ) )
& ( hskp10
| ! [X20] :
( ndr1_0
=> ( c0_1(X20)
| c2_1(X20)
| c3_1(X20) ) ) )
& ( ! [X19] :
( ndr1_0
=> ( c1_1(X19)
| ~ c3_1(X19)
| c0_1(X19) ) )
| hskp9
| ! [X18] :
( ndr1_0
=> ( c2_1(X18)
| c3_1(X18)
| c0_1(X18) ) ) )
& ( hskp37
| hskp8
| ! [X17] :
( ndr1_0
=> ( c0_1(X17)
| ~ c1_1(X17)
| ~ c3_1(X17) ) ) )
& ( hskp7
| hskp36
| ! [X16] :
( ndr1_0
=> ( c0_1(X16)
| ~ c1_1(X16)
| c2_1(X16) ) ) )
& ( ! [X15] :
( ndr1_0
=> ( ~ c3_1(X15)
| c2_1(X15)
| c0_1(X15) ) )
| hskp35
| ! [X14] :
( ndr1_0
=> ( c3_1(X14)
| c0_1(X14)
| c2_1(X14) ) ) )
& ( hskp34
| ! [X13] :
( ndr1_0
=> ( ~ c0_1(X13)
| c1_1(X13)
| c3_1(X13) ) )
| ! [X12] :
( ndr1_0
=> ( c3_1(X12)
| ~ c1_1(X12)
| c2_1(X12) ) ) )
& ( ! [X11] :
( ndr1_0
=> ( ~ c2_1(X11)
| ~ c3_1(X11)
| ~ c1_1(X11) ) )
| ! [X10] :
( ndr1_0
=> ( c0_1(X10)
| c2_1(X10)
| ~ c1_1(X10) ) )
| hskp33 )
& ( hskp6
| hskp32
| ! [X9] :
( ndr1_0
=> ( c3_1(X9)
| ~ c0_1(X9)
| ~ c1_1(X9) ) ) )
& ( ! [X8] :
( ndr1_0
=> ( c3_1(X8)
| c1_1(X8)
| ~ c2_1(X8) ) )
| ! [X7] :
( ndr1_0
=> ( c2_1(X7)
| ~ c1_1(X7)
| ~ c0_1(X7) ) )
| hskp31 )
& ( ! [X6] :
( ndr1_0
=> ( c3_1(X6)
| ~ c2_1(X6)
| ~ c0_1(X6) ) )
| hskp5
| hskp4 )
& ( ! [X5] :
( ndr1_0
=> ( c2_1(X5)
| ~ c0_1(X5)
| c1_1(X5) ) )
| hskp3
| ! [X4] :
( ndr1_0
=> ( c0_1(X4)
| c3_1(X4)
| c2_1(X4) ) ) )
& ( ! [X3] :
( ndr1_0
=> ( ~ c3_1(X3)
| ~ c1_1(X3)
| ~ c0_1(X3) ) )
| ! [X2] :
( ndr1_0
=> ( c0_1(X2)
| c2_1(X2)
| c3_1(X2) ) )
| hskp2 )
& ( hskp1
| ! [X1] :
( ndr1_0
=> ( ~ c2_1(X1)
| ~ c0_1(X1)
| c1_1(X1) ) )
| ! [X0] :
( ndr1_0
=> ( c1_1(X0)
| c2_1(X0)
| ~ c3_1(X0) ) ) )
& ( hskp30
| hskp29
| hskp0 )
& ( ( c3_1(a1105)
& c1_1(a1105)
& ~ c2_1(a1105)
& ndr1_0 )
| ~ hskp63 )
& ( ( c1_1(a1103)
& c3_1(a1103)
& c2_1(a1103)
& ndr1_0 )
| ~ hskp62 )
& ( ( c2_1(a1099)
& ~ c0_1(a1099)
& ~ c3_1(a1099)
& ndr1_0 )
| ~ hskp61 )
& ( ( c3_1(a1097)
& ~ c0_1(a1097)
& c2_1(a1097)
& ndr1_0 )
| ~ hskp60 )
& ( ( c1_1(a1095)
& ~ c3_1(a1095)
& ~ c0_1(a1095)
& ndr1_0 )
| ~ hskp59 )
& ( ( c3_1(a1086)
& c2_1(a1086)
& ~ c0_1(a1086)
& ndr1_0 )
| ~ hskp58 )
& ( ( c3_1(a1085)
& c0_1(a1085)
& c2_1(a1085)
& ndr1_0 )
| ~ hskp57 )
& ( ( c0_1(a1084)
& ~ c1_1(a1084)
& ~ c3_1(a1084)
& ndr1_0 )
| ~ hskp56 )
& ( ( c3_1(a1081)
& ~ c0_1(a1081)
& c1_1(a1081)
& ndr1_0 )
| ~ hskp55 )
& ( ( c2_1(a1074)
& c0_1(a1074)
& c3_1(a1074)
& ndr1_0 )
| ~ hskp54 )
& ( ( c0_1(a1073)
& c2_1(a1073)
& c1_1(a1073)
& ndr1_0 )
| ~ hskp53 )
& ( ( c3_1(a1071)
& c0_1(a1071)
& c1_1(a1071)
& ndr1_0 )
| ~ hskp52 )
& ( ( c0_1(a1070)
& ~ c1_1(a1070)
& c2_1(a1070)
& ndr1_0 )
| ~ hskp51 )
& ( ( c1_1(a1069)
& c3_1(a1069)
& ~ c0_1(a1069)
& ndr1_0 )
| ~ hskp50 )
& ( ( c1_1(a1065)
& ~ c2_1(a1065)
& ~ c0_1(a1065)
& ndr1_0 )
| ~ hskp49 )
& ( ( c0_1(a1062)
& c2_1(a1062)
& c3_1(a1062)
& ndr1_0 )
| ~ hskp48 )
& ( ( c3_1(a1056)
& c1_1(a1056)
& c2_1(a1056)
& ndr1_0 )
| ~ hskp47 )
& ( ( c0_1(a1053)
& ~ c2_1(a1053)
& ~ c1_1(a1053)
& ndr1_0 )
| ~ hskp46 )
& ( ( c2_1(a1052)
& c3_1(a1052)
& c0_1(a1052)
& ndr1_0 )
| ~ hskp45 )
& ( ( c0_1(a1051)
& ~ c2_1(a1051)
& c1_1(a1051)
& ndr1_0 )
| ~ hskp44 )
& ( ( c1_1(a1049)
& c2_1(a1049)
& c0_1(a1049)
& ndr1_0 )
| ~ hskp43 )
& ( ( c0_1(a1046)
& c1_1(a1046)
& ~ c2_1(a1046)
& ndr1_0 )
| ~ hskp42 )
& ( ( c3_1(a1045)
& ~ c0_1(a1045)
& ~ c1_1(a1045)
& ndr1_0 )
| ~ hskp41 )
& ( ( c0_1(a1044)
& c3_1(a1044)
& ~ c1_1(a1044)
& ndr1_0 )
| ~ hskp40 )
& ( ( c2_1(a1042)
& ~ c1_1(a1042)
& c0_1(a1042)
& ndr1_0 )
| ~ hskp39 )
& ( ( c2_1(a1040)
& c3_1(a1040)
& c1_1(a1040)
& ndr1_0 )
| ~ hskp38 )
& ( ( c3_1(a1037)
& c0_1(a1037)
& ~ c1_1(a1037)
& ndr1_0 )
| ~ hskp37 )
& ( ( c1_1(a1034)
& ~ c0_1(a1034)
& c3_1(a1034)
& ndr1_0 )
| ~ hskp36 )
& ( ( c3_1(a1033)
& c1_1(a1033)
& c0_1(a1033)
& ndr1_0 )
| ~ hskp35 )
& ( ( c3_1(a1032)
& ~ c1_1(a1032)
& ~ c2_1(a1032)
& ndr1_0 )
| ~ hskp34 )
& ( ( c2_1(a1031)
& ~ c1_1(a1031)
& c3_1(a1031)
& ndr1_0 )
| ~ hskp33 )
& ( ( c2_1(a1029)
& c1_1(a1029)
& ~ c0_1(a1029)
& ndr1_0 )
| ~ hskp32 )
& ( ( c3_1(a1028)
& ~ c1_1(a1028)
& c0_1(a1028)
& ndr1_0 )
| ~ hskp31 )
& ( ( c1_1(a1022)
& c3_1(a1022)
& ~ c2_1(a1022)
& ndr1_0 )
| ~ hskp30 )
& ( ( c2_1(a1021)
& ~ c3_1(a1021)
& ~ c1_1(a1021)
& ndr1_0 )
| ~ hskp29 )
& ( ( ~ c1_1(a1102)
& c2_1(a1102)
& ~ c0_1(a1102)
& ndr1_0 )
| ~ hskp28 )
& ( ( ~ c0_1(a1101)
& c1_1(a1101)
& c3_1(a1101)
& ndr1_0 )
| ~ hskp27 )
& ( ( ~ c0_1(a1098)
& c1_1(a1098)
& ~ c3_1(a1098)
& ndr1_0 )
| ~ hskp26 )
& ( ( ~ c2_1(a1091)
& ~ c0_1(a1091)
& ~ c3_1(a1091)
& ndr1_0 )
| ~ hskp25 )
& ( ( ~ c1_1(a1089)
& c0_1(a1089)
& ~ c2_1(a1089)
& ndr1_0 )
| ~ hskp24 )
& ( ( ~ c2_1(a1088)
& c3_1(a1088)
& c1_1(a1088)
& ndr1_0 )
| ~ hskp23 )
& ( ( ~ c1_1(a1083)
& c3_1(a1083)
& c2_1(a1083)
& ndr1_0 )
| ~ hskp22 )
& ( ( ~ c0_1(a1082)
& ~ c2_1(a1082)
& ~ c3_1(a1082)
& ndr1_0 )
| ~ hskp21 )
& ( ( ~ c1_1(a1080)
& ~ c2_1(a1080)
& ~ c0_1(a1080)
& ndr1_0 )
| ~ hskp20 )
& ( ( ~ c2_1(a1079)
& ~ c0_1(a1079)
& c1_1(a1079)
& ndr1_0 )
| ~ hskp19 )
& ( ( ~ c1_1(a1078)
& c0_1(a1078)
& c2_1(a1078)
& ndr1_0 )
| ~ hskp18 )
& ( ( ~ c2_1(a1077)
& c3_1(a1077)
& ~ c0_1(a1077)
& ndr1_0 )
| ~ hskp17 )
& ( ( ~ c3_1(a1064)
& c0_1(a1064)
& c2_1(a1064)
& ndr1_0 )
| ~ hskp16 )
& ( ( ~ c1_1(a1059)
& c2_1(a1059)
& c3_1(a1059)
& ndr1_0 )
| ~ hskp15 )
& ( ( ~ c2_1(a1055)
& ~ c1_1(a1055)
& ~ c0_1(a1055)
& ndr1_0 )
| ~ hskp14 )
& ( ( ~ c2_1(a1048)
& c3_1(a1048)
& c0_1(a1048)
& ndr1_0 )
| ~ hskp13 )
& ( ( ~ c3_1(a1043)
& c0_1(a1043)
& ~ c1_1(a1043)
& ndr1_0 )
| ~ hskp12 )
& ( ( ~ c2_1(a1041)
& c1_1(a1041)
& ~ c3_1(a1041)
& ndr1_0 )
| ~ hskp11 )
& ( ( ~ c0_1(a1039)
& ~ c2_1(a1039)
& c1_1(a1039)
& ndr1_0 )
| ~ hskp10 )
& ( ( ~ c0_1(a1038)
& c2_1(a1038)
& ~ c1_1(a1038)
& ndr1_0 )
| ~ hskp9 )
& ( ( ~ c1_1(a1036)
& ~ c3_1(a1036)
& c0_1(a1036)
& ndr1_0 )
| ~ hskp8 )
& ( ( ~ c2_1(a1035)
& c1_1(a1035)
& c0_1(a1035)
& ndr1_0 )
| ~ hskp7 )
& ( ( ~ c0_1(a1030)
& ~ c3_1(a1030)
& ~ c2_1(a1030)
& ndr1_0 )
| ~ hskp6 )
& ( ( ~ c3_1(a1027)
& c2_1(a1027)
& c1_1(a1027)
& ndr1_0 )
| ~ hskp5 )
& ( ( ~ c1_1(a1026)
& ~ c2_1(a1026)
& c0_1(a1026)
& ndr1_0 )
| ~ hskp4 )
& ( ( ~ c2_1(a1025)
& ~ c3_1(a1025)
& ~ c0_1(a1025)
& ndr1_0 )
| ~ hskp3 )
& ( ( ~ c3_1(a1024)
& c1_1(a1024)
& c2_1(a1024)
& ndr1_0 )
| ~ hskp2 )
& ( ( ~ c0_1(a1023)
& ~ c1_1(a1023)
& c2_1(a1023)
& ndr1_0 )
| ~ hskp1 )
& ( ( ~ c2_1(a1020)
& ~ c1_1(a1020)
& c0_1(a1020)
& ndr1_0 )
| ~ hskp0 ) ),
file('/export/starexec/sandbox2/benchmark/theBenchmark.p',co1) ).
fof(f2,negated_conjecture,
~ ~ ( ( hskp63
| hskp56
| hskp62 )
& ( hskp28
| hskp27
| hskp43 )
& ( hskp61
| ! [X92] :
( ndr1_0
=> ( c2_1(X92)
| c3_1(X92)
| ~ c1_1(X92) ) )
| ! [X91] :
( ndr1_0
=> ( c0_1(X91)
| ~ c1_1(X91)
| ~ c3_1(X91) ) ) )
& ( hskp26
| hskp60
| ! [X90] :
( ndr1_0
=> ( c2_1(X90)
| c1_1(X90)
| ~ c0_1(X90) ) ) )
& ( hskp35
| ! [X89] :
( ndr1_0
=> ( ~ c1_1(X89)
| c3_1(X89)
| c2_1(X89) ) )
| ! [X88] :
( ndr1_0
=> ( c0_1(X88)
| ~ c3_1(X88)
| ~ c2_1(X88) ) ) )
& ( ! [X87] :
( ndr1_0
=> ( c2_1(X87)
| c0_1(X87)
| ~ c3_1(X87) ) )
| hskp59
| ! [X86] :
( ndr1_0
=> ( ~ c1_1(X86)
| c2_1(X86)
| ~ c3_1(X86) ) ) )
& ( ! [X85] :
( ndr1_0
=> ( ~ c2_1(X85)
| ~ c1_1(X85)
| ~ c0_1(X85) ) )
| ! [X84] :
( ndr1_0
=> ( ~ c3_1(X84)
| ~ c0_1(X84)
| ~ c2_1(X84) ) )
| ! [X83] :
( ndr1_0
=> ( ~ c2_1(X83)
| ~ c0_1(X83)
| ~ c1_1(X83) ) ) )
& ( ! [X82] :
( ndr1_0
=> ( c2_1(X82)
| c1_1(X82)
| c0_1(X82) ) )
| ! [X81] :
( ndr1_0
=> ( ~ c2_1(X81)
| c1_1(X81)
| c3_1(X81) ) )
| ! [X80] :
( ndr1_0
=> ( ~ c3_1(X80)
| ~ c2_1(X80)
| c0_1(X80) ) ) )
& ( hskp14
| ! [X79] :
( ndr1_0
=> ( c1_1(X79)
| c2_1(X79)
| c0_1(X79) ) )
| hskp48 )
& ( ! [X78] :
( ndr1_0
=> ( c2_1(X78)
| ~ c0_1(X78)
| c1_1(X78) ) )
| ! [X77] :
( ndr1_0
=> ( ~ c2_1(X77)
| ~ c3_1(X77)
| ~ c0_1(X77) ) )
| hskp51 )
& ( ! [X76] :
( ndr1_0
=> ( ~ c3_1(X76)
| ~ c1_1(X76)
| ~ c2_1(X76) ) )
| hskp25
| ! [X75] :
( ndr1_0
=> ( c0_1(X75)
| ~ c1_1(X75)
| c2_1(X75) ) ) )
& ( ! [X74] :
( ndr1_0
=> ( ~ c3_1(X74)
| c0_1(X74)
| ~ c1_1(X74) ) )
| hskp36
| ! [X73] :
( ndr1_0
=> ( ~ c3_1(X73)
| ~ c2_1(X73)
| ~ c1_1(X73) ) ) )
& ( hskp24
| ! [X72] :
( ndr1_0
=> ( c3_1(X72)
| c0_1(X72)
| c1_1(X72) ) )
| ! [X71] :
( ndr1_0
=> ( ~ c3_1(X71)
| ~ c1_1(X71)
| c0_1(X71) ) ) )
& ( ! [X70] :
( ndr1_0
=> ( ~ c3_1(X70)
| ~ c2_1(X70)
| ~ c0_1(X70) ) )
| hskp23
| hskp33 )
& ( hskp58
| ! [X69] :
( ndr1_0
=> ( c2_1(X69)
| c1_1(X69)
| ~ c3_1(X69) ) )
| ! [X68] :
( ndr1_0
=> ( ~ c3_1(X68)
| ~ c1_1(X68)
| c2_1(X68) ) ) )
& ( hskp57
| ! [X67] :
( ndr1_0
=> ( c1_1(X67)
| ~ c3_1(X67)
| ~ c2_1(X67) ) )
| ! [X66] :
( ndr1_0
=> ( c2_1(X66)
| ~ c3_1(X66)
| ~ c0_1(X66) ) ) )
& ( ! [X65] :
( ndr1_0
=> ( c2_1(X65)
| ~ c1_1(X65)
| c3_1(X65) ) )
| ! [X64] :
( ndr1_0
=> ( c1_1(X64)
| c3_1(X64)
| c0_1(X64) ) )
| ! [X63] :
( ndr1_0
=> ( c2_1(X63)
| c0_1(X63)
| ~ c1_1(X63) ) ) )
& ( hskp56
| ! [X62] :
( ndr1_0
=> ( ~ c3_1(X62)
| c2_1(X62)
| ~ c1_1(X62) ) )
| hskp22 )
& ( hskp21
| ! [X61] :
( ndr1_0
=> ( c1_1(X61)
| c2_1(X61)
| ~ c0_1(X61) ) )
| hskp55 )
& ( hskp20
| ! [X60] :
( ndr1_0
=> ( c3_1(X60)
| ~ c0_1(X60)
| c1_1(X60) ) )
| hskp19 )
& ( hskp18
| hskp17
| hskp39 )
& ( ! [X59] :
( ndr1_0
=> ( c3_1(X59)
| ~ c1_1(X59)
| ~ c0_1(X59) ) )
| ! [X58] :
( ndr1_0
=> ( c1_1(X58)
| ~ c0_1(X58)
| c3_1(X58) ) )
| ! [X57] :
( ndr1_0
=> ( ~ c3_1(X57)
| ~ c1_1(X57)
| ~ c2_1(X57) ) ) )
& ( ! [X56] :
( ndr1_0
=> ( ~ c1_1(X56)
| ~ c2_1(X56)
| ~ c3_1(X56) ) )
| hskp47
| hskp54 )
& ( ! [X55] :
( ndr1_0
=> ( ~ c2_1(X55)
| c1_1(X55)
| ~ c3_1(X55) ) )
| hskp53
| ! [X54] :
( ndr1_0
=> ( ~ c0_1(X54)
| ~ c3_1(X54)
| ~ c2_1(X54) ) ) )
& ( ! [X53] :
( ndr1_0
=> ( ~ c0_1(X53)
| c1_1(X53)
| ~ c3_1(X53) ) )
| hskp34
| hskp52 )
& ( ! [X52] :
( ndr1_0
=> ( c2_1(X52)
| c1_1(X52)
| c3_1(X52) ) )
| ! [X51] :
( ndr1_0
=> ( c1_1(X51)
| c3_1(X51)
| ~ c0_1(X51) ) )
| ! [X50] :
( ndr1_0
=> ( c1_1(X50)
| c0_1(X50)
| ~ c2_1(X50) ) ) )
& ( hskp51
| hskp50
| ! [X49] :
( ndr1_0
=> ( ~ c1_1(X49)
| ~ c2_1(X49)
| c0_1(X49) ) ) )
& ( hskp12
| ! [X48] :
( ndr1_0
=> ( c3_1(X48)
| ~ c1_1(X48)
| ~ c2_1(X48) ) )
| hskp7 )
& ( ! [X47] :
( ndr1_0
=> ( ~ c2_1(X47)
| c1_1(X47)
| c3_1(X47) ) )
| ! [X46] :
( ndr1_0
=> ( c1_1(X46)
| ~ c2_1(X46)
| c0_1(X46) ) )
| ! [X45] :
( ndr1_0
=> ( c0_1(X45)
| c3_1(X45)
| c1_1(X45) ) ) )
& ( ! [X44] :
( ndr1_0
=> ( ~ c0_1(X44)
| c2_1(X44)
| c1_1(X44) ) )
| hskp1
| ! [X43] :
( ndr1_0
=> ( c0_1(X43)
| c2_1(X43)
| c3_1(X43) ) ) )
& ( hskp49
| ! [X42] :
( ndr1_0
=> ( c0_1(X42)
| c1_1(X42)
| c3_1(X42) ) )
| ! [X41] :
( ndr1_0
=> ( ~ c0_1(X41)
| c2_1(X41)
| ~ c3_1(X41) ) ) )
& ( hskp16
| hskp42
| ! [X40] :
( ndr1_0
=> ( c2_1(X40)
| c3_1(X40)
| ~ c1_1(X40) ) ) )
& ( hskp48
| hskp36
| ! [X39] :
( ndr1_0
=> ( c3_1(X39)
| ~ c1_1(X39)
| c0_1(X39) ) ) )
& ( hskp33
| hskp15
| ! [X38] :
( ndr1_0
=> ( c0_1(X38)
| c2_1(X38)
| ~ c3_1(X38) ) ) )
& ( hskp43
| ! [X37] :
( ndr1_0
=> ( ~ c2_1(X37)
| c0_1(X37)
| ~ c1_1(X37) ) )
| hskp10 )
& ( ! [X36] :
( ndr1_0
=> ( c3_1(X36)
| ~ c0_1(X36)
| ~ c2_1(X36) ) )
| hskp47
| ! [X35] :
( ndr1_0
=> ( c1_1(X35)
| ~ c2_1(X35)
| ~ c0_1(X35) ) ) )
& ( hskp14
| hskp38
| hskp46 )
& ( hskp45
| hskp44
| ! [X34] :
( ndr1_0
=> ( c2_1(X34)
| c3_1(X34)
| c1_1(X34) ) ) )
& ( hskp7
| ! [X33] :
( ndr1_0
=> ( ~ c2_1(X33)
| ~ c3_1(X33)
| ~ c0_1(X33) ) )
| ! [X32] :
( ndr1_0
=> ( ~ c3_1(X32)
| ~ c2_1(X32)
| c0_1(X32) ) ) )
& ( hskp43
| hskp13
| ! [X31] :
( ndr1_0
=> ( c3_1(X31)
| ~ c2_1(X31)
| ~ c0_1(X31) ) ) )
& ( hskp4
| ! [X30] :
( ndr1_0
=> ( ~ c3_1(X30)
| ~ c0_1(X30)
| c1_1(X30) ) )
| ! [X29] :
( ndr1_0
=> ( ~ c1_1(X29)
| c2_1(X29)
| ~ c0_1(X29) ) ) )
& ( ! [X28] :
( ndr1_0
=> ( c2_1(X28)
| ~ c3_1(X28)
| ~ c1_1(X28) ) )
| ! [X27] :
( ndr1_0
=> ( ~ c2_1(X27)
| c0_1(X27)
| c1_1(X27) ) )
| hskp42 )
& ( ! [X26] :
( ndr1_0
=> ( ~ c2_1(X26)
| c1_1(X26)
| ~ c0_1(X26) ) )
| hskp41
| hskp40 )
& ( ! [X25] :
( ndr1_0
=> ( ~ c0_1(X25)
| c2_1(X25)
| ~ c3_1(X25) ) )
| ! [X24] :
( ndr1_0
=> ( ~ c0_1(X24)
| ~ c1_1(X24)
| ~ c2_1(X24) ) )
| hskp12 )
& ( hskp39
| ! [X23] :
( ndr1_0
=> ( ~ c1_1(X23)
| ~ c3_1(X23)
| ~ c0_1(X23) ) )
| hskp11 )
& ( ! [X22] :
( ndr1_0
=> ( c1_1(X22)
| ~ c3_1(X22)
| ~ c0_1(X22) ) )
| hskp38
| ! [X21] :
( ndr1_0
=> ( ~ c0_1(X21)
| c2_1(X21)
| ~ c3_1(X21) ) ) )
& ( hskp10
| ! [X20] :
( ndr1_0
=> ( c0_1(X20)
| c2_1(X20)
| c3_1(X20) ) ) )
& ( ! [X19] :
( ndr1_0
=> ( c1_1(X19)
| ~ c3_1(X19)
| c0_1(X19) ) )
| hskp9
| ! [X18] :
( ndr1_0
=> ( c2_1(X18)
| c3_1(X18)
| c0_1(X18) ) ) )
& ( hskp37
| hskp8
| ! [X17] :
( ndr1_0
=> ( c0_1(X17)
| ~ c1_1(X17)
| ~ c3_1(X17) ) ) )
& ( hskp7
| hskp36
| ! [X16] :
( ndr1_0
=> ( c0_1(X16)
| ~ c1_1(X16)
| c2_1(X16) ) ) )
& ( ! [X15] :
( ndr1_0
=> ( ~ c3_1(X15)
| c2_1(X15)
| c0_1(X15) ) )
| hskp35
| ! [X14] :
( ndr1_0
=> ( c3_1(X14)
| c0_1(X14)
| c2_1(X14) ) ) )
& ( hskp34
| ! [X13] :
( ndr1_0
=> ( ~ c0_1(X13)
| c1_1(X13)
| c3_1(X13) ) )
| ! [X12] :
( ndr1_0
=> ( c3_1(X12)
| ~ c1_1(X12)
| c2_1(X12) ) ) )
& ( ! [X11] :
( ndr1_0
=> ( ~ c2_1(X11)
| ~ c3_1(X11)
| ~ c1_1(X11) ) )
| ! [X10] :
( ndr1_0
=> ( c0_1(X10)
| c2_1(X10)
| ~ c1_1(X10) ) )
| hskp33 )
& ( hskp6
| hskp32
| ! [X9] :
( ndr1_0
=> ( c3_1(X9)
| ~ c0_1(X9)
| ~ c1_1(X9) ) ) )
& ( ! [X8] :
( ndr1_0
=> ( c3_1(X8)
| c1_1(X8)
| ~ c2_1(X8) ) )
| ! [X7] :
( ndr1_0
=> ( c2_1(X7)
| ~ c1_1(X7)
| ~ c0_1(X7) ) )
| hskp31 )
& ( ! [X6] :
( ndr1_0
=> ( c3_1(X6)
| ~ c2_1(X6)
| ~ c0_1(X6) ) )
| hskp5
| hskp4 )
& ( ! [X5] :
( ndr1_0
=> ( c2_1(X5)
| ~ c0_1(X5)
| c1_1(X5) ) )
| hskp3
| ! [X4] :
( ndr1_0
=> ( c0_1(X4)
| c3_1(X4)
| c2_1(X4) ) ) )
& ( ! [X3] :
( ndr1_0
=> ( ~ c3_1(X3)
| ~ c1_1(X3)
| ~ c0_1(X3) ) )
| ! [X2] :
( ndr1_0
=> ( c0_1(X2)
| c2_1(X2)
| c3_1(X2) ) )
| hskp2 )
& ( hskp1
| ! [X1] :
( ndr1_0
=> ( ~ c2_1(X1)
