TSTP Solution File: SYN457+1 by iProver---3.9
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- Process Solution
%------------------------------------------------------------------------------
% File : iProver---3.9
% Problem : SYN457+1 : TPTP v8.1.2. Released v2.1.0.
% Transfm : none
% Format : tptp:raw
% Command : run_iprover %s %d THM
% Computer : n022.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 May 3 03:30:50 EDT 2024
% Result : Theorem 4.08s 1.16s
% Output : CNFRefutation 4.08s
% Verified :
% SZS Type : ERROR: Analysing output (Could not find formula named f377)
% Comments :
%------------------------------------------------------------------------------
fof(f1,conjecture,
~ ( ( hskp30
| hskp41
| ! [X88] :
( ndr1_0
=> ( c0_1(X88)
| ~ c1_1(X88)
| c2_1(X88) ) ) )
& ( ! [X87] :
( ndr1_0
=> ( ~ c3_1(X87)
| ~ c1_1(X87)
| ~ c0_1(X87) ) )
| hskp40
| ! [X86] :
( ndr1_0
=> ( c3_1(X86)
| ~ c2_1(X86)
| c1_1(X86) ) ) )
& ( ! [X85] :
( ndr1_0
=> ( c2_1(X85)
| c1_1(X85)
| ~ c3_1(X85) ) )
| hskp75
| ! [X84] :
( ndr1_0
=> ( ~ c1_1(X84)
| c3_1(X84)
| ~ c2_1(X84) ) ) )
& ( ! [X83] :
( ndr1_0
=> ( c3_1(X83)
| c2_1(X83)
| ~ c0_1(X83) ) )
| ! [X82] :
( ndr1_0
=> ( ~ c1_1(X82)
| ~ c0_1(X82)
| c2_1(X82) ) )
| hskp61 )
& ( ! [X81] :
( ndr1_0
=> ( ~ c3_1(X81)
| c1_1(X81)
| ~ c0_1(X81) ) )
| hskp29
| ! [X80] :
( ndr1_0
=> ( ~ c3_1(X80)
| c1_1(X80)
| c0_1(X80) ) ) )
& ( ! [X79] :
( ndr1_0
=> ( ~ c3_1(X79)
| ~ c0_1(X79)
| c2_1(X79) ) )
| ! [X78] :
( ndr1_0
=> ( ~ c2_1(X78)
| ~ c3_1(X78)
| c0_1(X78) ) )
| hskp39 )
& ( ! [X77] :
( ndr1_0
=> ( ~ c0_1(X77)
| c3_1(X77)
| c2_1(X77) ) )
| hskp57
| ! [X76] :
( ndr1_0
=> ( c3_1(X76)
| c1_1(X76)
| ~ c2_1(X76) ) ) )
& ( ! [X75] :
( ndr1_0
=> ( c1_1(X75)
| c2_1(X75)
| ~ c0_1(X75) ) )
| ! [X74] :
( ndr1_0
=> ( ~ c1_1(X74)
| ~ c0_1(X74)
| ~ c3_1(X74) ) )
| ! [X73] :
( ndr1_0
=> ( ~ c3_1(X73)
| c2_1(X73)
| c1_1(X73) ) ) )
& ( ! [X72] :
( ndr1_0
=> ( c2_1(X72)
| c3_1(X72)
| ~ c0_1(X72) ) )
| hskp47
| ! [X71] :
( ndr1_0
=> ( ~ c3_1(X71)
| ~ c0_1(X71)
| ~ c1_1(X71) ) ) )
& ( ! [X70] :
( ndr1_0
=> ( ~ c0_1(X70)
| ~ c2_1(X70)
| ~ c3_1(X70) ) )
| hskp38
| hskp74 )
& ( ! [X69] :
( ndr1_0
=> ( c1_1(X69)
| ~ c2_1(X69)
| ~ c3_1(X69) ) )
| ! [X68] :
( ndr1_0
=> ( c0_1(X68)
| ~ c3_1(X68)
| ~ c1_1(X68) ) )
| hskp73 )
& ( hskp72
| ! [X67] :
( ndr1_0
=> ( c2_1(X67)
| c0_1(X67)
| c3_1(X67) ) )
| hskp37 )
& ( ! [X66] :
( ndr1_0
=> ( ~ c2_1(X66)
| ~ c0_1(X66)
| c3_1(X66) ) )
| ! [X65] :
( ndr1_0
=> ( c0_1(X65)
| c2_1(X65)
| c1_1(X65) ) )
| ! [X64] :
( ndr1_0
=> ( c3_1(X64)
| c1_1(X64)
| c2_1(X64) ) ) )
& ( hskp71
| hskp36
| ! [X63] :
( ndr1_0
=> ( c0_1(X63)
| ~ c1_1(X63)
| c2_1(X63) ) ) )
& ( hskp0
| ! [X62] :
( ndr1_0
=> ( ~ c3_1(X62)
| ~ c1_1(X62)
| c2_1(X62) ) )
| ! [X61] :
( ndr1_0
=> ( ~ c0_1(X61)
| ~ c1_1(X61)
| ~ c2_1(X61) ) ) )
& ( ! [X60] :
( ndr1_0
=> ( c3_1(X60)
| c0_1(X60)
| c2_1(X60) ) )
| ! [X59] :
( ndr1_0
=> ( ~ c2_1(X59)
| c0_1(X59)
| c1_1(X59) ) )
| hskp70 )
& ( ! [X58] :
( ndr1_0
=> ( c1_1(X58)
| c0_1(X58)
| ~ c3_1(X58) ) )
| ! [X57] :
( ndr1_0
=> ( c3_1(X57)
| c2_1(X57)
| ~ c1_1(X57) ) )
| hskp69 )
& ( hskp13
| ! [X56] :
( ndr1_0
=> ( ~ c3_1(X56)
| ~ c0_1(X56)
| ~ c1_1(X56) ) )
| ! [X55] :
( ndr1_0
=> ( ~ c3_1(X55)
| ~ c1_1(X55)
| c2_1(X55) ) ) )
& ( ! [X54] :
( ndr1_0
=> ( c2_1(X54)
| ~ c1_1(X54)
| c0_1(X54) ) )
| hskp68
| hskp35 )
& ( ! [X53] :
( ndr1_0
=> ( ~ c2_1(X53)
| ~ c0_1(X53)
| c1_1(X53) ) )
| ! [X52] :
( ndr1_0
=> ( c2_1(X52)
| ~ c3_1(X52)
| ~ c1_1(X52) ) )
| hskp34 )
& ( hskp33
| hskp61
| ! [X51] :
( ndr1_0
=> ( ~ c3_1(X51)
| ~ c0_1(X51)
| c2_1(X51) ) ) )
& ( hskp67
| ! [X50] :
( ndr1_0
=> ( c1_1(X50)
| ~ c0_1(X50)
| ~ c3_1(X50) ) )
| ! [X49] :
( ndr1_0
=> ( ~ c2_1(X49)
| ~ c3_1(X49)
| c1_1(X49) ) ) )
& ( hskp32
| hskp31
| hskp63 )
& ( hskp30
| ! [X48] :
( ndr1_0
=> ( c1_1(X48)
| ~ c3_1(X48)
| c0_1(X48) ) )
| ! [X47] :
( ndr1_0
=> ( c2_1(X47)
| ~ c1_1(X47)
| ~ c0_1(X47) ) ) )
& ( hskp53
| hskp52
| hskp29 )
& ( hskp28
| hskp27
| hskp66 )
& ( ! [X46] :
( ndr1_0
=> ( c1_1(X46)
| ~ c3_1(X46)
| ~ c2_1(X46) ) )
| hskp26
| ! [X45] :
( ndr1_0
=> ( ~ c0_1(X45)
| ~ c3_1(X45)
| ~ c2_1(X45) ) ) )
& ( ! [X44] :
( ndr1_0
=> ( c0_1(X44)
| ~ c3_1(X44)
| ~ c1_1(X44) ) )
| ! [X43] :
( ndr1_0
=> ( c3_1(X43)
| c0_1(X43)
| c1_1(X43) ) )
| hskp25 )
& ( ! [X42] :
( ndr1_0
=> ( c0_1(X42)
| c1_1(X42)
| ~ c3_1(X42) ) )
| hskp24
| hskp61 )
& ( hskp65
| hskp64
| hskp23 )
& ( ! [X41] :
( ndr1_0
=> ( c2_1(X41)
| ~ c0_1(X41)
| c3_1(X41) ) )
| hskp22
| ! [X40] :
( ndr1_0
=> ( c3_1(X40)
| c0_1(X40)
| ~ c2_1(X40) ) ) )
& ( ! [X39] :
( ndr1_0
=> ( c3_1(X39)
| c2_1(X39)
| ~ c1_1(X39) ) )
| hskp21
| ! [X38] :
( ndr1_0
=> ( c2_1(X38)
| c0_1(X38)
| ~ c1_1(X38) ) ) )
& ( hskp20
| ! [X37] :
( ndr1_0
=> ( c3_1(X37)
| ~ c1_1(X37)
| ~ c0_1(X37) ) )
| hskp19 )
& ( ! [X36] :
( ndr1_0
=> ( c3_1(X36)
| ~ c2_1(X36)
| c1_1(X36) ) )
| hskp18
| hskp60 )
& ( hskp17
| hskp16
| ! [X35] :
( ndr1_0
=> ( ~ c3_1(X35)
| c1_1(X35)
| ~ c0_1(X35) ) ) )
& ( ! [X34] :
( ndr1_0
=> ( ~ c3_1(X34)
| ~ c1_1(X34)
| ~ c2_1(X34) ) )
| ! [X33] :
( ndr1_0
=> ( ~ c3_1(X33)
| ~ c0_1(X33)
| c1_1(X33) ) )
| hskp63 )
& ( ! [X32] :
( ndr1_0
=> ( c1_1(X32)
| ~ c3_1(X32)
| c0_1(X32) ) )
| ! [X31] :
( ndr1_0
=> ( c1_1(X31)
| ~ c3_1(X31)
| ~ c0_1(X31) ) )
| ! [X30] :
( ndr1_0
=> ( c3_1(X30)
| ~ c2_1(X30)
| ~ c1_1(X30) ) ) )
& ( hskp62
| hskp61
| ! [X29] :
( ndr1_0
=> ( c0_1(X29)
| ~ c3_1(X29)
| ~ c1_1(X29) ) ) )
& ( ! [X28] :
( ndr1_0
=> ( c1_1(X28)
| ~ c2_1(X28)
| c3_1(X28) ) )
| ! [X27] :
( ndr1_0
=> ( ~ c3_1(X27)
| c1_1(X27)
| c0_1(X27) ) )
| hskp60 )
& ( ! [X26] :
( ndr1_0
=> ( ~ c3_1(X26)
| ~ c0_1(X26)
| c2_1(X26) ) )
| ! [X25] :
( ndr1_0
=> ( c0_1(X25)
| c2_1(X25)
| ~ c3_1(X25) ) )
| ! [X24] :
( ndr1_0
=> ( ~ c3_1(X24)
| c1_1(X24)
| ~ c2_1(X24) ) ) )
& ( hskp15
| hskp14
| hskp10 )
& ( ! [X23] :
( ndr1_0
=> ( c2_1(X23)
| ~ c0_1(X23)
| c1_1(X23) ) )
| hskp59
| hskp58 )
& ( ! [X22] :
( ndr1_0
=> ( ~ c1_1(X22)
| ~ c3_1(X22)
| ~ c2_1(X22) ) )
| hskp13
| hskp12 )
& ( hskp57
| hskp11
| ! [X21] :
( ndr1_0
=> ( ~ c3_1(X21)
| c2_1(X21)
| ~ c0_1(X21) ) ) )
& ( hskp10
| ! [X20] :
( ndr1_0
=> ( c0_1(X20)
| c3_1(X20)
| c2_1(X20) ) )
| hskp56 )
& ( ! [X19] :
( ndr1_0
=> ( ~ c0_1(X19)
| ~ c3_1(X19)
| c2_1(X19) ) )
| ! [X18] :
( ndr1_0
=> ( ~ c3_1(X18)
| c0_1(X18)
| c2_1(X18) ) )
| ! [X17] :
( ndr1_0
=> ( c3_1(X17)
| c1_1(X17)
| ~ c0_1(X17) ) ) )
& ( ! [X16] :
( ndr1_0
=> ( c3_1(X16)
| ~ c2_1(X16)
| ~ c0_1(X16) ) )
| hskp55
| hskp9 )
& ( ! [X15] :
( ndr1_0
=> ( ~ c0_1(X15)
| c3_1(X15)
| ~ c1_1(X15) ) )
| ! [X14] :
( ndr1_0
=> ( ~ c0_1(X14)
| c1_1(X14)
| c3_1(X14) ) )
| hskp2 )
& ( ! [X13] :
( ndr1_0
=> ( ~ c2_1(X13)
| ~ c3_1(X13)
| ~ c0_1(X13) ) )
| ! [X12] :
( ndr1_0
=> ( ~ c2_1(X12)
| c1_1(X12)
| ~ c0_1(X12) ) )
| ! [X11] :
( ndr1_0
=> ( c0_1(X11)
| c3_1(X11)
| c2_1(X11) ) ) )
& ( hskp54
| hskp8
| hskp53 )
& ( hskp7
| ! [X10] :
( ndr1_0
=> ( c3_1(X10)
| ~ c0_1(X10)
| ~ c2_1(X10) ) )
| hskp52 )
& ( hskp51
| ! [X9] :
( ndr1_0
=> ( ~ c2_1(X9)
| ~ c0_1(X9)
| ~ c1_1(X9) ) )
| hskp50 )
& ( hskp49
| ! [X8] :
( ndr1_0
=> ( c0_1(X8)
| c2_1(X8)
| c1_1(X8) ) )
| ! [X7] :
( ndr1_0
=> ( ~ c1_1(X7)
| c0_1(X7)
| c2_1(X7) ) ) )
& ( hskp6
| hskp48
| ! [X6] :
( ndr1_0
=> ( c2_1(X6)
| ~ c3_1(X6)
| ~ c0_1(X6) ) ) )
& ( hskp5
| hskp4
| ! [X5] :
( ndr1_0
=> ( ~ c3_1(X5)
| c0_1(X5)
| c1_1(X5) ) ) )
& ( hskp3
| hskp2
| hskp47 )
& ( ! [X4] :
( ndr1_0
=> ( c2_1(X4)
| ~ c0_1(X4)
| c1_1(X4) ) )
| hskp1
| ! [X3] :
( ndr1_0
=> ( c3_1(X3)
| c0_1(X3)
| c2_1(X3) ) ) )
& ( ! [X2] :
( ndr1_0
=> ( ~ c3_1(X2)
| c0_1(X2)
| ~ c2_1(X2) ) )
| hskp46
| ! [X1] :
( ndr1_0
=> ( c2_1(X1)
| ~ c1_1(X1)
| c0_1(X1) ) ) )
& ( hskp45
| hskp44
| hskp43 )
& ( hskp42
| ! [X0] :
( ndr1_0
=> ( c3_1(X0)
| ~ c0_1(X0)
| ~ c2_1(X0) ) )
| hskp0 )
& ( ( c3_1(a1724)
& ~ c2_1(a1724)
& c0_1(a1724)
& ndr1_0 )
| ~ hskp75 )
& ( ( c2_1(a1717)
& c0_1(a1717)
& ~ c3_1(a1717)
& ndr1_0 )
| ~ hskp74 )
& ( ( c0_1(a1716)
& ~ c3_1(a1716)
& c2_1(a1716)
& ndr1_0 )
| ~ hskp73 )
& ( ( c3_1(a1715)
& c1_1(a1715)
& ~ c2_1(a1715)
& ndr1_0 )
| ~ hskp72 )
& ( ( c0_1(a1713)
& c3_1(a1713)
& ~ c2_1(a1713)
& ndr1_0 )
| ~ hskp71 )
& ( ( c1_1(a1710)
& ~ c3_1(a1710)
& ~ c0_1(a1710)
& ndr1_0 )
| ~ hskp70 )
& ( ( c3_1(a1709)
& c0_1(a1709)
& ~ c1_1(a1709)
& ndr1_0 )
| ~ hskp69 )
& ( ( c0_1(a1707)
& c3_1(a1707)
& ~ c1_1(a1707)
& ndr1_0 )
| ~ hskp68 )
& ( ( c3_1(a1702)
& c2_1(a1702)
& c1_1(a1702)
& ndr1_0 )
| ~ hskp67 )
& ( ( c0_1(a1692)
& ~ c2_1(a1692)
& ~ c1_1(a1692)
& ndr1_0 )
| ~ hskp66 )
& ( ( c2_1(a1687)
& ~ c0_1(a1687)
& ~ c3_1(a1687)
& ndr1_0 )
| ~ hskp65 )
& ( ( c0_1(a1686)
& ~ c1_1(a1686)
& ~ c3_1(a1686)
& ndr1_0 )
| ~ hskp64 )
& ( ( c3_1(a1676)
& c2_1(a1676)
& ~ c0_1(a1676)
& ndr1_0 )
| ~ hskp63 )
& ( ( c0_1(a1675)
& c1_1(a1675)
& ~ c3_1(a1675)
& ndr1_0 )
| ~ hskp62 )
& ( ( c3_1(a1674)
& ~ c2_1(a1674)
& ~ c1_1(a1674)
& ndr1_0 )
| ~ hskp61 )
& ( ( c2_1(a1673)
& c3_1(a1673)
& ~ c1_1(a1673)
& ndr1_0 )
| ~ hskp60 )
& ( ( c0_1(a1669)
& ~ c2_1(a1669)
& c3_1(a1669)
& ndr1_0 )
| ~ hskp59 )
& ( ( c3_1(a1668)
& ~ c1_1(a1668)
& ~ c0_1(a1668)
& ndr1_0 )
| ~ hskp58 )
& ( ( c3_1(a1665)
& ~ c1_1(a1665)
& c0_1(a1665)
& ndr1_0 )
| ~ hskp57 )
& ( ( c1_1(a1662)
& ~ c2_1(a1662)
& c0_1(a1662)
& ndr1_0 )
| ~ hskp56 )
& ( ( c1_1(a1661)
& ~ c3_1(a1661)
& ~ c2_1(a1661)
& ndr1_0 )
| ~ hskp55 )
& ( ( c1_1(a1658)
& ~ c0_1(a1658)
& c3_1(a1658)
& ndr1_0 )
| ~ hskp54 )
& ( ( c0_1(a1656)
& c2_1(a1656)
& ~ c3_1(a1656)
& ndr1_0 )
| ~ hskp53 )
& ( ( c3_1(a1654)
& c2_1(a1654)
& c0_1(a1654)
& ndr1_0 )
| ~ hskp52 )
& ( ( c1_1(a1653)
& ~ c0_1(a1653)
& c2_1(a1653)
& ndr1_0 )
| ~ hskp51 )
& ( ( c0_1(a1652)
& c2_1(a1652)
& c3_1(a1652)
& ndr1_0 )
| ~ hskp50 )
& ( ( c1_1(a1651)
& ~ c2_1(a1651)
& c3_1(a1651)
& ndr1_0 )
| ~ hskp49 )
& ( ( c0_1(a1649)
& ~ c2_1(a1649)
& ~ c3_1(a1649)
& ndr1_0 )
| ~ hskp48 )
& ( ( c3_1(a1644)
& ~ c0_1(a1644)
& ~ c1_1(a1644)
& ndr1_0 )
| ~ hskp47 )
& ( ( c0_1(a1642)
& ~ c1_1(a1642)
& ~ c2_1(a1642)
& ndr1_0 )
| ~ hskp46 )
& ( ( c2_1(a1641)
& ~ c1_1(a1641)
& ~ c3_1(a1641)
& ndr1_0 )
| ~ hskp45 )
& ( ( c1_1(a1640)
& c2_1(a1640)
& c3_1(a1640)
& ndr1_0 )
| ~ hskp44 )
& ( ( c0_1(a1639)
& c2_1(a1639)
& ~ c1_1(a1639)
& ndr1_0 )
| ~ hskp43 )
& ( ( c0_1(a1638)
& ~ c3_1(a1638)
& c1_1(a1638)
& ndr1_0 )
| ~ hskp42 )
& ( ( ~ c1_1(a1726)
& c2_1(a1726)
& c0_1(a1726)
& ndr1_0 )
| ~ hskp41 )
& ( ( ~ c2_1(a1725)
& c3_1(a1725)
& c1_1(a1725)
& ndr1_0 )
| ~ hskp40 )
& ( ( ~ c0_1(a1721)
& c3_1(a1721)
& ~ c1_1(a1721)
& ndr1_0 )
| ~ hskp39 )
& ( ( ~ c0_1(a1718)
& ~ c2_1(a1718)
& c3_1(a1718)
& ndr1_0 )
| ~ hskp38 )
& ( ( ~ c1_1(a1714)
& c0_1(a1714)
& c2_1(a1714)
& ndr1_0 )
| ~ hskp37 )
& ( ( ~ c1_1(a1712)
& ~ c0_1(a1712)
& ~ c2_1(a1712)
& ndr1_0 )
| ~ hskp36 )
& ( ( ~ c1_1(a1706)
& ~ c3_1(a1706)
& ~ c0_1(a1706)
& ndr1_0 )
| ~ hskp35 )
& ( ( ~ c1_1(a1705)
& ~ c3_1(a1705)
& c2_1(a1705)
& ndr1_0 )
| ~ hskp34 )
& ( ( ~ c2_1(a1704)
& ~ c0_1(a1704)
& c3_1(a1704)
& ndr1_0 )
| ~ hskp33 )
& ( ( ~ c3_1(a1701)
& c0_1(a1701)
& c1_1(a1701)
& ndr1_0 )
| ~ hskp32 )
& ( ( ~ c3_1(a1700)
& ~ c0_1(a1700)
& c2_1(a1700)
& ndr1_0 )
| ~ hskp31 )
& ( ( ~ c0_1(a1698)
& c3_1(a1698)
& c1_1(a1698)
& ndr1_0 )
| ~ hskp30 )
& ( ( ~ c3_1(a1695)
& c0_1(a1695)
& c2_1(a1695)
& ndr1_0 )
| ~ hskp29 )
& ( ( ~ c3_1(a1694)
& c2_1(a1694)
& ~ c1_1(a1694)
& ndr1_0 )
| ~ hskp28 )
& ( ( ~ c2_1(a1693)
& ~ c3_1(a1693)
& ~ c0_1(a1693)
& ndr1_0 )
| ~ hskp27 )
& ( ( ~ c2_1(a1691)
& ~ c1_1(a1691)
& ~ c3_1(a1691)
& ndr1_0 )
| ~ hskp26 )
& ( ( ~ c1_1(a1690)
& ~ c0_1(a1690)
& c2_1(a1690)
& ndr1_0 )
| ~ hskp25 )
& ( ( ~ c1_1(a1689)
& c3_1(a1689)
& ~ c0_1(a1689)
& ndr1_0 )
| ~ hskp24 )
& ( ( ~ c1_1(a1685)
& c2_1(a1685)
& ~ c0_1(a1685)
& ndr1_0 )
| ~ hskp23 )
& ( ( ~ c3_1(a1684)
& c2_1(a1684)
& ~ c0_1(a1684)
& ndr1_0 )
| ~ hskp22 )
& ( ( ~ c1_1(a1683)
& c2_1(a1683)
& c3_1(a1683)
& ndr1_0 )
| ~ hskp21 )
& ( ( ~ c3_1(a1682)
& ~ c1_1(a1682)
& ~ c2_1(a1682)
& ndr1_0 )
| ~ hskp20 )
& ( ( ~ c2_1(a1681)
& ~ c3_1(a1681)
& ~ c1_1(a1681)
& ndr1_0 )
| ~ hskp19 )
& ( ( ~ c0_1(a1680)
& ~ c1_1(a1680)
& ~ c3_1(a1680)
& ndr1_0 )
| ~ hskp18 )
& ( ( ~ c2_1(a1678)
& ~ c1_1(a1678)
& ~ c0_1(a1678)
& ndr1_0 )
| ~ hskp17 )
& ( ( ~ c1_1(a1677)
& ~ c2_1(a1677)
& ~ c0_1(a1677)
& ndr1_0 )
| ~ hskp16 )
& ( ( ~ c0_1(a1672)
& c1_1(a1672)
& c3_1(a1672)
& ndr1_0 )
| ~ hskp15 )
& ( ( ~ c3_1(a1671)
& ~ c1_1(a1671)
& c2_1(a1671)
& ndr1_0 )
| ~ hskp14 )
& ( ( ~ c1_1(a1667)
& c3_1(a1667)
& c0_1(a1667)
& ndr1_0 )
| ~ hskp13 )
& ( ( ~ c1_1(a1666)
& c3_1(a1666)
& c2_1(a1666)
& ndr1_0 )
| ~ hskp12 )
& ( ( ~ c1_1(a1664)
& ~ c2_1(a1664)
& ~ c3_1(a1664)
& ndr1_0 )
| ~ hskp11 )
& ( ( ~ c0_1(a1663)
& ~ c3_1(a1663)
& ~ c2_1(a1663)
& ndr1_0 )
| ~ hskp10 )
& ( ( ~ c1_1(a1660)
& ~ c0_1(a1660)
& ~ c3_1(a1660)
& ndr1_0 )
| ~ hskp9 )
& ( ( ~ c0_1(a1657)
& ~ c1_1(a1657)
& c2_1(a1657)
& ndr1_0 )
| ~ hskp8 )
& ( ( ~ c2_1(a1655)
& c0_1(a1655)
& c3_1(a1655)
& ndr1_0 )
| ~ hskp7 )
& ( ( ~ c3_1(a1650)
& ~ c2_1(a1650)
& ~ c1_1(a1650)
& ndr1_0 )
| ~ hskp6 )
& ( ( ~ c0_1(a1648)
& ~ c1_1(a1648)
& c3_1(a1648)
& ndr1_0 )
| ~ hskp5 )
& ( ( ~ c2_1(a1647)
& ~ c0_1(a1647)
& c1_1(a1647)
& ndr1_0 )
| ~ hskp4 )
& ( ( ~ c2_1(a1646)
& ~ c1_1(a1646)
& c0_1(a1646)
& ndr1_0 )
| ~ hskp3 )
& ( ( ~ c3_1(a1645)
& ~ c0_1(a1645)
& ~ c1_1(a1645)
& ndr1_0 )
| ~ hskp2 )
& ( ( ~ c2_1(a1643)
& c3_1(a1643)
& ~ c1_1(a1643)
& ndr1_0 )
| ~ hskp1 )
& ( ( ~ c2_1(a1637)
& c0_1(a1637)
& c1_1(a1637)
& ndr1_0 )
| ~ hskp0 ) ),
file('/export/starexec/sandbox/benchmark/theBenchmark.p',co1) ).
fof(f2,negated_conjecture,
~ ~ ( ( hskp30
| hskp41
| ! [X88] :
( ndr1_0
=> ( c0_1(X88)
| ~ c1_1(X88)
| c2_1(X88) ) ) )
& ( ! [X87] :
( ndr1_0
=> ( ~ c3_1(X87)
| ~ c1_1(X87)
| ~ c0_1(X87) ) )
| hskp40
| ! [X86] :
( ndr1_0
=> ( c3_1(X86)
| ~ c2_1(X86)
| c1_1(X86) ) ) )
& ( ! [X85] :
( ndr1_0
=> ( c2_1(X85)
| c1_1(X85)
| ~ c3_1(X85) ) )
| hskp75
| ! [X84] :
( ndr1_0
=> ( ~ c1_1(X84)
| c3_1(X84)
| ~ c2_1(X84) ) ) )
& ( ! [X83] :
( ndr1_0
=> ( c3_1(X83)
| c2_1(X83)
| ~ c0_1(X83) ) )
| ! [X82] :
( ndr1_0
=> ( ~ c1_1(X82)
| ~ c0_1(X82)
| c2_1(X82) ) )
| hskp61 )
& ( ! [X81] :
( ndr1_0
=> ( ~ c3_1(X81)
| c1_1(X81)
| ~ c0_1(X81) ) )
| hskp29
| ! [X80] :
( ndr1_0
=> ( ~ c3_1(X80)
| c1_1(X80)
| c0_1(X80) ) ) )
& ( ! [X79] :
( ndr1_0
=> ( ~ c3_1(X79)
| ~ c0_1(X79)
| c2_1(X79) ) )
| ! [X78] :
( ndr1_0
=> ( ~ c2_1(X78)
| ~ c3_1(X78)
| c0_1(X78) ) )
| hskp39 )
& ( ! [X77] :
( ndr1_0
=> ( ~ c0_1(X77)
| c3_1(X77)
| c2_1(X77) ) )
| hskp57
| ! [X76] :
( ndr1_0
=> ( c3_1(X76)
| c1_1(X76)
| ~ c2_1(X76) ) ) )
& ( ! [X75] :
( ndr1_0
=> ( c1_1(X75)
| c2_1(X75)
| ~ c0_1(X75) ) )
| ! [X74] :
( ndr1_0
=> ( ~ c1_1(X74)
| ~ c0_1(X74)
| ~ c3_1(X74) ) )
| ! [X73] :
( ndr1_0
=> ( ~ c3_1(X73)
| c2_1(X73)
| c1_1(X73) ) ) )
& ( ! [X72] :
( ndr1_0
=> ( c2_1(X72)
| c3_1(X72)
| ~ c0_1(X72) ) )
| hskp47
| ! [X71] :
( ndr1_0
=> ( ~ c3_1(X71)
| ~ c0_1(X71)
| ~ c1_1(X71) ) ) )
& ( ! [X70] :
( ndr1_0
=> ( ~ c0_1(X70)
| ~ c2_1(X70)
| ~ c3_1(X70) ) )
| hskp38
| hskp74 )
& ( ! [X69] :
( ndr1_0
=> ( c1_1(X69)
| ~ c2_1(X69)
| ~ c3_1(X69) ) )
| ! [X68] :
( ndr1_0
=> ( c0_1(X68)
| ~ c3_1(X68)
| ~ c1_1(X68) ) )
| hskp73 )
& ( hskp72
| ! [X67] :
( ndr1_0
=> ( c2_1(X67)
| c0_1(X67)
| c3_1(X67) ) )
| hskp37 )
& ( ! [X66] :
( ndr1_0
=> ( ~ c2_1(X66)
| ~ c0_1(X66)
| c3_1(X66) ) )
| ! [X65] :
( ndr1_0
=> ( c0_1(X65)
| c2_1(X65)
| c1_1(X65) ) )
| ! [X64] :
( ndr1_0
=> ( c3_1(X64)
| c1_1(X64)
| c2_1(X64) ) ) )
& ( hskp71
| hskp36
| ! [X63] :
( ndr1_0
=> ( c0_1(X63)
| ~ c1_1(X63)
| c2_1(X63) ) ) )
& ( hskp0
| ! [X62] :
( ndr1_0
=> ( ~ c3_1(X62)
| ~ c1_1(X62)
| c2_1(X62) ) )
| ! [X61] :
( ndr1_0
=> ( ~ c0_1(X61)
| ~ c1_1(X61)
| ~ c2_1(X61) ) ) )
& ( ! [X60] :
( ndr1_0
=> ( c3_1(X60)
| c0_1(X60)
| c2_1(X60) ) )
| ! [X59] :
( ndr1_0
=> ( ~ c2_1(X59)
| c0_1(X59)
| c1_1(X59) ) )
| hskp70 )
& ( ! [X58] :
( ndr1_0
=> ( c1_1(X58)
| c0_1(X58)
| ~ c3_1(X58) ) )
| ! [X57] :
( ndr1_0
=> ( c3_1(X57)
| c2_1(X57)
| ~ c1_1(X57) ) )
| hskp69 )
& ( hskp13
| ! [X56] :
( ndr1_0
=> ( ~ c3_1(X56)
| ~ c0_1(X56)
| ~ c1_1(X56) ) )
| ! [X55] :
( ndr1_0
=> ( ~ c3_1(X55)
| ~ c1_1(X55)
| c2_1(X55) ) ) )
& ( ! [X54] :
( ndr1_0
=> ( c2_1(X54)
| ~ c1_1(X54)
| c0_1(X54) ) )
| hskp68
| hskp35 )
& ( ! [X53] :
( ndr1_0
=> ( ~ c2_1(X53)
| ~ c0_1(X53)
| c1_1(X53) ) )
| ! [X52] :
( ndr1_0
=> ( c2_1(X52)
| ~ c3_1(X52)
| ~ c1_1(X52) ) )
| hskp34 )
& ( hskp33
| hskp61
| ! [X51] :
( ndr1_0
=> ( ~ c3_1(X51)
| ~ c0_1(X51)
| c2_1(X51) ) ) )
& ( hskp67
| ! [X50] :
( ndr1_0
=> ( c1_1(X50)
| ~ c0_1(X50)
| ~ c3_1(X50) ) )
| ! [X49] :
( ndr1_0
=> ( ~ c2_1(X49)
| ~ c3_1(X49)
| c1_1(X49) ) ) )
& ( hskp32
| hskp31
| hskp63 )
& ( hskp30
| ! [X48] :
( ndr1_0
=> ( c1_1(X48)
| ~ c3_1(X48)
| c0_1(X48) ) )
| ! [X47] :
( ndr1_0
=> ( c2_1(X47)
| ~ c1_1(X47)
| ~ c0_1(X47) ) ) )
& ( hskp53
| hskp52
| hskp29 )
& ( hskp28
| hskp27
| hskp66 )
& ( ! [X46] :
( ndr1_0
=> ( c1_1(X46)
| ~ c3_1(X46)
| ~ c2_1(X46) ) )
| hskp26
| ! [X45] :
( ndr1_0
=> ( ~ c0_1(X45)
| ~ c3_1(X45)
| ~ c2_1(X45) ) ) )
& ( ! [X44] :
( ndr1_0
=> ( c0_1(X44)
| ~ c3_1(X44)
| ~ c1_1(X44) ) )
| ! [X43] :
( ndr1_0
=> ( c3_1(X43)
| c0_1(X43)
| c1_1(X43) ) )
| hskp25 )
& ( ! [X42] :
( ndr1_0
=> ( c0_1(X42)
| c1_1(X42)
| ~ c3_1(X42) ) )
| hskp24
| hskp61 )
& ( hskp65
| hskp64
| hskp23 )
& ( ! [X41] :
( ndr1_0
=> ( c2_1(X41)
| ~ c0_1(X41)
| c3_1(X41) ) )
| hskp22
| ! [X40] :
( ndr1_0
=> ( c3_1(X40)
| c0_1(X40)
| ~ c2_1(X40) ) ) )
& ( ! [X39] :
( ndr1_0
=> ( c3_1(X39)
| c2_1(X39)
| ~ c1_1(X39) ) )
| hskp21
| ! [X38] :
( ndr1_0
=> ( c2_1(X38)
| c0_1(X38)
| ~ c1_1(X38) ) ) )
& ( hskp20
| ! [X37] :
( ndr1_0
=> ( c3_1(X37)
| ~ c1_1(X37)
| ~ c0_1(X37) ) )
| hskp19 )
& ( ! [X36] :
( ndr1_0
=> ( c3_1(X36)
| ~ c2_1(X36)
| c1_1(X36) ) )
| hskp18
| hskp60 )
& ( hskp17
| hskp16
| ! [X35] :
( ndr1_0
=> ( ~ c3_1(X35)
| c1_1(X35)
| ~ c0_1(X35) ) ) )
& ( ! [X34] :
( ndr1_0
=> ( ~ c3_1(X34)
| ~ c1_1(X34)
| ~ c2_1(X34) ) )
| ! [X33] :
( ndr1_0
=> ( ~ c3_1(X33)
| ~ c0_1(X33)
| c1_1(X33) ) )
| hskp63 )
& ( ! [X32] :
( ndr1_0
=> ( c1_1(X32)
| ~ c3_1(X32)
| c0_1(X32) ) )
| ! [X31] :
( ndr1_0
=> ( c1_1(X31)
| ~ c3_1(X31)
| ~ c0_1(X31) ) )
| ! [X30] :
( ndr1_0
=> ( c3_1(X30)
| ~ c2_1(X30)
| ~ c1_1(X30) ) ) )
& ( hskp62
| hskp61
| ! [X29] :
( ndr1_0
=> ( c0_1(X29)
| ~ c3_1(X29)
| ~ c1_1(X29) ) ) )
& ( ! [X28] :
( ndr1_0
=> ( c1_1(X28)
| ~ c2_1(X28)
| c3_1(X28) ) )
| ! [X27] :
( ndr1_0
=> ( ~ c3_1(X27)
| c1_1(X27)
| c0_1(X27) ) )
| hskp60 )
& ( ! [X26] :
( ndr1_0
=> ( ~ c3_1(X26)
| ~ c0_1(X26)
| c2_1(X26) ) )
| ! [X25] :
( ndr1_0
=> ( c0_1(X25)
| c2_1(X25)
| ~ c3_1(X25) ) )
| ! [X24] :
( ndr1_0
=> ( ~ c3_1(X24)
| c1_1(X24)
| ~ c2_1(X24) ) ) )
& ( hskp15
| hskp14
| hskp10 )
& ( ! [X23] :
( ndr1_0
=> ( c2_1(X23)
| ~ c0_1(X23)
| c1_1(X23) ) )
| hskp59
| hskp58 )
& ( ! [X22] :
( ndr1_0
=> ( ~ c1_1(X22)
| ~ c3_1(X22)
| ~ c2_1(X22) ) )
| hskp13
| hskp12 )
& ( hskp57
| hskp11
| ! [X21] :
( ndr1_0
=> ( ~ c3_1(X21)
| c2_1(X21)
| ~ c0_1(X21) ) ) )
& ( hskp10
| ! [X20] :
( ndr1_0
=> ( c0_1(X20)
| c3_1(X20)
| c2_1(X20) ) )
| hskp56 )
& ( ! [X19] :
( ndr1_0
=> ( ~ c0_1(X19)
| ~ c3_1(X19)
| c2_1(X19) ) )
| ! [X18] :
( ndr1_0
=> ( ~ c3_1(X18)
| c0_1(X18)
| c2_1(X18) ) )
| ! [X17] :
( ndr1_0
=> ( c3_1(X17)
| c1_1(X17)
| ~ c0_1(X17) ) ) )
& ( ! [X16] :
( ndr1_0
=> ( c3_1(X16)
| ~ c2_1(X16)
| ~ c0_1(X16) ) )
| hskp55
| hskp9 )
& ( ! [X15] :
( ndr1_0
=> ( ~ c0_1(X15)
| c3_1(X15)
| ~ c1_1(X15) ) )
| ! [X14] :
( ndr1_0
=> ( ~ c0_1(X14)
| c1_1(X14)
| c3_1(X14) ) )
| hskp2 )
& ( ! [X13] :
( ndr1_0
=> ( ~ c2_1(X13)
| ~ c3_1(X13)
| ~ c0_1(X13) ) )
| ! [X12] :
( ndr1_0
=> ( ~ c2_1(X12)
| c1_1(X12)
| ~ c0_1(X12) ) )
| ! [X11] :
( ndr1_0
=> ( c0_1(X11)
| c3_1(X11)
| c2_1(X11) ) ) )
& ( hskp54
| hskp8
| hskp53 )
& ( hskp7
| ! [X10] :
( ndr1_0
=> ( c3_1(X10)
| ~ c0_1(X10)
| ~ c2_1(X10) ) )
| hskp52 )
& ( hskp51
| ! [X9] :
( ndr1_0
=> ( ~ c2_1(X9)
| ~ c0_1(X9)
| ~ c1_1(X9) ) )
| hskp50 )
& ( hskp49
| ! [X8] :
( ndr1_0
=> ( c0_1(X8)
| c2_1(X8)
| c1_1(X8) ) )
| ! [X7] :
( ndr1_0
=> ( ~ c1_1(X7)
| c0_1(X7)
| c2_1(X7) ) ) )
& ( hskp6
| hskp48
| ! [X6] :
( ndr1_0
=> ( c2_1(X6)
| ~ c3_1(X6)
| ~ c0_1(X6) ) ) )
& ( hskp5
| hskp4
| ! [X5] :
( ndr1_0
=> ( ~ c3_1(X5)
| c0_1(X5)
| c1_1(X5) ) ) )
& ( hskp3
| hskp2
| hskp47 )
& ( ! [X4] :
( ndr1_0
=> ( c2_1(X4)
| ~ c0_1(X4)
| c1_1(X4) ) )
| hskp1
| ! [X3] :
( ndr1_0
=> ( c3_1(X3)
| c0_1(X3)
| c2_1(X3) ) ) )
& ( ! [X2] :
( ndr1_0
=> ( ~ c3_1(X2)
| c0_1(X2)
| ~ c2_1(X2) ) )
| hskp46
| ! [X1] :
( ndr1_0
=> ( c2_1(X1)
| ~ c1_1(X1)
| c0_1(X1) ) ) )
& ( hskp45
| hskp44
| hskp43 )
& ( hskp42
| ! [X0] :
( ndr1_0
=> ( c3_1(X0)
| ~ c0_1(X0)
| ~ c2_1(X0) ) )
| hskp0 )
& ( ( c3_1(a1724)
& ~ c2_1(a1724)
& c0_1(a1724)
& ndr1_0 )
| ~ hskp75 )
& ( ( c2_1(a1717)
& c0_1(a1717)
& ~ c3_1(a1717)
& ndr1_0 )
| ~ hskp74 )
& ( ( c0_1(a1716)
& ~ c3_1(a1716)
& c2_1(a1716)
& ndr1_0 )
| ~ hskp73 )
& ( ( c3_1(a1715)
& c1_1(a1715)
& ~ c2_1(a1715)
& ndr1_0 )
| ~ hskp72 )
& ( ( c0_1(a1713)
& c3_1(a1713)
& ~ c2_1(a1713)
& ndr1_0 )
| ~ hskp71 )
& ( ( c1_1(a1710)
& ~ c3_1(a1710)
& ~ c0_1(a1710)
& ndr1_0 )
| ~ hskp70 )
& ( ( c3_1(a1709)
& c0_1(a1709)
& ~ c1_1(a1709)
& ndr1_0 )
| ~ hskp69 )
& ( ( c0_1(a1707)
& c3_1(a1707)
& ~ c1_1(a1707)
& ndr1_0 )
| ~ hskp68 )
& ( ( c3_1(a1702)
& c2_1(a1702)
& c1_1(a1702)
& ndr1_0 )
| ~ hskp67 )
& ( ( c0_1(a1692)
& ~ c2_1(a1692)
& ~ c1_1(a1692)
& ndr1_0 )
| ~ hskp66 )
& ( ( c2_1(a1687)
& ~ c0_1(a1687)
& ~ c3_1(a1687)
& ndr1_0 )
| ~ hskp65 )
& ( ( c0_1(a1686)
& ~ c1_1(a1686)
& ~ c3_1(a1686)
& ndr1_0 )
| ~ hskp64 )
& ( ( c3_1(a1676)
& c2_1(a1676)
& ~ c0_1(a1676)
& ndr1_0 )
| ~ hskp63 )
& ( ( c0_1(a1675)
& c1_1(a1675)
& ~ c3_1(a1675)
& ndr1_0 )
| ~ hskp62 )
& ( ( c3_1(a1674)
& ~ c2_1(a1674)
& ~ c1_1(a1674)
& ndr1_0 )
| ~ hskp61 )
& ( ( c2_1(a1673)
& c3_1(a1673)
& ~ c1_1(a1673)
& ndr1_0 )
| ~ hskp60 )
& ( ( c0_1(a1669)
& ~ c2_1(a1669)
& c3_1(a1669)
& ndr1_0 )
| ~ hskp59 )
& ( ( c3_1(a1668)
& ~ c1_1(a1668)
& ~ c0_1(a1668)
& ndr1_0 )
| ~ hskp58 )
& ( ( c3_1(a1665)
& ~ c1_1(a1665)
& c0_1(a1665)
& ndr1_0 )
| ~ hskp57 )
& ( ( c1_1(a1662)
& ~ c2_1(a1662)
& c0_1(a1662)
& ndr1_0 )
| ~ hskp56 )
& ( ( c1_1(a1661)
& ~ c3_1(a1661)
& ~ c2_1(a1661)
& ndr1_0 )
| ~ hskp55 )
& ( ( c1_1(a1658)
& ~ c0_1(a1658)
& c3_1(a1658)
& ndr1_0 )
| ~ hskp54 )
& ( ( c0_1(a1656)
& c2_1(a1656)
& ~ c3_1(a1656)
& ndr1_0 )
| ~ hskp53 )
& ( ( c3_1(a1654)
& c2_1(a1654)
& c0_1(a1654)
& ndr1_0 )
| ~ hskp52 )
& ( ( c1_1(a1653)
& ~ c0_1(a1653)
& c2_1(a1653)
& ndr1_0 )
| ~ hskp51 )
& ( ( c0_1(a1652)
& c2_1(a1652)
& c3_1(a1652)
& ndr1_0 )
| ~ hskp50 )
& ( ( c1_1(a1651)
& ~ c2_1(a1651)
& c3_1(a1651)
& ndr1_0 )
| ~ hskp49 )
& ( ( c0_1(a1649)
& ~ c2_1(a1649)
& ~ c3_1(a1649)
& ndr1_0 )
| ~ hskp48 )
& ( ( c3_1(a1644)
& ~ c0_1(a1644)
& ~ c1_1(a1644)
& ndr1_0 )
| ~ hskp47 )
& ( ( c0_1(a1642)
& ~ c1_1(a1642)
& ~ c2_1(a1642)
& ndr1_0 )
| ~ hskp46 )
& ( ( c2_1(a1641)
& ~ c1_1(a1641)
& ~ c3_1(a1641)
& ndr1_0 )
| ~ hskp45 )
& ( ( c1_1(a1640)
& c2_1(a1640)
& c3_1(a1640)
& ndr1_0 )
| ~ hskp44 )
& ( ( c0_1(a1639)
& c2_1(a1639)
& ~ c1_1(a1639)
& ndr1_0 )
| ~ hskp43 )
& ( ( c0_1(a1638)
& ~ c3_1(a1638)
& c1_1(a1638)