| ~ c0_1(X1)
| c1_1(X1) ) )
| ! [X0] :
( ndr1_0
=> ( c1_1(X0)
| c2_1(X0)
| ~ c3_1(X0) ) ) )
& ( hskp30
| hskp29
| hskp0 )
& ( ( c3_1(a1105)
& c1_1(a1105)
& ~ c2_1(a1105)
& ndr1_0 )
| ~ hskp63 )
& ( ( c1_1(a1103)
& c3_1(a1103)
& c2_1(a1103)
& ndr1_0 )
| ~ hskp62 )
& ( ( c2_1(a1099)
& ~ c0_1(a1099)
& ~ c3_1(a1099)
& ndr1_0 )
| ~ hskp61 )
& ( ( c3_1(a1097)
& ~ c0_1(a1097)
& c2_1(a1097)
& ndr1_0 )
| ~ hskp60 )
& ( ( c1_1(a1095)
& ~ c3_1(a1095)
& ~ c0_1(a1095)
& ndr1_0 )
| ~ hskp59 )
& ( ( c3_1(a1086)
& c2_1(a1086)
& ~ c0_1(a1086)
& ndr1_0 )
| ~ hskp58 )
& ( ( c3_1(a1085)
& c0_1(a1085)
& c2_1(a1085)
& ndr1_0 )
| ~ hskp57 )
& ( ( c0_1(a1084)
& ~ c1_1(a1084)
& ~ c3_1(a1084)
& ndr1_0 )
| ~ hskp56 )
& ( ( c3_1(a1081)
& ~ c0_1(a1081)
& c1_1(a1081)
& ndr1_0 )
| ~ hskp55 )
& ( ( c2_1(a1074)
& c0_1(a1074)
& c3_1(a1074)
& ndr1_0 )
| ~ hskp54 )
& ( ( c0_1(a1073)
& c2_1(a1073)
& c1_1(a1073)
& ndr1_0 )
| ~ hskp53 )
& ( ( c3_1(a1071)
& c0_1(a1071)
& c1_1(a1071)
& ndr1_0 )
| ~ hskp52 )
& ( ( c0_1(a1070)
& ~ c1_1(a1070)
& c2_1(a1070)
& ndr1_0 )
| ~ hskp51 )
& ( ( c1_1(a1069)
& c3_1(a1069)
& ~ c0_1(a1069)
& ndr1_0 )
| ~ hskp50 )
& ( ( c1_1(a1065)
& ~ c2_1(a1065)
& ~ c0_1(a1065)
& ndr1_0 )
| ~ hskp49 )
& ( ( c0_1(a1062)
& c2_1(a1062)
& c3_1(a1062)
& ndr1_0 )
| ~ hskp48 )
& ( ( c3_1(a1056)
& c1_1(a1056)
& c2_1(a1056)
& ndr1_0 )
| ~ hskp47 )
& ( ( c0_1(a1053)
& ~ c2_1(a1053)
& ~ c1_1(a1053)
& ndr1_0 )
| ~ hskp46 )
& ( ( c2_1(a1052)
& c3_1(a1052)
& c0_1(a1052)
& ndr1_0 )
| ~ hskp45 )
& ( ( c0_1(a1051)
& ~ c2_1(a1051)
& c1_1(a1051)
& ndr1_0 )
| ~ hskp44 )
& ( ( c1_1(a1049)
& c2_1(a1049)
& c0_1(a1049)
& ndr1_0 )
| ~ hskp43 )
& ( ( c0_1(a1046)
& c1_1(a1046)
& ~ c2_1(a1046)
& ndr1_0 )
| ~ hskp42 )
& ( ( c3_1(a1045)
& ~ c0_1(a1045)
& ~ c1_1(a1045)
& ndr1_0 )
| ~ hskp41 )
& ( ( c0_1(a1044)
& c3_1(a1044)
& ~ c1_1(a1044)
& ndr1_0 )
| ~ hskp40 )
& ( ( c2_1(a1042)
& ~ c1_1(a1042)
& c0_1(a1042)
& ndr1_0 )
| ~ hskp39 )
& ( ( c2_1(a1040)
& c3_1(a1040)
& c1_1(a1040)
& ndr1_0 )
| ~ hskp38 )
& ( ( c3_1(a1037)
& c0_1(a1037)
& ~ c1_1(a1037)
& ndr1_0 )
| ~ hskp37 )
& ( ( c1_1(a1034)
& ~ c0_1(a1034)
& c3_1(a1034)
& ndr1_0 )
| ~ hskp36 )
& ( ( c3_1(a1033)
& c1_1(a1033)
& c0_1(a1033)
& ndr1_0 )
| ~ hskp35 )
& ( ( c3_1(a1032)
& ~ c1_1(a1032)
& ~ c2_1(a1032)
& ndr1_0 )
| ~ hskp34 )
& ( ( c2_1(a1031)
& ~ c1_1(a1031)
& c3_1(a1031)
& ndr1_0 )
| ~ hskp33 )
& ( ( c2_1(a1029)
& c1_1(a1029)
& ~ c0_1(a1029)
& ndr1_0 )
| ~ hskp32 )
& ( ( c3_1(a1028)
& ~ c1_1(a1028)
& c0_1(a1028)
& ndr1_0 )
| ~ hskp31 )
& ( ( c1_1(a1022)
& c3_1(a1022)
& ~ c2_1(a1022)
& ndr1_0 )
| ~ hskp30 )
& ( ( c2_1(a1021)
& ~ c3_1(a1021)
& ~ c1_1(a1021)
& ndr1_0 )
| ~ hskp29 )
& ( ( ~ c1_1(a1102)
& c2_1(a1102)
& ~ c0_1(a1102)
& ndr1_0 )
| ~ hskp28 )
& ( ( ~ c0_1(a1101)
& c1_1(a1101)
& c3_1(a1101)
& ndr1_0 )
| ~ hskp27 )
& ( ( ~ c0_1(a1098)
& c1_1(a1098)
& ~ c3_1(a1098)
& ndr1_0 )
| ~ hskp26 )
& ( ( ~ c2_1(a1091)
& ~ c0_1(a1091)
& ~ c3_1(a1091)
& ndr1_0 )
| ~ hskp25 )
& ( ( ~ c1_1(a1089)
& c0_1(a1089)
& ~ c2_1(a1089)
& ndr1_0 )
| ~ hskp24 )
& ( ( ~ c2_1(a1088)
& c3_1(a1088)
& c1_1(a1088)
& ndr1_0 )
| ~ hskp23 )
& ( ( ~ c1_1(a1083)
& c3_1(a1083)
& c2_1(a1083)
& ndr1_0 )
| ~ hskp22 )
& ( ( ~ c0_1(a1082)
& ~ c2_1(a1082)
& ~ c3_1(a1082)
& ndr1_0 )
| ~ hskp21 )
& ( ( ~ c1_1(a1080)
& ~ c2_1(a1080)
& ~ c0_1(a1080)
& ndr1_0 )
| ~ hskp20 )
& ( ( ~ c2_1(a1079)
& ~ c0_1(a1079)
& c1_1(a1079)
& ndr1_0 )
| ~ hskp19 )
& ( ( ~ c1_1(a1078)
& c0_1(a1078)
& c2_1(a1078)
& ndr1_0 )
| ~ hskp18 )
& ( ( ~ c2_1(a1077)
& c3_1(a1077)
& ~ c0_1(a1077)
& ndr1_0 )
| ~ hskp17 )
& ( ( ~ c3_1(a1064)
& c0_1(a1064)
& c2_1(a1064)
& ndr1_0 )
| ~ hskp16 )
& ( ( ~ c1_1(a1059)
& c2_1(a1059)
& c3_1(a1059)
& ndr1_0 )
| ~ hskp15 )
& ( ( ~ c2_1(a1055)
& ~ c1_1(a1055)
& ~ c0_1(a1055)
& ndr1_0 )
| ~ hskp14 )
& ( ( ~ c2_1(a1048)
& c3_1(a1048)
& c0_1(a1048)
& ndr1_0 )
| ~ hskp13 )
& ( ( ~ c3_1(a1043)
& c0_1(a1043)
& ~ c1_1(a1043)
& ndr1_0 )
| ~ hskp12 )
& ( ( ~ c2_1(a1041)
& c1_1(a1041)
& ~ c3_1(a1041)
& ndr1_0 )
| ~ hskp11 )
& ( ( ~ c0_1(a1039)
& ~ c2_1(a1039)
& c1_1(a1039)
& ndr1_0 )
| ~ hskp10 )
& ( ( ~ c0_1(a1038)
& c2_1(a1038)
& ~ c1_1(a1038)
& ndr1_0 )
| ~ hskp9 )
& ( ( ~ c1_1(a1036)
& ~ c3_1(a1036)
& c0_1(a1036)
& ndr1_0 )
| ~ hskp8 )
& ( ( ~ c2_1(a1035)
& c1_1(a1035)
& c0_1(a1035)
& ndr1_0 )
| ~ hskp7 )
& ( ( ~ c0_1(a1030)
& ~ c3_1(a1030)
& ~ c2_1(a1030)
& ndr1_0 )
| ~ hskp6 )
& ( ( ~ c3_1(a1027)
& c2_1(a1027)
& c1_1(a1027)
& ndr1_0 )
| ~ hskp5 )
& ( ( ~ c1_1(a1026)
& ~ c2_1(a1026)
& c0_1(a1026)
& ndr1_0 )
| ~ hskp4 )
& ( ( ~ c2_1(a1025)
& ~ c3_1(a1025)
& ~ c0_1(a1025)
& ndr1_0 )
| ~ hskp3 )
& ( ( ~ c3_1(a1024)
& c1_1(a1024)
& c2_1(a1024)
& ndr1_0 )
| ~ hskp2 )
& ( ( ~ c0_1(a1023)
& ~ c1_1(a1023)
& c2_1(a1023)
& ndr1_0 )
| ~ hskp1 )
& ( ( ~ c2_1(a1020)
& ~ c1_1(a1020)
& c0_1(a1020)
& ndr1_0 )
| ~ hskp0 ) ),
inference(negated_conjecture,[],[f1]) ).
fof(f3,plain,
~ ~ ( ( hskp63
| hskp56
| hskp62 )
& ( hskp28
| hskp27
| hskp43 )
& ( hskp61
| ! [X0] :
( ndr1_0
=> ( c2_1(X0)
| c3_1(X0)
| ~ c1_1(X0) ) )
| ! [X1] :
( ndr1_0
=> ( c0_1(X1)
| ~ c1_1(X1)
| ~ c3_1(X1) ) ) )
& ( hskp26
| hskp60
| ! [X2] :
( ndr1_0
=> ( c2_1(X2)
| c1_1(X2)
| ~ c0_1(X2) ) ) )
& ( hskp35
| ! [X3] :
( ndr1_0
=> ( ~ c1_1(X3)
| c3_1(X3)
| c2_1(X3) ) )
| ! [X4] :
( ndr1_0
=> ( c0_1(X4)
| ~ c3_1(X4)
| ~ c2_1(X4) ) ) )
& ( ! [X5] :
( ndr1_0
=> ( c2_1(X5)
| c0_1(X5)
| ~ c3_1(X5) ) )
| hskp59
| ! [X6] :
( ndr1_0
=> ( ~ c1_1(X6)
| c2_1(X6)
| ~ c3_1(X6) ) ) )
& ( ! [X7] :
( ndr1_0
=> ( ~ c2_1(X7)
| ~ c1_1(X7)
| ~ c0_1(X7) ) )
| ! [X8] :
( ndr1_0
=> ( ~ c3_1(X8)
| ~ c0_1(X8)
| ~ c2_1(X8) ) )
| ! [X9] :
( ndr1_0
=> ( ~ c2_1(X9)
| ~ c0_1(X9)
| ~ c1_1(X9) ) ) )
& ( ! [X10] :
( ndr1_0
=> ( c2_1(X10)
| c1_1(X10)
| c0_1(X10) ) )
| ! [X11] :
( ndr1_0
=> ( ~ c2_1(X11)
| c1_1(X11)
| c3_1(X11) ) )
| ! [X12] :
( ndr1_0
=> ( ~ c3_1(X12)
| ~ c2_1(X12)
| c0_1(X12) ) ) )
& ( hskp14
| ! [X13] :
( ndr1_0
=> ( c1_1(X13)
| c2_1(X13)
| c0_1(X13) ) )
| hskp48 )
& ( ! [X14] :
( ndr1_0
=> ( c2_1(X14)
| ~ c0_1(X14)
| c1_1(X14) ) )
| ! [X15] :
( ndr1_0
=> ( ~ c2_1(X15)
| ~ c3_1(X15)
| ~ c0_1(X15) ) )
| hskp51 )
& ( ! [X16] :
( ndr1_0
=> ( ~ c3_1(X16)
| ~ c1_1(X16)
| ~ c2_1(X16) ) )
| hskp25
| ! [X17] :
( ndr1_0
=> ( c0_1(X17)
| ~ c1_1(X17)
| c2_1(X17) ) ) )
& ( ! [X18] :
( ndr1_0
=> ( ~ c3_1(X18)
| c0_1(X18)
| ~ c1_1(X18) ) )
| hskp36
| ! [X19] :
( ndr1_0
=> ( ~ c3_1(X19)
| ~ c2_1(X19)
| ~ c1_1(X19) ) ) )
& ( hskp24
| ! [X20] :
( ndr1_0
=> ( c3_1(X20)
| c0_1(X20)
| c1_1(X20) ) )
| ! [X21] :
( ndr1_0
=> ( ~ c3_1(X21)
| ~ c1_1(X21)
| c0_1(X21) ) ) )
& ( ! [X22] :
( ndr1_0
=> ( ~ c3_1(X22)
| ~ c2_1(X22)
| ~ c0_1(X22) ) )
| hskp23
| hskp33 )
& ( hskp58
| ! [X23] :
( ndr1_0
=> ( c2_1(X23)
| c1_1(X23)
| ~ c3_1(X23) ) )
| ! [X24] :
( ndr1_0
=> ( ~ c3_1(X24)
| ~ c1_1(X24)
| c2_1(X24) ) ) )
& ( hskp57
| ! [X25] :
( ndr1_0
=> ( c1_1(X25)
| ~ c3_1(X25)
| ~ c2_1(X25) ) )
| ! [X26] :
( ndr1_0
=> ( c2_1(X26)
| ~ c3_1(X26)
| ~ c0_1(X26) ) ) )
& ( ! [X27] :
( ndr1_0
=> ( c2_1(X27)
| ~ c1_1(X27)
| c3_1(X27) ) )
| ! [X28] :
( ndr1_0
=> ( c1_1(X28)
| c3_1(X28)
| c0_1(X28) ) )
| ! [X29] :
( ndr1_0
=> ( c2_1(X29)
| c0_1(X29)
| ~ c1_1(X29) ) ) )
& ( hskp56
| ! [X30] :
( ndr1_0
=> ( ~ c3_1(X30)
| c2_1(X30)
| ~ c1_1(X30) ) )
| hskp22 )
& ( hskp21
| ! [X31] :
( ndr1_0
=> ( c1_1(X31)
| c2_1(X31)
| ~ c0_1(X31) ) )
| hskp55 )
& ( hskp20
| ! [X32] :
( ndr1_0
=> ( c3_1(X32)
| ~ c0_1(X32)
| c1_1(X32) ) )
| hskp19 )
& ( hskp18
| hskp17
| hskp39 )
& ( ! [X33] :
( ndr1_0
=> ( c3_1(X33)
| ~ c1_1(X33)
| ~ c0_1(X33) ) )
| ! [X34] :
( ndr1_0
=> ( c1_1(X34)
| ~ c0_1(X34)
| c3_1(X34) ) )
| ! [X35] :
( ndr1_0
=> ( ~ c3_1(X35)
| ~ c1_1(X35)
| ~ c2_1(X35) ) ) )
& ( ! [X36] :
( ndr1_0
=> ( ~ c1_1(X36)
| ~ c2_1(X36)
| ~ c3_1(X36) ) )
| hskp47
| hskp54 )
& ( ! [X37] :
( ndr1_0
=> ( ~ c2_1(X37)
| c1_1(X37)
| ~ c3_1(X37) ) )
| hskp53
| ! [X38] :
( ndr1_0
=> ( ~ c0_1(X38)
| ~ c3_1(X38)
| ~ c2_1(X38) ) ) )
& ( ! [X39] :
( ndr1_0
=> ( ~ c0_1(X39)
| c1_1(X39)
| ~ c3_1(X39) ) )
| hskp34
| hskp52 )
& ( ! [X40] :
( ndr1_0
=> ( c2_1(X40)
| c1_1(X40)
| c3_1(X40) ) )
| ! [X41] :
( ndr1_0
=> ( c1_1(X41)
| c3_1(X41)
| ~ c0_1(X41) ) )
| ! [X42] :
( ndr1_0
=> ( c1_1(X42)
| c0_1(X42)
| ~ c2_1(X42) ) ) )
& ( hskp51
| hskp50
| ! [X43] :
( ndr1_0
=> ( ~ c1_1(X43)
| ~ c2_1(X43)
| c0_1(X43) ) ) )
& ( hskp12
| ! [X44] :
( ndr1_0
=> ( c3_1(X44)
| ~ c1_1(X44)
| ~ c2_1(X44) ) )
| hskp7 )
& ( ! [X45] :
( ndr1_0
=> ( ~ c2_1(X45)
| c1_1(X45)
| c3_1(X45) ) )
| ! [X46] :
( ndr1_0
=> ( c1_1(X46)
| ~ c2_1(X46)
| c0_1(X46) ) )
| ! [X47] :
( ndr1_0
=> ( c0_1(X47)
| c3_1(X47)
| c1_1(X47) ) ) )
& ( ! [X48] :
( ndr1_0
=> ( ~ c0_1(X48)
| c2_1(X48)
| c1_1(X48) ) )
| hskp1
| ! [X49] :
( ndr1_0
=> ( c0_1(X49)
| c2_1(X49)
| c3_1(X49) ) ) )
& ( hskp49
| ! [X50] :
( ndr1_0
=> ( c0_1(X50)
| c1_1(X50)
| c3_1(X50) ) )
| ! [X51] :
( ndr1_0
=> ( ~ c0_1(X51)
| c2_1(X51)
| ~ c3_1(X51) ) ) )
& ( hskp16
| hskp42
| ! [X52] :
( ndr1_0
=> ( c2_1(X52)
| c3_1(X52)
| ~ c1_1(X52) ) ) )
& ( hskp48
| hskp36
| ! [X53] :
( ndr1_0
=> ( c3_1(X53)
| ~ c1_1(X53)
| c0_1(X53) ) ) )
& ( hskp33
| hskp15
| ! [X54] :
( ndr1_0
=> ( c0_1(X54)
| c2_1(X54)
| ~ c3_1(X54) ) ) )
& ( hskp43
| ! [X55] :
( ndr1_0
=> ( ~ c2_1(X55)
| c0_1(X55)
| ~ c1_1(X55) ) )
| hskp10 )
& ( ! [X56] :
( ndr1_0
=> ( c3_1(X56)
| ~ c0_1(X56)
| ~ c2_1(X56) ) )
| hskp47
| ! [X57] :
( ndr1_0
=> ( c1_1(X57)
| ~ c2_1(X57)
| ~ c0_1(X57) ) ) )
& ( hskp14
| hskp38
| hskp46 )
& ( hskp45
| hskp44
| ! [X58] :
( ndr1_0
=> ( c2_1(X58)
| c3_1(X58)
| c1_1(X58) ) ) )
& ( hskp7
| ! [X59] :
( ndr1_0
=> ( ~ c2_1(X59)
| ~ c3_1(X59)
| ~ c0_1(X59) ) )
| ! [X60] :
( ndr1_0
=> ( ~ c3_1(X60)
| ~ c2_1(X60)
| c0_1(X60) ) ) )
& ( hskp43
| hskp13
| ! [X61] :
( ndr1_0
=> ( c3_1(X61)
| ~ c2_1(X61)
| ~ c0_1(X61) ) ) )
& ( hskp4
| ! [X62] :
( ndr1_0
=> ( ~ c3_1(X62)
| ~ c0_1(X62)
| c1_1(X62) ) )
| ! [X63] :
( ndr1_0
=> ( ~ c1_1(X63)
| c2_1(X63)
| ~ c0_1(X63) ) ) )
& ( ! [X64] :
( ndr1_0
=> ( c2_1(X64)
| ~ c3_1(X64)
| ~ c1_1(X64) ) )
| ! [X65] :
( ndr1_0
=> ( ~ c2_1(X65)
| c0_1(X65)
| c1_1(X65) ) )
| hskp42 )
& ( ! [X66] :
( ndr1_0
=> ( ~ c2_1(X66)
| c1_1(X66)
| ~ c0_1(X66) ) )
| hskp41
| hskp40 )
& ( ! [X67] :
( ndr1_0
=> ( ~ c0_1(X67)
| c2_1(X67)
| ~ c3_1(X67) ) )
| ! [X68] :
( ndr1_0
=> ( ~ c0_1(X68)
| ~ c1_1(X68)
| ~ c2_1(X68) ) )
| hskp12 )
& ( hskp39
| ! [X69] :
( ndr1_0
=> ( ~ c1_1(X69)
| ~ c3_1(X69)
| ~ c0_1(X69) ) )
| hskp11 )
& ( ! [X70] :
( ndr1_0
=> ( c1_1(X70)
| ~ c3_1(X70)
| ~ c0_1(X70) ) )
| hskp38
| ! [X71] :
( ndr1_0
=> ( ~ c0_1(X71)
| c2_1(X71)
| ~ c3_1(X71) ) ) )
& ( hskp10
| ! [X72] :
( ndr1_0
=> ( c0_1(X72)
| c2_1(X72)
| c3_1(X72) ) ) )
& ( ! [X73] :
( ndr1_0
=> ( c1_1(X73)
| ~ c3_1(X73)
| c0_1(X73) ) )
| hskp9
| ! [X74] :
( ndr1_0
=> ( c2_1(X74)
| c3_1(X74)
| c0_1(X74) ) ) )
& ( hskp37
| hskp8
| ! [X75] :
( ndr1_0
=> ( c0_1(X75)
| ~ c1_1(X75)
| ~ c3_1(X75) ) ) )
& ( hskp7
| hskp36
| ! [X76] :
( ndr1_0
=> ( c0_1(X76)
| ~ c1_1(X76)
| c2_1(X76) ) ) )
& ( ! [X77] :
( ndr1_0
=> ( ~ c3_1(X77)
| c2_1(X77)
| c0_1(X77) ) )
| hskp35
| ! [X78] :
( ndr1_0
=> ( c3_1(X78)
| c0_1(X78)
| c2_1(X78) ) ) )
& ( hskp34
| ! [X79] :
( ndr1_0
=> ( ~ c0_1(X79)
| c1_1(X79)
| c3_1(X79) ) )
| ! [X80] :
( ndr1_0
=> ( c3_1(X80)
| ~ c1_1(X80)
| c2_1(X80) ) ) )
& ( ! [X81] :
( ndr1_0
=> ( ~ c2_1(X81)
| ~ c3_1(X81)
| ~ c1_1(X81) ) )
| ! [X82] :
( ndr1_0
=> ( c0_1(X82)
| c2_1(X82)
| ~ c1_1(X82) ) )
| hskp33 )
& ( hskp6
| hskp32
| ! [X83] :
( ndr1_0
=> ( c3_1(X83)
| ~ c0_1(X83)
| ~ c1_1(X83) ) ) )
& ( ! [X84] :
( ndr1_0
=> ( c3_1(X84)
| c1_1(X84)
| ~ c2_1(X84) ) )
| ! [X85] :
( ndr1_0
=> ( c2_1(X85)
| ~ c1_1(X85)
| ~ c0_1(X85) ) )
| hskp31 )
& ( ! [X86] :
( ndr1_0
=> ( c3_1(X86)
| ~ c2_1(X86)
| ~ c0_1(X86) ) )
| hskp5
| hskp4 )
& ( ! [X87] :
( ndr1_0
=> ( c2_1(X87)
| ~ c0_1(X87)
| c1_1(X87) ) )
| hskp3
| ! [X88] :
( ndr1_0
=> ( c0_1(X88)
| c3_1(X88)
| c2_1(X88) ) ) )
& ( ! [X89] :
( ndr1_0
=> ( ~ c3_1(X89)
| ~ c1_1(X89)
| ~ c0_1(X89) ) )
| ! [X90] :
( ndr1_0
=> ( c0_1(X90)
| c2_1(X90)
| c3_1(X90) ) )
| hskp2 )
& ( hskp1
| ! [X91] :
( ndr1_0
=> ( ~ c2_1(X91)
| ~ c0_1(X91)
| c1_1(X91) ) )
| ! [X92] :
( ndr1_0
=> ( c1_1(X92)
| c2_1(X92)
| ~ c3_1(X92) ) ) )
& ( hskp30
| hskp29
| hskp0 )
& ( ( c3_1(a1105)
& c1_1(a1105)
& ~ c2_1(a1105)
& ndr1_0 )
| ~ hskp63 )
& ( ( c1_1(a1103)
& c3_1(a1103)
& c2_1(a1103)
& ndr1_0 )
| ~ hskp62 )
& ( ( c2_1(a1099)
& ~ c0_1(a1099)
& ~ c3_1(a1099)
& ndr1_0 )
| ~ hskp61 )
& ( ( c3_1(a1097)
& ~ c0_1(a1097)
& c2_1(a1097)
& ndr1_0 )
| ~ hskp60 )
& ( ( c1_1(a1095)
& ~ c3_1(a1095)
& ~ c0_1(a1095)
& ndr1_0 )
| ~ hskp59 )
& ( ( c3_1(a1086)
& c2_1(a1086)
& ~ c0_1(a1086)
& ndr1_0 )
| ~ hskp58 )
& ( ( c3_1(a1085)
& c0_1(a1085)
& c2_1(a1085)
& ndr1_0 )
| ~ hskp57 )
& ( ( c0_1(a1084)
& ~ c1_1(a1084)
& ~ c3_1(a1084)
& ndr1_0 )
| ~ hskp56 )
& ( ( c3_1(a1081)
& ~ c0_1(a1081)
& c1_1(a1081)
& ndr1_0 )
| ~ hskp55 )
& ( ( c2_1(a1074)
& c0_1(a1074)
& c3_1(a1074)
& ndr1_0 )
| ~ hskp54 )
& ( ( c0_1(a1073)
& c2_1(a1073)
& c1_1(a1073)
& ndr1_0 )
| ~ hskp53 )
& ( ( c3_1(a1071)
& c0_1(a1071)
& c1_1(a1071)
& ndr1_0 )
| ~ hskp52 )
& ( ( c0_1(a1070)
& ~ c1_1(a1070)
& c2_1(a1070)
& ndr1_0 )
| ~ hskp51 )
& ( ( c1_1(a1069)
& c3_1(a1069)
& ~ c0_1(a1069)
& ndr1_0 )
| ~ hskp50 )
& ( ( c1_1(a1065)
& ~ c2_1(a1065)
& ~ c0_1(a1065)
& ndr1_0 )
| ~ hskp49 )
& ( ( c0_1(a1062)
& c2_1(a1062)
& c3_1(a1062)
& ndr1_0 )
| ~ hskp48 )
& ( ( c3_1(a1056)
& c1_1(a1056)
& c2_1(a1056)
& ndr1_0 )
| ~ hskp47 )
& ( ( c0_1(a1053)
& ~ c2_1(a1053)
& ~ c1_1(a1053)
& ndr1_0 )
| ~ hskp46 )
& ( ( c2_1(a1052)
& c3_1(a1052)
& c0_1(a1052)
& ndr1_0 )
| ~ hskp45 )
& ( ( c0_1(a1051)
& ~ c2_1(a1051)
& c1_1(a1051)
& ndr1_0 )
| ~ hskp44 )
& ( ( c1_1(a1049)
& c2_1(a1049)
& c0_1(a1049)
& ndr1_0 )
| ~ hskp43 )
& ( ( c0_1(a1046)
& c1_1(a1046)
& ~ c2_1(a1046)
& ndr1_0 )
| ~ hskp42 )
& ( ( c3_1(a1045)
& ~ c0_1(a1045)
& ~ c1_1(a1045)
& ndr1_0 )
| ~ hskp41 )
& ( ( c0_1(a1044)
& c3_1(a1044)
& ~ c1_1(a1044)
& ndr1_0 )
| ~ hskp40 )
& ( ( c2_1(a1042)
& ~ c1_1(a1042)
& c0_1(a1042)
& ndr1_0 )
| ~ hskp39 )
& ( ( c2_1(a1040)
& c3_1(a1040)
& c1_1(a1040)
& ndr1_0 )
| ~ hskp38 )
& ( ( c3_1(a1037)
& c0_1(a1037)
& ~ c1_1(a1037)
& ndr1_0 )
| ~ hskp37 )
& ( ( c1_1(a1034)
& ~ c0_1(a1034)
& c3_1(a1034)
& ndr1_0 )
| ~ hskp36 )
& ( ( c3_1(a1033)
& c1_1(a1033)
& c0_1(a1033)
& ndr1_0 )
| ~ hskp35 )
& ( ( c3_1(a1032)
& ~ c1_1(a1032)
& ~ c2_1(a1032)
& ndr1_0 )
| ~ hskp34 )
& ( ( c2_1(a1031)
& ~ c1_1(a1031)
& c3_1(a1031)
& ndr1_0 )
| ~ hskp33 )
& ( ( c2_1(a1029)
& c1_1(a1029)
& ~ c0_1(a1029)
& ndr1_0 )
| ~ hskp32 )
& ( ( c3_1(a1028)
& ~ c1_1(a1028)
& c0_1(a1028)
& ndr1_0 )
| ~ hskp31 )
& ( ( c1_1(a1022)
& c3_1(a1022)
& ~ c2_1(a1022)
& ndr1_0 )
| ~ hskp30 )
& ( ( c2_1(a1021)
& ~ c3_1(a1021)
& ~ c1_1(a1021)
& ndr1_0 )
| ~ hskp29 )
& ( ( ~ c1_1(a1102)
& c2_1(a1102)
& ~ c0_1(a1102)
& ndr1_0 )
| ~ hskp28 )
& ( ( ~ c0_1(a1101)
& c1_1(a1101)
& c3_1(a1101)
& ndr1_0 )
| ~ hskp27 )
& ( ( ~ c0_1(a1098)
& c1_1(a1098)
& ~ c3_1(a1098)
& ndr1_0 )
| ~ hskp26 )
& ( ( ~ c2_1(a1091)
& ~ c0_1(a1091)
& ~ c3_1(a1091)
& ndr1_0 )
| ~ hskp25 )
& ( ( ~ c1_1(a1089)
& c0_1(a1089)
& ~ c2_1(a1089)
& ndr1_0 )
| ~ hskp24 )
& ( ( ~ c2_1(a1088)
& c3_1(a1088)
& c1_1(a1088)
& ndr1_0 )
| ~ hskp23 )
& ( ( ~ c1_1(a1083)
& c3_1(a1083)
& c2_1(a1083)
& ndr1_0 )
| ~ hskp22 )
& ( ( ~ c0_1(a1082)
& ~ c2_1(a1082)
& ~ c3_1(a1082)
& ndr1_0 )
| ~ hskp21 )
& ( ( ~ c1_1(a1080)
& ~ c2_1(a1080)
& ~ c0_1(a1080)
& ndr1_0 )
| ~ hskp20 )
& ( ( ~ c2_1(a1079)
& ~ c0_1(a1079)
& c1_1(a1079)
& ndr1_0 )
| ~ hskp19 )
& ( ( ~ c1_1(a1078)
& c0_1(a1078)
& c2_1(a1078)
& ndr1_0 )
| ~ hskp18 )
& ( ( ~ c2_1(a1077)
& c3_1(a1077)
& ~ c0_1(a1077)
& ndr1_0 )
| ~ hskp17 )
& ( ( ~ c3_1(a1064)
& c0_1(a1064)
& c2_1(a1064)
& ndr1_0 )
| ~ hskp16 )
& ( ( ~ c1_1(a1059)
& c2_1(a1059)
& c3_1(a1059)
& ndr1_0 )
| ~ hskp15 )
& ( ( ~ c2_1(a1055)
& ~ c1_1(a1055)
& ~ c0_1(a1055)
& ndr1_0 )
| ~ hskp14 )
& ( ( ~ c2_1(a1048)
& c3_1(a1048)
& c0_1(a1048)
& ndr1_0 )
| ~ hskp13 )
& ( ( ~ c3_1(a1043)
& c0_1(a1043)
& ~ c1_1(a1043)
& ndr1_0 )
| ~ hskp12 )
& ( ( ~ c2_1(a1041)
& c1_1(a1041)
& ~ c3_1(a1041)
& ndr1_0 )
| ~ hskp11 )
& ( ( ~ c0_1(a1039)
& ~ c2_1(a1039)
& c1_1(a1039)
& ndr1_0 )
| ~ hskp10 )
& ( ( ~ c0_1(a1038)
& c2_1(a1038)
& ~ c1_1(a1038)
& ndr1_0 )
| ~ hskp9 )
& ( ( ~ c1_1(a1036)
& ~ c3_1(a1036)
& c0_1(a1036)
& ndr1_0 )
| ~ hskp8 )
& ( ( ~ c2_1(a1035)
& c1_1(a1035)
& c0_1(a1035)
& ndr1_0 )
| ~ hskp7 )
& ( ( ~ c0_1(a1030)
& ~ c3_1(a1030)
& ~ c2_1(a1030)
& ndr1_0 )
| ~ hskp6 )
& ( ( ~ c3_1(a1027)
& c2_1(a1027)
& c1_1(a1027)
& ndr1_0 )
| ~ hskp5 )
& ( ( ~ c1_1(a1026)
& ~ c2_1(a1026)
& c0_1(a1026)
& ndr1_0 )
| ~ hskp4 )
& ( ( ~ c2_1(a1025)
& ~ c3_1(a1025)
& ~ c0_1(a1025)
& ndr1_0 )
| ~ hskp3 )
& ( ( ~ c3_1(a1024)
& c1_1(a1024)
& c2_1(a1024)
& ndr1_0 )
| ~ hskp2 )
& ( ( ~ c0_1(a1023)
& ~ c1_1(a1023)
& c2_1(a1023)
& ndr1_0 )
| ~ hskp1 )
& ( ( ~ c2_1(a1020)
& ~ c1_1(a1020)
& c0_1(a1020)
& ndr1_0 )
| ~ hskp0 ) ),
inference(rectify,[],[f2]) ).
fof(f4,plain,
( ( hskp63
| hskp56
| hskp62 )
& ( hskp28
| hskp27
| hskp43 )
& ( hskp61
| ! [X0] :
( ndr1_0
=> ( c2_1(X0)
| c3_1(X0)
| ~ c1_1(X0) ) )
| ! [X1] :
( ndr1_0
=> ( c0_1(X1)
| ~ c1_1(X1)
| ~ c3_1(X1) ) ) )
& ( hskp26
| hskp60
| ! [X2] :
( ndr1_0
=> ( c2_1(X2)
| c1_1(X2)
| ~ c0_1(X2) ) ) )
& ( hskp35
| ! [X3] :
( ndr1_0
=> ( ~ c1_1(X3)
| c3_1(X3)
| c2_1(X3) ) )
| ! [X4] :
( ndr1_0
=> ( c0_1(X4)
| ~ c3_1(X4)
| ~ c2_1(X4) ) ) )
& ( ! [X5] :
( ndr1_0
=> ( c2_1(X5)
| c0_1(X5)
| ~ c3_1(X5) ) )
| hskp59
| ! [X6] :
( ndr1_0
=> ( ~ c1_1(X6)
| c2_1(X6)
| ~ c3_1(X6) ) ) )
& ( ! [X7] :
( ndr1_0
=> ( ~ c2_1(X7)
| ~ c1_1(X7)
| ~ c0_1(X7) ) )
| ! [X8] :
( ndr1_0
=> ( ~ c3_1(X8)
| ~ c0_1(X8)
| ~ c2_1(X8) ) )
| ! [X9] :
( ndr1_0
=> ( ~ c2_1(X9)
| ~ c0_1(X9)
| ~ c1_1(X9) ) ) )
& ( ! [X10] :
( ndr1_0
=> ( c2_1(X10)
| c1_1(X10)
| c0_1(X10) ) )
| ! [X11] :
( ndr1_0
=> ( ~ c2_1(X11)
| c1_1(X11)
| c3_1(X11) ) )
| ! [X12] :
( ndr1_0
=> ( ~ c3_1(X12)
| ~ c2_1(X12)
| c0_1(X12) ) ) )
& ( hskp14
| ! [X13] :
( ndr1_0
=> ( c1_1(X13)
| c2_1(X13)
| c0_1(X13) ) )
| hskp48 )
& ( ! [X14] :
( ndr1_0
=> ( c2_1(X14)
| ~ c0_1(X14)
| c1_1(X14) ) )
| ! [X15] :
( ndr1_0
=> ( ~ c2_1(X15)
| ~ c3_1(X15)
| ~ c0_1(X15) ) )
| hskp51 )
& ( ! [X16] :
( ndr1_0
=> ( ~ c3_1(X16)
| ~ c1_1(X16)
| ~ c2_1(X16) ) )
| hskp25
| ! [X17] :
( ndr1_0
=> ( c0_1(X17)
| ~ c1_1(X17)
| c2_1(X17) ) ) )
& ( ! [X18] :
( ndr1_0
=> ( ~ c3_1(X18)
| c0_1(X18)
| ~ c1_1(X18) ) )
| hskp36
| ! [X19] :
( ndr1_0
=> ( ~ c3_1(X19)
| ~ c2_1(X19)
| ~ c1_1(X19) ) ) )
& ( hskp24
| ! [X20] :
( ndr1_0
=> ( c3_1(X20)
| c0_1(X20)
| c1_1(X20) ) )
| ! [X21] :
( ndr1_0
=> ( ~ c3_1(X21)
| ~ c1_1(X21)
| c0_1(X21) ) ) )
& ( ! [X22] :
( ndr1_0
=> ( ~ c3_1(X22)
| ~ c2_1(X22)
| ~ c0_1(X22) ) )
| hskp23
| hskp33 )
& ( hskp58
| ! [X23] :
( ndr1_0
=> ( c2_1(X23)
| c1_1(X23)
| ~ c3_1(X23) ) )
| ! [X24] :
( ndr1_0
=> ( ~ c3_1(X24)
| ~ c1_1(X24)
| c2_1(X24) ) ) )
& ( hskp57
| ! [X25] :
( ndr1_0
=> ( c1_1(X25)
| ~ c3_1(X25)
| ~ c2_1(X25) ) )
| ! [X26] :
( ndr1_0
=> ( c2_1(X26)
| ~ c3_1(X26)
| ~ c0_1(X26) ) ) )
& ( ! [X27] :
( ndr1_0
=> ( c2_1(X27)
| ~ c1_1(X27)
| c3_1(X27) ) )
| ! [X28] :
( ndr1_0
=> ( c1_1(X28)
| c3_1(X28)
| c0_1(X28) ) )
| ! [X29] :
( ndr1_0
=> ( c2_1(X29)
| c0_1(X29)
| ~ c1_1(X29) ) ) )
& ( hskp56
| ! [X30] :
( ndr1_0
=> ( ~ c3_1(X30)
| c2_1(X30)
| ~ c1_1(X30) ) )
| hskp22 )
& ( hskp21
| ! [X31] :
( ndr1_0
=> ( c1_1(X31)
| c2_1(X31)
| ~ c0_1(X31) ) )
| hskp55 )
& ( hskp20
| ! [X32] :
( ndr1_0
=> ( c3_1(X32)
| ~ c0_1(X32)
| c1_1(X32) ) )
| hskp19 )
& ( hskp18
| hskp17
| hskp39 )
& ( ! [X33] :
( ndr1_0
=> ( c3_1(X33)
| ~ c1_1(X33)
| ~ c0_1(X33) ) )
| ! [X34] :
( ndr1_0
=> ( c1_1(X34)
| ~ c0_1(X34)
| c3_1(X34) ) )
| ! [X35] :
( ndr1_0
=> ( ~ c3_1(X35)
| ~ c1_1(X35)
| ~ c2_1(X35) ) ) )
& ( ! [X36] :
( ndr1_0
=> ( ~ c1_1(X36)
| ~ c2_1(X36)
| ~ c3_1(X36) ) )
| hskp47
| hskp54 )
& ( ! [X37] :
( ndr1_0
=> ( ~ c2_1(X37)
| c1_1(X37)
| ~ c3_1(X37) ) )
| hskp53
| ! [X38] :
( ndr1_0
=> ( ~ c0_1(X38)
| ~ c3_1(X38)
| ~ c2_1(X38) ) ) )
& ( ! [X39] :
( ndr1_0
=> ( ~ c0_1(X39)
| c1_1(X39)
| ~ c3_1(X39) ) )
| hskp34
| hskp52 )
& ( ! [X40] :
( ndr1_0
=> ( c2_1(X40)
| c1_1(X40)
| c3_1(X40) ) )
| ! [X41] :
( ndr1_0
=> ( c1_1(X41)
| c3_1(X41)
| ~ c0_1(X41) ) )
| ! [X42] :
( ndr1_0
=> ( c1_1(X42)
| c0_1(X42)
| ~ c2_1(X42) ) ) )
& ( hskp51
| hskp50
| ! [X43] :
( ndr1_0
=> ( ~ c1_1(X43)
| ~ c2_1(X43)
| c0_1(X43) ) ) )
& ( hskp12
| ! [X44] :
( ndr1_0
=> ( c3_1(X44)
| ~ c1_1(X44)
| ~ c2_1(X44) ) )
| hskp7 )
& ( ! [X45] :
( ndr1_0
=> ( ~ c2_1(X45)
| c1_1(X45)
| c3_1(X45) ) )
| ! [X46] :
( ndr1_0
=> ( c1_1(X46)
| ~ c2_1(X46)
| c0_1(X46) ) )
| ! [X47] :
( ndr1_0
=> ( c0_1(X47)
| c3_1(X47)
| c1_1(X47) ) ) )
& ( ! [X48] :
( ndr1_0
=> ( ~ c0_1(X48)
| c2_1(X48)
| c1_1(X48) ) )
| hskp1
| ! [X49] :
( ndr1_0
=> ( c0_1(X49)
| c2_1(X49)
| c3_1(X49) ) ) )
& ( hskp49
| ! [X50] :
( ndr1_0
=> ( c0_1(X50)
| c1_1(X50)
| c3_1(X50) ) )
| ! [X51] :
( ndr1_0
=> ( ~ c0_1(X51)
| c2_1(X51)
| ~ c3_1(X51) ) ) )
& ( hskp16
| hskp42
| ! [X52] :
( ndr1_0
=> ( c2_1(X52)
| c3_1(X52)
| ~ c1_1(X52) ) ) )
& ( hskp48
| hskp36
| ! [X53] :
( ndr1_0
=> ( c3_1(X53)
| ~ c1_1(X53)
| c0_1(X53) ) ) )
& ( hskp33
| hskp15
| ! [X54] :
( ndr1_0
=> ( c0_1(X54)
| c2_1(X54)
| ~ c3_1(X54) ) ) )
& ( hskp43
| ! [X55] :
( ndr1_0
=> ( ~ c2_1(X55)
| c0_1(X55)
| ~ c1_1(X55) ) )
| hskp10 )
& ( ! [X56] :
( ndr1_0
=> ( c3_1(X56)
| ~ c0_1(X56)
| ~ c2_1(X56) ) )
| hskp47
| ! [X57] :
( ndr1_0
=> ( c1_1(X57)
| ~ c2_1(X57)
| ~ c0_1(X57) ) ) )
& ( hskp14
| hskp38
| hskp46 )
& ( hskp45
| hskp44
| ! [X58] :
( ndr1_0
=> ( c2_1(X58)
| c3_1(X58)
| c1_1(X58) ) ) )
& ( hskp7
| ! [X59] :
( ndr1_0
=> ( ~ c2_1(X59)
| ~ c3_1(X59)
| ~ c0_1(X59) ) )
| ! [X60] :
( ndr1_0
=> ( ~ c3_1(X60)
| ~ c2_1(X60)
| c0_1(X60) ) ) )
& ( hskp43
| hskp13
| ! [X61] :
( ndr1_0
=> ( c3_1(X61)
| ~ c2_1(X61)
| ~ c0_1(X61) ) ) )
& ( hskp4
| ! [X62] :
( ndr1_0
=> ( ~ c3_1(X62)
| ~ c0_1(X62)
| c1_1(X62) ) )
| ! [X63] :
( ndr1_0
=> ( ~ c1_1(X63)
| c2_1(X63)
| ~ c0_1(X63) ) ) )
& ( ! [X64] :
( ndr1_0
=> ( c2_1(X64)
| ~ c3_1(X64)
| ~ c1_1(X64) ) )
| ! [X65] :
( ndr1_0
=> ( ~ c2_1(X65)
| c0_1(X65)
| c1_1(X65) ) )
| hskp42 )
& ( ! [X66] :
( ndr1_0
=> ( ~ c2_1(X66)
| c1_1(X66)
| ~ c0_1(X66) ) )
| hskp41
| hskp40 )
& ( ! [X67] :
( ndr1_0
=> ( ~ c0_1(X67)
| c2_1(X67)
| ~ c3_1(X67) ) )
| ! [X68] :
( ndr1_0
=> ( ~ c0_1(X68)
| ~ c1_1(X68)
| ~ c2_1(X68) ) )
| hskp12 )
& ( hskp39
| ! [X69] :
( ndr1_0
=> ( ~ c1_1(X69)
| ~ c3_1(X69)
| ~ c0_1(X69) ) )
| hskp11 )
& ( ! [X70] :
( ndr1_0
=> ( c1_1(X70)
| ~ c3_1(X70)
| ~ c0_1(X70) ) )
| hskp38
| ! [X71] :
( ndr1_0
=> ( ~ c0_1(X71)
| c2_1(X71)
| ~ c3_1(X71) ) ) )
& ( hskp10
| ! [X72] :
( ndr1_0
=> ( c0_1(X72)
| c2_1(X72)
| c3_1(X72) ) ) )
& ( ! [X73] :
( ndr1_0
=> ( c1_1(X73)
| ~ c3_1(X73)
| c0_1(X73) ) )
| hskp9
| ! [X74] :
( ndr1_0
=> ( c2_1(X74)
| c3_1(X74)
| c0_1(X74) ) ) )
& ( hskp37
| hskp8
| ! [X75] :
( ndr1_0
=> ( c0_1(X75)
| ~ c1_1(X75)
| ~ c3_1(X75) ) ) )
& ( hskp7
| hskp36
| ! [X76] :
( ndr1_0
=> ( c0_1(X76)
| ~ c1_1(X76)
| c2_1(X76) ) ) )
& ( ! [X77] :
( ndr1_0
=> ( ~ c3_1(X77)
| c2_1(X77)
| c0_1(X77) ) )
| hskp35
| ! [X78] :
( ndr1_0
=> ( c3_1(X78)
| c0_1(X78)
| c2_1(X78) ) ) )
& ( hskp34
| ! [X79] :
( ndr1_0
=> ( ~ c0_1(X79)
| c1_1(X79)
| c3_1(X79) ) )
| ! [X80] :
( ndr1_0
=> ( c3_1(X80)
| ~ c1_1(X80)
| c2_1(X80) ) ) )
& ( ! [X81] :
( ndr1_0
=> ( ~ c2_1(X81)
| ~ c3_1(X81)
| ~ c1_1(X81) ) )
| ! [X82] :
( ndr1_0
=> ( c0_1(X82)
| c2_1(X82)
| ~ c1_1(X82) ) )
| hskp33 )
& ( hskp6
| hskp32
| ! [X83] :
( ndr1_0
=> ( c3_1(X83)
| ~ c0_1(X83)
| ~ c1_1(X83) ) ) )
& ( ! [X84] :
( ndr1_0
=> ( c3_1(X84)
| c1_1(X84)
| ~ c2_1(X84) ) )
| ! [X85] :
( ndr1_0
=> ( c2_1(X85)
| ~ c1_1(X85)
| ~ c0_1(X85) ) )
| hskp31 )
& ( ! [X86] :
( ndr1_0
=> ( c3_1(X86)
| ~ c2_1(X86)
| ~ c0_1(X86) ) )
| hskp5
| hskp4 )
& ( ! [X87] :
( ndr1_0
=> ( c2_1(X87)
| ~ c0_1(X87)
| c1_1(X87) ) )
| hskp3
| ! [X88] :
( ndr1_0
=> ( c0_1(X88)
| c3_1(X88)
| c2_1(X88) ) ) )
& ( ! [X89] :
( ndr1_0
=> ( ~ c3_1(X89)
| ~ c1_1(X89)
| ~ c0_1(X89) ) )
| ! [X90] :
( ndr1_0
=> ( c0_1(X90)
| c2_1(X90)
| c3_1(X90) ) )
| hskp2 )
& ( hskp1
| ! [X91] :
( ndr1_0
=> ( ~ c2_1(X91)
| ~ c0_1(X91)
| c1_1(X91) ) )
| ! [X92] :
( ndr1_0
=> ( c1_1(X92)
| c2_1(X92)
| ~ c3_1(X92) ) ) )
& ( hskp30
| hskp29
| hskp0 )
& ( ( c3_1(a1105)
& c1_1(a1105)
& ~ c2_1(a1105)
& ndr1_0 )
| ~ hskp63 )
& ( ( c1_1(a1103)
& c3_1(a1103)
& c2_1(a1103)
& ndr1_0 )
| ~ hskp62 )
& ( ( c2_1(a1099)
& ~ c0_1(a1099)
& ~ c3_1(a1099)
& ndr1_0 )
| ~ hskp61 )
& ( ( c3_1(a1097)
& ~ c0_1(a1097)
& c2_1(a1097)
& ndr1_0 )
| ~ hskp60 )
& ( ( c1_1(a1095)
& ~ c3_1(a1095)
& ~ c0_1(a1095)
& ndr1_0 )
| ~ hskp59 )
& ( ( c3_1(a1086)
& c2_1(a1086)
& ~ c0_1(a1086)
& ndr1_0 )
| ~ hskp58 )
& ( ( c3_1(a1085)
& c0_1(a1085)
& c2_1(a1085)
& ndr1_0 )
| ~ hskp57 )
& ( ( c0_1(a1084)
& ~ c1_1(a1084)
& ~ c3_1(a1084)
& ndr1_0 )
| ~ hskp56 )
& ( ( c3_1(a1081)
& ~ c0_1(a1081)
& c1_1(a1081)
& ndr1_0 )
| ~ hskp55 )
& ( ( c2_1(a1074)
& c0_1(a1074)
& c3_1(a1074)
& ndr1_0 )
| ~ hskp54 )
& ( ( c0_1(a1073)
& c2_1(a1073)
& c1_1(a1073)
& ndr1_0 )
| ~ hskp53 )
& ( ( c3_1(a1071)
& c0_1(a1071)
& c1_1(a1071)
& ndr1_0 )
| ~ hskp52 )
& ( ( c0_1(a1070)
& ~ c1_1(a1070)
& c2_1(a1070)
& ndr1_0 )
| ~ hskp51 )
& ( ( c1_1(a1069)
& c3_1(a1069)
& ~ c0_1(a1069)
& ndr1_0 )
| ~ hskp50 )
& ( ( c1_1(a1065)
& ~ c2_1(a1065)
& ~ c0_1(a1065)
& ndr1_0 )
| ~ hskp49 )
& ( ( c0_1(a1062)
& c2_1(a1062)
& c3_1(a1062)
& ndr1_0 )
| ~ hskp48 )
& ( ( c3_1(a1056)
& c1_1(a1056)
& c2_1(a1056)
& ndr1_0 )
| ~ hskp47 )
& ( ( c0_1(a1053)
& ~ c2_1(a1053)
& ~ c1_1(a1053)
& ndr1_0 )
| ~ hskp46 )
& ( ( c2_1(a1052)
& c3_1(a1052)
& c0_1(a1052)
& ndr1_0 )
| ~ hskp45 )
& ( ( c0_1(a1051)
& ~ c2_1(a1051)
& c1_1(a1051)
& ndr1_0 )
| ~ hskp44 )
& ( ( c1_1(a1049)
& c2_1(a1049)
& c0_1(a1049)
& ndr1_0 )
| ~ hskp43 )
& ( ( c0_1(a1046)
& c1_1(a1046)
& ~ c2_1(a1046)
& ndr1_0 )
| ~ hskp42 )
& ( ( c3_1(a1045)
& ~ c0_1(a1045)
& ~ c1_1(a1045)
& ndr1_0 )
| ~ hskp41 )
& ( ( c0_1(a1044)
& c3_1(a1044)
& ~ c1_1(a1044)
& ndr1_0 )
| ~ hskp40 )
& ( ( c2_1(a1042)
& ~ c1_1(a1042)
& c0_1(a1042)
& ndr1_0 )
| ~ hskp39 )
& ( ( c2_1(a1040)
& c3_1(a1040)
& c1_1(a1040)
& ndr1_0 )
| ~ hskp38 )
& ( ( c3_1(a1037)
& c0_1(a1037)
& ~ c1_1(a1037)
& ndr1_0 )
| ~ hskp37 )
& ( ( c1_1(a1034)
& ~ c0_1(a1034)
& c3_1(a1034)
& ndr1_0 )
| ~ hskp36 )
& ( ( c3_1(a1033)
& c1_1(a1033)
& c0_1(a1033)
& ndr1_0 )
| ~ hskp35 )
& ( ( c3_1(a1032)
& ~ c1_1(a1032)
& ~ c2_1(a1032)
& ndr1_0 )
| ~ hskp34 )
& ( ( c2_1(a1031)
& ~ c1_1(a1031)
& c3_1(a1031)
& ndr1_0 )
| ~ hskp33 )
& ( ( c2_1(a1029)
& c1_1(a1029)
& ~ c0_1(a1029)
& ndr1_0 )
| ~ hskp32 )
& ( ( c3_1(a1028)
& ~ c1_1(a1028)
& c0_1(a1028)
& ndr1_0 )
| ~ hskp31 )
& ( ( c1_1(a1022)
& c3_1(a1022)
& ~ c2_1(a1022)
& ndr1_0 )
| ~ hskp30 )
& ( ( c2_1(a1021)
& ~ c3_1(a1021)
& ~ c1_1(a1021)
& ndr1_0 )
| ~ hskp29 )
& ( ( ~ c1_1(a1102)
& c2_1(a1102)
& ~ c0_1(a1102)
& ndr1_0 )
| ~ hskp28 )
& ( ( ~ c0_1(a1101)
& c1_1(a1101)
& c3_1(a1101)
& ndr1_0 )
| ~ hskp27 )
& ( ( ~ c0_1(a1098)
& c1_1(a1098)
& ~ c3_1(a1098)
& ndr1_0 )
| ~ hskp26 )
& ( ( ~ c2_1(a1091)
& ~ c0_1(a1091)
& ~ c3_1(a1091)
& ndr1_0 )
| ~ hskp25 )
& ( ( ~ c1_1(a1089)
& c0_1(a1089)
& ~ c2_1(a1089)
& ndr1_0 )
| ~ hskp24 )
& ( ( ~ c2_1(a1088)