& ndr1_0 )
| ~ hskp42 )
& ( ( ~ c1_1(a1726)
& c2_1(a1726)
& c0_1(a1726)
& ndr1_0 )
| ~ hskp41 )
& ( ( ~ c2_1(a1725)
& c3_1(a1725)
& c1_1(a1725)
& ndr1_0 )
| ~ hskp40 )
& ( ( ~ c0_1(a1721)
& c3_1(a1721)
& ~ c1_1(a1721)
& ndr1_0 )
| ~ hskp39 )
& ( ( ~ c0_1(a1718)
& ~ c2_1(a1718)
& c3_1(a1718)
& ndr1_0 )
| ~ hskp38 )
& ( ( ~ c1_1(a1714)
& c0_1(a1714)
& c2_1(a1714)
& ndr1_0 )
| ~ hskp37 )
& ( ( ~ c1_1(a1712)
& ~ c0_1(a1712)
& ~ c2_1(a1712)
& ndr1_0 )
| ~ hskp36 )
& ( ( ~ c1_1(a1706)
& ~ c3_1(a1706)
& ~ c0_1(a1706)
& ndr1_0 )
| ~ hskp35 )
& ( ( ~ c1_1(a1705)
& ~ c3_1(a1705)
& c2_1(a1705)
& ndr1_0 )
| ~ hskp34 )
& ( ( ~ c2_1(a1704)
& ~ c0_1(a1704)
& c3_1(a1704)
& ndr1_0 )
| ~ hskp33 )
& ( ( ~ c3_1(a1701)
& c0_1(a1701)
& c1_1(a1701)
& ndr1_0 )
| ~ hskp32 )
& ( ( ~ c3_1(a1700)
& ~ c0_1(a1700)
& c2_1(a1700)
& ndr1_0 )
| ~ hskp31 )
& ( ( ~ c0_1(a1698)
& c3_1(a1698)
& c1_1(a1698)
& ndr1_0 )
| ~ hskp30 )
& ( ( ~ c3_1(a1695)
& c0_1(a1695)
& c2_1(a1695)
& ndr1_0 )
| ~ hskp29 )
& ( ( ~ c3_1(a1694)
& c2_1(a1694)
& ~ c1_1(a1694)
& ndr1_0 )
| ~ hskp28 )
& ( ( ~ c2_1(a1693)
& ~ c3_1(a1693)
& ~ c0_1(a1693)
& ndr1_0 )
| ~ hskp27 )
& ( ( ~ c2_1(a1691)
& ~ c1_1(a1691)
& ~ c3_1(a1691)
& ndr1_0 )
| ~ hskp26 )
& ( ( ~ c1_1(a1690)
& ~ c0_1(a1690)
& c2_1(a1690)
& ndr1_0 )
| ~ hskp25 )
& ( ( ~ c1_1(a1689)
& c3_1(a1689)
& ~ c0_1(a1689)
& ndr1_0 )
| ~ hskp24 )
& ( ( ~ c1_1(a1685)
& c2_1(a1685)
& ~ c0_1(a1685)
& ndr1_0 )
| ~ hskp23 )
& ( ( ~ c3_1(a1684)
& c2_1(a1684)
& ~ c0_1(a1684)
& ndr1_0 )
| ~ hskp22 )
& ( ( ~ c1_1(a1683)
& c2_1(a1683)
& c3_1(a1683)
& ndr1_0 )
| ~ hskp21 )
& ( ( ~ c3_1(a1682)
& ~ c1_1(a1682)
& ~ c2_1(a1682)
& ndr1_0 )
| ~ hskp20 )
& ( ( ~ c2_1(a1681)
& ~ c3_1(a1681)
& ~ c1_1(a1681)
& ndr1_0 )
| ~ hskp19 )
& ( ( ~ c0_1(a1680)
& ~ c1_1(a1680)
& ~ c3_1(a1680)
& ndr1_0 )
| ~ hskp18 )
& ( ( ~ c2_1(a1678)
& ~ c1_1(a1678)
& ~ c0_1(a1678)
& ndr1_0 )
| ~ hskp17 )
& ( ( ~ c1_1(a1677)
& ~ c2_1(a1677)
& ~ c0_1(a1677)
& ndr1_0 )
| ~ hskp16 )
& ( ( ~ c0_1(a1672)
& c1_1(a1672)
& c3_1(a1672)
& ndr1_0 )
| ~ hskp15 )
& ( ( ~ c3_1(a1671)
& ~ c1_1(a1671)
& c2_1(a1671)
& ndr1_0 )
| ~ hskp14 )
& ( ( ~ c1_1(a1667)
& c3_1(a1667)
& c0_1(a1667)
& ndr1_0 )
| ~ hskp13 )
& ( ( ~ c1_1(a1666)
& c3_1(a1666)
& c2_1(a1666)
& ndr1_0 )
| ~ hskp12 )
& ( ( ~ c1_1(a1664)
& ~ c2_1(a1664)
& ~ c3_1(a1664)
& ndr1_0 )
| ~ hskp11 )
& ( ( ~ c0_1(a1663)
& ~ c3_1(a1663)
& ~ c2_1(a1663)
& ndr1_0 )
| ~ hskp10 )
& ( ( ~ c1_1(a1660)
& ~ c0_1(a1660)
& ~ c3_1(a1660)
& ndr1_0 )
| ~ hskp9 )
& ( ( ~ c0_1(a1657)
& ~ c1_1(a1657)
& c2_1(a1657)
& ndr1_0 )
| ~ hskp8 )
& ( ( ~ c2_1(a1655)
& c0_1(a1655)
& c3_1(a1655)
& ndr1_0 )
| ~ hskp7 )
& ( ( ~ c3_1(a1650)
& ~ c2_1(a1650)
& ~ c1_1(a1650)
& ndr1_0 )
| ~ hskp6 )
& ( ( ~ c0_1(a1648)
& ~ c1_1(a1648)
& c3_1(a1648)
& ndr1_0 )
| ~ hskp5 )
& ( ( ~ c2_1(a1647)
& ~ c0_1(a1647)
& c1_1(a1647)
& ndr1_0 )
| ~ hskp4 )
& ( ( ~ c2_1(a1646)
& ~ c1_1(a1646)
& c0_1(a1646)
& ndr1_0 )
| ~ hskp3 )
& ( ( ~ c3_1(a1645)
& ~ c0_1(a1645)
& ~ c1_1(a1645)
& ndr1_0 )
| ~ hskp2 )
& ( ( ~ c2_1(a1643)
& c3_1(a1643)
& ~ c1_1(a1643)
& ndr1_0 )
| ~ hskp1 )
& ( ( ~ c2_1(a1637)
& c0_1(a1637)
& c1_1(a1637)
& ndr1_0 )
| ~ hskp0 ) ),
inference(negated_conjecture,[],[f1]) ).
fof(f3,plain,
~ ~ ( ( hskp30
| hskp41
| ! [X0] :
( ndr1_0
=> ( c0_1(X0)
| ~ c1_1(X0)
| c2_1(X0) ) ) )
& ( ! [X1] :
( ndr1_0
=> ( ~ c3_1(X1)
| ~ c1_1(X1)
| ~ c0_1(X1) ) )
| hskp40
| ! [X2] :
( ndr1_0
=> ( c3_1(X2)
| ~ c2_1(X2)
| c1_1(X2) ) ) )
& ( ! [X3] :
( ndr1_0
=> ( c2_1(X3)
| c1_1(X3)
| ~ c3_1(X3) ) )
| hskp75
| ! [X4] :
( ndr1_0
=> ( ~ c1_1(X4)
| c3_1(X4)
| ~ c2_1(X4) ) ) )
& ( ! [X5] :
( ndr1_0
=> ( c3_1(X5)
| c2_1(X5)
| ~ c0_1(X5) ) )
| ! [X6] :
( ndr1_0
=> ( ~ c1_1(X6)
| ~ c0_1(X6)
| c2_1(X6) ) )
| hskp61 )
& ( ! [X7] :
( ndr1_0
=> ( ~ c3_1(X7)
| c1_1(X7)
| ~ c0_1(X7) ) )
| hskp29
| ! [X8] :
( ndr1_0
=> ( ~ c3_1(X8)
| c1_1(X8)
| c0_1(X8) ) ) )
& ( ! [X9] :
( ndr1_0
=> ( ~ c3_1(X9)
| ~ c0_1(X9)
| c2_1(X9) ) )
| ! [X10] :
( ndr1_0
=> ( ~ c2_1(X10)
| ~ c3_1(X10)
| c0_1(X10) ) )
| hskp39 )
& ( ! [X11] :
( ndr1_0
=> ( ~ c0_1(X11)
| c3_1(X11)
| c2_1(X11) ) )
| hskp57
| ! [X12] :
( ndr1_0
=> ( c3_1(X12)
| c1_1(X12)
| ~ c2_1(X12) ) ) )
& ( ! [X13] :
( ndr1_0
=> ( c1_1(X13)
| c2_1(X13)
| ~ c0_1(X13) ) )
| ! [X14] :
( ndr1_0
=> ( ~ c1_1(X14)
| ~ c0_1(X14)
| ~ c3_1(X14) ) )
| ! [X15] :
( ndr1_0
=> ( ~ c3_1(X15)
| c2_1(X15)
| c1_1(X15) ) ) )
& ( ! [X16] :
( ndr1_0
=> ( c2_1(X16)
| c3_1(X16)
| ~ c0_1(X16) ) )
| hskp47
| ! [X17] :
( ndr1_0
=> ( ~ c3_1(X17)
| ~ c0_1(X17)
| ~ c1_1(X17) ) ) )
& ( ! [X18] :
( ndr1_0
=> ( ~ c0_1(X18)
| ~ c2_1(X18)
| ~ c3_1(X18) ) )
| hskp38
| hskp74 )
& ( ! [X19] :
( ndr1_0
=> ( c1_1(X19)
| ~ c2_1(X19)
| ~ c3_1(X19) ) )
| ! [X20] :
( ndr1_0
=> ( c0_1(X20)
| ~ c3_1(X20)
| ~ c1_1(X20) ) )
| hskp73 )
& ( hskp72
| ! [X21] :
( ndr1_0
=> ( c2_1(X21)
| c0_1(X21)
| c3_1(X21) ) )
| hskp37 )
& ( ! [X22] :
( ndr1_0
=> ( ~ c2_1(X22)
| ~ c0_1(X22)
| c3_1(X22) ) )
| ! [X23] :
( ndr1_0
=> ( c0_1(X23)
| c2_1(X23)
| c1_1(X23) ) )
| ! [X24] :
( ndr1_0
=> ( c3_1(X24)
| c1_1(X24)
| c2_1(X24) ) ) )
& ( hskp71
| hskp36
| ! [X25] :
( ndr1_0
=> ( c0_1(X25)
| ~ c1_1(X25)
| c2_1(X25) ) ) )
& ( hskp0
| ! [X26] :
( ndr1_0
=> ( ~ c3_1(X26)
| ~ c1_1(X26)
| c2_1(X26) ) )
| ! [X27] :
( ndr1_0
=> ( ~ c0_1(X27)
| ~ c1_1(X27)
| ~ c2_1(X27) ) ) )
& ( ! [X28] :
( ndr1_0
=> ( c3_1(X28)
| c0_1(X28)
| c2_1(X28) ) )
| ! [X29] :
( ndr1_0
=> ( ~ c2_1(X29)
| c0_1(X29)
| c1_1(X29) ) )
| hskp70 )
& ( ! [X30] :
( ndr1_0
=> ( c1_1(X30)
| c0_1(X30)
| ~ c3_1(X30) ) )
| ! [X31] :
( ndr1_0
=> ( c3_1(X31)
| c2_1(X31)
| ~ c1_1(X31) ) )
| hskp69 )
& ( hskp13
| ! [X32] :
( ndr1_0
=> ( ~ c3_1(X32)
| ~ c0_1(X32)
| ~ c1_1(X32) ) )
| ! [X33] :
( ndr1_0
=> ( ~ c3_1(X33)
| ~ c1_1(X33)
| c2_1(X33) ) ) )
& ( ! [X34] :
( ndr1_0
=> ( c2_1(X34)
| ~ c1_1(X34)
| c0_1(X34) ) )
| hskp68
| hskp35 )
& ( ! [X35] :
( ndr1_0
=> ( ~ c2_1(X35)
| ~ c0_1(X35)
| c1_1(X35) ) )
| ! [X36] :
( ndr1_0
=> ( c2_1(X36)
| ~ c3_1(X36)
| ~ c1_1(X36) ) )
| hskp34 )
& ( hskp33
| hskp61
| ! [X37] :
( ndr1_0
=> ( ~ c3_1(X37)
| ~ c0_1(X37)
| c2_1(X37) ) ) )
& ( hskp67
| ! [X38] :
( ndr1_0
=> ( c1_1(X38)
| ~ c0_1(X38)
| ~ c3_1(X38) ) )
| ! [X39] :
( ndr1_0
=> ( ~ c2_1(X39)
| ~ c3_1(X39)
| c1_1(X39) ) ) )
& ( hskp32
| hskp31
| hskp63 )
& ( hskp30
| ! [X40] :
( ndr1_0
=> ( c1_1(X40)
| ~ c3_1(X40)
| c0_1(X40) ) )
| ! [X41] :
( ndr1_0
=> ( c2_1(X41)
| ~ c1_1(X41)
| ~ c0_1(X41) ) ) )
& ( hskp53
| hskp52
| hskp29 )
& ( hskp28
| hskp27
| hskp66 )
& ( ! [X42] :
( ndr1_0
=> ( c1_1(X42)
| ~ c3_1(X42)
| ~ c2_1(X42) ) )
| hskp26
| ! [X43] :
( ndr1_0
=> ( ~ c0_1(X43)
| ~ c3_1(X43)
| ~ c2_1(X43) ) ) )
& ( ! [X44] :
( ndr1_0
=> ( c0_1(X44)
| ~ c3_1(X44)
| ~ c1_1(X44) ) )
| ! [X45] :
( ndr1_0
=> ( c3_1(X45)
| c0_1(X45)
| c1_1(X45) ) )
| hskp25 )
& ( ! [X46] :
( ndr1_0
=> ( c0_1(X46)
| c1_1(X46)
| ~ c3_1(X46) ) )
| hskp24
| hskp61 )
& ( hskp65
| hskp64
| hskp23 )
& ( ! [X47] :
( ndr1_0
=> ( c2_1(X47)
| ~ c0_1(X47)
| c3_1(X47) ) )
| hskp22
| ! [X48] :
( ndr1_0
=> ( c3_1(X48)
| c0_1(X48)
| ~ c2_1(X48) ) ) )
& ( ! [X49] :
( ndr1_0
=> ( c3_1(X49)
| c2_1(X49)
| ~ c1_1(X49) ) )
| hskp21
| ! [X50] :
( ndr1_0
=> ( c2_1(X50)
| c0_1(X50)
| ~ c1_1(X50) ) ) )
& ( hskp20
| ! [X51] :
( ndr1_0
=> ( c3_1(X51)
| ~ c1_1(X51)
| ~ c0_1(X51) ) )
| hskp19 )
& ( ! [X52] :
( ndr1_0
=> ( c3_1(X52)
| ~ c2_1(X52)
| c1_1(X52) ) )
| hskp18
| hskp60 )
& ( hskp17
| hskp16
| ! [X53] :
( ndr1_0
=> ( ~ c3_1(X53)
| c1_1(X53)
| ~ c0_1(X53) ) ) )
& ( ! [X54] :
( ndr1_0
=> ( ~ c3_1(X54)
| ~ c1_1(X54)
| ~ c2_1(X54) ) )
| ! [X55] :
( ndr1_0
=> ( ~ c3_1(X55)
| ~ c0_1(X55)
| c1_1(X55) ) )
| hskp63 )
& ( ! [X56] :
( ndr1_0
=> ( c1_1(X56)
| ~ c3_1(X56)
| c0_1(X56) ) )
| ! [X57] :
( ndr1_0
=> ( c1_1(X57)
| ~ c3_1(X57)
| ~ c0_1(X57) ) )
| ! [X58] :
( ndr1_0
=> ( c3_1(X58)
| ~ c2_1(X58)
| ~ c1_1(X58) ) ) )
& ( hskp62
| hskp61
| ! [X59] :
( ndr1_0
=> ( c0_1(X59)
| ~ c3_1(X59)
| ~ c1_1(X59) ) ) )
& ( ! [X60] :
( ndr1_0
=> ( c1_1(X60)
| ~ c2_1(X60)
| c3_1(X60) ) )
| ! [X61] :
( ndr1_0
=> ( ~ c3_1(X61)
| c1_1(X61)
| c0_1(X61) ) )
| hskp60 )
& ( ! [X62] :
( ndr1_0
=> ( ~ c3_1(X62)
| ~ c0_1(X62)
| c2_1(X62) ) )
| ! [X63] :
( ndr1_0
=> ( c0_1(X63)
| c2_1(X63)
| ~ c3_1(X63) ) )
| ! [X64] :
( ndr1_0
=> ( ~ c3_1(X64)
| c1_1(X64)
| ~ c2_1(X64) ) ) )
& ( hskp15
| hskp14
| hskp10 )
& ( ! [X65] :
( ndr1_0
=> ( c2_1(X65)
| ~ c0_1(X65)
| c1_1(X65) ) )
| hskp59
| hskp58 )
& ( ! [X66] :
( ndr1_0
=> ( ~ c1_1(X66)
| ~ c3_1(X66)
| ~ c2_1(X66) ) )
| hskp13
| hskp12 )
& ( hskp57
| hskp11
| ! [X67] :
( ndr1_0
=> ( ~ c3_1(X67)
| c2_1(X67)
| ~ c0_1(X67) ) ) )
& ( hskp10
| ! [X68] :
( ndr1_0
=> ( c0_1(X68)
| c3_1(X68)
| c2_1(X68) ) )
| hskp56 )
& ( ! [X69] :
( ndr1_0
=> ( ~ c0_1(X69)
| ~ c3_1(X69)
| c2_1(X69) ) )
| ! [X70] :
( ndr1_0
=> ( ~ c3_1(X70)
| c0_1(X70)
| c2_1(X70) ) )
| ! [X71] :
( ndr1_0
=> ( c3_1(X71)
| c1_1(X71)
| ~ c0_1(X71) ) ) )
& ( ! [X72] :
( ndr1_0
=> ( c3_1(X72)
| ~ c2_1(X72)
| ~ c0_1(X72) ) )
| hskp55
| hskp9 )
& ( ! [X73] :
( ndr1_0
=> ( ~ c0_1(X73)
| c3_1(X73)
| ~ c1_1(X73) ) )
| ! [X74] :
( ndr1_0
=> ( ~ c0_1(X74)
| c1_1(X74)
| c3_1(X74) ) )
| hskp2 )
& ( ! [X75] :
( ndr1_0
=> ( ~ c2_1(X75)
| ~ c3_1(X75)
| ~ c0_1(X75) ) )
| ! [X76] :
( ndr1_0
=> ( ~ c2_1(X76)
| c1_1(X76)
| ~ c0_1(X76) ) )
| ! [X77] :
( ndr1_0
=> ( c0_1(X77)
| c3_1(X77)
| c2_1(X77) ) ) )
& ( hskp54
| hskp8
| hskp53 )
& ( hskp7
| ! [X78] :
( ndr1_0
=> ( c3_1(X78)
| ~ c0_1(X78)
| ~ c2_1(X78) ) )
| hskp52 )
& ( hskp51
| ! [X79] :
( ndr1_0
=> ( ~ c2_1(X79)
| ~ c0_1(X79)
| ~ c1_1(X79) ) )
| hskp50 )
& ( hskp49
| ! [X80] :
( ndr1_0
=> ( c0_1(X80)