& c3_1(a1088)
& c1_1(a1088)
& ndr1_0 )
| ~ hskp23 )
& ( ( ~ c1_1(a1083)
& c3_1(a1083)
& c2_1(a1083)
& ndr1_0 )
| ~ hskp22 )
& ( ( ~ c0_1(a1082)
& ~ c2_1(a1082)
& ~ c3_1(a1082)
& ndr1_0 )
| ~ hskp21 )
& ( ( ~ c1_1(a1080)
& ~ c2_1(a1080)
& ~ c0_1(a1080)
& ndr1_0 )
| ~ hskp20 )
& ( ( ~ c2_1(a1079)
& ~ c0_1(a1079)
& c1_1(a1079)
& ndr1_0 )
| ~ hskp19 )
& ( ( ~ c1_1(a1078)
& c0_1(a1078)
& c2_1(a1078)
& ndr1_0 )
| ~ hskp18 )
& ( ( ~ c2_1(a1077)
& c3_1(a1077)
& ~ c0_1(a1077)
& ndr1_0 )
| ~ hskp17 )
& ( ( ~ c3_1(a1064)
& c0_1(a1064)
& c2_1(a1064)
& ndr1_0 )
| ~ hskp16 )
& ( ( ~ c1_1(a1059)
& c2_1(a1059)
& c3_1(a1059)
& ndr1_0 )
| ~ hskp15 )
& ( ( ~ c2_1(a1055)
& ~ c1_1(a1055)
& ~ c0_1(a1055)
& ndr1_0 )
| ~ hskp14 )
& ( ( ~ c2_1(a1048)
& c3_1(a1048)
& c0_1(a1048)
& ndr1_0 )
| ~ hskp13 )
& ( ( ~ c3_1(a1043)
& c0_1(a1043)
& ~ c1_1(a1043)
& ndr1_0 )
| ~ hskp12 )
& ( ( ~ c2_1(a1041)
& c1_1(a1041)
& ~ c3_1(a1041)
& ndr1_0 )
| ~ hskp11 )
& ( ( ~ c0_1(a1039)
& ~ c2_1(a1039)
& c1_1(a1039)
& ndr1_0 )
| ~ hskp10 )
& ( ( ~ c0_1(a1038)
& c2_1(a1038)
& ~ c1_1(a1038)
& ndr1_0 )
| ~ hskp9 )
& ( ( ~ c1_1(a1036)
& ~ c3_1(a1036)
& c0_1(a1036)
& ndr1_0 )
| ~ hskp8 )
& ( ( ~ c2_1(a1035)
& c1_1(a1035)
& c0_1(a1035)
& ndr1_0 )
| ~ hskp7 )
& ( ( ~ c0_1(a1030)
& ~ c3_1(a1030)
& ~ c2_1(a1030)
& ndr1_0 )
| ~ hskp6 )
& ( ( ~ c3_1(a1027)
& c2_1(a1027)
& c1_1(a1027)
& ndr1_0 )
| ~ hskp5 )
& ( ( ~ c1_1(a1026)
& ~ c2_1(a1026)
& c0_1(a1026)
& ndr1_0 )
| ~ hskp4 )
& ( ( ~ c2_1(a1025)
& ~ c3_1(a1025)
& ~ c0_1(a1025)
& ndr1_0 )
| ~ hskp3 )
& ( ( ~ c3_1(a1024)
& c1_1(a1024)
& c2_1(a1024)
& ndr1_0 )
| ~ hskp2 )
& ( ( ~ c0_1(a1023)
& ~ c1_1(a1023)
& c2_1(a1023)
& ndr1_0 )
| ~ hskp1 )
& ( ( ~ c2_1(a1020)
& ~ c1_1(a1020)
& c0_1(a1020)
& ndr1_0 )
| ~ hskp0 ) ),
inference(flattening,[],[f3]) ).
fof(f5,plain,
( ( hskp63
| hskp56
| hskp62 )
& ( hskp28
| hskp27
| hskp43 )
& ( hskp61
| ! [X0] :
( c2_1(X0)
| c3_1(X0)
| ~ c1_1(X0)
| ~ ndr1_0 )
| ! [X1] :
( c0_1(X1)
| ~ c1_1(X1)
| ~ c3_1(X1)
| ~ ndr1_0 ) )
& ( hskp26
| hskp60
| ! [X2] :
( c2_1(X2)
| c1_1(X2)
| ~ c0_1(X2)
| ~ ndr1_0 ) )
& ( hskp35
| ! [X3] :
( ~ c1_1(X3)
| c3_1(X3)
| c2_1(X3)
| ~ ndr1_0 )
| ! [X4] :
( c0_1(X4)
| ~ c3_1(X4)
| ~ c2_1(X4)
| ~ ndr1_0 ) )
& ( ! [X5] :
( c2_1(X5)
| c0_1(X5)
| ~ c3_1(X5)
| ~ ndr1_0 )
| hskp59
| ! [X6] :
( ~ c1_1(X6)
| c2_1(X6)
| ~ c3_1(X6)
| ~ ndr1_0 ) )
& ( ! [X7] :
( ~ c2_1(X7)
| ~ c1_1(X7)
| ~ c0_1(X7)
| ~ ndr1_0 )
| ! [X8] :
( ~ c3_1(X8)
| ~ c0_1(X8)
| ~ c2_1(X8)
| ~ ndr1_0 )
| ! [X9] :
( ~ c2_1(X9)
| ~ c0_1(X9)
| ~ c1_1(X9)
| ~ ndr1_0 ) )
& ( ! [X10] :
( c2_1(X10)
| c1_1(X10)
| c0_1(X10)
| ~ ndr1_0 )
| ! [X11] :
( ~ c2_1(X11)
| c1_1(X11)
| c3_1(X11)
| ~ ndr1_0 )
| ! [X12] :
( ~ c3_1(X12)
| ~ c2_1(X12)
| c0_1(X12)
| ~ ndr1_0 ) )
& ( hskp14
| ! [X13] :
( c1_1(X13)
| c2_1(X13)
| c0_1(X13)
| ~ ndr1_0 )
| hskp48 )
& ( ! [X14] :
( c2_1(X14)
| ~ c0_1(X14)
| c1_1(X14)
| ~ ndr1_0 )
| ! [X15] :
( ~ c2_1(X15)
| ~ c3_1(X15)
| ~ c0_1(X15)
| ~ ndr1_0 )
| hskp51 )
& ( ! [X16] :
( ~ c3_1(X16)
| ~ c1_1(X16)
| ~ c2_1(X16)
| ~ ndr1_0 )
| hskp25
| ! [X17] :
( c0_1(X17)
| ~ c1_1(X17)
| c2_1(X17)
| ~ ndr1_0 ) )
& ( ! [X18] :
( ~ c3_1(X18)
| c0_1(X18)
| ~ c1_1(X18)
| ~ ndr1_0 )
| hskp36
| ! [X19] :
( ~ c3_1(X19)
| ~ c2_1(X19)
| ~ c1_1(X19)
| ~ ndr1_0 ) )
& ( hskp24
| ! [X20] :
( c3_1(X20)
| c0_1(X20)
| c1_1(X20)
| ~ ndr1_0 )
| ! [X21] :
( ~ c3_1(X21)
| ~ c1_1(X21)
| c0_1(X21)
| ~ ndr1_0 ) )
& ( ! [X22] :
( ~ c3_1(X22)
| ~ c2_1(X22)
| ~ c0_1(X22)
| ~ ndr1_0 )
| hskp23
| hskp33 )
& ( hskp58
| ! [X23] :
( c2_1(X23)
| c1_1(X23)
| ~ c3_1(X23)
| ~ ndr1_0 )
| ! [X24] :
( ~ c3_1(X24)
| ~ c1_1(X24)
| c2_1(X24)
| ~ ndr1_0 ) )
& ( hskp57
| ! [X25] :
( c1_1(X25)
| ~ c3_1(X25)
| ~ c2_1(X25)
| ~ ndr1_0 )
| ! [X26] :
( c2_1(X26)
| ~ c3_1(X26)
| ~ c0_1(X26)
| ~ ndr1_0 ) )
& ( ! [X27] :
( c2_1(X27)
| ~ c1_1(X27)
| c3_1(X27)
| ~ ndr1_0 )
| ! [X28] :
( c1_1(X28)
| c3_1(X28)
| c0_1(X28)
| ~ ndr1_0 )
| ! [X29] :
( c2_1(X29)
| c0_1(X29)
| ~ c1_1(X29)
| ~ ndr1_0 ) )
& ( hskp56
| ! [X30] :
( ~ c3_1(X30)
| c2_1(X30)
| ~ c1_1(X30)
| ~ ndr1_0 )
| hskp22 )
& ( hskp21
| ! [X31] :
( c1_1(X31)
| c2_1(X31)
| ~ c0_1(X31)
| ~ ndr1_0 )
| hskp55 )
& ( hskp20
| ! [X32] :
( c3_1(X32)
| ~ c0_1(X32)
| c1_1(X32)
| ~ ndr1_0 )
| hskp19 )
& ( hskp18
| hskp17
| hskp39 )
& ( ! [X33] :
( c3_1(X33)
| ~ c1_1(X33)
| ~ c0_1(X33)
| ~ ndr1_0 )
| ! [X34] :
( c1_1(X34)
| ~ c0_1(X34)
| c3_1(X34)
| ~ ndr1_0 )
| ! [X35] :
( ~ c3_1(X35)
| ~ c1_1(X35)
| ~ c2_1(X35)
| ~ ndr1_0 ) )
& ( ! [X36] :
( ~ c1_1(X36)
| ~ c2_1(X36)
| ~ c3_1(X36)
| ~ ndr1_0 )
| hskp47
| hskp54 )
& ( ! [X37] :
( ~ c2_1(X37)
| c1_1(X37)
| ~ c3_1(X37)
| ~ ndr1_0 )
| hskp53
| ! [X38] :
( ~ c0_1(X38)
| ~ c3_1(X38)
| ~ c2_1(X38)
| ~ ndr1_0 ) )
& ( ! [X39] :
( ~ c0_1(X39)
| c1_1(X39)
| ~ c3_1(X39)
| ~ ndr1_0 )
| hskp34
| hskp52 )
& ( ! [X40] :
( c2_1(X40)
| c1_1(X40)
| c3_1(X40)
| ~ ndr1_0 )
| ! [X41] :
( c1_1(X41)
| c3_1(X41)
| ~ c0_1(X41)
| ~ ndr1_0 )
| ! [X42] :
( c1_1(X42)
| c0_1(X42)
| ~ c2_1(X42)
| ~ ndr1_0 ) )
& ( hskp51
| hskp50
| ! [X43] :
( ~ c1_1(X43)
| ~ c2_1(X43)
| c0_1(X43)
| ~ ndr1_0 ) )
& ( hskp12
| ! [X44] :
( c3_1(X44)
| ~ c1_1(X44)
| ~ c2_1(X44)
| ~ ndr1_0 )
| hskp7 )
& ( ! [X45] :
( ~ c2_1(X45)
| c1_1(X45)
| c3_1(X45)
| ~ ndr1_0 )
| ! [X46] :
( c1_1(X46)
| ~ c2_1(X46)
| c0_1(X46)
| ~ ndr1_0 )
| ! [X47] :
( c0_1(X47)
| c3_1(X47)
| c1_1(X47)
| ~ ndr1_0 ) )
& ( ! [X48] :
( ~ c0_1(X48)
| c2_1(X48)
| c1_1(X48)
| ~ ndr1_0 )
| hskp1
| ! [X49] :
( c0_1(X49)
| c2_1(X49)
| c3_1(X49)
| ~ ndr1_0 ) )
& ( hskp49
| ! [X50] :
( c0_1(X50)
| c1_1(X50)
| c3_1(X50)
| ~ ndr1_0 )
| ! [X51] :
( ~ c0_1(X51)
| c2_1(X51)
| ~ c3_1(X51)
| ~ ndr1_0 ) )
& ( hskp16
| hskp42
| ! [X52] :
( c2_1(X52)
| c3_1(X52)
| ~ c1_1(X52)
| ~ ndr1_0 ) )
& ( hskp48
| hskp36
| ! [X53] :
( c3_1(X53)
| ~ c1_1(X53)
| c0_1(X53)
| ~ ndr1_0 ) )
& ( hskp33
| hskp15
| ! [X54] :
( c0_1(X54)
| c2_1(X54)
| ~ c3_1(X54)
| ~ ndr1_0 ) )
& ( hskp43
| ! [X55] :
( ~ c2_1(X55)
| c0_1(X55)
| ~ c1_1(X55)
| ~ ndr1_0 )
| hskp10 )
& ( ! [X56] :
( c3_1(X56)
| ~ c0_1(X56)
| ~ c2_1(X56)
| ~ ndr1_0 )
| hskp47
| ! [X57] :
( c1_1(X57)
| ~ c2_1(X57)
| ~ c0_1(X57)
| ~ ndr1_0 ) )
& ( hskp14
| hskp38
| hskp46 )
& ( hskp45
| hskp44
| ! [X58] :
( c2_1(X58)
| c3_1(X58)
| c1_1(X58)
| ~ ndr1_0 ) )
& ( hskp7
| ! [X59] :
( ~ c2_1(X59)
| ~ c3_1(X59)
| ~ c0_1(X59)
| ~ ndr1_0 )
| ! [X60] :
( ~ c3_1(X60)
| ~ c2_1(X60)
| c0_1(X60)
| ~ ndr1_0 ) )
& ( hskp43
| hskp13
| ! [X61] :
( c3_1(X61)
| ~ c2_1(X61)
| ~ c0_1(X61)
| ~ ndr1_0 ) )
& ( hskp4
| ! [X62] :
( ~ c3_1(X62)
| ~ c0_1(X62)
| c1_1(X62)
| ~ ndr1_0 )
| ! [X63] :
( ~ c1_1(X63)
| c2_1(X63)
| ~ c0_1(X63)
| ~ ndr1_0 ) )
& ( ! [X64] :
( c2_1(X64)
| ~ c3_1(X64)
| ~ c1_1(X64)
| ~ ndr1_0 )
| ! [X65] :
( ~ c2_1(X65)
| c0_1(X65)
| c1_1(X65)
| ~ ndr1_0 )
| hskp42 )
& ( ! [X66] :
( ~ c2_1(X66)
| c1_1(X66)
| ~ c0_1(X66)
| ~ ndr1_0 )
| hskp41
| hskp40 )
& ( ! [X67] :
( ~ c0_1(X67)
| c2_1(X67)
| ~ c3_1(X67)
| ~ ndr1_0 )
| ! [X68] :
( ~ c0_1(X68)
| ~ c1_1(X68)
| ~ c2_1(X68)
| ~ ndr1_0 )
| hskp12 )
& ( hskp39
| ! [X69] :
( ~ c1_1(X69)
| ~ c3_1(X69)
| ~ c0_1(X69)
| ~ ndr1_0 )
| hskp11 )
& ( ! [X70] :
( c1_1(X70)
| ~ c3_1(X70)
| ~ c0_1(X70)
| ~ ndr1_0 )
| hskp38
| ! [X71] :
( ~ c0_1(X71)
| c2_1(X71)
| ~ c3_1(X71)
| ~ ndr1_0 ) )
& ( hskp10
| ! [X72] :
( c0_1(X72)
| c2_1(X72)
| c3_1(X72)
| ~ ndr1_0 ) )
& ( ! [X73] :
( c1_1(X73)
| ~ c3_1(X73)
| c0_1(X73)
| ~ ndr1_0 )
| hskp9
| ! [X74] :
( c2_1(X74)
| c3_1(X74)
| c0_1(X74)
| ~ ndr1_0 ) )
& ( hskp37
| hskp8
| ! [X75] :
( c0_1(X75)
| ~ c1_1(X75)
| ~ c3_1(X75)
| ~ ndr1_0 ) )
& ( hskp7
| hskp36
| ! [X76] :
( c0_1(X76)
| ~ c1_1(X76)
| c2_1(X76)
| ~ ndr1_0 ) )
& ( ! [X77] :
( ~ c3_1(X77)
| c2_1(X77)
| c0_1(X77)
| ~ ndr1_0 )
| hskp35
| ! [X78] :
( c3_1(X78)
| c0_1(X78)
| c2_1(X78)
| ~ ndr1_0 ) )
& ( hskp34
| ! [X79] :
( ~ c0_1(X79)
| c1_1(X79)
| c3_1(X79)
| ~ ndr1_0 )
| ! [X80] :
( c3_1(X80)
| ~ c1_1(X80)
| c2_1(X80)
| ~ ndr1_0 ) )
& ( ! [X81] :
( ~ c2_1(X81)
| ~ c3_1(X81)
| ~ c1_1(X81)
| ~ ndr1_0 )
| ! [X82] :
( c0_1(X82)
| c2_1(X82)
| ~ c1_1(X82)
| ~ ndr1_0 )
| hskp33 )
& ( hskp6
| hskp32
| ! [X83] :
( c3_1(X83)
| ~ c0_1(X83)
| ~ c1_1(X83)
| ~ ndr1_0 ) )
& ( ! [X84] :
( c3_1(X84)
| c1_1(X84)
| ~ c2_1(X84)
| ~ ndr1_0 )
| ! [X85] :
( c2_1(X85)
| ~ c1_1(X85)
| ~ c0_1(X85)
| ~ ndr1_0 )
| hskp31 )
& ( ! [X86] :
( c3_1(X86)
| ~ c2_1(X86)
| ~ c0_1(X86)
| ~ ndr1_0 )
| hskp5
| hskp4 )
& ( ! [X87] :
( c2_1(X87)
| ~ c0_1(X87)
| c1_1(X87)
| ~ ndr1_0 )
| hskp3
| ! [X88] :
( c0_1(X88)
| c3_1(X88)
| c2_1(X88)
| ~ ndr1_0 ) )
& ( ! [X89] :
( ~ c3_1(X89)
| ~ c1_1(X89)
| ~ c0_1(X89)
| ~ ndr1_0 )
| ! [X90] :
( c0_1(X90)
| c2_1(X90)
| c3_1(X90)
| ~ ndr1_0 )
| hskp2 )
& ( hskp1
| ! [X91] :
( ~ c2_1(X91)
| ~ c0_1(X91)
| c1_1(X91)
| ~ ndr1_0 )
| ! [X92] :
( c1_1(X92)
| c2_1(X92)
| ~ c3_1(X92)
| ~ ndr1_0 ) )
& ( hskp30
| hskp29
| hskp0 )
& ( ( c3_1(a1105)
& c1_1(a1105)
& ~ c2_1(a1105)
& ndr1_0 )
| ~ hskp63 )
& ( ( c1_1(a1103)
& c3_1(a1103)
& c2_1(a1103)
& ndr1_0 )
| ~ hskp62 )
& ( ( c2_1(a1099)
& ~ c0_1(a1099)
& ~ c3_1(a1099)
& ndr1_0 )
| ~ hskp61 )
& ( ( c3_1(a1097)
& ~ c0_1(a1097)
& c2_1(a1097)
& ndr1_0 )
| ~ hskp60 )
& ( ( c1_1(a1095)
& ~ c3_1(a1095)
& ~ c0_1(a1095)
& ndr1_0 )
| ~ hskp59 )
& ( ( c3_1(a1086)
& c2_1(a1086)
& ~ c0_1(a1086)
& ndr1_0 )
| ~ hskp58 )
& ( ( c3_1(a1085)
& c0_1(a1085)
& c2_1(a1085)
& ndr1_0 )
| ~ hskp57 )
& ( ( c0_1(a1084)
& ~ c1_1(a1084)
& ~ c3_1(a1084)
& ndr1_0 )
| ~ hskp56 )
& ( ( c3_1(a1081)
& ~ c0_1(a1081)
& c1_1(a1081)
& ndr1_0 )
| ~ hskp55 )
& ( ( c2_1(a1074)
& c0_1(a1074)
& c3_1(a1074)
& ndr1_0 )
| ~ hskp54 )
& ( ( c0_1(a1073)
& c2_1(a1073)
& c1_1(a1073)
& ndr1_0 )
| ~ hskp53 )
& ( ( c3_1(a1071)
& c0_1(a1071)
& c1_1(a1071)
& ndr1_0 )
| ~ hskp52 )
& ( ( c0_1(a1070)
& ~ c1_1(a1070)
& c2_1(a1070)
& ndr1_0 )
| ~ hskp51 )
& ( ( c1_1(a1069)
& c3_1(a1069)
& ~ c0_1(a1069)
& ndr1_0 )
| ~ hskp50 )
& ( ( c1_1(a1065)
& ~ c2_1(a1065)
& ~ c0_1(a1065)
& ndr1_0 )
| ~ hskp49 )
& ( ( c0_1(a1062)
& c2_1(a1062)
& c3_1(a1062)
& ndr1_0 )
| ~ hskp48 )
& ( ( c3_1(a1056)
& c1_1(a1056)
& c2_1(a1056)
& ndr1_0 )
| ~ hskp47 )
& ( ( c0_1(a1053)
& ~ c2_1(a1053)
& ~ c1_1(a1053)
& ndr1_0 )
| ~ hskp46 )
& ( ( c2_1(a1052)
& c3_1(a1052)
& c0_1(a1052)
& ndr1_0 )
| ~ hskp45 )
& ( ( c0_1(a1051)
& ~ c2_1(a1051)
& c1_1(a1051)
& ndr1_0 )
| ~ hskp44 )
& ( ( c1_1(a1049)
& c2_1(a1049)
& c0_1(a1049)
& ndr1_0 )
| ~ hskp43 )
& ( ( c0_1(a1046)
& c1_1(a1046)
& ~ c2_1(a1046)
& ndr1_0 )
| ~ hskp42 )
& ( ( c3_1(a1045)
& ~ c0_1(a1045)
& ~ c1_1(a1045)
& ndr1_0 )
| ~ hskp41 )
& ( ( c0_1(a1044)
& c3_1(a1044)
& ~ c1_1(a1044)
& ndr1_0 )
| ~ hskp40 )
& ( ( c2_1(a1042)
& ~ c1_1(a1042)
& c0_1(a1042)
& ndr1_0 )
| ~ hskp39 )
& ( ( c2_1(a1040)
& c3_1(a1040)
& c1_1(a1040)
& ndr1_0 )
| ~ hskp38 )
& ( ( c3_1(a1037)
& c0_1(a1037)
& ~ c1_1(a1037)
& ndr1_0 )
| ~ hskp37 )
& ( ( c1_1(a1034)
& ~ c0_1(a1034)
& c3_1(a1034)
& ndr1_0 )
| ~ hskp36 )
& ( ( c3_1(a1033)
& c1_1(a1033)
& c0_1(a1033)
& ndr1_0 )
| ~ hskp35 )
& ( ( c3_1(a1032)
& ~ c1_1(a1032)
& ~ c2_1(a1032)
& ndr1_0 )
| ~ hskp34 )
& ( ( c2_1(a1031)
& ~ c1_1(a1031)
& c3_1(a1031)
& ndr1_0 )
| ~ hskp33 )
& ( ( c2_1(a1029)
& c1_1(a1029)
& ~ c0_1(a1029)
& ndr1_0 )
| ~ hskp32 )
& ( ( c3_1(a1028)
& ~ c1_1(a1028)
& c0_1(a1028)
& ndr1_0 )
| ~ hskp31 )
& ( ( c1_1(a1022)
& c3_1(a1022)
& ~ c2_1(a1022)
& ndr1_0 )
| ~ hskp30 )
& ( ( c2_1(a1021)
& ~ c3_1(a1021)
& ~ c1_1(a1021)
& ndr1_0 )
| ~ hskp29 )
& ( ( ~ c1_1(a1102)
& c2_1(a1102)
& ~ c0_1(a1102)
& ndr1_0 )
| ~ hskp28 )
& ( ( ~ c0_1(a1101)
& c1_1(a1101)
& c3_1(a1101)
& ndr1_0 )
| ~ hskp27 )
& ( ( ~ c0_1(a1098)
& c1_1(a1098)
& ~ c3_1(a1098)
& ndr1_0 )
| ~ hskp26 )
& ( ( ~ c2_1(a1091)
& ~ c0_1(a1091)
& ~ c3_1(a1091)
& ndr1_0 )
| ~ hskp25 )
& ( ( ~ c1_1(a1089)
& c0_1(a1089)
& ~ c2_1(a1089)
& ndr1_0 )
| ~ hskp24 )
& ( ( ~ c2_1(a1088)
& c3_1(a1088)
& c1_1(a1088)
& ndr1_0 )
| ~ hskp23 )
& ( ( ~ c1_1(a1083)
& c3_1(a1083)
& c2_1(a1083)
& ndr1_0 )
| ~ hskp22 )
& ( ( ~ c0_1(a1082)
& ~ c2_1(a1082)
& ~ c3_1(a1082)
& ndr1_0 )
| ~ hskp21 )
& ( ( ~ c1_1(a1080)
& ~ c2_1(a1080)
& ~ c0_1(a1080)
& ndr1_0 )
| ~ hskp20 )
& ( ( ~ c2_1(a1079)
& ~ c0_1(a1079)
& c1_1(a1079)
& ndr1_0 )
| ~ hskp19 )
& ( ( ~ c1_1(a1078)
& c0_1(a1078)
& c2_1(a1078)
& ndr1_0 )
| ~ hskp18 )
& ( ( ~ c2_1(a1077)
& c3_1(a1077)
& ~ c0_1(a1077)
& ndr1_0 )
| ~ hskp17 )
& ( ( ~ c3_1(a1064)
& c0_1(a1064)
& c2_1(a1064)
& ndr1_0 )
| ~ hskp16 )
& ( ( ~ c1_1(a1059)
& c2_1(a1059)
& c3_1(a1059)
& ndr1_0 )
| ~ hskp15 )
& ( ( ~ c2_1(a1055)
& ~ c1_1(a1055)
& ~ c0_1(a1055)
& ndr1_0 )
| ~ hskp14 )
& ( ( ~ c2_1(a1048)
& c3_1(a1048)
& c0_1(a1048)
& ndr1_0 )
| ~ hskp13 )
& ( ( ~ c3_1(a1043)
& c0_1(a1043)
& ~ c1_1(a1043)
& ndr1_0 )
| ~ hskp12 )
& ( ( ~ c2_1(a1041)
& c1_1(a1041)
& ~ c3_1(a1041)
& ndr1_0 )
| ~ hskp11 )
& ( ( ~ c0_1(a1039)
& ~ c2_1(a1039)
& c1_1(a1039)
& ndr1_0 )
| ~ hskp10 )
& ( ( ~ c0_1(a1038)
& c2_1(a1038)
& ~ c1_1(a1038)
& ndr1_0 )
| ~ hskp9 )
& ( ( ~ c1_1(a1036)
& ~ c3_1(a1036)
& c0_1(a1036)
& ndr1_0 )
| ~ hskp8 )
& ( ( ~ c2_1(a1035)
& c1_1(a1035)
& c0_1(a1035)
& ndr1_0 )
| ~ hskp7 )
& ( ( ~ c0_1(a1030)
& ~ c3_1(a1030)
& ~ c2_1(a1030)
& ndr1_0 )
| ~ hskp6 )
& ( ( ~ c3_1(a1027)
& c2_1(a1027)
& c1_1(a1027)
& ndr1_0 )
| ~ hskp5 )
& ( ( ~ c1_1(a1026)
& ~ c2_1(a1026)
& c0_1(a1026)
& ndr1_0 )
| ~ hskp4 )
& ( ( ~ c2_1(a1025)
& ~ c3_1(a1025)
& ~ c0_1(a1025)
& ndr1_0 )
| ~ hskp3 )
& ( ( ~ c3_1(a1024)
& c1_1(a1024)
& c2_1(a1024)
& ndr1_0 )
| ~ hskp2 )
& ( ( ~ c0_1(a1023)
& ~ c1_1(a1023)
& c2_1(a1023)
& ndr1_0 )
| ~ hskp1 )
& ( ( ~ c2_1(a1020)
& ~ c1_1(a1020)
& c0_1(a1020)
& ndr1_0 )
| ~ hskp0 ) ),
inference(ennf_transformation,[],[f4]) ).
fof(f6,plain,
( ( hskp63
| hskp56
| hskp62 )
& ( hskp28
| hskp27
| hskp43 )
& ( hskp61
| ! [X0] :
( c2_1(X0)
| c3_1(X0)
| ~ c1_1(X0)
| ~ ndr1_0 )
| ! [X1] :
( c0_1(X1)
| ~ c1_1(X1)
| ~ c3_1(X1)
| ~ ndr1_0 ) )
& ( hskp26
| hskp60
| ! [X2] :
( c2_1(X2)
| c1_1(X2)
| ~ c0_1(X2)
| ~ ndr1_0 ) )
& ( hskp35
| ! [X3] :
( ~ c1_1(X3)
| c3_1(X3)
| c2_1(X3)
| ~ ndr1_0 )
| ! [X4] :
( c0_1(X4)
| ~ c3_1(X4)
| ~ c2_1(X4)
| ~ ndr1_0 ) )
& ( ! [X5] :
( c2_1(X5)
| c0_1(X5)
| ~ c3_1(X5)
| ~ ndr1_0 )
| hskp59
| ! [X6] :
( ~ c1_1(X6)
| c2_1(X6)
| ~ c3_1(X6)
| ~ ndr1_0 ) )
& ( ! [X7] :
( ~ c2_1(X7)
| ~ c1_1(X7)
| ~ c0_1(X7)
| ~ ndr1_0 )
| ! [X8] :
( ~ c3_1(X8)
| ~ c0_1(X8)
| ~ c2_1(X8)
| ~ ndr1_0 )
| ! [X9] :
( ~ c2_1(X9)
| ~ c0_1(X9)
| ~ c1_1(X9)
| ~ ndr1_0 ) )
& ( ! [X10] :
( c2_1(X10)
| c1_1(X10)
| c0_1(X10)
| ~ ndr1_0 )
| ! [X11] :
( ~ c2_1(X11)
| c1_1(X11)
| c3_1(X11)
| ~ ndr1_0 )
| ! [X12] :
( ~ c3_1(X12)
| ~ c2_1(X12)
| c0_1(X12)
| ~ ndr1_0 ) )
& ( hskp14
| ! [X13] :
( c1_1(X13)
| c2_1(X13)
| c0_1(X13)
| ~ ndr1_0 )
| hskp48 )
& ( ! [X14] :
( c2_1(X14)
| ~ c0_1(X14)
| c1_1(X14)
| ~ ndr1_0 )
| ! [X15] :
( ~ c2_1(X15)
| ~ c3_1(X15)
| ~ c0_1(X15)
| ~ ndr1_0 )
| hskp51 )
& ( ! [X16] :
( ~ c3_1(X16)
| ~ c1_1(X16)
| ~ c2_1(X16)
| ~ ndr1_0 )
| hskp25
| ! [X17] :
( c0_1(X17)
| ~ c1_1(X17)
| c2_1(X17)
| ~ ndr1_0 ) )
& ( ! [X18] :
( ~ c3_1(X18)
| c0_1(X18)
| ~ c1_1(X18)
| ~ ndr1_0 )
| hskp36
| ! [X19] :
( ~ c3_1(X19)
| ~ c2_1(X19)
| ~ c1_1(X19)
| ~ ndr1_0 ) )
& ( hskp24
| ! [X20] :
( c3_1(X20)
| c0_1(X20)
| c1_1(X20)
| ~ ndr1_0 )
| ! [X21] :
( ~ c3_1(X21)
| ~ c1_1(X21)
| c0_1(X21)
| ~ ndr1_0 ) )
& ( ! [X22] :
( ~ c3_1(X22)
| ~ c2_1(X22)
| ~ c0_1(X22)
| ~ ndr1_0 )
| hskp23
| hskp33 )
& ( hskp58
| ! [X23] :
( c2_1(X23)
| c1_1(X23)
| ~ c3_1(X23)
| ~ ndr1_0 )
| ! [X24] :
( ~ c3_1(X24)
| ~ c1_1(X24)
| c2_1(X24)
| ~ ndr1_0 ) )
& ( hskp57
| ! [X25] :
( c1_1(X25)
| ~ c3_1(X25)
| ~ c2_1(X25)
| ~ ndr1_0 )
| ! [X26] :
( c2_1(X26)
| ~ c3_1(X26)
| ~ c0_1(X26)
| ~ ndr1_0 ) )
& ( ! [X27] :
( c2_1(X27)
| ~ c1_1(X27)
| c3_1(X27)
| ~ ndr1_0 )
| ! [X28] :
( c1_1(X28)
| c3_1(X28)
| c0_1(X28)
| ~ ndr1_0 )
| ! [X29] :
( c2_1(X29)
| c0_1(X29)
| ~ c1_1(X29)
| ~ ndr1_0 ) )
& ( hskp56
| ! [X30] :
( ~ c3_1(X30)
| c2_1(X30)
| ~ c1_1(X30)
| ~ ndr1_0 )
| hskp22 )
& ( hskp21
| ! [X31] :
( c1_1(X31)
| c2_1(X31)
| ~ c0_1(X31)
| ~ ndr1_0 )
| hskp55 )
& ( hskp20
| ! [X32] :
( c3_1(X32)
| ~ c0_1(X32)
| c1_1(X32)
| ~ ndr1_0 )
| hskp19 )
& ( hskp18
| hskp17
| hskp39 )
& ( ! [X33] :
( c3_1(X33)
| ~ c1_1(X33)
| ~ c0_1(X33)
| ~ ndr1_0 )
| ! [X34] :
( c1_1(X34)
| ~ c0_1(X34)
| c3_1(X34)
| ~ ndr1_0 )
| ! [X35] :
( ~ c3_1(X35)
| ~ c1_1(X35)
| ~ c2_1(X35)
| ~ ndr1_0 ) )
& ( ! [X36] :
( ~ c1_1(X36)
| ~ c2_1(X36)
| ~ c3_1(X36)
| ~ ndr1_0 )
| hskp47
| hskp54 )
& ( ! [X37] :
( ~ c2_1(X37)
| c1_1(X37)
| ~ c3_1(X37)
| ~ ndr1_0 )
| hskp53
| ! [X38] :
( ~ c0_1(X38)
| ~ c3_1(X38)
| ~ c2_1(X38)
| ~ ndr1_0 ) )
& ( ! [X39] :
( ~ c0_1(X39)
| c1_1(X39)
| ~ c3_1(X39)
| ~ ndr1_0 )
| hskp34
| hskp52 )
& ( ! [X40] :
( c2_1(X40)
| c1_1(X40)
| c3_1(X40)
| ~ ndr1_0 )
| ! [X41] :
( c1_1(X41)
| c3_1(X41)
| ~ c0_1(X41)
| ~ ndr1_0 )
| ! [X42] :
( c1_1(X42)
| c0_1(X42)
| ~ c2_1(X42)
| ~ ndr1_0 ) )
& ( hskp51
| hskp50
| ! [X43] :
( ~ c1_1(X43)
| ~ c2_1(X43)
| c0_1(X43)
| ~ ndr1_0 ) )
& ( hskp12
| ! [X44] :
( c3_1(X44)
| ~ c1_1(X44)
| ~ c2_1(X44)
| ~ ndr1_0 )
| hskp7 )
& ( ! [X45] :
( ~ c2_1(X45)
| c1_1(X45)
| c3_1(X45)
| ~ ndr1_0 )
| ! [X46] :
( c1_1(X46)
| ~ c2_1(X46)
| c0_1(X46)
| ~ ndr1_0 )
| ! [X47] :
( c0_1(X47)
| c3_1(X47)
| c1_1(X47)
| ~ ndr1_0 ) )
& ( ! [X48] :
( ~ c0_1(X48)
| c2_1(X48)
| c1_1(X48)
| ~ ndr1_0 )
| hskp1
| ! [X49] :
( c0_1(X49)
| c2_1(X49)
| c3_1(X49)
| ~ ndr1_0 ) )
& ( hskp49
| ! [X50] :
( c0_1(X50)
| c1_1(X50)
| c3_1(X50)
| ~ ndr1_0 )
| ! [X51] :
( ~ c0_1(X51)
| c2_1(X51)
| ~ c3_1(X51)
| ~ ndr1_0 ) )
& ( hskp16
| hskp42
| ! [X52] :
( c2_1(X52)
| c3_1(X52)
| ~ c1_1(X52)
| ~ ndr1_0 ) )
& ( hskp48
| hskp36
| ! [X53] :
( c3_1(X53)
| ~ c1_1(X53)
| c0_1(X53)
| ~ ndr1_0 ) )
& ( hskp33
| hskp15
| ! [X54] :
( c0_1(X54)
| c2_1(X54)
| ~ c3_1(X54)
| ~ ndr1_0 ) )
& ( hskp43
| ! [X55] :
( ~ c2_1(X55)
| c0_1(X55)
| ~ c1_1(X55)
| ~ ndr1_0 )
| hskp10 )
& ( ! [X56] :
( c3_1(X56)
| ~ c0_1(X56)
| ~ c2_1(X56)
| ~ ndr1_0 )
| hskp47
| ! [X57] :
( c1_1(X57)
| ~ c2_1(X57)
| ~ c0_1(X57)
| ~ ndr1_0 ) )
& ( hskp14
| hskp38
| hskp46 )
& ( hskp45
| hskp44
| ! [X58] :
( c2_1(X58)
| c3_1(X58)
| c1_1(X58)
| ~ ndr1_0 ) )
& ( hskp7
| ! [X59] :
( ~ c2_1(X59)
| ~ c3_1(X59)
| ~ c0_1(X59)
| ~ ndr1_0 )
| ! [X60] :
( ~ c3_1(X60)
| ~ c2_1(X60)
| c0_1(X60)
| ~ ndr1_0 ) )
& ( hskp43
| hskp13
| ! [X61] :
( c3_1(X61)
| ~ c2_1(X61)
| ~ c0_1(X61)
| ~ ndr1_0 ) )
& ( hskp4
| ! [X62] :
( ~ c3_1(X62)
| ~ c0_1(X62)
| c1_1(X62)
| ~ ndr1_0 )
| ! [X63] :
( ~ c1_1(X63)
| c2_1(X63)
| ~ c0_1(X63)
| ~ ndr1_0 ) )
& ( ! [X64] :
( c2_1(X64)
| ~ c3_1(X64)
| ~ c1_1(X64)
| ~ ndr1_0 )
| ! [X65] :
( ~ c2_1(X65)
| c0_1(X65)
| c1_1(X65)
| ~ ndr1_0 )
| hskp42 )
& ( ! [X66] :
( ~ c2_1(X66)
| c1_1(X66)
| ~ c0_1(X66)
| ~ ndr1_0 )
| hskp41
| hskp40 )
& ( ! [X67] :
( ~ c0_1(X67)
| c2_1(X67)
| ~ c3_1(X67)
| ~ ndr1_0 )
| ! [X68] :
( ~ c0_1(X68)
| ~ c1_1(X68)
| ~ c2_1(X68)
| ~ ndr1_0 )
| hskp12 )
& ( hskp39
| ! [X69] :
( ~ c1_1(X69)
| ~ c3_1(X69)
| ~ c0_1(X69)
| ~ ndr1_0 )
| hskp11 )
& ( ! [X70] :
( c1_1(X70)
| ~ c3_1(X70)
| ~ c0_1(X70)
| ~ ndr1_0 )
| hskp38
| ! [X71] :
( ~ c0_1(X71)
| c2_1(X71)
| ~ c3_1(X71)
| ~ ndr1_0 ) )
& ( hskp10
| ! [X72] :
( c0_1(X72)
| c2_1(X72)
| c3_1(X72)
| ~ ndr1_0 ) )
& ( ! [X73] :
( c1_1(X73)
| ~ c3_1(X73)
| c0_1(X73)
| ~ ndr1_0 )
| hskp9
| ! [X74] :
( c2_1(X74)
| c3_1(X74)
| c0_1(X74)
| ~ ndr1_0 ) )
& ( hskp37
| hskp8
| ! [X75] :
( c0_1(X75)
| ~ c1_1(X75)
| ~ c3_1(X75)
| ~ ndr1_0 ) )
& ( hskp7
| hskp36
| ! [X76] :
( c0_1(X76)
| ~ c1_1(X76)
| c2_1(X76)
| ~ ndr1_0 ) )
& ( ! [X77] :
( ~ c3_1(X77)
| c2_1(X77)
| c0_1(X77)
| ~ ndr1_0 )
| hskp35
| ! [X78] :
( c3_1(X78)
| c0_1(X78)
| c2_1(X78)
| ~ ndr1_0 ) )
& ( hskp34
| ! [X79] :
( ~ c0_1(X79)
| c1_1(X79)
| c3_1(X79)
| ~ ndr1_0 )
| ! [X80] :
( c3_1(X80)
| ~ c1_1(X80)
| c2_1(X80)
| ~ ndr1_0 ) )
& ( ! [X81] :
( ~ c2_1(X81)
| ~ c3_1(X81)
| ~ c1_1(X81)
| ~ ndr1_0 )
| ! [X82] :
( c0_1(X82)
| c2_1(X82)
| ~ c1_1(X82)
| ~ ndr1_0 )
| hskp33 )
& ( hskp6
| hskp32
| ! [X83] :
( c3_1(X83)
| ~ c0_1(X83)
| ~ c1_1(X83)
| ~ ndr1_0 ) )
& ( ! [X84] :
( c3_1(X84)
| c1_1(X84)
| ~ c2_1(X84)
| ~ ndr1_0 )
| ! [X85] :
( c2_1(X85)
| ~ c1_1(X85)
| ~ c0_1(X85)
| ~ ndr1_0 )
| hskp31 )
& ( ! [X86] :
( c3_1(X86)
| ~ c2_1(X86)
| ~ c0_1(X86)
| ~ ndr1_0 )
| hskp5
| hskp4 )
& ( ! [X87] :
( c2_1(X87)
| ~ c0_1(X87)
| c1_1(X87)
| ~ ndr1_0 )
| hskp3
| ! [X88] :
( c0_1(X88)
| c3_1(X88)
| c2_1(X88)
| ~ ndr1_0 ) )
& ( ! [X89] :
( ~ c3_1(X89)
| ~ c1_1(X89)
| ~ c0_1(X89)
| ~ ndr1_0 )
| ! [X90] :
( c0_1(X90)
| c2_1(X90)
| c3_1(X90)
| ~ ndr1_0 )
| hskp2 )
& ( hskp1
| ! [X91] :
( ~ c2_1(X91)
| ~ c0_1(X91)
| c1_1(X91)
| ~ ndr1_0 )
| ! [X92] :
( c1_1(X92)
| c2_1(X92)
| ~ c3_1(X92)
| ~ ndr1_0 ) )
& ( hskp30
| hskp29
| hskp0 )
& ( ( c3_1(a1105)
& c1_1(a1105)
& ~ c2_1(a1105)
& ndr1_0 )
| ~ hskp63 )
& ( ( c1_1(a1103)
& c3_1(a1103)
& c2_1(a1103)
& ndr1_0 )
| ~ hskp62 )
& ( ( c2_1(a1099)
& ~ c0_1(a1099)
& ~ c3_1(a1099)
& ndr1_0 )
| ~ hskp61 )
& ( ( c3_1(a1097)
& ~ c0_1(a1097)
& c2_1(a1097)
& ndr1_0 )
| ~ hskp60 )
& ( ( c1_1(a1095)
& ~ c3_1(a1095)
& ~ c0_1(a1095)
& ndr1_0 )
| ~ hskp59 )
& ( ( c3_1(a1086)
& c2_1(a1086)
& ~ c0_1(a1086)
& ndr1_0 )
| ~ hskp58 )
& ( ( c3_1(a1085)
& c0_1(a1085)
& c2_1(a1085)
& ndr1_0 )
| ~ hskp57 )
& ( ( c0_1(a1084)
& ~ c1_1(a1084)
& ~ c3_1(a1084)
& ndr1_0 )
| ~ hskp56 )
& ( ( c3_1(a1081)
& ~ c0_1(a1081)
& c1_1(a1081)
& ndr1_0 )
| ~ hskp55 )
& ( ( c2_1(a1074)
& c0_1(a1074)
& c3_1(a1074)
& ndr1_0 )
| ~ hskp54 )
& ( ( c0_1(a1073)
& c2_1(a1073)
& c1_1(a1073)
& ndr1_0 )
| ~ hskp53 )
& ( ( c3_1(a1071)
& c0_1(a1071)
& c1_1(a1071)
& ndr1_0 )
| ~ hskp52 )
& ( ( c0_1(a1070)
& ~ c1_1(a1070)
& c2_1(a1070)
& ndr1_0 )
| ~ hskp51 )
& ( ( c1_1(a1069)
& c3_1(a1069)
& ~ c0_1(a1069)
& ndr1_0 )
| ~ hskp50 )
& ( ( c1_1(a1065)
& ~ c2_1(a1065)
& ~ c0_1(a1065)
& ndr1_0 )
| ~ hskp49 )
& ( ( c0_1(a1062)
& c2_1(a1062)
& c3_1(a1062)
& ndr1_0 )
| ~ hskp48 )
& ( ( c3_1(a1056)
& c1_1(a1056)
& c2_1(a1056)
& ndr1_0 )
| ~ hskp47 )
& ( ( c0_1(a1053)
& ~ c2_1(a1053)
& ~ c1_1(a1053)
& ndr1_0 )
| ~ hskp46 )
& ( ( c2_1(a1052)
& c3_1(a1052)
& c0_1(a1052)
& ndr1_0 )
| ~ hskp45 )
& ( ( c0_1(a1051)
& ~ c2_1(a1051)
& c1_1(a1051)
& ndr1_0 )
| ~ hskp44 )
& ( ( c1_1(a1049)
& c2_1(a1049)
& c0_1(a1049)
& ndr1_0 )
| ~ hskp43 )
& ( ( c0_1(a1046)
& c1_1(a1046)
& ~ c2_1(a1046)
& ndr1_0 )
| ~ hskp42 )
& ( ( c3_1(a1045)
& ~ c0_1(a1045)
& ~ c1_1(a1045)
& ndr1_0 )
| ~ hskp41 )
& ( ( c0_1(a1044)
& c3_1(a1044)
& ~ c1_1(a1044)
& ndr1_0 )
| ~ hskp40 )
& ( ( c2_1(a1042)
& ~ c1_1(a1042)
& c0_1(a1042)
& ndr1_0 )
| ~ hskp39 )
& ( ( c2_1(a1040)
& c3_1(a1040)
& c1_1(a1040)
& ndr1_0 )
| ~ hskp38 )
& ( ( c3_1(a1037)
& c0_1(a1037)
& ~ c1_1(a1037)
& ndr1_0 )
| ~ hskp37 )
& ( ( c1_1(a1034)
& ~ c0_1(a1034)
& c3_1(a1034)
& ndr1_0 )
| ~ hskp36 )
& ( ( c3_1(a1033)
& c1_1(a1033)
& c0_1(a1033)
& ndr1_0 )
| ~ hskp35 )
& ( ( c3_1(a1032)
& ~ c1_1(a1032)
& ~ c2_1(a1032)
& ndr1_0 )
| ~ hskp34 )
& ( ( c2_1(a1031)
& ~ c1_1(a1031)
& c3_1(a1031)
& ndr1_0 )
| ~ hskp33 )
& ( ( c2_1(a1029)
& c1_1(a1029)
& ~ c0_1(a1029)
& ndr1_0 )
| ~ hskp32 )
& ( ( c3_1(a1028)
& ~ c1_1(a1028)
& c0_1(a1028)
& ndr1_0 )
| ~ hskp31 )
& ( ( c1_1(a1022)
& c3_1(a1022)
& ~ c2_1(a1022)
& ndr1_0 )
| ~ hskp30 )
& ( ( c2_1(a1021)
& ~ c3_1(a1021)
& ~ c1_1(a1021)
& ndr1_0 )
| ~ hskp29 )
& ( ( ~ c1_1(a1102)
& c2_1(a1102)
& ~ c0_1(a1102)
& ndr1_0 )
| ~ hskp28 )
& ( ( ~ c0_1(a1101)
& c1_1(a1101)
& c3_1(a1101)
& ndr1_0 )
| ~ hskp27 )
& ( ( ~ c0_1(a1098)
& c1_1(a1098)
& ~ c3_1(a1098)
& ndr1_0 )
| ~ hskp26 )
& ( ( ~ c2_1(a1091)
& ~ c0_1(a1091)
& ~ c3_1(a1091)
& ndr1_0 )
| ~ hskp25 )
& ( ( ~ c1_1(a1089)
& c0_1(a1089)
& ~ c2_1(a1089)
& ndr1_0 )
| ~ hskp24 )
& ( ( ~ c2_1(a1088)
& c3_1(a1088)
& c1_1(a1088)
& ndr1_0 )
| ~ hskp23 )
& ( ( ~ c1_1(a1083)
& c3_1(a1083)
& c2_1(a1083)
& ndr1_0 )
| ~ hskp22 )
& ( ( ~ c0_1(a1082)
& ~ c2_1(a1082)
& ~ c3_1(a1082)
& ndr1_0 )
| ~ hskp21 )
& ( ( ~ c1_1(a1080)
& ~ c2_1(a1080)
& ~ c0_1(a1080)
& ndr1_0 )
| ~ hskp20 )
& ( ( ~ c2_1(a1079)
& ~ c0_1(a1079)
& c1_1(a1079)
& ndr1_0 )
| ~ hskp19 )
& ( ( ~ c1_1(a1078)
& c0_1(a1078)
& c2_1(a1078)
& ndr1_0 )
| ~ hskp18 )
& ( ( ~ c2_1(a1077)
& c3_1(a1077)
& ~ c0_1(a1077)
& ndr1_0 )
| ~ hskp17 )
& ( ( ~ c3_1(a1064)
& c0_1(a1064)
& c2_1(a1064)
& ndr1_0 )
| ~ hskp16 )
& ( ( ~ c1_1(a1059)
& c2_1(a1059)
& c3_1(a1059)
& ndr1_0 )
| ~ hskp15 )
& ( ( ~ c2_1(a1055)
& ~ c1_1(a1055)
& ~ c0_1(a1055)
& ndr1_0 )
| ~ hskp14 )
& ( ( ~ c2_1(a1048)
& c3_1(a1048)
& c0_1(a1048)
& ndr1_0 )
| ~ hskp13 )
& ( ( ~ c3_1(a1043)
& c0_1(a1043)
& ~ c1_1(a1043)
& ndr1_0 )
| ~ hskp12 )
& ( ( ~ c2_1(a1041)
& c1_1(a1041)
& ~ c3_1(a1041)
& ndr1_0 )
| ~ hskp11 )
& ( ( ~ c0_1(a1039)
& ~ c2_1(a1039)
& c1_1(a1039)
& ndr1_0 )
| ~ hskp10 )
& ( ( ~ c0_1(a1038)
& c2_1(a1038)
& ~ c1_1(a1038)
& ndr1_0 )
| ~ hskp9 )
& ( ( ~ c1_1(a1036)
& ~ c3_1(a1036)
& c0_1(a1036)
& ndr1_0 )
| ~ hskp8 )
& ( ( ~ c2_1(a1035)
& c1_1(a1035)
& c0_1(a1035)
& ndr1_0 )
| ~ hskp7 )
& ( ( ~ c0_1(a1030)
& ~ c3_1(a1030)
& ~ c2_1(a1030)
& ndr1_0 )
| ~ hskp6 )
& ( ( ~ c3_1(a1027)
& c2_1(a1027)
& c1_1(a1027)
& ndr1_0 )
| ~ hskp5 )
& ( ( ~ c1_1(a1026)
& ~ c2_1(a1026)
& c0_1(a1026)
& ndr1_0 )
| ~ hskp4 )
& ( ( ~ c2_1(a1025)
& ~ c3_1(a1025)
& ~ c0_1(a1025)
& ndr1_0 )
| ~ hskp3 )
& ( ( ~ c3_1(a1024)
& c1_1(a1024)
& c2_1(a1024)
& ndr1_0 )
| ~ hskp2 )
& ( ( ~ c0_1(a1023)
& ~ c1_1(a1023)
& c2_1(a1023)
& ndr1_0 )
| ~ hskp1 )
& ( ( ~ c2_1(a1020)
& ~ c1_1(a1020)
& c0_1(a1020)
& ndr1_0 )
| ~ hskp0 ) ),
inference(flattening,[],[f5]) ).