| c2_1(X80)
| c1_1(X80) ) )
| ! [X81] :
( ndr1_0
=> ( ~ c1_1(X81)
| c0_1(X81)
| c2_1(X81) ) ) )
& ( hskp6
| hskp48
| ! [X82] :
( ndr1_0
=> ( c2_1(X82)
| ~ c3_1(X82)
| ~ c0_1(X82) ) ) )
& ( hskp5
| hskp4
| ! [X83] :
( ndr1_0
=> ( ~ c3_1(X83)
| c0_1(X83)
| c1_1(X83) ) ) )
& ( hskp3
| hskp2
| hskp47 )
& ( ! [X84] :
( ndr1_0
=> ( c2_1(X84)
| ~ c0_1(X84)
| c1_1(X84) ) )
| hskp1
| ! [X85] :
( ndr1_0
=> ( c3_1(X85)
| c0_1(X85)
| c2_1(X85) ) ) )
& ( ! [X86] :
( ndr1_0
=> ( ~ c3_1(X86)
| c0_1(X86)
| ~ c2_1(X86) ) )
| hskp46
| ! [X87] :
( ndr1_0
=> ( c2_1(X87)
| ~ c1_1(X87)
| c0_1(X87) ) ) )
& ( hskp45
| hskp44
| hskp43 )
& ( hskp42
| ! [X88] :
( ndr1_0
=> ( c3_1(X88)
| ~ c0_1(X88)
| ~ c2_1(X88) ) )
| hskp0 )
& ( ( c3_1(a1724)
& ~ c2_1(a1724)
& c0_1(a1724)
& ndr1_0 )
| ~ hskp75 )
& ( ( c2_1(a1717)
& c0_1(a1717)
& ~ c3_1(a1717)
& ndr1_0 )
| ~ hskp74 )
& ( ( c0_1(a1716)
& ~ c3_1(a1716)
& c2_1(a1716)
& ndr1_0 )
| ~ hskp73 )
& ( ( c3_1(a1715)
& c1_1(a1715)
& ~ c2_1(a1715)
& ndr1_0 )
| ~ hskp72 )
& ( ( c0_1(a1713)
& c3_1(a1713)
& ~ c2_1(a1713)
& ndr1_0 )
| ~ hskp71 )
& ( ( c1_1(a1710)
& ~ c3_1(a1710)
& ~ c0_1(a1710)
& ndr1_0 )
| ~ hskp70 )
& ( ( c3_1(a1709)
& c0_1(a1709)
& ~ c1_1(a1709)
& ndr1_0 )
| ~ hskp69 )
& ( ( c0_1(a1707)
& c3_1(a1707)
& ~ c1_1(a1707)
& ndr1_0 )
| ~ hskp68 )
& ( ( c3_1(a1702)
& c2_1(a1702)
& c1_1(a1702)
& ndr1_0 )
| ~ hskp67 )
& ( ( c0_1(a1692)
& ~ c2_1(a1692)
& ~ c1_1(a1692)
& ndr1_0 )
| ~ hskp66 )
& ( ( c2_1(a1687)
& ~ c0_1(a1687)
& ~ c3_1(a1687)
& ndr1_0 )
| ~ hskp65 )
& ( ( c0_1(a1686)
& ~ c1_1(a1686)
& ~ c3_1(a1686)
& ndr1_0 )
| ~ hskp64 )
& ( ( c3_1(a1676)
& c2_1(a1676)
& ~ c0_1(a1676)
& ndr1_0 )
| ~ hskp63 )
& ( ( c0_1(a1675)
& c1_1(a1675)
& ~ c3_1(a1675)
& ndr1_0 )
| ~ hskp62 )
& ( ( c3_1(a1674)
& ~ c2_1(a1674)
& ~ c1_1(a1674)
& ndr1_0 )
| ~ hskp61 )
& ( ( c2_1(a1673)
& c3_1(a1673)
& ~ c1_1(a1673)
& ndr1_0 )
| ~ hskp60 )
& ( ( c0_1(a1669)
& ~ c2_1(a1669)
& c3_1(a1669)
& ndr1_0 )
| ~ hskp59 )
& ( ( c3_1(a1668)
& ~ c1_1(a1668)
& ~ c0_1(a1668)
& ndr1_0 )
| ~ hskp58 )
& ( ( c3_1(a1665)
& ~ c1_1(a1665)
& c0_1(a1665)
& ndr1_0 )
| ~ hskp57 )
& ( ( c1_1(a1662)
& ~ c2_1(a1662)
& c0_1(a1662)
& ndr1_0 )
| ~ hskp56 )
& ( ( c1_1(a1661)
& ~ c3_1(a1661)
& ~ c2_1(a1661)
& ndr1_0 )
| ~ hskp55 )
& ( ( c1_1(a1658)
& ~ c0_1(a1658)
& c3_1(a1658)
& ndr1_0 )
| ~ hskp54 )
& ( ( c0_1(a1656)
& c2_1(a1656)
& ~ c3_1(a1656)
& ndr1_0 )
| ~ hskp53 )
& ( ( c3_1(a1654)
& c2_1(a1654)
& c0_1(a1654)
& ndr1_0 )
| ~ hskp52 )
& ( ( c1_1(a1653)
& ~ c0_1(a1653)
& c2_1(a1653)
& ndr1_0 )
| ~ hskp51 )
& ( ( c0_1(a1652)
& c2_1(a1652)
& c3_1(a1652)
& ndr1_0 )
| ~ hskp50 )
& ( ( c1_1(a1651)
& ~ c2_1(a1651)
& c3_1(a1651)
& ndr1_0 )
| ~ hskp49 )
& ( ( c0_1(a1649)
& ~ c2_1(a1649)
& ~ c3_1(a1649)
& ndr1_0 )
| ~ hskp48 )
& ( ( c3_1(a1644)
& ~ c0_1(a1644)
& ~ c1_1(a1644)
& ndr1_0 )
| ~ hskp47 )
& ( ( c0_1(a1642)
& ~ c1_1(a1642)
& ~ c2_1(a1642)
& ndr1_0 )
| ~ hskp46 )
& ( ( c2_1(a1641)
& ~ c1_1(a1641)
& ~ c3_1(a1641)
& ndr1_0 )
| ~ hskp45 )
& ( ( c1_1(a1640)
& c2_1(a1640)
& c3_1(a1640)
& ndr1_0 )
| ~ hskp44 )
& ( ( c0_1(a1639)
& c2_1(a1639)
& ~ c1_1(a1639)
& ndr1_0 )
| ~ hskp43 )
& ( ( c0_1(a1638)
& ~ c3_1(a1638)
& c1_1(a1638)
& ndr1_0 )
| ~ hskp42 )
& ( ( ~ c1_1(a1726)
& c2_1(a1726)
& c0_1(a1726)
& ndr1_0 )
| ~ hskp41 )
& ( ( ~ c2_1(a1725)
& c3_1(a1725)
& c1_1(a1725)
& ndr1_0 )
| ~ hskp40 )
& ( ( ~ c0_1(a1721)
& c3_1(a1721)
& ~ c1_1(a1721)
& ndr1_0 )
| ~ hskp39 )
& ( ( ~ c0_1(a1718)
& ~ c2_1(a1718)
& c3_1(a1718)
& ndr1_0 )
| ~ hskp38 )
& ( ( ~ c1_1(a1714)
& c0_1(a1714)
& c2_1(a1714)
& ndr1_0 )
| ~ hskp37 )
& ( ( ~ c1_1(a1712)
& ~ c0_1(a1712)
& ~ c2_1(a1712)
& ndr1_0 )
| ~ hskp36 )
& ( ( ~ c1_1(a1706)
& ~ c3_1(a1706)
& ~ c0_1(a1706)
& ndr1_0 )
| ~ hskp35 )
& ( ( ~ c1_1(a1705)
& ~ c3_1(a1705)
& c2_1(a1705)
& ndr1_0 )
| ~ hskp34 )
& ( ( ~ c2_1(a1704)
& ~ c0_1(a1704)
& c3_1(a1704)
& ndr1_0 )
| ~ hskp33 )
& ( ( ~ c3_1(a1701)
& c0_1(a1701)
& c1_1(a1701)
& ndr1_0 )
| ~ hskp32 )
& ( ( ~ c3_1(a1700)
& ~ c0_1(a1700)
& c2_1(a1700)
& ndr1_0 )
| ~ hskp31 )
& ( ( ~ c0_1(a1698)
& c3_1(a1698)
& c1_1(a1698)
& ndr1_0 )
| ~ hskp30 )
& ( ( ~ c3_1(a1695)
& c0_1(a1695)
& c2_1(a1695)
& ndr1_0 )
| ~ hskp29 )
& ( ( ~ c3_1(a1694)
& c2_1(a1694)
& ~ c1_1(a1694)
& ndr1_0 )
| ~ hskp28 )
& ( ( ~ c2_1(a1693)
& ~ c3_1(a1693)
& ~ c0_1(a1693)
& ndr1_0 )
| ~ hskp27 )
& ( ( ~ c2_1(a1691)
& ~ c1_1(a1691)
& ~ c3_1(a1691)
& ndr1_0 )
| ~ hskp26 )
& ( ( ~ c1_1(a1690)
& ~ c0_1(a1690)
& c2_1(a1690)
& ndr1_0 )
| ~ hskp25 )
& ( ( ~ c1_1(a1689)
& c3_1(a1689)
& ~ c0_1(a1689)
& ndr1_0 )
| ~ hskp24 )
& ( ( ~ c1_1(a1685)
& c2_1(a1685)
& ~ c0_1(a1685)
& ndr1_0 )
| ~ hskp23 )
& ( ( ~ c3_1(a1684)
& c2_1(a1684)
& ~ c0_1(a1684)
& ndr1_0 )
| ~ hskp22 )
& ( ( ~ c1_1(a1683)
& c2_1(a1683)
& c3_1(a1683)
& ndr1_0 )
| ~ hskp21 )
& ( ( ~ c3_1(a1682)
& ~ c1_1(a1682)
& ~ c2_1(a1682)
& ndr1_0 )
| ~ hskp20 )
& ( ( ~ c2_1(a1681)
& ~ c3_1(a1681)
& ~ c1_1(a1681)
& ndr1_0 )
| ~ hskp19 )
& ( ( ~ c0_1(a1680)
& ~ c1_1(a1680)
& ~ c3_1(a1680)
& ndr1_0 )
| ~ hskp18 )
& ( ( ~ c2_1(a1678)
& ~ c1_1(a1678)
& ~ c0_1(a1678)
& ndr1_0 )
| ~ hskp17 )
& ( ( ~ c1_1(a1677)
& ~ c2_1(a1677)
& ~ c0_1(a1677)
& ndr1_0 )
| ~ hskp16 )
& ( ( ~ c0_1(a1672)
& c1_1(a1672)
& c3_1(a1672)
& ndr1_0 )
| ~ hskp15 )
& ( ( ~ c3_1(a1671)
& ~ c1_1(a1671)
& c2_1(a1671)
& ndr1_0 )
| ~ hskp14 )
& ( ( ~ c1_1(a1667)
& c3_1(a1667)
& c0_1(a1667)
& ndr1_0 )
| ~ hskp13 )
& ( ( ~ c1_1(a1666)
& c3_1(a1666)
& c2_1(a1666)
& ndr1_0 )
| ~ hskp12 )
& ( ( ~ c1_1(a1664)
& ~ c2_1(a1664)
& ~ c3_1(a1664)
& ndr1_0 )
| ~ hskp11 )
& ( ( ~ c0_1(a1663)
& ~ c3_1(a1663)
& ~ c2_1(a1663)
& ndr1_0 )
| ~ hskp10 )
& ( ( ~ c1_1(a1660)
& ~ c0_1(a1660)
& ~ c3_1(a1660)
& ndr1_0 )
| ~ hskp9 )
& ( ( ~ c0_1(a1657)
& ~ c1_1(a1657)
& c2_1(a1657)
& ndr1_0 )
| ~ hskp8 )
& ( ( ~ c2_1(a1655)
& c0_1(a1655)
& c3_1(a1655)
& ndr1_0 )
| ~ hskp7 )
& ( ( ~ c3_1(a1650)
& ~ c2_1(a1650)
& ~ c1_1(a1650)
& ndr1_0 )
| ~ hskp6 )
& ( ( ~ c0_1(a1648)
& ~ c1_1(a1648)
& c3_1(a1648)
& ndr1_0 )
| ~ hskp5 )
& ( ( ~ c2_1(a1647)
& ~ c0_1(a1647)
& c1_1(a1647)
& ndr1_0 )
| ~ hskp4 )
& ( ( ~ c2_1(a1646)
& ~ c1_1(a1646)
& c0_1(a1646)
& ndr1_0 )
| ~ hskp3 )
& ( ( ~ c3_1(a1645)
& ~ c0_1(a1645)
& ~ c1_1(a1645)
& ndr1_0 )
| ~ hskp2 )
& ( ( ~ c2_1(a1643)
& c3_1(a1643)
& ~ c1_1(a1643)
& ndr1_0 )
| ~ hskp1 )
& ( ( ~ c2_1(a1637)
& c0_1(a1637)
& c1_1(a1637)
& ndr1_0 )
| ~ hskp0 ) ),
inference(rectify,[],[f2]) ).
fof(f4,plain,
( ( hskp30
| hskp41
| ! [X0] :
( ndr1_0
=> ( c0_1(X0)
| ~ c1_1(X0)
| c2_1(X0) ) ) )
& ( ! [X1] :
( ndr1_0
=> ( ~ c3_1(X1)
| ~ c1_1(X1)
| ~ c0_1(X1) ) )
| hskp40
| ! [X2] :
( ndr1_0
=> ( c3_1(X2)
| ~ c2_1(X2)
| c1_1(X2) ) ) )
& ( ! [X3] :
( ndr1_0
=> ( c2_1(X3)
| c1_1(X3)
| ~ c3_1(X3) ) )
| hskp75
| ! [X4] :
( ndr1_0
=> ( ~ c1_1(X4)
| c3_1(X4)
| ~ c2_1(X4) ) ) )
& ( ! [X5] :
( ndr1_0
=> ( c3_1(X5)
| c2_1(X5)
| ~ c0_1(X5) ) )
| ! [X6] :
( ndr1_0
=> ( ~ c1_1(X6)
| ~ c0_1(X6)
| c2_1(X6) ) )
| hskp61 )
& ( ! [X7] :
( ndr1_0
=> ( ~ c3_1(X7)
| c1_1(X7)
| ~ c0_1(X7) ) )
| hskp29
| ! [X8] :
( ndr1_0
=> ( ~ c3_1(X8)
| c1_1(X8)
| c0_1(X8) ) ) )
& ( ! [X9] :
( ndr1_0
=> ( ~ c3_1(X9)
| ~ c0_1(X9)
| c2_1(X9) ) )
| ! [X10] :
( ndr1_0
=> ( ~ c2_1(X10)
| ~ c3_1(X10)
| c0_1(X10) ) )
| hskp39 )
& ( ! [X11] :
( ndr1_0
=> ( ~ c0_1(X11)
| c3_1(X11)
| c2_1(X11) ) )
| hskp57
| ! [X12] :
( ndr1_0
=> ( c3_1(X12)
| c1_1(X12)
| ~ c2_1(X12) ) ) )
& ( ! [X13] :
( ndr1_0
=> ( c1_1(X13)
| c2_1(X13)
| ~ c0_1(X13) ) )
| ! [X14] :
( ndr1_0
=> ( ~ c1_1(X14)
| ~ c0_1(X14)
| ~ c3_1(X14) ) )
| ! [X15] :
( ndr1_0
=> ( ~ c3_1(X15)
| c2_1(X15)
| c1_1(X15) ) ) )
& ( ! [X16] :
( ndr1_0
=> ( c2_1(X16)
| c3_1(X16)
| ~ c0_1(X16) ) )
| hskp47
| ! [X17] :
( ndr1_0
=> ( ~ c3_1(X17)
| ~ c0_1(X17)
| ~ c1_1(X17) ) ) )
& ( ! [X18] :
( ndr1_0
=> ( ~ c0_1(X18)
| ~ c2_1(X18)
| ~ c3_1(X18) ) )
| hskp38
| hskp74 )
& ( ! [X19] :
( ndr1_0
=> ( c1_1(X19)
| ~ c2_1(X19)
| ~ c3_1(X19) ) )
| ! [X20] :
( ndr1_0
=> ( c0_1(X20)
| ~ c3_1(X20)
| ~ c1_1(X20) ) )
| hskp73 )
& ( hskp72
| ! [X21] :
( ndr1_0
=> ( c2_1(X21)
| c0_1(X21)
| c3_1(X21) ) )
| hskp37 )
& ( ! [X22] :
( ndr1_0
=> ( ~ c2_1(X22)
| ~ c0_1(X22)
| c3_1(X22) ) )
| ! [X23] :
( ndr1_0
=> ( c0_1(X23)
| c2_1(X23)
| c1_1(X23) ) )
| ! [X24] :
( ndr1_0
=> ( c3_1(X24)
| c1_1(X24)
| c2_1(X24) ) ) )
& ( hskp71
| hskp36
| ! [X25] :
( ndr1_0
=> ( c0_1(X25)
| ~ c1_1(X25)
| c2_1(X25) ) ) )
& ( hskp0
| ! [X26] :
( ndr1_0
=> ( ~ c3_1(X26)
| ~ c1_1(X26)
| c2_1(X26) ) )
| ! [X27] :
( ndr1_0
=> ( ~ c0_1(X27)
| ~ c1_1(X27)
| ~ c2_1(X27) ) ) )
& ( ! [X28] :
( ndr1_0
=> ( c3_1(X28)
| c0_1(X28)
| c2_1(X28) ) )
| ! [X29] :
( ndr1_0
=> ( ~ c2_1(X29)
| c0_1(X29)
| c1_1(X29) ) )
| hskp70 )
& ( ! [X30] :
( ndr1_0
=> ( c1_1(X30)
| c0_1(X30)
| ~ c3_1(X30) ) )
| ! [X31] :
( ndr1_0
=> ( c3_1(X31)
| c2_1(X31)
| ~ c1_1(X31) ) )
| hskp69 )
& ( hskp13
| ! [X32] :
( ndr1_0
=> ( ~ c3_1(X32)
| ~ c0_1(X32)
| ~ c1_1(X32) ) )
| ! [X33] :
( ndr1_0
=> ( ~ c3_1(X33)
| ~ c1_1(X33)
| c2_1(X33) ) ) )
& ( ! [X34] :
( ndr1_0
=> ( c2_1(X34)
| ~ c1_1(X34)
| c0_1(X34) ) )
| hskp68
| hskp35 )
& ( ! [X35] :
( ndr1_0
=> ( ~ c2_1(X35)
| ~ c0_1(X35)
| c1_1(X35) ) )
| ! [X36] :
( ndr1_0
=> ( c2_1(X36)
| ~ c3_1(X36)
| ~ c1_1(X36) ) )
| hskp34 )
& ( hskp33
| hskp61
| ! [X37] :
( ndr1_0
=> ( ~ c3_1(X37)
| ~ c0_1(X37)
| c2_1(X37) ) ) )
& ( hskp67
| ! [X38] :
( ndr1_0
=> ( c1_1(X38)
| ~ c0_1(X38)
| ~ c3_1(X38) ) )
| ! [X39] :
( ndr1_0
=> ( ~ c2_1(X39)
| ~ c3_1(X39)
| c1_1(X39) ) ) )
& ( hskp32
| hskp31
| hskp63 )
& ( hskp30
| ! [X40] :
( ndr1_0
=> ( c1_1(X40)
| ~ c3_1(X40)
| c0_1(X40) ) )
| ! [X41] :
( ndr1_0
=> ( c2_1(X41)
| ~ c1_1(X41)