fof(f7,plain,
( ndr1_0
| ~ hskp0 ),
inference(cnf_transformation,[],[f6]) ).
fof(f8,plain,
( c0_1(a1020)
| ~ hskp0 ),
inference(cnf_transformation,[],[f6]) ).
fof(f9,plain,
( ~ c1_1(a1020)
| ~ hskp0 ),
inference(cnf_transformation,[],[f6]) ).
fof(f10,plain,
( ~ c2_1(a1020)
| ~ hskp0 ),
inference(cnf_transformation,[],[f6]) ).
fof(f12,plain,
( c2_1(a1023)
| ~ hskp1 ),
inference(cnf_transformation,[],[f6]) ).
fof(f13,plain,
( ~ c1_1(a1023)
| ~ hskp1 ),
inference(cnf_transformation,[],[f6]) ).
fof(f14,plain,
( ~ c0_1(a1023)
| ~ hskp1 ),
inference(cnf_transformation,[],[f6]) ).
fof(f48,plain,
( c1_1(a1039)
| ~ hskp10 ),
inference(cnf_transformation,[],[f6]) ).
fof(f49,plain,
( ~ c2_1(a1039)
| ~ hskp10 ),
inference(cnf_transformation,[],[f6]) ).
fof(f50,plain,
( ~ c0_1(a1039)
| ~ hskp10 ),
inference(cnf_transformation,[],[f6]) ).
fof(f56,plain,
( ~ c1_1(a1043)
| ~ hskp12 ),
inference(cnf_transformation,[],[f6]) ).
fof(f57,plain,
( c0_1(a1043)
| ~ hskp12 ),
inference(cnf_transformation,[],[f6]) ).
fof(f58,plain,
( ~ c3_1(a1043)
| ~ hskp12 ),
inference(cnf_transformation,[],[f6]) ).
fof(f68,plain,
( c3_1(a1059)
| ~ hskp15 ),
inference(cnf_transformation,[],[f6]) ).
fof(f69,plain,
( c2_1(a1059)
| ~ hskp15 ),
inference(cnf_transformation,[],[f6]) ).
fof(f70,plain,
( ~ c1_1(a1059)
| ~ hskp15 ),
inference(cnf_transformation,[],[f6]) ).
fof(f76,plain,
( ~ c0_1(a1077)
| ~ hskp17 ),
inference(cnf_transformation,[],[f6]) ).
fof(f77,plain,
( c3_1(a1077)
| ~ hskp17 ),
inference(cnf_transformation,[],[f6]) ).
fof(f78,plain,
( ~ c2_1(a1077)
| ~ hskp17 ),
inference(cnf_transformation,[],[f6]) ).
fof(f80,plain,
( c2_1(a1078)
| ~ hskp18 ),
inference(cnf_transformation,[],[f6]) ).
fof(f81,plain,
( c0_1(a1078)
| ~ hskp18 ),
inference(cnf_transformation,[],[f6]) ).
fof(f82,plain,
( ~ c1_1(a1078)
| ~ hskp18 ),
inference(cnf_transformation,[],[f6]) ).
fof(f84,plain,
( c1_1(a1079)
| ~ hskp19 ),
inference(cnf_transformation,[],[f6]) ).
fof(f85,plain,
( ~ c0_1(a1079)
| ~ hskp19 ),
inference(cnf_transformation,[],[f6]) ).
fof(f86,plain,
( ~ c2_1(a1079)
| ~ hskp19 ),
inference(cnf_transformation,[],[f6]) ).
fof(f88,plain,
( ~ c0_1(a1080)
| ~ hskp20 ),
inference(cnf_transformation,[],[f6]) ).
fof(f89,plain,
( ~ c2_1(a1080)
| ~ hskp20 ),
inference(cnf_transformation,[],[f6]) ).
fof(f90,plain,
( ~ c1_1(a1080)
| ~ hskp20 ),
inference(cnf_transformation,[],[f6]) ).
fof(f96,plain,
( c2_1(a1083)
| ~ hskp22 ),
inference(cnf_transformation,[],[f6]) ).
fof(f97,plain,
( c3_1(a1083)
| ~ hskp22 ),
inference(cnf_transformation,[],[f6]) ).
fof(f98,plain,
( ~ c1_1(a1083)
| ~ hskp22 ),
inference(cnf_transformation,[],[f6]) ).
fof(f108,plain,
( ~ c3_1(a1091)
| ~ hskp25 ),
inference(cnf_transformation,[],[f6]) ).
fof(f109,plain,
( ~ c0_1(a1091)
| ~ hskp25 ),
inference(cnf_transformation,[],[f6]) ).
fof(f110,plain,
( ~ c2_1(a1091)
| ~ hskp25 ),
inference(cnf_transformation,[],[f6]) ).
fof(f123,plain,
( ndr1_0
| ~ hskp29 ),
inference(cnf_transformation,[],[f6]) ).
fof(f124,plain,
( ~ c1_1(a1021)
| ~ hskp29 ),
inference(cnf_transformation,[],[f6]) ).
fof(f125,plain,
( ~ c3_1(a1021)
| ~ hskp29 ),
inference(cnf_transformation,[],[f6]) ).
fof(f126,plain,
( c2_1(a1021)
| ~ hskp29 ),
inference(cnf_transformation,[],[f6]) ).
fof(f127,plain,
( ndr1_0
| ~ hskp30 ),
inference(cnf_transformation,[],[f6]) ).
fof(f128,plain,
( ~ c2_1(a1022)
| ~ hskp30 ),
inference(cnf_transformation,[],[f6]) ).
fof(f129,plain,
( c3_1(a1022)
| ~ hskp30 ),
inference(cnf_transformation,[],[f6]) ).
fof(f130,plain,
( c1_1(a1022)
| ~ hskp30 ),
inference(cnf_transformation,[],[f6]) ).
fof(f140,plain,
( c3_1(a1031)
| ~ hskp33 ),
inference(cnf_transformation,[],[f6]) ).
fof(f141,plain,
( ~ c1_1(a1031)
| ~ hskp33 ),
inference(cnf_transformation,[],[f6]) ).
fof(f142,plain,
( c2_1(a1031)
| ~ hskp33 ),
inference(cnf_transformation,[],[f6]) ).
fof(f144,plain,
( ~ c2_1(a1032)
| ~ hskp34 ),
inference(cnf_transformation,[],[f6]) ).
fof(f145,plain,
( ~ c1_1(a1032)
| ~ hskp34 ),
inference(cnf_transformation,[],[f6]) ).
fof(f146,plain,
( c3_1(a1032)
| ~ hskp34 ),
inference(cnf_transformation,[],[f6]) ).
fof(f148,plain,
( c0_1(a1033)
| ~ hskp35 ),
inference(cnf_transformation,[],[f6]) ).
fof(f149,plain,
( c1_1(a1033)
| ~ hskp35 ),
inference(cnf_transformation,[],[f6]) ).
fof(f150,plain,
( c3_1(a1033)
| ~ hskp35 ),
inference(cnf_transformation,[],[f6]) ).
fof(f160,plain,
( c1_1(a1040)
| ~ hskp38 ),
inference(cnf_transformation,[],[f6]) ).
fof(f161,plain,
( c3_1(a1040)
| ~ hskp38 ),
inference(cnf_transformation,[],[f6]) ).
fof(f162,plain,
( c2_1(a1040)
| ~ hskp38 ),
inference(cnf_transformation,[],[f6]) ).
fof(f164,plain,
( c0_1(a1042)
| ~ hskp39 ),
inference(cnf_transformation,[],[f6]) ).
fof(f165,plain,
( ~ c1_1(a1042)
| ~ hskp39 ),
inference(cnf_transformation,[],[f6]) ).
fof(f166,plain,
( c2_1(a1042)
| ~ hskp39 ),
inference(cnf_transformation,[],[f6]) ).
fof(f176,plain,
( ~ c2_1(a1046)
| ~ hskp42 ),
inference(cnf_transformation,[],[f6]) ).
fof(f177,plain,
( c1_1(a1046)
| ~ hskp42 ),
inference(cnf_transformation,[],[f6]) ).
fof(f178,plain,
( c0_1(a1046)
| ~ hskp42 ),
inference(cnf_transformation,[],[f6]) ).
fof(f196,plain,
( c2_1(a1056)
| ~ hskp47 ),
inference(cnf_transformation,[],[f6]) ).
fof(f197,plain,
( c1_1(a1056)
| ~ hskp47 ),
inference(cnf_transformation,[],[f6]) ).
fof(f198,plain,
( c3_1(a1056)
| ~ hskp47 ),
inference(cnf_transformation,[],[f6]) ).
fof(f204,plain,
( ~ c0_1(a1065)
| ~ hskp49 ),
inference(cnf_transformation,[],[f6]) ).
fof(f205,plain,
( ~ c2_1(a1065)
| ~ hskp49 ),
inference(cnf_transformation,[],[f6]) ).
fof(f206,plain,
( c1_1(a1065)
| ~ hskp49 ),
inference(cnf_transformation,[],[f6]) ).
fof(f220,plain,
( c1_1(a1073)
| ~ hskp53 ),
inference(cnf_transformation,[],[f6]) ).
fof(f221,plain,
( c2_1(a1073)
| ~ hskp53 ),
inference(cnf_transformation,[],[f6]) ).
fof(f222,plain,
( c0_1(a1073)
| ~ hskp53 ),
inference(cnf_transformation,[],[f6]) ).
fof(f232,plain,
( ~ c3_1(a1084)
| ~ hskp56 ),
inference(cnf_transformation,[],[f6]) ).
fof(f233,plain,
( ~ c1_1(a1084)
| ~ hskp56 ),
inference(cnf_transformation,[],[f6]) ).
fof(f234,plain,
( c0_1(a1084)
| ~ hskp56 ),
inference(cnf_transformation,[],[f6]) ).
fof(f236,plain,
( c2_1(a1085)
| ~ hskp57 ),
inference(cnf_transformation,[],[f6]) ).
fof(f237,plain,
( c0_1(a1085)
| ~ hskp57 ),
inference(cnf_transformation,[],[f6]) ).
fof(f238,plain,
( c3_1(a1085)
| ~ hskp57 ),
inference(cnf_transformation,[],[f6]) ).
fof(f263,plain,
( hskp30
| hskp29
| hskp0 ),
inference(cnf_transformation,[],[f6]) ).
fof(f276,plain,
! [X72] :
( hskp10
| c0_1(X72)
| c2_1(X72)
| c3_1(X72)
| ~ ndr1_0 ),
inference(cnf_transformation,[],[f6]) ).
fof(f289,plain,
! [X54] :
( hskp33
| hskp15
| c0_1(X54)
| c2_1(X54)
| ~ c3_1(X54)
| ~ ndr1_0 ),
inference(cnf_transformation,[],[f6]) ).
fof(f302,plain,
( hskp18
| hskp17
| hskp39 ),
inference(cnf_transformation,[],[f6]) ).
fof(f303,plain,
! [X32] :
( hskp20
| c3_1(X32)
| ~ c0_1(X32)
| c1_1(X32)
| ~ ndr1_0
| hskp19 ),
inference(cnf_transformation,[],[f6]) ).
fof(f305,plain,
! [X30] :
( hskp56
| ~ c3_1(X30)
| c2_1(X30)
| ~ c1_1(X30)
| ~ ndr1_0
| hskp22 ),
inference(cnf_transformation,[],[f6]) ).
cnf(c_53,negated_conjecture,
( ~ c2_1(X0)
| ~ c3_1(X0)
| ~ c1_1(X1)
| ~ ndr1_0
| c2_1(X1)
| c3_1(X1)
| c0_1(X0)
| hskp35 ),
inference(cnf_transformation,[],[f324]) ).
cnf(c_54,negated_conjecture,
( ~ c3_1(X0)
| ~ c3_1(X1)
| ~ c1_1(X1)
| ~ ndr1_0
| c2_1(X0)
| c2_1(X1)
| c0_1(X0)
| hskp59 ),
inference(cnf_transformation,[],[f325]) ).
cnf(c_55,negated_conjecture,
( ~ c2_1(X0)
| ~ c2_1(X1)
| ~ c2_1(X2)
| ~ c3_1(X1)
| ~ c1_1(X0)
| ~ c1_1(X2)
| ~ c0_1(X0)
| ~ c0_1(X1)
| ~ c0_1(X2)
| ~ ndr1_0 ),
inference(cnf_transformation,[],[f326]) ).
cnf(c_56,negated_conjecture,
( ~ c2_1(X0)
| ~ c2_1(X1)
| ~ c3_1(X1)
| ~ ndr1_0
| c2_1(X2)
| c3_1(X0)
| c1_1(X0)
| c1_1(X2)
| c0_1(X1)
| c0_1(X2) ),
inference(cnf_transformation,[],[f327]) ).
cnf(c_59,negated_conjecture,
( ~ c2_1(X0)
| ~ c3_1(X0)
| ~ c1_1(X0)
| ~ c1_1(X1)
| ~ ndr1_0
| c2_1(X1)
| c0_1(X1)
| hskp25 ),
inference(cnf_transformation,[],[f329]) ).
cnf(c_63,negated_conjecture,
( ~ c3_1(X0)
| ~ c3_1(X1)
| ~ c1_1(X1)
| ~ ndr1_0
| c2_1(X0)
| c2_1(X1)
| c1_1(X0)
| hskp58 ),
inference(cnf_transformation,[],[f332]) ).
cnf(c_64,negated_conjecture,
( ~ c2_1(X0)
| ~ c3_1(X0)
| ~ c3_1(X1)
| ~ c0_1(X1)
| ~ ndr1_0
| c2_1(X1)
| c1_1(X0)
| hskp57 ),
inference(cnf_transformation,[],[f333]) ).
cnf(c_65,negated_conjecture,
( ~ c1_1(X0)
| ~ c1_1(X1)
| ~ ndr1_0
| c2_1(X0)
| c2_1(X1)
| c3_1(X0)
| c3_1(X2)
| c1_1(X2)
| c0_1(X1)
| c0_1(X2) ),
inference(cnf_transformation,[],[f334]) ).
cnf(c_66,negated_conjecture,
( ~ c3_1(X0)
| ~ c1_1(X0)
| ~ ndr1_0
| c2_1(X0)
| hskp56
| hskp22 ),
inference(cnf_transformation,[],[f305]) ).
cnf(c_68,negated_conjecture,
( ~ c0_1(X0)
| ~ ndr1_0
| c3_1(X0)
| c1_1(X0)
| hskp20
| hskp19 ),
inference(cnf_transformation,[],[f303]) ).
cnf(c_69,negated_conjecture,
( hskp18
| hskp17
| hskp39 ),
inference(cnf_transformation,[],[f302]) ).
cnf(c_70,negated_conjecture,
( ~ c2_1(X0)
| ~ c3_1(X0)
| ~ c1_1(X0)
| ~ c1_1(X1)
| ~ c0_1(X1)
| ~ c0_1(X2)
| ~ ndr1_0
| c3_1(X1)
| c3_1(X2)
| c1_1(X2) ),
inference(cnf_transformation,[],[f335]) ).
cnf(c_72,negated_conjecture,
( ~ c2_1(X0)
| ~ c2_1(X1)
| ~ c3_1(X0)
| ~ c3_1(X1)
| ~ c0_1(X1)
| ~ ndr1_0
| c1_1(X0)
| hskp53 ),
inference(cnf_transformation,[],[f336]) ).
cnf(c_74,negated_conjecture,
( ~ c2_1(X0)
| ~ c0_1(X1)
| ~ ndr1_0
| c2_1(X2)
| c3_1(X1)
| c3_1(X2)
| c1_1(X0)
| c1_1(X1)
| c1_1(X2)
| c0_1(X0) ),
inference(cnf_transformation,[],[f337]) ).
cnf(c_77,negated_conjecture,
( ~ c2_1(X0)
| ~ c2_1(X1)
| ~ ndr1_0
| c3_1(X0)
| c3_1(X2)
| c1_1(X0)
| c1_1(X1)
| c1_1(X2)
| c0_1(X1)
| c0_1(X2) ),
inference(cnf_transformation,[],[f338]) ).
cnf(c_79,negated_conjecture,
( ~ c3_1(X0)
| ~ c0_1(X0)
| ~ ndr1_0
| c2_1(X0)
| c3_1(X1)
| c1_1(X1)
| c0_1(X1)
| hskp49 ),
inference(cnf_transformation,[],[f340]) ).
cnf(c_82,negated_conjecture,
( ~ c3_1(X0)
| ~ ndr1_0
| c2_1(X0)
| c0_1(X0)
| hskp33
| hskp15 ),
inference(cnf_transformation,[],[f289]) ).
cnf(c_84,negated_conjecture,
( ~ c2_1(X0)
| ~ c2_1(X1)
| ~ c0_1(X0)
| ~ c0_1(X1)
| ~ ndr1_0
| c3_1(X0)
| c1_1(X1)
| hskp47 ),
inference(cnf_transformation,[],[f341]) ).
cnf(c_89,negated_conjecture,
( ~ c3_1(X0)
| ~ c1_1(X1)
| ~ c0_1(X0)
| ~ c0_1(X1)
| ~ ndr1_0
| c2_1(X1)
| c1_1(X0)
| hskp4 ),
inference(cnf_transformation,[],[f343]) ).
cnf(c_90,negated_conjecture,
( ~ c2_1(X0)
| ~ c3_1(X1)
| ~ c1_1(X1)
| ~ ndr1_0
| c2_1(X1)
| c1_1(X0)
| c0_1(X0)
| hskp42 ),
inference(cnf_transformation,[],[f344]) ).
cnf(c_92,negated_conjecture,
( ~ c2_1(X0)
| ~ c3_1(X1)
| ~ c1_1(X0)
| ~ c0_1(X0)
| ~ c0_1(X1)
| ~ ndr1_0
| c2_1(X1)
| hskp12 ),
inference(cnf_transformation,[],[f345]) ).
cnf(c_94,negated_conjecture,
( ~ c3_1(X0)
| ~ c3_1(X1)
| ~ c0_1(X0)
| ~ c0_1(X1)
| ~ ndr1_0
| c2_1(X1)
| c1_1(X0)
| hskp38 ),
inference(cnf_transformation,[],[f346]) ).
cnf(c_95,negated_conjecture,
( ~ ndr1_0
| c2_1(X0)
| c3_1(X0)
| c0_1(X0)
| hskp10 ),
inference(cnf_transformation,[],[f276]) ).
cnf(c_100,negated_conjecture,
( ~ c1_1(X0)
| ~ c0_1(X1)
| ~ ndr1_0
| c2_1(X0)
| c3_1(X0)
| c3_1(X1)
| c1_1(X1)
| hskp34 ),
inference(cnf_transformation,[],[f349]) ).
cnf(c_101,negated_conjecture,
( ~ c2_1(X0)
| ~ c3_1(X0)
| ~ c1_1(X0)
| ~ c1_1(X1)
| ~ ndr1_0
| c2_1(X1)
| c0_1(X1)
| hskp33 ),
inference(cnf_transformation,[],[f350]) ).
cnf(c_107,negated_conjecture,
( ~ c2_1(X0)
| ~ c3_1(X1)
| ~ c0_1(X0)
| ~ ndr1_0
| c2_1(X1)
| c1_1(X0)
| c1_1(X1)
| hskp1 ),
inference(cnf_transformation,[],[f354]) ).
cnf(c_108,negated_conjecture,
( hskp30
| hskp29
| hskp0 ),
inference(cnf_transformation,[],[f263]) ).
cnf(c_133,negated_conjecture,
( ~ hskp57
| c3_1(a1085) ),
inference(cnf_transformation,[],[f238]) ).
cnf(c_134,negated_conjecture,
( ~ hskp57
| c0_1(a1085) ),
inference(cnf_transformation,[],[f237]) ).
cnf(c_135,negated_conjecture,
( ~ hskp57
| c2_1(a1085) ),
inference(cnf_transformation,[],[f236]) ).
cnf(c_137,negated_conjecture,
( ~ hskp56
| c0_1(a1084) ),
inference(cnf_transformation,[],[f234]) ).
cnf(c_138,negated_conjecture,
( ~ c1_1(a1084)
| ~ hskp56 ),
inference(cnf_transformation,[],[f233]) ).
cnf(c_139,negated_conjecture,
( ~ c3_1(a1084)
| ~ hskp56 ),
inference(cnf_transformation,[],[f232]) ).
cnf(c_149,negated_conjecture,
( ~ hskp53
| c0_1(a1073) ),
inference(cnf_transformation,[],[f222]) ).
cnf(c_150,negated_conjecture,
( ~ hskp53
| c2_1(a1073) ),
inference(cnf_transformation,[],[f221]) ).
cnf(c_151,negated_conjecture,
( ~ hskp53
| c1_1(a1073) ),
inference(cnf_transformation,[],[f220]) ).
cnf(c_165,negated_conjecture,
( ~ hskp49
| c1_1(a1065) ),
inference(cnf_transformation,[],[f206]) ).
cnf(c_166,negated_conjecture,
( ~ c2_1(a1065)
| ~ hskp49 ),
inference(cnf_transformation,[],[f205]) ).
cnf(c_167,negated_conjecture,
( ~ c0_1(a1065)
| ~ hskp49 ),
inference(cnf_transformation,[],[f204]) ).
cnf(c_173,negated_conjecture,
( ~ hskp47
| c3_1(a1056) ),
inference(cnf_transformation,[],[f198]) ).
cnf(c_174,negated_conjecture,
( ~ hskp47
| c1_1(a1056) ),
inference(cnf_transformation,[],[f197]) ).
cnf(c_175,negated_conjecture,
( ~ hskp47
| c2_1(a1056) ),
inference(cnf_transformation,[],[f196]) ).