| ~ c0_1(X41) ) ) )
& ( hskp53
| hskp52
| hskp29 )
& ( hskp28
| hskp27
| hskp66 )
& ( ! [X42] :
( ndr1_0
=> ( c1_1(X42)
| ~ c3_1(X42)
| ~ c2_1(X42) ) )
| hskp26
| ! [X43] :
( ndr1_0
=> ( ~ c0_1(X43)
| ~ c3_1(X43)
| ~ c2_1(X43) ) ) )
& ( ! [X44] :
( ndr1_0
=> ( c0_1(X44)
| ~ c3_1(X44)
| ~ c1_1(X44) ) )
| ! [X45] :
( ndr1_0
=> ( c3_1(X45)
| c0_1(X45)
| c1_1(X45) ) )
| hskp25 )
& ( ! [X46] :
( ndr1_0
=> ( c0_1(X46)
| c1_1(X46)
| ~ c3_1(X46) ) )
| hskp24
| hskp61 )
& ( hskp65
| hskp64
| hskp23 )
& ( ! [X47] :
( ndr1_0
=> ( c2_1(X47)
| ~ c0_1(X47)
| c3_1(X47) ) )
| hskp22
| ! [X48] :
( ndr1_0
=> ( c3_1(X48)
| c0_1(X48)
| ~ c2_1(X48) ) ) )
& ( ! [X49] :
( ndr1_0
=> ( c3_1(X49)
| c2_1(X49)
| ~ c1_1(X49) ) )
| hskp21
| ! [X50] :
( ndr1_0
=> ( c2_1(X50)
| c0_1(X50)
| ~ c1_1(X50) ) ) )
& ( hskp20
| ! [X51] :
( ndr1_0
=> ( c3_1(X51)
| ~ c1_1(X51)
| ~ c0_1(X51) ) )
| hskp19 )
& ( ! [X52] :
( ndr1_0
=> ( c3_1(X52)
| ~ c2_1(X52)
| c1_1(X52) ) )
| hskp18
| hskp60 )
& ( hskp17
| hskp16
| ! [X53] :
( ndr1_0
=> ( ~ c3_1(X53)
| c1_1(X53)
| ~ c0_1(X53) ) ) )
& ( ! [X54] :
( ndr1_0
=> ( ~ c3_1(X54)
| ~ c1_1(X54)
| ~ c2_1(X54) ) )
| ! [X55] :
( ndr1_0
=> ( ~ c3_1(X55)
| ~ c0_1(X55)
| c1_1(X55) ) )
| hskp63 )
& ( ! [X56] :
( ndr1_0
=> ( c1_1(X56)
| ~ c3_1(X56)
| c0_1(X56) ) )
| ! [X57] :
( ndr1_0
=> ( c1_1(X57)
| ~ c3_1(X57)
| ~ c0_1(X57) ) )
| ! [X58] :
( ndr1_0
=> ( c3_1(X58)
| ~ c2_1(X58)
| ~ c1_1(X58) ) ) )
& ( hskp62
| hskp61
| ! [X59] :
( ndr1_0
=> ( c0_1(X59)
| ~ c3_1(X59)
| ~ c1_1(X59) ) ) )
& ( ! [X60] :
( ndr1_0
=> ( c1_1(X60)
| ~ c2_1(X60)
| c3_1(X60) ) )
| ! [X61] :
( ndr1_0
=> ( ~ c3_1(X61)
| c1_1(X61)
| c0_1(X61) ) )
| hskp60 )
& ( ! [X62] :
( ndr1_0
=> ( ~ c3_1(X62)
| ~ c0_1(X62)
| c2_1(X62) ) )
| ! [X63] :
( ndr1_0
=> ( c0_1(X63)
| c2_1(X63)
| ~ c3_1(X63) ) )
| ! [X64] :
( ndr1_0
=> ( ~ c3_1(X64)
| c1_1(X64)
| ~ c2_1(X64) ) ) )
& ( hskp15
| hskp14
| hskp10 )
& ( ! [X65] :
( ndr1_0
=> ( c2_1(X65)
| ~ c0_1(X65)
| c1_1(X65) ) )
| hskp59
| hskp58 )
& ( ! [X66] :
( ndr1_0
=> ( ~ c1_1(X66)
| ~ c3_1(X66)
| ~ c2_1(X66) ) )
| hskp13
| hskp12 )
& ( hskp57
| hskp11
| ! [X67] :
( ndr1_0
=> ( ~ c3_1(X67)
| c2_1(X67)
| ~ c0_1(X67) ) ) )
& ( hskp10
| ! [X68] :
( ndr1_0
=> ( c0_1(X68)
| c3_1(X68)
| c2_1(X68) ) )
| hskp56 )
& ( ! [X69] :
( ndr1_0
=> ( ~ c0_1(X69)
| ~ c3_1(X69)
| c2_1(X69) ) )
| ! [X70] :
( ndr1_0
=> ( ~ c3_1(X70)
| c0_1(X70)
| c2_1(X70) ) )
| ! [X71] :
( ndr1_0
=> ( c3_1(X71)
| c1_1(X71)
| ~ c0_1(X71) ) ) )
& ( ! [X72] :
( ndr1_0
=> ( c3_1(X72)
| ~ c2_1(X72)
| ~ c0_1(X72) ) )
| hskp55
| hskp9 )
& ( ! [X73] :
( ndr1_0
=> ( ~ c0_1(X73)
| c3_1(X73)
| ~ c1_1(X73) ) )
| ! [X74] :
( ndr1_0
=> ( ~ c0_1(X74)
| c1_1(X74)
| c3_1(X74) ) )
| hskp2 )
& ( ! [X75] :
( ndr1_0
=> ( ~ c2_1(X75)
| ~ c3_1(X75)
| ~ c0_1(X75) ) )
| ! [X76] :
( ndr1_0
=> ( ~ c2_1(X76)
| c1_1(X76)
| ~ c0_1(X76) ) )
| ! [X77] :
( ndr1_0
=> ( c0_1(X77)
| c3_1(X77)
| c2_1(X77) ) ) )
& ( hskp54
| hskp8
| hskp53 )
& ( hskp7
| ! [X78] :
( ndr1_0
=> ( c3_1(X78)
| ~ c0_1(X78)
| ~ c2_1(X78) ) )
| hskp52 )
& ( hskp51
| ! [X79] :
( ndr1_0
=> ( ~ c2_1(X79)
| ~ c0_1(X79)
| ~ c1_1(X79) ) )
| hskp50 )
& ( hskp49
| ! [X80] :
( ndr1_0
=> ( c0_1(X80)
| c2_1(X80)
| c1_1(X80) ) )
| ! [X81] :
( ndr1_0
=> ( ~ c1_1(X81)
| c0_1(X81)
| c2_1(X81) ) ) )
& ( hskp6
| hskp48
| ! [X82] :
( ndr1_0
=> ( c2_1(X82)
| ~ c3_1(X82)
| ~ c0_1(X82) ) ) )
& ( hskp5
| hskp4
| ! [X83] :
( ndr1_0
=> ( ~ c3_1(X83)
| c0_1(X83)
| c1_1(X83) ) ) )
& ( hskp3
| hskp2
| hskp47 )
& ( ! [X84] :
( ndr1_0
=> ( c2_1(X84)
| ~ c0_1(X84)
| c1_1(X84) ) )
| hskp1
| ! [X85] :
( ndr1_0
=> ( c3_1(X85)
| c0_1(X85)
| c2_1(X85) ) ) )
& ( ! [X86] :
( ndr1_0
=> ( ~ c3_1(X86)
| c0_1(X86)
| ~ c2_1(X86) ) )
| hskp46
| ! [X87] :
( ndr1_0
=> ( c2_1(X87)
| ~ c1_1(X87)
| c0_1(X87) ) ) )
& ( hskp45
| hskp44
| hskp43 )
& ( hskp42
| ! [X88] :
( ndr1_0
=> ( c3_1(X88)
| ~ c0_1(X88)
| ~ c2_1(X88) ) )
| hskp0 )
& ( ( c3_1(a1724)
& ~ c2_1(a1724)
& c0_1(a1724)
& ndr1_0 )
| ~ hskp75 )
& ( ( c2_1(a1717)
& c0_1(a1717)
& ~ c3_1(a1717)
& ndr1_0 )
| ~ hskp74 )
& ( ( c0_1(a1716)
& ~ c3_1(a1716)
& c2_1(a1716)
& ndr1_0 )
| ~ hskp73 )
& ( ( c3_1(a1715)
& c1_1(a1715)
& ~ c2_1(a1715)
& ndr1_0 )
| ~ hskp72 )
& ( ( c0_1(a1713)
& c3_1(a1713)
& ~ c2_1(a1713)
& ndr1_0 )
| ~ hskp71 )
& ( ( c1_1(a1710)
& ~ c3_1(a1710)
& ~ c0_1(a1710)
& ndr1_0 )
| ~ hskp70 )
& ( ( c3_1(a1709)
& c0_1(a1709)
& ~ c1_1(a1709)
& ndr1_0 )
| ~ hskp69 )
& ( ( c0_1(a1707)
& c3_1(a1707)
& ~ c1_1(a1707)
& ndr1_0 )
| ~ hskp68 )
& ( ( c3_1(a1702)
& c2_1(a1702)
& c1_1(a1702)
& ndr1_0 )
| ~ hskp67 )
& ( ( c0_1(a1692)
& ~ c2_1(a1692)
& ~ c1_1(a1692)
& ndr1_0 )
| ~ hskp66 )
& ( ( c2_1(a1687)
& ~ c0_1(a1687)
& ~ c3_1(a1687)
& ndr1_0 )
| ~ hskp65 )
& ( ( c0_1(a1686)
& ~ c1_1(a1686)
& ~ c3_1(a1686)
& ndr1_0 )
| ~ hskp64 )
& ( ( c3_1(a1676)
& c2_1(a1676)
& ~ c0_1(a1676)
& ndr1_0 )
| ~ hskp63 )
& ( ( c0_1(a1675)
& c1_1(a1675)
& ~ c3_1(a1675)
& ndr1_0 )
| ~ hskp62 )
& ( ( c3_1(a1674)
& ~ c2_1(a1674)
& ~ c1_1(a1674)
& ndr1_0 )
| ~ hskp61 )
& ( ( c2_1(a1673)
& c3_1(a1673)
& ~ c1_1(a1673)
& ndr1_0 )
| ~ hskp60 )
& ( ( c0_1(a1669)
& ~ c2_1(a1669)
& c3_1(a1669)
& ndr1_0 )
| ~ hskp59 )
& ( ( c3_1(a1668)
& ~ c1_1(a1668)
& ~ c0_1(a1668)
& ndr1_0 )
| ~ hskp58 )
& ( ( c3_1(a1665)
& ~ c1_1(a1665)
& c0_1(a1665)
& ndr1_0 )
| ~ hskp57 )
& ( ( c1_1(a1662)
& ~ c2_1(a1662)
& c0_1(a1662)
& ndr1_0 )
| ~ hskp56 )
& ( ( c1_1(a1661)
& ~ c3_1(a1661)
& ~ c2_1(a1661)
& ndr1_0 )
| ~ hskp55 )
& ( ( c1_1(a1658)
& ~ c0_1(a1658)
& c3_1(a1658)
& ndr1_0 )
| ~ hskp54 )
& ( ( c0_1(a1656)
& c2_1(a1656)
& ~ c3_1(a1656)
& ndr1_0 )
| ~ hskp53 )
& ( ( c3_1(a1654)
& c2_1(a1654)
& c0_1(a1654)
& ndr1_0 )
| ~ hskp52 )
& ( ( c1_1(a1653)
& ~ c0_1(a1653)
& c2_1(a1653)
& ndr1_0 )
| ~ hskp51 )
& ( ( c0_1(a1652)
& c2_1(a1652)
& c3_1(a1652)
& ndr1_0 )
| ~ hskp50 )
& ( ( c1_1(a1651)
& ~ c2_1(a1651)
& c3_1(a1651)
& ndr1_0 )
| ~ hskp49 )
& ( ( c0_1(a1649)
& ~ c2_1(a1649)
& ~ c3_1(a1649)
& ndr1_0 )
| ~ hskp48 )
& ( ( c3_1(a1644)
& ~ c0_1(a1644)
& ~ c1_1(a1644)
& ndr1_0 )
| ~ hskp47 )
& ( ( c0_1(a1642)
& ~ c1_1(a1642)
& ~ c2_1(a1642)
& ndr1_0 )
| ~ hskp46 )
& ( ( c2_1(a1641)
& ~ c1_1(a1641)
& ~ c3_1(a1641)
& ndr1_0 )
| ~ hskp45 )
& ( ( c1_1(a1640)
& c2_1(a1640)
& c3_1(a1640)
& ndr1_0 )
| ~ hskp44 )
& ( ( c0_1(a1639)
& c2_1(a1639)
& ~ c1_1(a1639)
& ndr1_0 )
| ~ hskp43 )
& ( ( c0_1(a1638)
& ~ c3_1(a1638)
& c1_1(a1638)
& ndr1_0 )
| ~ hskp42 )
& ( ( ~ c1_1(a1726)
& c2_1(a1726)
& c0_1(a1726)
& ndr1_0 )
| ~ hskp41 )
& ( ( ~ c2_1(a1725)
& c3_1(a1725)
& c1_1(a1725)
& ndr1_0 )
| ~ hskp40 )
& ( ( ~ c0_1(a1721)
& c3_1(a1721)
& ~ c1_1(a1721)
& ndr1_0 )
| ~ hskp39 )
& ( ( ~ c0_1(a1718)
& ~ c2_1(a1718)
& c3_1(a1718)
& ndr1_0 )
| ~ hskp38 )
& ( ( ~ c1_1(a1714)
& c0_1(a1714)
& c2_1(a1714)
& ndr1_0 )
| ~ hskp37 )
& ( ( ~ c1_1(a1712)
& ~ c0_1(a1712)
& ~ c2_1(a1712)
& ndr1_0 )
| ~ hskp36 )
& ( ( ~ c1_1(a1706)
& ~ c3_1(a1706)
& ~ c0_1(a1706)
& ndr1_0 )
| ~ hskp35 )
& ( ( ~ c1_1(a1705)
& ~ c3_1(a1705)
& c2_1(a1705)
& ndr1_0 )
| ~ hskp34 )
& ( ( ~ c2_1(a1704)
& ~ c0_1(a1704)
& c3_1(a1704)
& ndr1_0 )
| ~ hskp33 )
& ( ( ~ c3_1(a1701)
& c0_1(a1701)
& c1_1(a1701)
& ndr1_0 )
| ~ hskp32 )
& ( ( ~ c3_1(a1700)
& ~ c0_1(a1700)
& c2_1(a1700)
& ndr1_0 )
| ~ hskp31 )
& ( ( ~ c0_1(a1698)
& c3_1(a1698)
& c1_1(a1698)
& ndr1_0 )
| ~ hskp30 )
& ( ( ~ c3_1(a1695)
& c0_1(a1695)
& c2_1(a1695)
& ndr1_0 )
| ~ hskp29 )
& ( ( ~ c3_1(a1694)
& c2_1(a1694)
& ~ c1_1(a1694)
& ndr1_0 )
| ~ hskp28 )
& ( ( ~ c2_1(a1693)
& ~ c3_1(a1693)
& ~ c0_1(a1693)
& ndr1_0 )
| ~ hskp27 )
& ( ( ~ c2_1(a1691)
& ~ c1_1(a1691)
& ~ c3_1(a1691)
& ndr1_0 )
| ~ hskp26 )
& ( ( ~ c1_1(a1690)
& ~ c0_1(a1690)
& c2_1(a1690)
& ndr1_0 )
| ~ hskp25 )
& ( ( ~ c1_1(a1689)
& c3_1(a1689)
& ~ c0_1(a1689)
& ndr1_0 )
| ~ hskp24 )
& ( ( ~ c1_1(a1685)
& c2_1(a1685)
& ~ c0_1(a1685)
& ndr1_0 )
| ~ hskp23 )
& ( ( ~ c3_1(a1684)
& c2_1(a1684)
& ~ c0_1(a1684)
& ndr1_0 )
| ~ hskp22 )
& ( ( ~ c1_1(a1683)
& c2_1(a1683)
& c3_1(a1683)
& ndr1_0 )
| ~ hskp21 )
& ( ( ~ c3_1(a1682)
& ~ c1_1(a1682)
& ~ c2_1(a1682)
& ndr1_0 )
| ~ hskp20 )
& ( ( ~ c2_1(a1681)
& ~ c3_1(a1681)
& ~ c1_1(a1681)
& ndr1_0 )
| ~ hskp19 )
& ( ( ~ c0_1(a1680)
& ~ c1_1(a1680)
& ~ c3_1(a1680)
& ndr1_0 )
| ~ hskp18 )
& ( ( ~ c2_1(a1678)
& ~ c1_1(a1678)
& ~ c0_1(a1678)
& ndr1_0 )
| ~ hskp17 )
& ( ( ~ c1_1(a1677)
& ~ c2_1(a1677)
& ~ c0_1(a1677)
& ndr1_0 )
| ~ hskp16 )
& ( ( ~ c0_1(a1672)
& c1_1(a1672)
& c3_1(a1672)
& ndr1_0 )
| ~ hskp15 )
& ( ( ~ c3_1(a1671)
& ~ c1_1(a1671)
& c2_1(a1671)
& ndr1_0 )
| ~ hskp14 )
& ( ( ~ c1_1(a1667)
& c3_1(a1667)
& c0_1(a1667)
& ndr1_0 )
| ~ hskp13 )
& ( ( ~ c1_1(a1666)
& c3_1(a1666)
& c2_1(a1666)
& ndr1_0 )
| ~ hskp12 )
& ( ( ~ c1_1(a1664)
& ~ c2_1(a1664)
& ~ c3_1(a1664)
& ndr1_0 )
| ~ hskp11 )
& ( ( ~ c0_1(a1663)
& ~ c3_1(a1663)
& ~ c2_1(a1663)
& ndr1_0 )
| ~ hskp10 )
& ( ( ~ c1_1(a1660)
& ~ c0_1(a1660)
& ~ c3_1(a1660)
& ndr1_0 )
| ~ hskp9 )
& ( ( ~ c0_1(a1657)
& ~ c1_1(a1657)
& c2_1(a1657)
& ndr1_0 )
| ~ hskp8 )
& ( ( ~ c2_1(a1655)
& c0_1(a1655)
& c3_1(a1655)
& ndr1_0 )
| ~ hskp7 )
& ( ( ~ c3_1(a1650)
& ~ c2_1(a1650)
& ~ c1_1(a1650)
& ndr1_0 )
| ~ hskp6 )
& ( ( ~ c0_1(a1648)
& ~ c1_1(a1648)
& c3_1(a1648)
& ndr1_0 )
| ~ hskp5 )
& ( ( ~ c2_1(a1647)
& ~ c0_1(a1647)
& c1_1(a1647)
& ndr1_0 )
| ~ hskp4 )
& ( ( ~ c2_1(a1646)
& ~ c1_1(a1646)
& c0_1(a1646)
& ndr1_0 )
| ~ hskp3 )
& ( ( ~ c3_1(a1645)
& ~ c0_1(a1645)
& ~ c1_1(a1645)
& ndr1_0 )
| ~ hskp2 )
& ( ( ~ c2_1(a1643)
& c3_1(a1643)
& ~ c1_1(a1643)
& ndr1_0 )
| ~ hskp1 )
& ( ( ~ c2_1(a1637)
& c0_1(a1637)
& c1_1(a1637)
& ndr1_0 )
| ~ hskp0 ) ),
inference(flattening,[],[f3]) ).
fof(f5,plain,
( ( hskp30
| hskp41
| ! [X0] :
( c0_1(X0)
| ~ c1_1(X0)
| c2_1(X0)
| ~ ndr1_0 ) )
& ( ! [X1] :
( ~ c3_1(X1)
| ~ c1_1(X1)
| ~ c0_1(X1)
| ~ ndr1_0 )
| hskp40
| ! [X2] :
( c3_1(X2)
| ~ c2_1(X2)
| c1_1(X2)
| ~ ndr1_0 ) )
& ( ! [X3] :
( c2_1(X3)
| c1_1(X3)
| ~ c3_1(X3)
| ~ ndr1_0 )
| hskp75
| ! [X4] :
( ~ c1_1(X4)
| c3_1(X4)
| ~ c2_1(X4)
| ~ ndr1_0 ) )
& ( ! [X5] :
( c3_1(X5)
| c2_1(X5)
| ~ c0_1(X5)
| ~ ndr1_0 )
| ! [X6] :
( ~ c1_1(X6)
| ~ c0_1(X6)
| c2_1(X6)
| ~ ndr1_0 )
| hskp61 )
& ( ! [X7] :
( ~ c3_1(X7)
| c1_1(X7)
| ~ c0_1(X7)
| ~ ndr1_0 )
| hskp29
| ! [X8] :
( ~ c3_1(X8)
| c1_1(X8)
| c0_1(X8)
| ~ ndr1_0 ) )
& ( ! [X9] :
( ~ c3_1(X9)
| ~ c0_1(X9)
| c2_1(X9)
| ~ ndr1_0 )
| ! [X10] :
( ~ c2_1(X10)
| ~ c3_1(X10)
| c0_1(X10)
| ~ ndr1_0 )
| hskp39 )
& ( ! [X11] :
( ~ c0_1(X11)
| c3_1(X11)
| c2_1(X11)
| ~ ndr1_0 )
| hskp57
| ! [X12] :
( c3_1(X12)
| c1_1(X12)
| ~ c2_1(X12)
| ~ ndr1_0 ) )
& ( ! [X13] :
( c1_1(X13)
| c2_1(X13)
| ~ c0_1(X13)
| ~ ndr1_0 )
| ! [X14] :
( ~ c1_1(X14)
| ~ c0_1(X14)
| ~ c3_1(X14)
| ~ ndr1_0 )
| ! [X15] :
( ~ c3_1(X15)
| c2_1(X15)
| c1_1(X15)
| ~ ndr1_0 ) )
& ( ! [X16] :
( c2_1(X16)
| c3_1(X16)
| ~ c0_1(X16)
| ~ ndr1_0 )
| hskp47
| ! [X17] :
( ~ c3_1(X17)
| ~ c0_1(X17)
| ~ c1_1(X17)
| ~ ndr1_0 ) )
& ( ! [X18] :
( ~ c0_1(X18)
| ~ c2_1(X18)
| ~ c3_1(X18)
| ~ ndr1_0 )
| hskp38
| hskp74 )
& ( ! [X19] :
( c1_1(X19)
| ~ c2_1(X19)
| ~ c3_1(X19)
| ~ ndr1_0 )
| ! [X20] :
( c0_1(X20)
| ~ c3_1(X20)
| ~ c1_1(X20)
| ~ ndr1_0 )
| hskp73 )
& ( hskp72
| ! [X21] :
( c2_1(X21)
| c0_1(X21)
| c3_1(X21)
| ~ ndr1_0 )
| hskp37 )
& ( ! [X22] :
( ~ c2_1(X22)
| ~ c0_1(X22)
| c3_1(X22)
| ~ ndr1_0 )
| ! [X23] :
( c0_1(X23)
| c2_1(X23)
| c1_1(X23)
| ~ ndr1_0 )
| ! [X24] :
( c3_1(X24)
| c1_1(X24)
| c2_1(X24)
| ~ ndr1_0 ) )
& ( hskp71
| hskp36
| ! [X25] :
( c0_1(X25)
| ~ c1_1(X25)
| c2_1(X25)
| ~ ndr1_0 ) )
& ( hskp0
| ! [X26] :
( ~ c3_1(X26)
| ~ c1_1(X26)
| c2_1(X26)
| ~ ndr1_0 )
| ! [X27] :
( ~ c0_1(X27)
| ~ c1_1(X27)
| ~ c2_1(X27)
| ~ ndr1_0 ) )
& ( ! [X28] :
( c3_1(X28)
| c0_1(X28)
| c2_1(X28)
| ~ ndr1_0 )
| ! [X29] :
( ~ c2_1(X29)
| c0_1(X29)
| c1_1(X29)
| ~ ndr1_0 )
| hskp70 )
& ( ! [X30] :
( c1_1(X30)
| c0_1(X30)
| ~ c3_1(X30)
| ~ ndr1_0 )
| ! [X31] :
( c3_1(X31)
| c2_1(X31)
| ~ c1_1(X31)
| ~ ndr1_0 )
| hskp69 )
& ( hskp13
| ! [X32] :
( ~ c3_1(X32)
| ~ c0_1(X32)
| ~ c1_1(X32)
| ~ ndr1_0 )
| ! [X33] :
( ~ c3_1(X33)
| ~ c1_1(X33)
| c2_1(X33)
| ~ ndr1_0 ) )
& ( ! [X34] :
( c2_1(X34)
| ~ c1_1(X34)
| c0_1(X34)
| ~ ndr1_0 )
| hskp68
| hskp35 )
& ( ! [X35] :
( ~ c2_1(X35)
| ~ c0_1(X35)
| c1_1(X35)
| ~ ndr1_0 )
| ! [X36] :
( c2_1(X36)
| ~ c3_1(X36)
| ~ c1_1(X36)
| ~ ndr1_0 )
| hskp34 )
& ( hskp33
| hskp61
| ! [X37] :
( ~ c3_1(X37)
| ~ c0_1(X37)
| c2_1(X37)
| ~ ndr1_0 ) )
& ( hskp67
| ! [X38] :
( c1_1(X38)
| ~ c0_1(X38)
| ~ c3_1(X38)
| ~ ndr1_0 )
| ! [X39] :
( ~ c2_1(X39)
| ~ c3_1(X39)
| c1_1(X39)
| ~ ndr1_0 ) )
& ( hskp32
| hskp31
| hskp63 )
& ( hskp30
| ! [X40] :
( c1_1(X40)
| ~ c3_1(X40)
| c0_1(X40)
| ~ ndr1_0 )
| ! [X41] :
( c2_1(X41)
| ~ c1_1(X41)
| ~ c0_1(X41)
| ~ ndr1_0 ) )
& ( hskp53
| hskp52
| hskp29 )
& ( hskp28
| hskp27
| hskp66 )
& ( ! [X42] :
( c1_1(X42)
| ~ c3_1(X42)
| ~ c2_1(X42)
| ~ ndr1_0 )
| hskp26
| ! [X43] :
( ~ c0_1(X43)
| ~ c3_1(X43)
| ~ c2_1(X43)
| ~ ndr1_0 ) )
& ( ! [X44] :
( c0_1(X44)
| ~ c3_1(X44)
| ~ c1_1(X44)
| ~ ndr1_0 )
| ! [X45] :
( c3_1(X45)
| c0_1(X45)
| c1_1(X45)
| ~ ndr1_0 )
| hskp25 )
& ( ! [X46] :
( c0_1(X46)
| c1_1(X46)
| ~ c3_1(X46)
| ~ ndr1_0 )
| hskp24
| hskp61 )
& ( hskp65
| hskp64
| hskp23 )
& ( ! [X47] :
( c2_1(X47)
| ~ c0_1(X47)
| c3_1(X47)
| ~ ndr1_0 )
| hskp22
| ! [X48] :
( c3_1(X48)
| c0_1(X48)
| ~ c2_1(X48)
| ~ ndr1_0 ) )
& ( ! [X49] :
( c3_1(X49)
| c2_1(X49)
| ~ c1_1(X49)
| ~ ndr1_0 )
| hskp21
| ! [X50] :
( c2_1(X50)
| c0_1(X50)
| ~ c1_1(X50)
| ~ ndr1_0 ) )
& ( hskp20
| ! [X51] :
( c3_1(X51)
| ~ c1_1(X51)
| ~ c0_1(X51)
| ~ ndr1_0 )
| hskp19 )
& ( ! [X52] :
( c3_1(X52)
| ~ c2_1(X52)
| c1_1(X52)
| ~ ndr1_0 )
| hskp18
| hskp60 )
& ( hskp17
| hskp16
| ! [X53] :
( ~ c3_1(X53)
| c1_1(X53)
| ~ c0_1(X53)
| ~ ndr1_0 ) )
& ( ! [X54] :
( ~ c3_1(X54)
| ~ c1_1(X54)
| ~ c2_1(X54)
| ~ ndr1_0 )
| ! [X55] :
( ~ c3_1(X55)
| ~ c0_1(X55)
| c1_1(X55)
| ~ ndr1_0 )
| hskp63 )
& ( ! [X56] :
( c1_1(X56)
| ~ c3_1(X56)
| c0_1(X56)
| ~ ndr1_0 )
| ! [X57] :
( c1_1(X57)
| ~ c3_1(X57)
| ~ c0_1(X57)
| ~ ndr1_0 )
| ! [X58] :
( c3_1(X58)
| ~ c2_1(X58)
| ~ c1_1(X58)
| ~ ndr1_0 ) )
& ( hskp62
| hskp61
| ! [X59] :
( c0_1(X59)
| ~ c3_1(X59)
| ~ c1_1(X59)
| ~ ndr1_0 ) )
& ( ! [X60] :
( c1_1(X60)
| ~ c2_1(X60)
| c3_1(X60)
| ~ ndr1_0 )
| ! [X61] :
( ~ c3_1(X61)
| c1_1(X61)
| c0_1(X61)
| ~ ndr1_0 )
| hskp60 )
& ( ! [X62] :
( ~ c3_1(X62)
| ~ c0_1(X62)
| c2_1(X62)
| ~ ndr1_0 )
| ! [X63] :
( c0_1(X63)
| c2_1(X63)
| ~ c3_1(X63)
| ~ ndr1_0 )
| ! [X64] :
( ~ c3_1(X64)
| c1_1(X64)
| ~ c2_1(X64)
| ~ ndr1_0 ) )
& ( hskp15
| hskp14
| hskp10 )
& ( ! [X65] :
( c2_1(X65)
| ~ c0_1(X65)
| c1_1(X65)
| ~ ndr1_0 )
| hskp59
| hskp58 )
& ( ! [X66] :
( ~ c1_1(X66)
| ~ c3_1(X66)
| ~ c2_1(X66)
| ~ ndr1_0 )
| hskp13
| hskp12 )
& ( hskp57
| hskp11
| ! [X67] :
( ~ c3_1(X67)
| c2_1(X67)
| ~ c0_1(X67)
| ~ ndr1_0 ) )
& ( hskp10
| ! [X68] :
( c0_1(X68)
| c3_1(X68)
| c2_1(X68)
| ~ ndr1_0 )
| hskp56 )
& ( ! [X69] :
( ~ c0_1(X69)
| ~ c3_1(X69)
| c2_1(X69)
| ~ ndr1_0 )
| ! [X70] :
( ~ c3_1(X70)
| c0_1(X70)
| c2_1(X70)
| ~ ndr1_0 )
| ! [X71] :
( c3_1(X71)
| c1_1(X71)
| ~ c0_1(X71)
| ~ ndr1_0 ) )
& ( ! [X72] :
( c3_1(X72)
| ~ c2_1(X72)
| ~ c0_1(X72)
| ~ ndr1_0 )
| hskp55
| hskp9 )
& ( ! [X73] :
( ~ c0_1(X73)
| c3_1(X73)
| ~ c1_1(X73)
| ~ ndr1_0 )
| ! [X74] :
( ~ c0_1(X74)
| c1_1(X74)
| c3_1(X74)
| ~ ndr1_0 )
| hskp2 )
& ( ! [X75] :
( ~ c2_1(X75)
| ~ c3_1(X75)
| ~ c0_1(X75)
| ~ ndr1_0 )
| ! [X76] :
( ~ c2_1(X76)
| c1_1(X76)
| ~ c0_1(X76)
| ~ ndr1_0 )
| ! [X77] :
( c0_1(X77)
| c3_1(X77)
| c2_1(X77)
| ~ ndr1_0 ) )
& ( hskp54
| hskp8
| hskp53 )
& ( hskp7
| ! [X78] :
( c3_1(X78)
| ~ c0_1(X78)
| ~ c2_1(X78)
| ~ ndr1_0 )
| hskp52 )
& ( hskp51
| ! [X79] :
( ~ c2_1(X79)
| ~ c0_1(X79)
| ~ c1_1(X79)
| ~ ndr1_0 )
| hskp50 )
& ( hskp49
| ! [X80] :
( c0_1(X80)
| c2_1(X80)
| c1_1(X80)
| ~ ndr1_0 )
| ! [X81] :
( ~ c1_1(X81)
| c0_1(X81)
| c2_1(X81)
| ~ ndr1_0 ) )
& ( hskp6
| hskp48
| ! [X82] :
( c2_1(X82)
| ~ c3_1(X82)
| ~ c0_1(X82)
| ~ ndr1_0 ) )
& ( hskp5
| hskp4
| ! [X83] :
( ~ c3_1(X83)
| c0_1(X83)
| c1_1(X83)
| ~ ndr1_0 ) )
& ( hskp3
| hskp2
| hskp47 )
& ( ! [X84] :
( c2_1(X84)
| ~ c0_1(X84)
| c1_1(X84)
| ~ ndr1_0 )
| hskp1
| ! [X85] :
( c3_1(X85)
| c0_1(X85)
| c2_1(X85)
| ~ ndr1_0 ) )
& ( ! [X86] :
( ~ c3_1(X86)
| c0_1(X86)
| ~ c2_1(X86)
| ~ ndr1_0 )
| hskp46
| ! [X87] :
( c2_1(X87)
| ~ c1_1(X87)
| c0_1(X87)
| ~ ndr1_0 ) )
& ( hskp45
| hskp44
| hskp43 )
& ( hskp42
| ! [X88] :
( c3_1(X88)
| ~ c0_1(X88)
| ~ c2_1(X88)
| ~ ndr1_0 )
| hskp0 )
& ( ( c3_1(a1724)
& ~ c2_1(a1724)
& c0_1(a1724)
& ndr1_0 )
| ~ hskp75 )
& ( ( c2_1(a1717)
& c0_1(a1717)
& ~ c3_1(a1717)
& ndr1_0 )
| ~ hskp74 )
& ( ( c0_1(a1716)
& ~ c3_1(a1716)
& c2_1(a1716)
& ndr1_0 )
| ~ hskp73 )
& ( ( c3_1(a1715)
& c1_1(a1715)
& ~ c2_1(a1715)
& ndr1_0 )
| ~ hskp72 )
& ( ( c0_1(a1713)
& c3_1(a1713)
& ~ c2_1(a1713)
& ndr1_0 )
| ~ hskp71 )
& ( ( c1_1(a1710)
& ~ c3_1(a1710)
& ~ c0_1(a1710)
& ndr1_0 )
| ~ hskp70 )
& ( ( c3_1(a1709)
& c0_1(a1709)
& ~ c1_1(a1709)
& ndr1_0 )
| ~ hskp69 )
& ( ( c0_1(a1707)
& c3_1(a1707)
& ~ c1_1(a1707)
& ndr1_0 )
| ~ hskp68 )
& ( ( c3_1(a1702)
& c2_1(a1702)
& c1_1(a1702)
& ndr1_0 )
| ~ hskp67 )
& ( ( c0_1(a1692)
& ~ c2_1(a1692)
& ~ c1_1(a1692)
& ndr1_0 )
| ~ hskp66 )
& ( ( c2_1(a1687)
& ~ c0_1(a1687)
& ~ c3_1(a1687)
& ndr1_0 )
| ~ hskp65 )
& ( ( c0_1(a1686)
& ~ c1_1(a1686)
& ~ c3_1(a1686)
& ndr1_0 )
| ~ hskp64 )
& ( ( c3_1(a1676)
& c2_1(a1676)
& ~ c0_1(a1676)
& ndr1_0 )
| ~ hskp63 )
& ( ( c0_1(a1675)
& c1_1(a1675)
& ~ c3_1(a1675)
& ndr1_0 )
| ~ hskp62 )
& ( ( c3_1(a1674)
& ~ c2_1(a1674)
& ~ c1_1(a1674)
& ndr1_0 )
| ~ hskp61 )
& ( ( c2_1(a1673)
& c3_1(a1673)
& ~ c1_1(a1673)
& ndr1_0 )
| ~ hskp60 )
& ( ( c0_1(a1669)
& ~ c2_1(a1669)
& c3_1(a1669)
& ndr1_0 )
| ~ hskp59 )
& ( ( c3_1(a1668)
& ~ c1_1(a1668)
& ~ c0_1(a1668)
& ndr1_0 )
| ~ hskp58 )
& ( ( c3_1(a1665)
& ~ c1_1(a1665)
& c0_1(a1665)
& ndr1_0 )
| ~ hskp57 )
& ( ( c1_1(a1662)
& ~ c2_1(a1662)
& c0_1(a1662)
& ndr1_0 )
| ~ hskp56 )
& ( ( c1_1(a1661)
& ~ c3_1(a1661)
& ~ c2_1(a1661)
& ndr1_0 )
| ~ hskp55 )
& ( ( c1_1(a1658)
& ~ c0_1(a1658)
& c3_1(a1658)
& ndr1_0 )
| ~ hskp54 )
& ( ( c0_1(a1656)
& c2_1(a1656)
& ~ c3_1(a1656)
& ndr1_0 )
| ~ hskp53 )
& ( ( c3_1(a1654)
& c2_1(a1654)
& c0_1(a1654)
& ndr1_0 )
| ~ hskp52 )
& ( ( c1_1(a1653)
& ~ c0_1(a1653)
& c2_1(a1653)
& ndr1_0 )
| ~ hskp51 )
& ( ( c0_1(a1652)
& c2_1(a1652)
& c3_1(a1652)
& ndr1_0 )
| ~ hskp50 )
& ( ( c1_1(a1651)
& ~ c2_1(a1651)
& c3_1(a1651)
& ndr1_0 )
| ~ hskp49 )
& ( ( c0_1(a1649)
& ~ c2_1(a1649)
& ~ c3_1(a1649)
& ndr1_0 )
| ~ hskp48 )
& ( ( c3_1(a1644)
& ~ c0_1(a1644)
& ~ c1_1(a1644)
& ndr1_0 )
| ~ hskp47 )
& ( ( c0_1(a1642)
& ~ c1_1(a1642)
& ~ c2_1(a1642)
& ndr1_0 )
| ~ hskp46 )
& ( ( c2_1(a1641)
& ~ c1_1(a1641)
& ~ c3_1(a1641)
& ndr1_0 )
| ~ hskp45 )
& ( ( c1_1(a1640)
& c2_1(a1640)
& c3_1(a1640)
& ndr1_0 )
| ~ hskp44 )
& ( ( c0_1(a1639)
& c2_1(a1639)
& ~ c1_1(a1639)
& ndr1_0 )
| ~ hskp43 )
& ( ( c0_1(a1638)
& ~ c3_1(a1638)
& c1_1(a1638)
& ndr1_0 )
| ~ hskp42 )
& ( ( ~ c1_1(a1726)
& c2_1(a1726)
& c0_1(a1726)
& ndr1_0 )
| ~ hskp41 )
& ( ( ~ c2_1(a1725)
& c3_1(a1725)
& c1_1(a1725)
& ndr1_0 )
| ~ hskp40 )
& ( ( ~ c0_1(a1721)
& c3_1(a1721)
& ~ c1_1(a1721)
& ndr1_0 )
| ~ hskp39 )
& ( ( ~ c0_1(a1718)
& ~ c2_1(a1718)
& c3_1(a1718)
& ndr1_0 )
| ~ hskp38 )
& ( ( ~ c1_1(a1714)
& c0_1(a1714)
& c2_1(a1714)
& ndr1_0 )
| ~ hskp37 )
& ( ( ~ c1_1(a1712)
& ~ c0_1(a1712)
& ~ c2_1(a1712)
& ndr1_0 )
| ~ hskp36 )
& ( ( ~ c1_1(a1706)
& ~ c3_1(a1706)
& ~ c0_1(a1706)
& ndr1_0 )
| ~ hskp35 )
& ( ( ~ c1_1(a1705)
& ~ c3_1(a1705)
& c2_1(a1705)
& ndr1_0 )
| ~ hskp34 )
& ( ( ~ c2_1(a1704)
& ~ c0_1(a1704)
& c3_1(a1704)
& ndr1_0 )
| ~ hskp33 )
& ( ( ~ c3_1(a1701)
& c0_1(a1701)
& c1_1(a1701)
& ndr1_0 )
| ~ hskp32 )
& ( ( ~ c3_1(a1700)
& ~ c0_1(a1700)
& c2_1(a1700)
& ndr1_0 )
| ~ hskp31 )
& ( ( ~ c0_1(a1698)
& c3_1(a1698)
& c1_1(a1698)
& ndr1_0 )
| ~ hskp30 )
& ( ( ~ c3_1(a1695)
& c0_1(a1695)
& c2_1(a1695)
& ndr1_0 )
| ~ hskp29 )
& ( ( ~ c3_1(a1694)
& c2_1(a1694)
& ~ c1_1(a1694)
& ndr1_0 )
| ~ hskp28 )
& ( ( ~ c2_1(a1693)
& ~ c3_1(a1693)
& ~ c0_1(a1693)
& ndr1_0 )
| ~ hskp27 )
& ( ( ~ c2_1(a1691)
& ~ c1_1(a1691)
& ~ c3_1(a1691)
& ndr1_0 )
| ~ hskp26 )
& ( ( ~ c1_1(a1690)
& ~ c0_1(a1690)
& c2_1(a1690)
& ndr1_0 )
| ~ hskp25 )
& ( ( ~ c1_1(a1689)
& c3_1(a1689)
& ~ c0_1(a1689)
& ndr1_0 )
| ~ hskp24 )
& ( ( ~ c1_1(a1685)
& c2_1(a1685)
& ~ c0_1(a1685)
& ndr1_0 )
| ~ hskp23 )
& ( ( ~ c3_1(a1684)
& c2_1(a1684)
& ~ c0_1(a1684)
& ndr1_0 )
| ~ hskp22 )
& ( ( ~ c1_1(a1683)
& c2_1(a1683)
& c3_1(a1683)
& ndr1_0 )
| ~ hskp21 )
& ( ( ~ c3_1(a1682)
& ~ c1_1(a1682)
& ~ c2_1(a1682)
& ndr1_0 )
| ~ hskp20 )
& ( ( ~ c2_1(a1681)
& ~ c3_1(a1681)
& ~ c1_1(a1681)
& ndr1_0 )
| ~ hskp19 )
& ( ( ~ c0_1(a1680)
& ~ c1_1(a1680)
& ~ c3_1(a1680)
& ndr1_0 )
| ~ hskp18 )
& ( ( ~ c2_1(a1678)
& ~ c1_1(a1678)
& ~ c0_1(a1678)
& ndr1_0 )
| ~ hskp17 )
& ( ( ~ c1_1(a1677)
& ~ c2_1(a1677)
& ~ c0_1(a1677)
& ndr1_0 )
| ~ hskp16 )
& ( ( ~ c0_1(a1672)
& c1_1(a1672)
& c3_1(a1672)
& ndr1_0 )
| ~ hskp15 )
& ( ( ~ c3_1(a1671)
& ~ c1_1(a1671)
& c2_1(a1671)
& ndr1_0 )
| ~ hskp14 )
& ( ( ~ c1_1(a1667)
& c3_1(a1667)
& c0_1(a1667)
& ndr1_0 )
| ~ hskp13 )
& ( ( ~ c1_1(a1666)
& c3_1(a1666)
& c2_1(a1666)
& ndr1_0 )
| ~ hskp12 )
& ( ( ~ c1_1(a1664)
& ~ c2_1(a1664)
& ~ c3_1(a1664)
& ndr1_0 )
| ~ hskp11 )
& ( ( ~ c0_1(a1663)
& ~ c3_1(a1663)
& ~ c2_1(a1663)
& ndr1_0 )
| ~ hskp10 )
& ( ( ~ c1_1(a1660)
& ~ c0_1(a1660)
& ~ c3_1(a1660)
& ndr1_0 )
| ~ hskp9 )
& ( ( ~ c0_1(a1657)
& ~ c1_1(a1657)
& c2_1(a1657)
& ndr1_0 )
| ~ hskp8 )
& ( ( ~ c2_1(a1655)
& c0_1(a1655)
& c3_1(a1655)
& ndr1_0 )
| ~ hskp7 )
& ( ( ~ c3_1(a1650)
& ~ c2_1(a1650)
& ~ c1_1(a1650)
& ndr1_0 )
| ~ hskp6 )
& ( ( ~ c0_1(a1648)
& ~ c1_1(a1648)
& c3_1(a1648)
& ndr1_0 )
| ~ hskp5 )
& ( ( ~ c2_1(a1647)
& ~ c0_1(a1647)
& c1_1(a1647)
& ndr1_0 )
| ~ hskp4 )
& ( ( ~ c2_1(a1646)
& ~ c1_1(a1646)
& c0_1(a1646)
& ndr1_0 )
| ~ hskp3 )
& ( ( ~ c3_1(a1645)
& ~ c0_1(a1645)
& ~ c1_1(a1645)
& ndr1_0 )
| ~ hskp2 )
& ( ( ~ c2_1(a1643)
& c3_1(a1643)
& ~ c1_1(a1643)
& ndr1_0 )
| ~ hskp1 )
& ( ( ~ c2_1(a1637)
& c0_1(a1637)
& c1_1(a1637)
& ndr1_0 )
| ~ hskp0 ) ),
inference(ennf_transformation,[],[f4]) ).