cnf(c_193,negated_conjecture,
( ~ hskp42
| c0_1(a1046) ),
inference(cnf_transformation,[],[f178]) ).
cnf(c_194,negated_conjecture,
( ~ hskp42
| c1_1(a1046) ),
inference(cnf_transformation,[],[f177]) ).
cnf(c_195,negated_conjecture,
( ~ c2_1(a1046)
| ~ hskp42 ),
inference(cnf_transformation,[],[f176]) ).
cnf(c_205,negated_conjecture,
( ~ hskp39
| c2_1(a1042) ),
inference(cnf_transformation,[],[f166]) ).
cnf(c_206,negated_conjecture,
( ~ c1_1(a1042)
| ~ hskp39 ),
inference(cnf_transformation,[],[f165]) ).
cnf(c_207,negated_conjecture,
( ~ hskp39
| c0_1(a1042) ),
inference(cnf_transformation,[],[f164]) ).
cnf(c_209,negated_conjecture,
( ~ hskp38
| c2_1(a1040) ),
inference(cnf_transformation,[],[f162]) ).
cnf(c_210,negated_conjecture,
( ~ hskp38
| c3_1(a1040) ),
inference(cnf_transformation,[],[f161]) ).
cnf(c_211,negated_conjecture,
( ~ hskp38
| c1_1(a1040) ),
inference(cnf_transformation,[],[f160]) ).
cnf(c_221,negated_conjecture,
( ~ hskp35
| c3_1(a1033) ),
inference(cnf_transformation,[],[f150]) ).
cnf(c_222,negated_conjecture,
( ~ hskp35
| c1_1(a1033) ),
inference(cnf_transformation,[],[f149]) ).
cnf(c_223,negated_conjecture,
( ~ hskp35
| c0_1(a1033) ),
inference(cnf_transformation,[],[f148]) ).
cnf(c_225,negated_conjecture,
( ~ hskp34
| c3_1(a1032) ),
inference(cnf_transformation,[],[f146]) ).
cnf(c_226,negated_conjecture,
( ~ c1_1(a1032)
| ~ hskp34 ),
inference(cnf_transformation,[],[f145]) ).
cnf(c_227,negated_conjecture,
( ~ c2_1(a1032)
| ~ hskp34 ),
inference(cnf_transformation,[],[f144]) ).
cnf(c_229,negated_conjecture,
( ~ hskp33
| c2_1(a1031) ),
inference(cnf_transformation,[],[f142]) ).
cnf(c_230,negated_conjecture,
( ~ c1_1(a1031)
| ~ hskp33 ),
inference(cnf_transformation,[],[f141]) ).
cnf(c_231,negated_conjecture,
( ~ hskp33
| c3_1(a1031) ),
inference(cnf_transformation,[],[f140]) ).
cnf(c_241,negated_conjecture,
( ~ hskp30
| c1_1(a1022) ),
inference(cnf_transformation,[],[f130]) ).
cnf(c_242,negated_conjecture,
( ~ hskp30
| c3_1(a1022) ),
inference(cnf_transformation,[],[f129]) ).
cnf(c_243,negated_conjecture,
( ~ c2_1(a1022)
| ~ hskp30 ),
inference(cnf_transformation,[],[f128]) ).
cnf(c_244,negated_conjecture,
( ~ hskp30
| ndr1_0 ),
inference(cnf_transformation,[],[f127]) ).
cnf(c_245,negated_conjecture,
( ~ hskp29
| c2_1(a1021) ),
inference(cnf_transformation,[],[f126]) ).
cnf(c_246,negated_conjecture,
( ~ c3_1(a1021)
| ~ hskp29 ),
inference(cnf_transformation,[],[f125]) ).
cnf(c_247,negated_conjecture,
( ~ c1_1(a1021)
| ~ hskp29 ),
inference(cnf_transformation,[],[f124]) ).
cnf(c_248,negated_conjecture,
( ~ hskp29
| ndr1_0 ),
inference(cnf_transformation,[],[f123]) ).
cnf(c_261,negated_conjecture,
( ~ c2_1(a1091)
| ~ hskp25 ),
inference(cnf_transformation,[],[f110]) ).
cnf(c_262,negated_conjecture,
( ~ c0_1(a1091)
| ~ hskp25 ),
inference(cnf_transformation,[],[f109]) ).
cnf(c_263,negated_conjecture,
( ~ c3_1(a1091)
| ~ hskp25 ),
inference(cnf_transformation,[],[f108]) ).
cnf(c_273,negated_conjecture,
( ~ c1_1(a1083)
| ~ hskp22 ),
inference(cnf_transformation,[],[f98]) ).
cnf(c_274,negated_conjecture,
( ~ hskp22
| c3_1(a1083) ),
inference(cnf_transformation,[],[f97]) ).
cnf(c_275,negated_conjecture,
( ~ hskp22
| c2_1(a1083) ),
inference(cnf_transformation,[],[f96]) ).
cnf(c_281,negated_conjecture,
( ~ c1_1(a1080)
| ~ hskp20 ),
inference(cnf_transformation,[],[f90]) ).
cnf(c_282,negated_conjecture,
( ~ c2_1(a1080)
| ~ hskp20 ),
inference(cnf_transformation,[],[f89]) ).
cnf(c_283,negated_conjecture,
( ~ c0_1(a1080)
| ~ hskp20 ),
inference(cnf_transformation,[],[f88]) ).
cnf(c_285,negated_conjecture,
( ~ c2_1(a1079)
| ~ hskp19 ),
inference(cnf_transformation,[],[f86]) ).
cnf(c_286,negated_conjecture,
( ~ c0_1(a1079)
| ~ hskp19 ),
inference(cnf_transformation,[],[f85]) ).
cnf(c_287,negated_conjecture,
( ~ hskp19
| c1_1(a1079) ),
inference(cnf_transformation,[],[f84]) ).
cnf(c_289,negated_conjecture,
( ~ c1_1(a1078)
| ~ hskp18 ),
inference(cnf_transformation,[],[f82]) ).
cnf(c_290,negated_conjecture,
( ~ hskp18
| c0_1(a1078) ),
inference(cnf_transformation,[],[f81]) ).
cnf(c_291,negated_conjecture,
( ~ hskp18
| c2_1(a1078) ),
inference(cnf_transformation,[],[f80]) ).
cnf(c_293,negated_conjecture,
( ~ c2_1(a1077)
| ~ hskp17 ),
inference(cnf_transformation,[],[f78]) ).
cnf(c_294,negated_conjecture,
( ~ hskp17
| c3_1(a1077) ),
inference(cnf_transformation,[],[f77]) ).
cnf(c_295,negated_conjecture,
( ~ c0_1(a1077)
| ~ hskp17 ),
inference(cnf_transformation,[],[f76]) ).
cnf(c_301,negated_conjecture,
( ~ c1_1(a1059)
| ~ hskp15 ),
inference(cnf_transformation,[],[f70]) ).
cnf(c_302,negated_conjecture,
( ~ hskp15
| c2_1(a1059) ),
inference(cnf_transformation,[],[f69]) ).
cnf(c_303,negated_conjecture,
( ~ hskp15
| c3_1(a1059) ),
inference(cnf_transformation,[],[f68]) ).
cnf(c_313,negated_conjecture,
( ~ c3_1(a1043)
| ~ hskp12 ),
inference(cnf_transformation,[],[f58]) ).
cnf(c_314,negated_conjecture,
( ~ hskp12
| c0_1(a1043) ),
inference(cnf_transformation,[],[f57]) ).
cnf(c_315,negated_conjecture,
( ~ c1_1(a1043)
| ~ hskp12 ),
inference(cnf_transformation,[],[f56]) ).
cnf(c_321,negated_conjecture,
( ~ c0_1(a1039)
| ~ hskp10 ),
inference(cnf_transformation,[],[f50]) ).
cnf(c_322,negated_conjecture,
( ~ c2_1(a1039)
| ~ hskp10 ),
inference(cnf_transformation,[],[f49]) ).
cnf(c_323,negated_conjecture,
( ~ hskp10
| c1_1(a1039) ),
inference(cnf_transformation,[],[f48]) ).
cnf(c_357,negated_conjecture,
( ~ c0_1(a1023)
| ~ hskp1 ),
inference(cnf_transformation,[],[f14]) ).
cnf(c_358,negated_conjecture,
( ~ c1_1(a1023)
| ~ hskp1 ),
inference(cnf_transformation,[],[f13]) ).
cnf(c_359,negated_conjecture,
( ~ hskp1
| c2_1(a1023) ),
inference(cnf_transformation,[],[f12]) ).
cnf(c_361,negated_conjecture,
( ~ c2_1(a1020)
| ~ hskp0 ),
inference(cnf_transformation,[],[f10]) ).
cnf(c_362,negated_conjecture,
( ~ c1_1(a1020)
| ~ hskp0 ),
inference(cnf_transformation,[],[f9]) ).
cnf(c_363,negated_conjecture,
( ~ hskp0
| c0_1(a1020) ),
inference(cnf_transformation,[],[f8]) ).
cnf(c_364,negated_conjecture,
( ~ hskp0
| ndr1_0 ),
inference(cnf_transformation,[],[f7]) ).
cnf(c_389,plain,
( ~ c3_1(a1020)
| ~ c0_1(a1020)
| ~ ndr1_0
| c2_1(a1020)
| c1_1(a1020)
| hskp38 ),
inference(instantiation,[status(thm)],[c_94]) ).
cnf(c_395,negated_conjecture,
ndr1_0,
inference(global_subsumption_just,[status(thm)],[c_364,c_364,c_248,c_244,c_108]) ).
cnf(c_523,negated_conjecture,
( c2_1(X0)
| c3_1(X0)
| c0_1(X0)
| hskp10 ),
inference(global_subsumption_just,[status(thm)],[c_95,c_364,c_248,c_244,c_108,c_95]) ).
cnf(c_535,negated_conjecture,
( ~ c3_1(X0)
| c2_1(X0)
| c0_1(X0)
| hskp33
| hskp15 ),
inference(global_subsumption_just,[status(thm)],[c_82,c_364,c_248,c_244,c_108,c_82]) ).
cnf(c_544,negated_conjecture,
( ~ c0_1(X0)
| c3_1(X0)
| c1_1(X0)
| hskp20
| hskp19 ),
inference(global_subsumption_just,[status(thm)],[c_68,c_364,c_248,c_244,c_108,c_68]) ).
cnf(c_580,plain,
( ~ c1_1(X0)
| ~ c3_1(X0)
| c2_1(X0)
| hskp56
| hskp22 ),
inference(global_subsumption_just,[status(thm)],[c_66,c_364,c_248,c_244,c_108,c_66]) ).
cnf(c_581,negated_conjecture,
( ~ c3_1(X0)
| ~ c1_1(X0)
| c2_1(X0)
| hskp56
| hskp22 ),
inference(renaming,[status(thm)],[c_580]) ).
cnf(c_600,plain,
( ~ c0_1(X1)
| ~ c1_1(X0)
| c2_1(X0)
| c3_1(X0)
| c3_1(X1)
| c1_1(X1)
| hskp34 ),
inference(global_subsumption_just,[status(thm)],[c_100,c_364,c_248,c_244,c_108,c_100]) ).
cnf(c_601,negated_conjecture,
( ~ c1_1(X0)
| ~ c0_1(X1)
| c2_1(X0)
| c3_1(X0)
| c3_1(X1)
| c1_1(X1)
| hskp34 ),
inference(renaming,[status(thm)],[c_600]) ).
cnf(c_602,plain,
( ~ c0_1(X0)
| ~ c3_1(X0)
| c2_1(X0)
| c3_1(X1)
| c1_1(X1)
| c0_1(X1)
| hskp49 ),
inference(global_subsumption_just,[status(thm)],[c_79,c_364,c_248,c_244,c_108,c_79]) ).
cnf(c_603,negated_conjecture,
( ~ c3_1(X0)
| ~ c0_1(X0)
| c2_1(X0)
| c3_1(X1)
| c1_1(X1)
| c0_1(X1)
| hskp49 ),
inference(renaming,[status(thm)],[c_602]) ).
cnf(c_606,plain,
( ~ c0_1(X0)
| ~ c3_1(X1)
| ~ c2_1(X0)
| c2_1(X1)
| c1_1(X0)
| c1_1(X1)
| hskp1 ),
inference(global_subsumption_just,[status(thm)],[c_107,c_364,c_248,c_244,c_108,c_107]) ).
cnf(c_607,negated_conjecture,
( ~ c2_1(X0)
| ~ c3_1(X1)
| ~ c0_1(X0)
| c2_1(X1)
| c1_1(X0)
| c1_1(X1)
| hskp1 ),
inference(renaming,[status(thm)],[c_606]) ).
cnf(c_612,plain,
( ~ c1_1(X1)
| ~ c3_1(X1)
| ~ c2_1(X0)
| c2_1(X1)
| c1_1(X0)
| c0_1(X0)
| hskp42 ),
inference(global_subsumption_just,[status(thm)],[c_90,c_364,c_248,c_244,c_108,c_90]) ).
cnf(c_613,negated_conjecture,
( ~ c2_1(X0)
| ~ c3_1(X1)
| ~ c1_1(X1)
| c2_1(X1)
| c1_1(X0)
| c0_1(X0)
| hskp42 ),
inference(renaming,[status(thm)],[c_612]) ).
cnf(c_614,plain,
( ~ c1_1(X1)
| ~ c3_1(X1)
| ~ c3_1(X0)
| c2_1(X0)
| c2_1(X1)
| c1_1(X0)
| hskp58 ),
inference(global_subsumption_just,[status(thm)],[c_63,c_364,c_248,c_244,c_108,c_63]) ).
cnf(c_615,negated_conjecture,
( ~ c3_1(X0)
| ~ c3_1(X1)
| ~ c1_1(X1)
| c2_1(X0)
| c2_1(X1)
| c1_1(X0)
| hskp58 ),
inference(renaming,[status(thm)],[c_614]) ).
cnf(c_616,plain,
( ~ c1_1(X1)
| ~ c3_1(X1)
| ~ c3_1(X0)
| c2_1(X0)
| c2_1(X1)
| c0_1(X0)
| hskp59 ),
inference(global_subsumption_just,[status(thm)],[c_54,c_54,c_395]) ).
cnf(c_617,negated_conjecture,
( ~ c3_1(X0)
| ~ c3_1(X1)
| ~ c1_1(X1)
| c2_1(X0)
| c2_1(X1)
| c0_1(X0)
| hskp59 ),
inference(renaming,[status(thm)],[c_616]) ).
cnf(c_619,plain,
( ~ c1_1(X1)
| ~ c3_1(X0)
| ~ c2_1(X0)
| c2_1(X1)
| c3_1(X1)
| c0_1(X0)
| hskp35 ),
inference(global_subsumption_just,[status(thm)],[c_53,c_364,c_248,c_244,c_108,c_53]) ).
cnf(c_620,negated_conjecture,
( ~ c2_1(X0)
| ~ c3_1(X0)
| ~ c1_1(X1)
| c2_1(X1)
| c3_1(X1)
| c0_1(X0)
| hskp35 ),
inference(renaming,[status(thm)],[c_619]) ).
cnf(c_623,plain,
( ~ c1_1(X1)
| ~ c1_1(X0)
| ~ c3_1(X0)
| ~ c2_1(X0)
| c2_1(X1)
| c0_1(X1)
| hskp33 ),
inference(global_subsumption_just,[status(thm)],[c_101,c_364,c_248,c_244,c_108,c_101]) ).
cnf(c_624,negated_conjecture,
( ~ c2_1(X0)
| ~ c3_1(X0)
| ~ c1_1(X0)
| ~ c1_1(X1)
| c2_1(X1)
| c0_1(X1)
| hskp33 ),
inference(renaming,[status(thm)],[c_623]) ).
cnf(c_625,plain,
( ~ c0_1(X1)
| ~ c0_1(X0)
| ~ c3_1(X1)
| ~ c3_1(X0)
| c2_1(X1)
| c1_1(X0)
| hskp38 ),
inference(global_subsumption_just,[status(thm)],[c_94,c_364,c_248,c_244,c_108,c_94]) ).
cnf(c_626,negated_conjecture,
( ~ c3_1(X0)
| ~ c3_1(X1)
| ~ c0_1(X0)
| ~ c0_1(X1)
| c2_1(X1)
| c1_1(X0)
| hskp38 ),
inference(renaming,[status(thm)],[c_625]) ).
cnf(c_628,plain,
( ~ c0_1(X1)
| ~ c0_1(X0)
| ~ c1_1(X1)
| ~ c3_1(X0)
| c2_1(X1)
| c1_1(X0)
| hskp4 ),
inference(global_subsumption_just,[status(thm)],[c_89,c_364,c_248,c_244,c_108,c_89]) ).
cnf(c_629,negated_conjecture,
( ~ c3_1(X0)
| ~ c1_1(X1)
| ~ c0_1(X0)
| ~ c0_1(X1)
| c2_1(X1)
| c1_1(X0)
| hskp4 ),
inference(renaming,[status(thm)],[c_628]) ).
cnf(c_630,plain,
( ~ c0_1(X1)
| ~ c0_1(X0)
| ~ c2_1(X1)
| ~ c2_1(X0)
| c3_1(X0)
| c1_1(X1)
| hskp47 ),
inference(global_subsumption_just,[status(thm)],[c_84,c_364,c_248,c_244,c_108,c_84]) ).
cnf(c_631,negated_conjecture,
( ~ c2_1(X0)
| ~ c2_1(X1)
| ~ c0_1(X0)
| ~ c0_1(X1)
| c3_1(X0)
| c1_1(X1)
| hskp47 ),
inference(renaming,[status(thm)],[c_630]) ).
cnf(c_633,plain,
( ~ c0_1(X1)
| ~ c3_1(X1)
| ~ c3_1(X0)
| ~ c2_1(X0)
| c2_1(X1)
| c1_1(X0)
| hskp57 ),
inference(global_subsumption_just,[status(thm)],[c_64,c_364,c_248,c_244,c_108,c_64]) ).
cnf(c_634,negated_conjecture,
( ~ c2_1(X0)
| ~ c3_1(X0)
| ~ c3_1(X1)
| ~ c0_1(X1)
| c2_1(X1)
| c1_1(X0)
| hskp57 ),
inference(renaming,[status(thm)],[c_633]) ).
cnf(c_635,plain,
( ~ c1_1(X1)
| ~ c1_1(X0)
| ~ c3_1(X0)
| ~ c2_1(X0)
| c2_1(X1)
| c0_1(X1)
| hskp25 ),
inference(global_subsumption_just,[status(thm)],[c_59,c_364,c_248,c_244,c_108,c_59]) ).
cnf(c_636,negated_conjecture,
( ~ c2_1(X0)
| ~ c3_1(X0)
| ~ c1_1(X0)
| ~ c1_1(X1)
| c2_1(X1)
| c0_1(X1)
| hskp25 ),
inference(renaming,[status(thm)],[c_635]) ).
cnf(c_639,plain,
( ~ c0_1(X1)
| ~ c0_1(X0)
| ~ c1_1(X0)
| ~ c3_1(X1)
| ~ c2_1(X0)
| c2_1(X1)
| hskp12 ),
inference(global_subsumption_just,[status(thm)],[c_92,c_364,c_248,c_244,c_108,c_92]) ).
cnf(c_640,negated_conjecture,
( ~ c2_1(X0)
| ~ c3_1(X1)
| ~ c1_1(X0)
| ~ c0_1(X0)
| ~ c0_1(X1)
| c2_1(X1)
| hskp12 ),
inference(renaming,[status(thm)],[c_639]) ).
cnf(c_643,plain,
( ~ c0_1(X1)
| ~ c3_1(X1)
| ~ c3_1(X0)
| ~ c2_1(X1)
| ~ c2_1(X0)
| c1_1(X0)
| hskp53 ),
inference(global_subsumption_just,[status(thm)],[c_72,c_364,c_248,c_244,c_108,c_72]) ).
cnf(c_644,negated_conjecture,
( ~ c2_1(X0)
| ~ c2_1(X1)
| ~ c3_1(X0)
| ~ c3_1(X1)
| ~ c0_1(X1)
| c1_1(X0)
| hskp53 ),
inference(renaming,[status(thm)],[c_643]) ).
cnf(c_649,plain,
( ~ c2_1(X1)
| ~ c2_1(X0)
| c3_1(X0)
| c3_1(X2)
| c1_1(X0)
| c1_1(X1)
| c1_1(X2)
| c0_1(X1)
| c0_1(X2) ),
inference(global_subsumption_just,[status(thm)],[c_77,c_364,c_248,c_244,c_108,c_77]) ).
cnf(c_650,negated_conjecture,
( ~ c2_1(X0)
| ~ c2_1(X1)
| c3_1(X0)
| c3_1(X2)
| c1_1(X0)
| c1_1(X1)
| c1_1(X2)
| c0_1(X1)
| c0_1(X2) ),
inference(renaming,[status(thm)],[c_649]) ).
cnf(c_652,plain,
( ~ c0_1(X1)
| ~ c2_1(X0)
| c2_1(X2)
| c3_1(X1)
| c3_1(X2)
| c1_1(X0)
| c1_1(X1)
| c1_1(X2)
| c0_1(X0) ),
inference(global_subsumption_just,[status(thm)],[c_74,c_364,c_248,c_244,c_108,c_74]) ).
cnf(c_653,negated_conjecture,
( ~ c2_1(X0)
| ~ c0_1(X1)
| c2_1(X2)
| c3_1(X1)
| c3_1(X2)
| c1_1(X0)
| c1_1(X1)
| c1_1(X2)
| c0_1(X0) ),
inference(renaming,[status(thm)],[c_652]) ).
cnf(c_654,plain,
( ~ c1_1(X1)
| ~ c1_1(X0)
| c2_1(X0)
| c2_1(X1)
| c3_1(X0)
| c3_1(X2)
| c1_1(X2)
| c0_1(X1)
| c0_1(X2) ),
inference(global_subsumption_just,[status(thm)],[c_65,c_364,c_248,c_244,c_108,c_65]) ).
cnf(c_655,negated_conjecture,
( ~ c1_1(X0)
| ~ c1_1(X1)
| c2_1(X0)
| c2_1(X1)
| c3_1(X0)
| c3_1(X2)
| c1_1(X2)
| c0_1(X1)
| c0_1(X2) ),
inference(renaming,[status(thm)],[c_654]) ).
cnf(c_656,plain,
( ~ c3_1(X1)
| ~ c2_1(X1)
| ~ c2_1(X0)
| c2_1(X2)
| c3_1(X0)
| c1_1(X0)
| c1_1(X2)
| c0_1(X1)
| c0_1(X2) ),
inference(global_subsumption_just,[status(thm)],[c_56,c_364,c_248,c_244,c_108,c_56]) ).
cnf(c_657,negated_conjecture,
( ~ c2_1(X0)
| ~ c2_1(X1)
| ~ c3_1(X1)
| c2_1(X2)
| c3_1(X0)
| c1_1(X0)
| c1_1(X2)
| c0_1(X1)
| c0_1(X2) ),
inference(renaming,[status(thm)],[c_656]) ).
cnf(c_658,plain,
( ~ c0_1(X2)
| ~ c0_1(X1)
| ~ c1_1(X1)
| ~ c1_1(X0)
| ~ c3_1(X0)
| ~ c2_1(X0)
| c3_1(X1)
| c3_1(X2)
| c1_1(X2) ),
inference(global_subsumption_just,[status(thm)],[c_70,c_364,c_248,c_244,c_108,c_70]) ).
cnf(c_659,negated_conjecture,
( ~ c2_1(X0)
| ~ c3_1(X0)
| ~ c1_1(X0)
| ~ c1_1(X1)
| ~ c0_1(X1)
| ~ c0_1(X2)
| c3_1(X1)
| c3_1(X2)
| c1_1(X2) ),
inference(renaming,[status(thm)],[c_658]) ).
cnf(c_660,plain,
( ~ c0_1(X2)
| ~ c0_1(X1)
| ~ c0_1(X0)
| ~ c1_1(X2)
| ~ c1_1(X0)
| ~ c3_1(X1)
| ~ c2_1(X2)
| ~ c2_1(X1)
| ~ c2_1(X0) ),
inference(global_subsumption_just,[status(thm)],[c_55,c_364,c_248,c_244,c_108,c_55]) ).
cnf(c_661,negated_conjecture,
( ~ c2_1(X0)
| ~ c2_1(X1)
| ~ c2_1(X2)
| ~ c3_1(X1)
| ~ c1_1(X0)
| ~ c1_1(X2)
| ~ c0_1(X0)
| ~ c0_1(X1)
| ~ c0_1(X2) ),
inference(renaming,[status(thm)],[c_660]) ).
cnf(c_2319,plain,
( ~ c2_1(a1022)
| hskp29
| hskp0 ),
inference(resolution,[status(thm)],[c_108,c_243]) ).
cnf(c_2329,plain,
( c3_1(a1022)
| hskp29
| hskp0 ),
inference(resolution,[status(thm)],[c_108,c_242]) ).
cnf(c_2339,plain,
( c1_1(a1022)
| hskp29
| hskp0 ),
inference(resolution,[status(thm)],[c_108,c_241]) ).
cnf(c_5580,plain,
( c1_1(a1022)
| c0_1(a1020)
| hskp29 ),
inference(resolution,[status(thm)],[c_2339,c_363]) ).
cnf(c_5590,plain,
( ~ c1_1(a1020)
| c1_1(a1022)
| hskp29 ),
inference(resolution,[status(thm)],[c_2339,c_362]) ).
cnf(c_5600,plain,
( ~ c2_1(a1020)
| c1_1(a1022)
| hskp29 ),
inference(resolution,[status(thm)],[c_2339,c_361]) ).
cnf(c_5610,plain,
( c3_1(a1022)
| c0_1(a1020)
| hskp29 ),
inference(resolution,[status(thm)],[c_2329,c_363]) ).
cnf(c_5620,plain,
( ~ c1_1(a1020)
| c3_1(a1022)
| hskp29 ),
inference(resolution,[status(thm)],[c_2329,c_362]) ).
cnf(c_5630,plain,
( ~ c2_1(a1020)
| c3_1(a1022)
| hskp29 ),
inference(resolution,[status(thm)],[c_2329,c_361]) ).