fof(f6,plain,
( ( hskp30
| hskp41
| ! [X0] :
( c0_1(X0)
| ~ c1_1(X0)
| c2_1(X0)
| ~ ndr1_0 ) )
& ( ! [X1] :
( ~ c3_1(X1)
| ~ c1_1(X1)
| ~ c0_1(X1)
| ~ ndr1_0 )
| hskp40
| ! [X2] :
( c3_1(X2)
| ~ c2_1(X2)
| c1_1(X2)
| ~ ndr1_0 ) )
& ( ! [X3] :
( c2_1(X3)
| c1_1(X3)
| ~ c3_1(X3)
| ~ ndr1_0 )
| hskp75
| ! [X4] :
( ~ c1_1(X4)
| c3_1(X4)
| ~ c2_1(X4)
| ~ ndr1_0 ) )
& ( ! [X5] :
( c3_1(X5)
| c2_1(X5)
| ~ c0_1(X5)
| ~ ndr1_0 )
| ! [X6] :
( ~ c1_1(X6)
| ~ c0_1(X6)
| c2_1(X6)
| ~ ndr1_0 )
| hskp61 )
& ( ! [X7] :
( ~ c3_1(X7)
| c1_1(X7)
| ~ c0_1(X7)
| ~ ndr1_0 )
| hskp29
| ! [X8] :
( ~ c3_1(X8)
| c1_1(X8)
| c0_1(X8)
| ~ ndr1_0 ) )
& ( ! [X9] :
( ~ c3_1(X9)
| ~ c0_1(X9)
| c2_1(X9)
| ~ ndr1_0 )
| ! [X10] :
( ~ c2_1(X10)
| ~ c3_1(X10)
| c0_1(X10)
| ~ ndr1_0 )
| hskp39 )
& ( ! [X11] :
( ~ c0_1(X11)
| c3_1(X11)
| c2_1(X11)
| ~ ndr1_0 )
| hskp57
| ! [X12] :
( c3_1(X12)
| c1_1(X12)
| ~ c2_1(X12)
| ~ ndr1_0 ) )
& ( ! [X13] :
( c1_1(X13)
| c2_1(X13)
| ~ c0_1(X13)
| ~ ndr1_0 )
| ! [X14] :
( ~ c1_1(X14)
| ~ c0_1(X14)
| ~ c3_1(X14)
| ~ ndr1_0 )
| ! [X15] :
( ~ c3_1(X15)
| c2_1(X15)
| c1_1(X15)
| ~ ndr1_0 ) )
& ( ! [X16] :
( c2_1(X16)
| c3_1(X16)
| ~ c0_1(X16)
| ~ ndr1_0 )
| hskp47
| ! [X17] :
( ~ c3_1(X17)
| ~ c0_1(X17)
| ~ c1_1(X17)
| ~ ndr1_0 ) )
& ( ! [X18] :
( ~ c0_1(X18)
| ~ c2_1(X18)
| ~ c3_1(X18)
| ~ ndr1_0 )
| hskp38
| hskp74 )
& ( ! [X19] :
( c1_1(X19)
| ~ c2_1(X19)
| ~ c3_1(X19)
| ~ ndr1_0 )
| ! [X20] :
( c0_1(X20)
| ~ c3_1(X20)
| ~ c1_1(X20)
| ~ ndr1_0 )
| hskp73 )
& ( hskp72
| ! [X21] :
( c2_1(X21)
| c0_1(X21)
| c3_1(X21)
| ~ ndr1_0 )
| hskp37 )
& ( ! [X22] :
( ~ c2_1(X22)
| ~ c0_1(X22)
| c3_1(X22)
| ~ ndr1_0 )
| ! [X23] :
( c0_1(X23)
| c2_1(X23)
| c1_1(X23)
| ~ ndr1_0 )
| ! [X24] :
( c3_1(X24)
| c1_1(X24)
| c2_1(X24)
| ~ ndr1_0 ) )
& ( hskp71
| hskp36
| ! [X25] :
( c0_1(X25)
| ~ c1_1(X25)
| c2_1(X25)
| ~ ndr1_0 ) )
& ( hskp0
| ! [X26] :
( ~ c3_1(X26)
| ~ c1_1(X26)
| c2_1(X26)
| ~ ndr1_0 )
| ! [X27] :
( ~ c0_1(X27)
| ~ c1_1(X27)
| ~ c2_1(X27)
| ~ ndr1_0 ) )
& ( ! [X28] :
( c3_1(X28)
| c0_1(X28)
| c2_1(X28)
| ~ ndr1_0 )
| ! [X29] :
( ~ c2_1(X29)
| c0_1(X29)
| c1_1(X29)
| ~ ndr1_0 )
| hskp70 )
& ( ! [X30] :
( c1_1(X30)
| c0_1(X30)
| ~ c3_1(X30)
| ~ ndr1_0 )
| ! [X31] :
( c3_1(X31)
| c2_1(X31)
| ~ c1_1(X31)
| ~ ndr1_0 )
| hskp69 )
& ( hskp13
| ! [X32] :
( ~ c3_1(X32)
| ~ c0_1(X32)
| ~ c1_1(X32)
| ~ ndr1_0 )
| ! [X33] :
( ~ c3_1(X33)
| ~ c1_1(X33)
| c2_1(X33)
| ~ ndr1_0 ) )
& ( ! [X34] :
( c2_1(X34)
| ~ c1_1(X34)
| c0_1(X34)
| ~ ndr1_0 )
| hskp68
| hskp35 )
& ( ! [X35] :
( ~ c2_1(X35)
| ~ c0_1(X35)
| c1_1(X35)
| ~ ndr1_0 )
| ! [X36] :
( c2_1(X36)
| ~ c3_1(X36)
| ~ c1_1(X36)
| ~ ndr1_0 )
| hskp34 )
& ( hskp33
| hskp61
| ! [X37] :
( ~ c3_1(X37)
| ~ c0_1(X37)
| c2_1(X37)
| ~ ndr1_0 ) )
& ( hskp67
| ! [X38] :
( c1_1(X38)
| ~ c0_1(X38)
| ~ c3_1(X38)
| ~ ndr1_0 )
| ! [X39] :
( ~ c2_1(X39)
| ~ c3_1(X39)
| c1_1(X39)
| ~ ndr1_0 ) )
& ( hskp32
| hskp31
| hskp63 )
& ( hskp30
| ! [X40] :
( c1_1(X40)
| ~ c3_1(X40)
| c0_1(X40)
| ~ ndr1_0 )
| ! [X41] :
( c2_1(X41)
| ~ c1_1(X41)
| ~ c0_1(X41)
| ~ ndr1_0 ) )
& ( hskp53
| hskp52
| hskp29 )
& ( hskp28
| hskp27
| hskp66 )
& ( ! [X42] :
( c1_1(X42)
| ~ c3_1(X42)
| ~ c2_1(X42)
| ~ ndr1_0 )
| hskp26
| ! [X43] :
( ~ c0_1(X43)
| ~ c3_1(X43)
| ~ c2_1(X43)
| ~ ndr1_0 ) )
& ( ! [X44] :
( c0_1(X44)
| ~ c3_1(X44)
| ~ c1_1(X44)
| ~ ndr1_0 )
| ! [X45] :
( c3_1(X45)
| c0_1(X45)
| c1_1(X45)
| ~ ndr1_0 )
| hskp25 )
& ( ! [X46] :
( c0_1(X46)
| c1_1(X46)
| ~ c3_1(X46)
| ~ ndr1_0 )
| hskp24
| hskp61 )
& ( hskp65
| hskp64
| hskp23 )
& ( ! [X47] :
( c2_1(X47)
| ~ c0_1(X47)
| c3_1(X47)
| ~ ndr1_0 )
| hskp22
| ! [X48] :
( c3_1(X48)
| c0_1(X48)
| ~ c2_1(X48)
| ~ ndr1_0 ) )
& ( ! [X49] :
( c3_1(X49)
| c2_1(X49)
| ~ c1_1(X49)
| ~ ndr1_0 )
| hskp21
| ! [X50] :
( c2_1(X50)
| c0_1(X50)
| ~ c1_1(X50)
| ~ ndr1_0 ) )
& ( hskp20
| ! [X51] :
( c3_1(X51)
| ~ c1_1(X51)
| ~ c0_1(X51)
| ~ ndr1_0 )
| hskp19 )
& ( ! [X52] :
( c3_1(X52)
| ~ c2_1(X52)
| c1_1(X52)
| ~ ndr1_0 )
| hskp18
| hskp60 )
& ( hskp17
| hskp16
| ! [X53] :
( ~ c3_1(X53)
| c1_1(X53)
| ~ c0_1(X53)
| ~ ndr1_0 ) )
& ( ! [X54] :
( ~ c3_1(X54)
| ~ c1_1(X54)
| ~ c2_1(X54)
| ~ ndr1_0 )
| ! [X55] :
( ~ c3_1(X55)
| ~ c0_1(X55)
| c1_1(X55)
| ~ ndr1_0 )
| hskp63 )
& ( ! [X56] :
( c1_1(X56)
| ~ c3_1(X56)
| c0_1(X56)
| ~ ndr1_0 )
| ! [X57] :
( c1_1(X57)
| ~ c3_1(X57)
| ~ c0_1(X57)
| ~ ndr1_0 )
| ! [X58] :
( c3_1(X58)
| ~ c2_1(X58)
| ~ c1_1(X58)
| ~ ndr1_0 ) )
& ( hskp62
| hskp61
| ! [X59] :
( c0_1(X59)
| ~ c3_1(X59)
| ~ c1_1(X59)
| ~ ndr1_0 ) )
& ( ! [X60] :
( c1_1(X60)
| ~ c2_1(X60)
| c3_1(X60)
| ~ ndr1_0 )
| ! [X61] :
( ~ c3_1(X61)
| c1_1(X61)
| c0_1(X61)
| ~ ndr1_0 )
| hskp60 )
& ( ! [X62] :
( ~ c3_1(X62)
| ~ c0_1(X62)
| c2_1(X62)
| ~ ndr1_0 )
| ! [X63] :
( c0_1(X63)
| c2_1(X63)
| ~ c3_1(X63)
| ~ ndr1_0 )
| ! [X64] :
( ~ c3_1(X64)
| c1_1(X64)
| ~ c2_1(X64)
| ~ ndr1_0 ) )
& ( hskp15
| hskp14
| hskp10 )
& ( ! [X65] :
( c2_1(X65)
| ~ c0_1(X65)
| c1_1(X65)
| ~ ndr1_0 )
| hskp59
| hskp58 )
& ( ! [X66] :
( ~ c1_1(X66)
| ~ c3_1(X66)
| ~ c2_1(X66)
| ~ ndr1_0 )
| hskp13
| hskp12 )
& ( hskp57
| hskp11
| ! [X67] :
( ~ c3_1(X67)
| c2_1(X67)
| ~ c0_1(X67)
| ~ ndr1_0 ) )
& ( hskp10
| ! [X68] :
( c0_1(X68)
| c3_1(X68)
| c2_1(X68)
| ~ ndr1_0 )
| hskp56 )
& ( ! [X69] :
( ~ c0_1(X69)
| ~ c3_1(X69)
| c2_1(X69)
| ~ ndr1_0 )
| ! [X70] :
( ~ c3_1(X70)
| c0_1(X70)
| c2_1(X70)
| ~ ndr1_0 )
| ! [X71] :
( c3_1(X71)
| c1_1(X71)
| ~ c0_1(X71)
| ~ ndr1_0 ) )
& ( ! [X72] :
( c3_1(X72)
| ~ c2_1(X72)
| ~ c0_1(X72)
| ~ ndr1_0 )
| hskp55
| hskp9 )
& ( ! [X73] :
( ~ c0_1(X73)
| c3_1(X73)
| ~ c1_1(X73)
| ~ ndr1_0 )
| ! [X74] :
( ~ c0_1(X74)
| c1_1(X74)
| c3_1(X74)
| ~ ndr1_0 )
| hskp2 )
& ( ! [X75] :
( ~ c2_1(X75)
| ~ c3_1(X75)
| ~ c0_1(X75)
| ~ ndr1_0 )
| ! [X76] :
( ~ c2_1(X76)
| c1_1(X76)
| ~ c0_1(X76)
| ~ ndr1_0 )
| ! [X77] :
( c0_1(X77)
| c3_1(X77)
| c2_1(X77)
| ~ ndr1_0 ) )
& ( hskp54
| hskp8
| hskp53 )
& ( hskp7
| ! [X78] :
( c3_1(X78)
| ~ c0_1(X78)
| ~ c2_1(X78)
| ~ ndr1_0 )
| hskp52 )
& ( hskp51
| ! [X79] :
( ~ c2_1(X79)
| ~ c0_1(X79)
| ~ c1_1(X79)
| ~ ndr1_0 )
| hskp50 )
& ( hskp49
| ! [X80] :
( c0_1(X80)
| c2_1(X80)
| c1_1(X80)
| ~ ndr1_0 )
| ! [X81] :
( ~ c1_1(X81)
| c0_1(X81)
| c2_1(X81)
| ~ ndr1_0 ) )
& ( hskp6
| hskp48
| ! [X82] :
( c2_1(X82)
| ~ c3_1(X82)
| ~ c0_1(X82)
| ~ ndr1_0 ) )
& ( hskp5
| hskp4
| ! [X83] :
( ~ c3_1(X83)
| c0_1(X83)
| c1_1(X83)
| ~ ndr1_0 ) )
& ( hskp3
| hskp2
| hskp47 )
& ( ! [X84] :
( c2_1(X84)
| ~ c0_1(X84)
| c1_1(X84)
| ~ ndr1_0 )
| hskp1
| ! [X85] :
( c3_1(X85)
| c0_1(X85)
| c2_1(X85)
| ~ ndr1_0 ) )
& ( ! [X86] :
( ~ c3_1(X86)
| c0_1(X86)
| ~ c2_1(X86)
| ~ ndr1_0 )
| hskp46
| ! [X87] :
( c2_1(X87)
| ~ c1_1(X87)
| c0_1(X87)
| ~ ndr1_0 ) )
& ( hskp45
| hskp44
| hskp43 )
& ( hskp42
| ! [X88] :
( c3_1(X88)
| ~ c0_1(X88)
| ~ c2_1(X88)
| ~ ndr1_0 )
| hskp0 )
& ( ( c3_1(a1724)
& ~ c2_1(a1724)
& c0_1(a1724)
& ndr1_0 )
| ~ hskp75 )
& ( ( c2_1(a1717)
& c0_1(a1717)
& ~ c3_1(a1717)
& ndr1_0 )
| ~ hskp74 )
& ( ( c0_1(a1716)
& ~ c3_1(a1716)
& c2_1(a1716)
& ndr1_0 )
| ~ hskp73 )
& ( ( c3_1(a1715)
& c1_1(a1715)
& ~ c2_1(a1715)
& ndr1_0 )
| ~ hskp72 )
& ( ( c0_1(a1713)
& c3_1(a1713)
& ~ c2_1(a1713)
& ndr1_0 )
| ~ hskp71 )
& ( ( c1_1(a1710)
& ~ c3_1(a1710)
& ~ c0_1(a1710)
& ndr1_0 )
| ~ hskp70 )
& ( ( c3_1(a1709)
& c0_1(a1709)
& ~ c1_1(a1709)
& ndr1_0 )
| ~ hskp69 )
& ( ( c0_1(a1707)
& c3_1(a1707)
& ~ c1_1(a1707)
& ndr1_0 )
| ~ hskp68 )
& ( ( c3_1(a1702)
& c2_1(a1702)
& c1_1(a1702)
& ndr1_0 )
| ~ hskp67 )
& ( ( c0_1(a1692)
& ~ c2_1(a1692)
& ~ c1_1(a1692)
& ndr1_0 )
| ~ hskp66 )
& ( ( c2_1(a1687)
& ~ c0_1(a1687)
& ~ c3_1(a1687)
& ndr1_0 )
| ~ hskp65 )
& ( ( c0_1(a1686)
& ~ c1_1(a1686)
& ~ c3_1(a1686)
& ndr1_0 )
| ~ hskp64 )
& ( ( c3_1(a1676)
& c2_1(a1676)
& ~ c0_1(a1676)
& ndr1_0 )
| ~ hskp63 )
& ( ( c0_1(a1675)
& c1_1(a1675)
& ~ c3_1(a1675)
& ndr1_0 )
| ~ hskp62 )
& ( ( c3_1(a1674)
& ~ c2_1(a1674)
& ~ c1_1(a1674)
& ndr1_0 )
| ~ hskp61 )
& ( ( c2_1(a1673)
& c3_1(a1673)
& ~ c1_1(a1673)
& ndr1_0 )
| ~ hskp60 )
& ( ( c0_1(a1669)
& ~ c2_1(a1669)
& c3_1(a1669)
& ndr1_0 )
| ~ hskp59 )
& ( ( c3_1(a1668)
& ~ c1_1(a1668)
& ~ c0_1(a1668)
& ndr1_0 )
| ~ hskp58 )
& ( ( c3_1(a1665)
& ~ c1_1(a1665)
& c0_1(a1665)
& ndr1_0 )
| ~ hskp57 )
& ( ( c1_1(a1662)
& ~ c2_1(a1662)
& c0_1(a1662)
& ndr1_0 )
| ~ hskp56 )
& ( ( c1_1(a1661)
& ~ c3_1(a1661)
& ~ c2_1(a1661)
& ndr1_0 )
| ~ hskp55 )
& ( ( c1_1(a1658)
& ~ c0_1(a1658)
& c3_1(a1658)
& ndr1_0 )
| ~ hskp54 )
& ( ( c0_1(a1656)
& c2_1(a1656)
& ~ c3_1(a1656)
& ndr1_0 )
| ~ hskp53 )
& ( ( c3_1(a1654)
& c2_1(a1654)
& c0_1(a1654)
& ndr1_0 )
| ~ hskp52 )
& ( ( c1_1(a1653)
& ~ c0_1(a1653)
& c2_1(a1653)
& ndr1_0 )
| ~ hskp51 )
& ( ( c0_1(a1652)
& c2_1(a1652)
& c3_1(a1652)
& ndr1_0 )
| ~ hskp50 )
& ( ( c1_1(a1651)
& ~ c2_1(a1651)
& c3_1(a1651)
& ndr1_0 )
| ~ hskp49 )
& ( ( c0_1(a1649)
& ~ c2_1(a1649)
& ~ c3_1(a1649)
& ndr1_0 )
| ~ hskp48 )
& ( ( c3_1(a1644)
& ~ c0_1(a1644)
& ~ c1_1(a1644)
& ndr1_0 )
| ~ hskp47 )
& ( ( c0_1(a1642)
& ~ c1_1(a1642)
& ~ c2_1(a1642)
& ndr1_0 )
| ~ hskp46 )
& ( ( c2_1(a1641)
& ~ c1_1(a1641)
& ~ c3_1(a1641)
& ndr1_0 )
| ~ hskp45 )
& ( ( c1_1(a1640)
& c2_1(a1640)
& c3_1(a1640)
& ndr1_0 )
| ~ hskp44 )
& ( ( c0_1(a1639)
& c2_1(a1639)
& ~ c1_1(a1639)
& ndr1_0 )
| ~ hskp43 )
& ( ( c0_1(a1638)
& ~ c3_1(a1638)
& c1_1(a1638)
& ndr1_0 )
| ~ hskp42 )
& ( ( ~ c1_1(a1726)
& c2_1(a1726)
& c0_1(a1726)
& ndr1_0 )
| ~ hskp41 )
& ( ( ~ c2_1(a1725)
& c3_1(a1725)
& c1_1(a1725)
& ndr1_0 )
| ~ hskp40 )
& ( ( ~ c0_1(a1721)
& c3_1(a1721)
& ~ c1_1(a1721)
& ndr1_0 )
| ~ hskp39 )
& ( ( ~ c0_1(a1718)
& ~ c2_1(a1718)
& c3_1(a1718)
& ndr1_0 )
| ~ hskp38 )
& ( ( ~ c1_1(a1714)
& c0_1(a1714)
& c2_1(a1714)
& ndr1_0 )
| ~ hskp37 )
& ( ( ~ c1_1(a1712)
& ~ c0_1(a1712)
& ~ c2_1(a1712)
& ndr1_0 )
| ~ hskp36 )
& ( ( ~ c1_1(a1706)
& ~ c3_1(a1706)
& ~ c0_1(a1706)
& ndr1_0 )
| ~ hskp35 )
& ( ( ~ c1_1(a1705)
& ~ c3_1(a1705)
& c2_1(a1705)
& ndr1_0 )
| ~ hskp34 )
& ( ( ~ c2_1(a1704)
& ~ c0_1(a1704)
& c3_1(a1704)
& ndr1_0 )
| ~ hskp33 )
& ( ( ~ c3_1(a1701)
& c0_1(a1701)
& c1_1(a1701)
& ndr1_0 )
| ~ hskp32 )
& ( ( ~ c3_1(a1700)
& ~ c0_1(a1700)
& c2_1(a1700)
& ndr1_0 )
| ~ hskp31 )
& ( ( ~ c0_1(a1698)
& c3_1(a1698)
& c1_1(a1698)
& ndr1_0 )
| ~ hskp30 )
& ( ( ~ c3_1(a1695)
& c0_1(a1695)
& c2_1(a1695)
& ndr1_0 )
| ~ hskp29 )
& ( ( ~ c3_1(a1694)
& c2_1(a1694)
& ~ c1_1(a1694)
& ndr1_0 )
| ~ hskp28 )
& ( ( ~ c2_1(a1693)
& ~ c3_1(a1693)
& ~ c0_1(a1693)
& ndr1_0 )
| ~ hskp27 )
& ( ( ~ c2_1(a1691)
& ~ c1_1(a1691)
& ~ c3_1(a1691)
& ndr1_0 )
| ~ hskp26 )
& ( ( ~ c1_1(a1690)
& ~ c0_1(a1690)
& c2_1(a1690)
& ndr1_0 )
| ~ hskp25 )
& ( ( ~ c1_1(a1689)
& c3_1(a1689)
& ~ c0_1(a1689)
& ndr1_0 )
| ~ hskp24 )
& ( ( ~ c1_1(a1685)
& c2_1(a1685)
& ~ c0_1(a1685)
& ndr1_0 )
| ~ hskp23 )
& ( ( ~ c3_1(a1684)