cnf(c_5640,plain,
( ~ c2_1(a1022)
| c0_1(a1020)
| hskp29 ),
inference(resolution,[status(thm)],[c_2319,c_363]) ).
cnf(c_5650,plain,
( ~ c2_1(a1022)
| ~ c1_1(a1020)
| hskp29 ),
inference(resolution,[status(thm)],[c_2319,c_362]) ).
cnf(c_5660,plain,
( ~ c2_1(a1022)
| ~ c2_1(a1020)
| hskp29 ),
inference(resolution,[status(thm)],[c_2319,c_361]) ).
cnf(c_16516,negated_conjecture,
( ~ c0_1(X0)
| ~ c3_1(X0)
| ~ c2_1(X0)
| ~ sP0_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP0_iProver_split])],[c_661]) ).
cnf(c_16517,negated_conjecture,
( ~ c0_1(X0)
| ~ c1_1(X0)
| ~ c2_1(X0)
| ~ sP1_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP1_iProver_split])],[c_661]) ).
cnf(c_16518,negated_conjecture,
( sP0_iProver_split
| sP1_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_661]) ).
cnf(c_16520,negated_conjecture,
( ~ c0_1(X0)
| c1_1(X0)
| c3_1(X0)
| ~ sP3_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP3_iProver_split])],[c_659]) ).
cnf(c_16521,negated_conjecture,
( ~ c1_1(X0)
| ~ c3_1(X0)
| ~ c2_1(X0)
| ~ sP4_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP4_iProver_split])],[c_659]) ).
cnf(c_16523,negated_conjecture,
( c0_1(X0)
| ~ c3_1(X0)
| ~ c2_1(X0)
| ~ sP5_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP5_iProver_split])],[c_657]) ).
cnf(c_16524,negated_conjecture,
( c0_1(X0)
| c1_1(X0)
| c2_1(X0)
| ~ sP6_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP6_iProver_split])],[c_657]) ).
cnf(c_16525,negated_conjecture,
( c1_1(X0)
| c3_1(X0)
| ~ c2_1(X0)
| ~ sP7_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP7_iProver_split])],[c_657]) ).
cnf(c_16526,negated_conjecture,
( sP5_iProver_split
| sP6_iProver_split
| sP7_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_657]) ).
cnf(c_16527,negated_conjecture,
( c0_1(X0)
| ~ c1_1(X0)
| c2_1(X0)
| ~ sP8_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP8_iProver_split])],[c_655]) ).
cnf(c_16528,negated_conjecture,
( c0_1(X0)
| c1_1(X0)
| c3_1(X0)
| ~ sP9_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP9_iProver_split])],[c_655]) ).
cnf(c_16529,negated_conjecture,
( ~ c1_1(X0)
| c3_1(X0)
| c2_1(X0)
| ~ sP10_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP10_iProver_split])],[c_655]) ).
cnf(c_16531,negated_conjecture,
( c1_1(X0)
| c3_1(X0)
| c2_1(X0)
| ~ sP11_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP11_iProver_split])],[c_653]) ).
cnf(c_16532,negated_conjecture,
( c0_1(X0)
| c1_1(X0)
| ~ c2_1(X0)
| ~ sP12_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP12_iProver_split])],[c_653]) ).
cnf(c_16533,negated_conjecture,
( sP3_iProver_split
| sP11_iProver_split
| sP12_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_653]) ).
cnf(c_16534,negated_conjecture,
( sP7_iProver_split
| sP9_iProver_split
| sP12_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_650]) ).
cnf(c_16537,negated_conjecture,
( c1_1(X0)
| ~ c3_1(X0)
| ~ c2_1(X0)
| ~ sP14_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP14_iProver_split])],[c_644]) ).
cnf(c_16538,negated_conjecture,
( hskp53
| sP0_iProver_split
| sP14_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_644]) ).
cnf(c_16540,negated_conjecture,
( ~ c0_1(X0)
| ~ c3_1(X0)
| c2_1(X0)
| ~ sP15_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP15_iProver_split])],[c_640]) ).
cnf(c_16541,negated_conjecture,
( hskp12
| sP1_iProver_split
| sP15_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_640]) ).
cnf(c_16544,negated_conjecture,
( hskp25
| sP4_iProver_split
| sP8_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_636]) ).
cnf(c_16545,negated_conjecture,
( hskp57
| sP14_iProver_split
| sP15_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_634]) ).
cnf(c_16546,negated_conjecture,
( ~ c0_1(X0)
| c1_1(X0)
| ~ c2_1(X0)
| ~ sP17_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP17_iProver_split])],[c_631]) ).
cnf(c_16547,negated_conjecture,
( ~ c0_1(X0)
| c3_1(X0)
| ~ c2_1(X0)
| ~ sP18_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP18_iProver_split])],[c_631]) ).
cnf(c_16548,negated_conjecture,
( hskp47
| sP17_iProver_split
| sP18_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_631]) ).
cnf(c_16550,negated_conjecture,
( ~ c0_1(X0)
| c1_1(X0)
| ~ c3_1(X0)
| ~ sP20_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP20_iProver_split])],[c_629]) ).
cnf(c_16552,negated_conjecture,
( hskp38
| sP15_iProver_split
| sP20_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_626]) ).
cnf(c_16553,negated_conjecture,
( hskp33
| sP4_iProver_split
| sP8_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_624]) ).
cnf(c_16555,negated_conjecture,
( hskp35
| sP5_iProver_split
| sP10_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_620]) ).
cnf(c_16556,negated_conjecture,
( ~ c1_1(X0)
| ~ c3_1(X0)
| c2_1(X0)
| ~ sP21_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP21_iProver_split])],[c_617]) ).
cnf(c_16557,negated_conjecture,
( c0_1(X0)
| ~ c3_1(X0)
| c2_1(X0)
| ~ sP22_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP22_iProver_split])],[c_617]) ).
cnf(c_16559,negated_conjecture,
( c1_1(X0)
| ~ c3_1(X0)
| c2_1(X0)
| ~ sP23_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[sP23_iProver_split])],[c_615]) ).
cnf(c_16561,negated_conjecture,
( hskp42
| sP12_iProver_split
| sP21_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_613]) ).
cnf(c_16566,negated_conjecture,
( hskp1
| sP17_iProver_split
| sP23_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_607]) ).
cnf(c_16568,negated_conjecture,
( hskp49
| sP9_iProver_split
| sP15_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_603]) ).
cnf(c_16569,negated_conjecture,
( hskp34
| sP3_iProver_split
| sP10_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_601]) ).
cnf(c_16578,negated_conjecture,
( hskp56
| hskp22
| sP21_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_581]) ).
cnf(c_16592,negated_conjecture,
( hskp20
| hskp19
| sP3_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_544]) ).
cnf(c_16596,negated_conjecture,
( hskp33
| hskp15
| sP22_iProver_split ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_535]) ).
cnf(c_16602,plain,
( ~ sP11_iProver_split
| c2_1(a1020)
| c3_1(a1020)
| c1_1(a1020) ),
inference(instantiation,[status(thm)],[c_16531]) ).
cnf(c_16604,plain,
( ~ c0_1(a1020)
| ~ sP3_iProver_split
| c3_1(a1020)
| c1_1(a1020) ),
inference(instantiation,[status(thm)],[c_16520]) ).
cnf(c_16607,plain,
( ~ c1_1(a1020)
| ~ sP10_iProver_split
| c2_1(a1020)
| c3_1(a1020) ),
inference(instantiation,[status(thm)],[c_16529]) ).
cnf(c_16611,plain,
( ~ c3_1(a1020)
| ~ sP23_iProver_split
| c2_1(a1020)
| c1_1(a1020) ),
inference(instantiation,[status(thm)],[c_16559]) ).
cnf(c_16618,plain,
( ~ c3_1(a1020)
| ~ c0_1(a1020)
| ~ sP15_iProver_split
| c2_1(a1020) ),
inference(instantiation,[status(thm)],[c_16540]) ).
cnf(c_16632,plain,
( ~ c2_1(a1085)
| ~ c3_1(a1085)
| ~ c0_1(a1085)
| ~ sP0_iProver_split ),
inference(instantiation,[status(thm)],[c_16516]) ).
cnf(c_16633,plain,
( ~ c2_1(a1056)
| ~ c3_1(a1056)
| ~ c0_1(a1056)
| ~ sP0_iProver_split ),
inference(instantiation,[status(thm)],[c_16516]) ).
cnf(c_16637,plain,
( ~ c2_1(a1059)
| ~ c3_1(a1059)
| ~ c0_1(a1059)
| ~ sP0_iProver_split ),
inference(instantiation,[status(thm)],[c_16516]) ).
cnf(c_16642,plain,
( ~ c0_1(a1084)
| ~ sP3_iProver_split
| c3_1(a1084)
| c1_1(a1084) ),
inference(instantiation,[status(thm)],[c_16520]) ).
cnf(c_16649,plain,
( ~ c0_1(a1043)
| ~ sP3_iProver_split
| c3_1(a1043)
| c1_1(a1043) ),
inference(instantiation,[status(thm)],[c_16520]) ).
cnf(c_16658,plain,
( ~ c2_1(a1021)
| ~ sP7_iProver_split
| c3_1(a1021)
| c1_1(a1021) ),
inference(instantiation,[status(thm)],[c_16525]) ).
cnf(c_16665,plain,
( ~ c1_1(a1065)
| ~ sP8_iProver_split
| c2_1(a1065)
| c0_1(a1065) ),
inference(instantiation,[status(thm)],[c_16527]) ).
cnf(c_16676,plain,
( ~ c1_1(a1039)
| ~ sP8_iProver_split
| c2_1(a1039)
| c0_1(a1039) ),
inference(instantiation,[status(thm)],[c_16527]) ).
cnf(c_16685,plain,
( ~ c2_1(a1031)
| ~ c3_1(a1031)
| ~ c0_1(a1031)
| ~ sP0_iProver_split ),
inference(instantiation,[status(thm)],[c_16516]) ).
cnf(c_16691,plain,
( ~ c2_1(a1056)
| ~ c3_1(a1056)
| ~ sP5_iProver_split
| c0_1(a1056) ),
inference(instantiation,[status(thm)],[c_16523]) ).
cnf(c_16692,plain,
( ~ c2_1(a1040)
| ~ c3_1(a1040)
| ~ sP5_iProver_split
| c0_1(a1040) ),
inference(instantiation,[status(thm)],[c_16523]) ).
cnf(c_16693,plain,
( ~ c2_1(a1031)
| ~ c3_1(a1031)
| ~ sP5_iProver_split
| c0_1(a1031) ),
inference(instantiation,[status(thm)],[c_16523]) ).
cnf(c_16696,plain,
( ~ c2_1(a1059)
| ~ c3_1(a1059)
| ~ sP5_iProver_split
| c0_1(a1059) ),
inference(instantiation,[status(thm)],[c_16523]) ).
cnf(c_16702,plain,
( ~ c2_1(a1073)
| ~ c1_1(a1073)
| ~ c0_1(a1073)
| ~ sP1_iProver_split ),
inference(instantiation,[status(thm)],[c_16517]) ).
cnf(c_16707,plain,
( ~ c2_1(a1033)
| ~ c1_1(a1033)
| ~ c0_1(a1033)
| ~ sP1_iProver_split ),
inference(instantiation,[status(thm)],[c_16517]) ).
cnf(c_16718,plain,
( ~ sP9_iProver_split
| c3_1(a1021)
| c1_1(a1021)
| c0_1(a1021) ),
inference(instantiation,[status(thm)],[c_16528]) ).
cnf(c_16727,plain,
( ~ sP9_iProver_split
| c3_1(a1023)
| c1_1(a1023)
| c0_1(a1023) ),
inference(instantiation,[status(thm)],[c_16528]) ).
cnf(c_16767,plain,
( ~ sP6_iProver_split
| c2_1(a1032)
| c1_1(a1032)
| c0_1(a1032) ),
inference(instantiation,[status(thm)],[c_16524]) ).
cnf(c_16772,plain,
( ~ sP6_iProver_split
| c2_1(a1080)
| c1_1(a1080)
| c0_1(a1080) ),
inference(instantiation,[status(thm)],[c_16524]) ).
cnf(c_16786,plain,
( ~ c2_1(a1031)
| ~ c3_1(a1031)
| ~ sP14_iProver_split
| c1_1(a1031) ),
inference(instantiation,[status(thm)],[c_16537]) ).
cnf(c_16789,plain,
( ~ c2_1(a1059)
| ~ c3_1(a1059)
| ~ sP14_iProver_split
| c1_1(a1059) ),
inference(instantiation,[status(thm)],[c_16537]) ).
cnf(c_16792,plain,
( ~ c2_1(a1023)
| ~ c3_1(a1023)
| ~ sP14_iProver_split
| c1_1(a1023) ),
inference(instantiation,[status(thm)],[c_16537]) ).
cnf(c_16798,plain,
( ~ c1_1(a1091)
| ~ sP10_iProver_split
| c2_1(a1091)
| c3_1(a1091) ),
inference(instantiation,[status(thm)],[c_16529]) ).
cnf(c_16811,plain,
( ~ c2_1(a1031)
| ~ sP12_iProver_split
| c1_1(a1031)
| c0_1(a1031) ),
inference(instantiation,[status(thm)],[c_16532]) ).
cnf(c_16813,plain,
( ~ c2_1(a1021)
| ~ sP12_iProver_split
| c1_1(a1021)
| c0_1(a1021) ),
inference(instantiation,[status(thm)],[c_16532]) ).
cnf(c_16814,plain,
( ~ c2_1(a1059)
| ~ sP12_iProver_split
| c1_1(a1059)
| c0_1(a1059) ),
inference(instantiation,[status(thm)],[c_16532]) ).
cnf(c_16817,plain,
( ~ c2_1(a1023)
| ~ sP12_iProver_split
| c1_1(a1023)
| c0_1(a1023) ),
inference(instantiation,[status(thm)],[c_16532]) ).
cnf(c_16824,plain,
( ~ c2_1(a1056)
| ~ c3_1(a1056)
| ~ c1_1(a1056)
| ~ sP4_iProver_split ),
inference(instantiation,[status(thm)],[c_16521]) ).
cnf(c_16825,plain,
( ~ c2_1(a1040)
| ~ c3_1(a1040)
| ~ c1_1(a1040)
| ~ sP4_iProver_split ),
inference(instantiation,[status(thm)],[c_16521]) ).
cnf(c_16851,plain,
( ~ sP6_iProver_split
| c2_1(a1091)
| c1_1(a1091)
| c0_1(a1091) ),
inference(instantiation,[status(thm)],[c_16524]) ).
cnf(c_16870,plain,
( ~ c3_1(a1032)
| ~ sP23_iProver_split
| c2_1(a1032)
| c1_1(a1032) ),
inference(instantiation,[status(thm)],[c_16559]) ).
cnf(c_16880,plain,
( ~ c1_1(a1046)
| ~ sP10_iProver_split
| c2_1(a1046)
| c3_1(a1046) ),
inference(instantiation,[status(thm)],[c_16529]) ).
cnf(c_16891,plain,
( ~ c1_1(a1039)
| ~ sP10_iProver_split
| c2_1(a1039)
| c3_1(a1039) ),
inference(instantiation,[status(thm)],[c_16529]) ).
cnf(c_16900,plain,
( ~ c2_1(a1021)
| ~ c0_1(a1021)
| ~ sP17_iProver_split
| c1_1(a1021) ),
inference(instantiation,[status(thm)],[c_16546]) ).
cnf(c_16912,plain,
( ~ c3_1(a1032)
| ~ c0_1(a1032)
| ~ sP20_iProver_split
| c1_1(a1032) ),
inference(instantiation,[status(thm)],[c_16550]) ).
cnf(c_16924,plain,
( ~ c3_1(a1032)
| ~ sP22_iProver_split
| c2_1(a1032)
| c0_1(a1032) ),
inference(instantiation,[status(thm)],[c_16557]) ).
cnf(c_16927,plain,
( ~ c3_1(a1077)
| ~ sP22_iProver_split
| c2_1(a1077)
| c0_1(a1077) ),
inference(instantiation,[status(thm)],[c_16557]) ).
cnf(c_16960,plain,
( c2_1(a1079)
| c3_1(a1079)
| c0_1(a1079)
| hskp10 ),
inference(instantiation,[status(thm)],[c_523]) ).
cnf(c_17012,plain,
( ~ c2_1(a1042)
| ~ c0_1(a1042)
| ~ sP17_iProver_split
| c1_1(a1042) ),
inference(instantiation,[status(thm)],[c_16546]) ).
cnf(c_17150,plain,
( ~ c3_1(a1079)
| ~ sP22_iProver_split
| c2_1(a1079)
| c0_1(a1079) ),
inference(instantiation,[status(thm)],[c_16557]) ).
cnf(c_17161,plain,
( ~ c2_1(a1021)
| ~ c0_1(a1021)
| ~ sP18_iProver_split
| c3_1(a1021) ),
inference(instantiation,[status(thm)],[c_16547]) ).
cnf(c_17302,plain,
( ~ c2_1(a1083)
| ~ c3_1(a1083)
| ~ sP14_iProver_split
| c1_1(a1083) ),
inference(instantiation,[status(thm)],[c_16537]) ).
cnf(c_17336,plain,
( ~ c2_1(a1056)
| ~ c1_1(a1056)
| ~ c0_1(a1056)
| ~ sP1_iProver_split ),
inference(instantiation,[status(thm)],[c_16517]) ).
cnf(c_17339,plain,
( ~ c2_1(a1040)
| ~ c1_1(a1040)
| ~ c0_1(a1040)
| ~ sP1_iProver_split ),
inference(instantiation,[status(thm)],[c_16517]) ).
cnf(c_17415,plain,
( ~ c0_1(a1021)
| ~ sP3_iProver_split
| c3_1(a1021)
| c1_1(a1021) ),
inference(instantiation,[status(thm)],[c_16520]) ).
cnf(c_17768,plain,
( ~ c2_1(a1033)
| ~ c3_1(a1033)
| ~ c0_1(a1033)
| ~ sP0_iProver_split ),
inference(instantiation,[status(thm)],[c_16516]) ).
cnf(c_17811,plain,
( ~ c3_1(a1046)
| ~ c0_1(a1046)
| ~ sP15_iProver_split
| c2_1(a1046) ),
inference(instantiation,[status(thm)],[c_16540]) ).
cnf(c_17812,plain,
( ~ c3_1(a1032)
| ~ c0_1(a1032)
| ~ sP15_iProver_split
| c2_1(a1032) ),
inference(instantiation,[status(thm)],[c_16540]) ).
cnf(c_17813,plain,
( ~ c3_1(a1022)
| ~ c0_1(a1022)
| ~ sP15_iProver_split
| c2_1(a1022) ),
inference(instantiation,[status(thm)],[c_16540]) ).
cnf(c_17823,plain,
( ~ c3_1(a1033)
| ~ c0_1(a1033)
| ~ sP15_iProver_split
| c2_1(a1033) ),
inference(instantiation,[status(thm)],[c_16540]) ).
cnf(c_17837,plain,
( ~ c3_1(a1022)
| ~ c1_1(a1022)
| ~ sP21_iProver_split
| c2_1(a1022) ),
inference(instantiation,[status(thm)],[c_16556]) ).
cnf(c_17847,plain,
( ~ c3_1(a1033)
| ~ c1_1(a1033)
| ~ sP21_iProver_split
| c2_1(a1033) ),
inference(instantiation,[status(thm)],[c_16556]) ).
cnf(c_17872,plain,
( ~ c2_1(a1078)
| ~ c0_1(a1078)
| ~ sP17_iProver_split
| c1_1(a1078) ),
inference(instantiation,[status(thm)],[c_16546]) ).
cnf(c_17878,plain,
( ~ c2_1(a1022)
| ~ c3_1(a1022)
| ~ c0_1(a1022)
| ~ sP0_iProver_split ),
inference(instantiation,[status(thm)],[c_16516]) ).
cnf(c_17902,plain,
( c2_1(a1080)
| c3_1(a1080)
| c0_1(a1080)
| hskp10 ),
inference(instantiation,[status(thm)],[c_523]) ).
cnf(c_17926,plain,
( ~ c1_1(a1079)
| ~ sP8_iProver_split
| c2_1(a1079)
| c0_1(a1079) ),
inference(instantiation,[status(thm)],[c_16527]) ).
cnf(c_17955,plain,
( ~ c3_1(a1022)
| ~ sP22_iProver_split
| c2_1(a1022)
| c0_1(a1022) ),
inference(instantiation,[status(thm)],[c_16557]) ).
cnf(c_17958,plain,
( ~ c3_1(a1080)
| ~ sP22_iProver_split
| c2_1(a1080)
| c0_1(a1080) ),
inference(instantiation,[status(thm)],[c_16557]) ).
cnf(c_17961,plain,
( ~ c3_1(a1039)
| ~ sP22_iProver_split
| c2_1(a1039)
| c0_1(a1039) ),
inference(instantiation,[status(thm)],[c_16557]) ).
cnf(c_18008,plain,
$false,
inference(prop_impl_just,[status(thm)],[c_17961,c_17958,c_17955,c_17926,c_17902,c_17878,c_17872,c_17847,c_17837,c_17823,c_17813,c_17812,c_17811,c_17768,c_17415,c_17339,c_17336,c_17302,c_17161,c_17150,c_17012,c_16960,c_16927,c_16924,c_16912,c_16900,c_16891,c_16880,c_16870,c_16851,c_16825,c_16824,c_16817,c_16814,c_16813,c_16811,c_16798,c_16792,c_16789,c_16786,c_16772,c_16767,c_16727,c_16718,c_16707,c_16702,c_16696,c_16693,c_16692,c_16691,c_16685,c_16676,c_16665,c_16658,c_16649,c_16642,c_16637,c_16633,c_16632,c_16618,c_16611,c_16607,c_16604,c_16602,c_16596,c_16592,c_16578,c_16569,c_16568,c_16566,c_16561,c_16555,c_16553,c_16552,c_16548,c_16545,c_16544,c_16541,c_16538,c_16534,c_16533,c_16526,c_16518,c_5660,c_5650,c_5640,c_5630,c_5620,c_5610,c_5600,c_5590,c_5580,c_395,c_389,c_138,c_139,c_166,c_167,c_195,c_206,c_226,c_227,c_230,c_246,c_247,c_261,c_262,c_263,c_273,c_281,c_282,c_283,c_285,c_286,c_289,c_293,c_295,c_301,c_313,c_315,c_321,c_322,c_357,c_358,c_133,c_134,c_135,c_137,c_149,c_150,c_151,c_165,c_173,c_174,c_175,c_193,c_194,c_205,c_207,c_209,c_210,c_211,c_221,c_222,c_223,c_225,c_229,c_231,c_245,c_274,c_275,c_287,c_290,c_291,c_294,c_302,c_303,c_314,c_323,c_359,c_69]) ).
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.00/0.12 % Problem : SYN447+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 19:31:20 EDT 2023
% 0.13/0.35 % CPUTime :
% 0.20/0.47 Running first-order theorem proving
% 0.20/0.47 Running: /export/starexec/sandbox2/solver/bin/run_problem --schedule fof_schedule --no_cores 8 /export/starexec/sandbox2/benchmark/theBenchmark.p 300
% 3.45/1.20 % SZS status Started for theBenchmark.p
% 3.45/1.20 % SZS status Theorem for theBenchmark.p
% 3.45/1.20
% 3.45/1.20 %---------------- iProver v3.8 (pre SMT-COMP 2023/CASC 2023) ----------------%
% 3.45/1.20
% 3.45/1.20 ------ iProver source info
% 3.45/1.20
% 3.45/1.20 git: date: 2023-05-31 18:12:56 +0000
% 3.45/1.20 git: sha1: 8abddc1f627fd3ce0bcb8b4cbf113b3cc443d7b6
% 3.45/1.20 git: non_committed_changes: false
% 3.45/1.20 git: last_make_outside_of_git: false
% 3.45/1.20
% 3.45/1.20 ------ Parsing...
% 3.45/1.20 ------ Clausification by vclausify_rel & Parsing by iProver...------ preprocesses with Option_epr_non_horn_non_eq
% 3.45/1.20
% 3.45/1.20
% 3.45/1.20 ------ Preprocessing... sf_s rm: 1 0s sf_e pe_s pe:1:0s pe:2:0s pe:4:0s pe_e sf_s rm: 0 0s sf_e pe_s pe_e
% 3.45/1.20
% 3.45/1.20 ------ Preprocessing...------ preprocesses with Option_epr_non_horn_non_eq
% 3.45/1.20 gs_s sp: 92 0s gs_e snvd_s sp: 0 0s snvd_e
% 3.45/1.20 ------ Proving...
% 3.45/1.20 ------ Problem Properties
% 3.45/1.20
% 3.45/1.20
% 3.45/1.20 clauses 277
% 3.45/1.20 conjectures 262
% 3.45/1.20 EPR 277
% 3.45/1.20 Horn 193
% 3.45/1.20 unary 0
% 3.45/1.20 binary 178
% 3.45/1.20 lits 684
% 3.45/1.20 lits eq 0
% 3.45/1.20 fd_pure 0
% 3.45/1.20 fd_pseudo 0
% 3.45/1.20 fd_cond 0
% 3.45/1.20 fd_pseudo_cond 0
% 3.45/1.20 AC symbols 0
% 3.45/1.20
% 3.45/1.20 ------ Schedule EPR non Horn non eq is on
% 3.45/1.20
% 3.45/1.20 ------ no equalities: superposition off
% 3.45/1.20
% 3.45/1.20 ------ Input Options "--resolution_flag false" Time Limit: 70.
% 3.45/1.20
% 3.45/1.20
% 3.45/1.20 ------
% 3.45/1.20 Current options:
% 3.45/1.20 ------
% 3.45/1.20
% 3.45/1.20
% 3.45/1.20
% 3.45/1.20
% 3.45/1.20 ------ Proving...
% 3.45/1.20
% 3.45/1.20
% 3.45/1.20 % SZS status Theorem for theBenchmark.p
% 3.45/1.20
% 3.45/1.20 % SZS output start CNFRefutation for theBenchmark.p
% See solution above
% 3.45/1.20
% 3.45/1.20
%------------------------------------------------------------------------------