& c2_1(a1684)
& ~ c0_1(a1684)
& ndr1_0 )
| ~ hskp22 )
& ( ( ~ c1_1(a1683)
& c2_1(a1683)
& c3_1(a1683)
& ndr1_0 )
| ~ hskp21 )
& ( ( ~ c3_1(a1682)
& ~ c1_1(a1682)
& ~ c2_1(a1682)
& ndr1_0 )
| ~ hskp20 )
& ( ( ~ c2_1(a1681)
& ~ c3_1(a1681)
& ~ c1_1(a1681)
& ndr1_0 )
| ~ hskp19 )
& ( ( ~ c0_1(a1680)
& ~ c1_1(a1680)
& ~ c3_1(a1680)
& ndr1_0 )
| ~ hskp18 )
& ( ( ~ c2_1(a1678)
& ~ c1_1(a1678)
& ~ c0_1(a1678)
& ndr1_0 )
| ~ hskp17 )
& ( ( ~ c1_1(a1677)
& ~ c2_1(a1677)
& ~ c0_1(a1677)
& ndr1_0 )
| ~ hskp16 )
& ( ( ~ c0_1(a1672)
& c1_1(a1672)
& c3_1(a1672)
& ndr1_0 )
| ~ hskp15 )
& ( ( ~ c3_1(a1671)
& ~ c1_1(a1671)
& c2_1(a1671)
& ndr1_0 )
| ~ hskp14 )
& ( ( ~ c1_1(a1667)
& c3_1(a1667)
& c0_1(a1667)
& ndr1_0 )
| ~ hskp13 )
& ( ( ~ c1_1(a1666)
& c3_1(a1666)
& c2_1(a1666)
& ndr1_0 )
| ~ hskp12 )
& ( ( ~ c1_1(a1664)
& ~ c2_1(a1664)
& ~ c3_1(a1664)
& ndr1_0 )
| ~ hskp11 )
& ( ( ~ c0_1(a1663)
& ~ c3_1(a1663)
& ~ c2_1(a1663)
& ndr1_0 )
| ~ hskp10 )
& ( ( ~ c1_1(a1660)
& ~ c0_1(a1660)
& ~ c3_1(a1660)
& ndr1_0 )
| ~ hskp9 )
& ( ( ~ c0_1(a1657)
& ~ c1_1(a1657)
& c2_1(a1657)
& ndr1_0 )
| ~ hskp8 )
& ( ( ~ c2_1(a1655)
& c0_1(a1655)
& c3_1(a1655)
& ndr1_0 )
| ~ hskp7 )
& ( ( ~ c3_1(a1650)
& ~ c2_1(a1650)
& ~ c1_1(a1650)
& ndr1_0 )
| ~ hskp6 )
& ( ( ~ c0_1(a1648)
& ~ c1_1(a1648)
& c3_1(a1648)
& ndr1_0 )
| ~ hskp5 )
& ( ( ~ c2_1(a1647)
& ~ c0_1(a1647)
& c1_1(a1647)
& ndr1_0 )
| ~ hskp4 )
& ( ( ~ c2_1(a1646)
& ~ c1_1(a1646)
& c0_1(a1646)
& ndr1_0 )
| ~ hskp3 )
& ( ( ~ c3_1(a1645)
& ~ c0_1(a1645)
& ~ c1_1(a1645)
& ndr1_0 )
| ~ hskp2 )
& ( ( ~ c2_1(a1643)
& c3_1(a1643)
& ~ c1_1(a1643)
& ndr1_0 )
| ~ hskp1 )
& ( ( ~ c2_1(a1637)
& c0_1(a1637)
& c1_1(a1637)
& ndr1_0 )
| ~ hskp0 ) ),
inference(flattening,[],[f5]) ).
fof(f7,plain,
( ndr1_0
| ~ hskp0 ),
inference(cnf_transformation,[],[f6]) ).
fof(f8,plain,
( c1_1(a1637)
| ~ hskp0 ),
inference(cnf_transformation,[],[f6]) ).
fof(f9,plain,
( c0_1(a1637)
| ~ hskp0 ),
inference(cnf_transformation,[],[f6]) ).
fof(f10,plain,
( ~ c2_1(a1637)
| ~ hskp0 ),
inference(cnf_transformation,[],[f6]) ).
fof(f12,plain,
( ~ c1_1(a1643)
| ~ hskp1 ),
inference(cnf_transformation,[],[f6]) ).
fof(f13,plain,
( c3_1(a1643)
| ~ hskp1 ),
inference(cnf_transformation,[],[f6]) ).
fof(f14,plain,
( ~ c2_1(a1643)
| ~ hskp1 ),
inference(cnf_transformation,[],[f6]) ).
fof(f15,plain,
( ndr1_0
| ~ hskp2 ),
inference(cnf_transformation,[],[f6]) ).
fof(f16,plain,
( ~ c1_1(a1645)
| ~ hskp2 ),
inference(cnf_transformation,[],[f6]) ).
fof(f17,plain,
( ~ c0_1(a1645)
| ~ hskp2 ),
inference(cnf_transformation,[],[f6]) ).
fof(f18,plain,
( ~ c3_1(a1645)
| ~ hskp2 ),
inference(cnf_transformation,[],[f6]) ).
fof(f19,plain,
( ndr1_0
| ~ hskp3 ),
inference(cnf_transformation,[],[f6]) ).
fof(f36,plain,
( c3_1(a1655)
| ~ hskp7 ),
inference(cnf_transformation,[],[f6]) ).
fof(f37,plain,
( c0_1(a1655)
| ~ hskp7 ),
inference(cnf_transformation,[],[f6]) ).
fof(f38,plain,
( ~ c2_1(a1655)
| ~ hskp7 ),
inference(cnf_transformation,[],[f6]) ).
fof(f40,plain,
( c2_1(a1657)
| ~ hskp8 ),
inference(cnf_transformation,[],[f6]) ).
fof(f41,plain,
( ~ c1_1(a1657)
| ~ hskp8 ),
inference(cnf_transformation,[],[f6]) ).
fof(f44,plain,
( ~ c3_1(a1660)
| ~ hskp9 ),
inference(cnf_transformation,[],[f6]) ).
fof(f45,plain,
( ~ c0_1(a1660)
| ~ hskp9 ),
inference(cnf_transformation,[],[f6]) ).
fof(f46,plain,
( ~ c1_1(a1660)
| ~ hskp9 ),
inference(cnf_transformation,[],[f6]) ).
fof(f48,plain,
( ~ c2_1(a1663)
| ~ hskp10 ),
inference(cnf_transformation,[],[f6]) ).
fof(f49,plain,
( ~ c3_1(a1663)
| ~ hskp10 ),
inference(cnf_transformation,[],[f6]) ).
fof(f50,plain,
( ~ c0_1(a1663)
| ~ hskp10 ),
inference(cnf_transformation,[],[f6]) ).
fof(f56,plain,
( c2_1(a1666)
| ~ hskp12 ),
inference(cnf_transformation,[],[f6]) ).
fof(f57,plain,
( c3_1(a1666)
| ~ hskp12 ),
inference(cnf_transformation,[],[f6]) ).
fof(f58,plain,
( ~ c1_1(a1666)
| ~ hskp12 ),
inference(cnf_transformation,[],[f6]) ).
fof(f60,plain,
( c0_1(a1667)
| ~ hskp13 ),
inference(cnf_transformation,[],[f6]) ).
fof(f61,plain,
( c3_1(a1667)
| ~ hskp13 ),
inference(cnf_transformation,[],[f6]) ).
fof(f62,plain,
( ~ c1_1(a1667)
| ~ hskp13 ),
inference(cnf_transformation,[],[f6]) ).
fof(f64,plain,
( c2_1(a1671)
| ~ hskp14 ),
inference(cnf_transformation,[],[f6]) ).
fof(f65,plain,
( ~ c1_1(a1671)
| ~ hskp14 ),
inference(cnf_transformation,[],[f6]) ).
fof(f66,plain,
( ~ c3_1(a1671)
| ~ hskp14 ),
inference(cnf_transformation,[],[f6]) ).
fof(f68,plain,
( c3_1(a1672)
| ~ hskp15 ),
inference(cnf_transformation,[],[f6]) ).
fof(f69,plain,
( c1_1(a1672)
| ~ hskp15 ),
inference(cnf_transformation,[],[f6]) ).
fof(f70,plain,
( ~ c0_1(a1672)
| ~ hskp15 ),
inference(cnf_transformation,[],[f6]) ).
fof(f72,plain,
( ~ c0_1(a1677)
| ~ hskp16 ),
inference(cnf_transformation,[],[f6]) ).
fof(f73,plain,
( ~ c2_1(a1677)
| ~ hskp16 ),
inference(cnf_transformation,[],[f6]) ).
fof(f74,plain,
( ~ c1_1(a1677)
| ~ hskp16 ),
inference(cnf_transformation,[],[f6]) ).
fof(f76,plain,
( ~ c0_1(a1678)
| ~ hskp17 ),
inference(cnf_transformation,[],[f6]) ).
fof(f77,plain,
( ~ c1_1(a1678)
| ~ hskp17 ),
inference(cnf_transformation,[],[f6]) ).
fof(f78,plain,
( ~ c2_1(a1678)
| ~ hskp17 ),
inference(cnf_transformation,[],[f6]) ).
fof(f92,plain,
( c3_1(a1683)
| ~ hskp21 ),
inference(cnf_transformation,[],[f6]) ).
fof(f93,plain,
( c2_1(a1683)
| ~ hskp21 ),
inference(cnf_transformation,[],[f6]) ).
fof(f94,plain,
( ~ c1_1(a1683)
| ~ hskp21 ),
inference(cnf_transformation,[],[f6]) ).
fof(f108,plain,
( c2_1(a1690)
| ~ hskp25 ),
inference(cnf_transformation,[],[f6]) ).
fof(f109,plain,
( ~ c0_1(a1690)
| ~ hskp25 ),
inference(cnf_transformation,[],[f6]) ).
fof(f110,plain,
( ~ c1_1(a1690)
| ~ hskp25 ),
inference(cnf_transformation,[],[f6]) ).
fof(f112,plain,
( ~ c3_1(a1691)
| ~ hskp26 ),
inference(cnf_transformation,[],[f6]) ).
fof(f113,plain,
( ~ c1_1(a1691)
| ~ hskp26 ),
inference(cnf_transformation,[],[f6]) ).
fof(f114,plain,
( ~ c2_1(a1691)
| ~ hskp26 ),
inference(cnf_transformation,[],[f6]) ).
fof(f124,plain,
( c2_1(a1695)
| ~ hskp29 ),
inference(cnf_transformation,[],[f6]) ).
fof(f125,plain,
( c0_1(a1695)
| ~ hskp29 ),
inference(cnf_transformation,[],[f6]) ).
fof(f126,plain,
( ~ c3_1(a1695)
| ~ hskp29 ),
inference(cnf_transformation,[],[f6]) ).
fof(f156,plain,
( c2_1(a1714)
| ~ hskp37 ),
inference(cnf_transformation,[],[f6]) ).
fof(f157,plain,
( c0_1(a1714)
| ~ hskp37 ),
inference(cnf_transformation,[],[f6]) ).
fof(f158,plain,
( ~ c1_1(a1714)
| ~ hskp37 ),
inference(cnf_transformation,[],[f6]) ).
fof(f168,plain,
( c1_1(a1725)
| ~ hskp40 ),
inference(cnf_transformation,[],[f6]) ).
fof(f169,plain,
( c3_1(a1725)
| ~ hskp40 ),
inference(cnf_transformation,[],[f6]) ).
fof(f170,plain,
( ~ c2_1(a1725)
| ~ hskp40 ),
inference(cnf_transformation,[],[f6]) ).
fof(f176,plain,
( c1_1(a1638)
| ~ hskp42 ),
inference(cnf_transformation,[],[f6]) ).
fof(f177,plain,
( ~ c3_1(a1638)
| ~ hskp42 ),
inference(cnf_transformation,[],[f6]) ).
fof(f178,plain,
( c0_1(a1638)
| ~ hskp42 ),
inference(cnf_transformation,[],[f6]) ).
fof(f180,plain,
( ~ c1_1(a1639)
| ~ hskp43 ),
inference(cnf_transformation,[],[f6]) ).
fof(f181,plain,
( c2_1(a1639)
| ~ hskp43 ),
inference(cnf_transformation,[],[f6]) ).
fof(f182,plain,
( c0_1(a1639)
| ~ hskp43 ),
inference(cnf_transformation,[],[f6]) ).
fof(f184,plain,
( c3_1(a1640)
| ~ hskp44 ),
inference(cnf_transformation,[],[f6]) ).
fof(f185,plain,
( c2_1(a1640)
| ~ hskp44 ),
inference(cnf_transformation,[],[f6]) ).
fof(f186,plain,
( c1_1(a1640)
| ~ hskp44 ),
inference(cnf_transformation,[],[f6]) ).
fof(f188,plain,
( ~ c3_1(a1641)
| ~ hskp45 ),
inference(cnf_transformation,[],[f6]) ).
fof(f189,plain,
( ~ c1_1(a1641)
| ~ hskp45 ),
inference(cnf_transformation,[],[f6]) ).
fof(f190,plain,
( c2_1(a1641)
| ~ hskp45 ),
inference(cnf_transformation,[],[f6]) ).
fof(f195,plain,
( ndr1_0
| ~ hskp47 ),
inference(cnf_transformation,[],[f6]) ).
fof(f196,plain,
( ~ c1_1(a1644)
| ~ hskp47 ),
inference(cnf_transformation,[],[f6]) ).
fof(f197,plain,
( ~ c0_1(a1644)
| ~ hskp47 ),
inference(cnf_transformation,[],[f6]) ).
fof(f198,plain,
( c3_1(a1644)
| ~ hskp47 ),
inference(cnf_transformation,[],[f6]) ).
fof(f216,plain,
( c0_1(a1654)
| ~ hskp52 ),
inference(cnf_transformation,[],[f6]) ).
fof(f217,plain,
( c2_1(a1654)
| ~ hskp52 ),
inference(cnf_transformation,[],[f6]) ).
fof(f218,plain,
( c3_1(a1654)
| ~ hskp52 ),
inference(cnf_transformation,[],[f6]) ).
fof(f220,plain,
( ~ c3_1(a1656)
| ~ hskp53 ),
inference(cnf_transformation,[],[f6]) ).
fof(f221,plain,
( c2_1(a1656)
| ~ hskp53 ),
inference(cnf_transformation,[],[f6]) ).
fof(f222,plain,
( c0_1(a1656)
| ~ hskp53 ),
inference(cnf_transformation,[],[f6]) ).
fof(f224,plain,
( c3_1(a1658)
| ~ hskp54 ),
inference(cnf_transformation,[],[f6]) ).
fof(f225,plain,
( ~ c0_1(a1658)
| ~ hskp54 ),
inference(cnf_transformation,[],[f6]) ).
fof(f226,plain,
( c1_1(a1658)
| ~ hskp54 ),
inference(cnf_transformation,[],[f6]) ).
fof(f228,plain,
( ~ c2_1(a1661)
| ~ hskp55 ),
inference(cnf_transformation,[],[f6]) ).
fof(f229,plain,
( ~ c3_1(a1661)
| ~ hskp55 ),
inference(cnf_transformation,[],[f6]) ).
fof(f230,plain,
( c1_1(a1661)
| ~ hskp55 ),
inference(cnf_transformation,[],[f6]) ).
fof(f248,plain,
( ~ c1_1(a1673)
| ~ hskp60 ),
inference(cnf_transformation,[],[f6]) ).
fof(f249,plain,
( c3_1(a1673)
| ~ hskp60 ),
inference(cnf_transformation,[],[f6]) ).
fof(f250,plain,
( c2_1(a1673)
| ~ hskp60 ),
inference(cnf_transformation,[],[f6]) ).
fof(f252,plain,
( ~ c1_1(a1674)
| ~ hskp61 ),
inference(cnf_transformation,[],[f6]) ).
fof(f253,plain,
( ~ c2_1(a1674)
| ~ hskp61 ),
inference(cnf_transformation,[],[f6]) ).
fof(f254,plain,
( c3_1(a1674)
| ~ hskp61 ),
inference(cnf_transformation,[],[f6]) ).
fof(f260,plain,
( ~ c0_1(a1676)
| ~ hskp63 ),
inference(cnf_transformation,[],[f6]) ).
fof(f262,plain,
( c3_1(a1676)
| ~ hskp63 ),
inference(cnf_transformation,[],[f6]) ).
fof(f276,plain,
( c1_1(a1702)
| ~ hskp67 ),
inference(cnf_transformation,[],[f6]) ).
fof(f277,plain,
( c2_1(a1702)
| ~ hskp67 ),
inference(cnf_transformation,[],[f6]) ).
fof(f278,plain,
( c3_1(a1702)
| ~ hskp67 ),
inference(cnf_transformation,[],[f6]) ).
fof(f296,plain,
( ~ c2_1(a1715)
| ~ hskp72 ),
inference(cnf_transformation,[],[f6]) ).
fof(f297,plain,
( c1_1(a1715)
| ~ hskp72 ),
inference(cnf_transformation,[],[f6]) ).
fof(f298,plain,
( c3_1(a1715)
| ~ hskp72 ),
inference(cnf_transformation,[],[f6]) ).
fof(f300,plain,
( c2_1(a1716)
| ~ hskp73 ),
inference(cnf_transformation,[],[f6]) ).
fof(f301,plain,
( ~ c3_1(a1716)
| ~ hskp73 ),
inference(cnf_transformation,[],[f6]) ).
fof(f302,plain,
( c0_1(a1716)
| ~ hskp73 ),
inference(cnf_transformation,[],[f6]) ).
fof(f308,plain,
( c0_1(a1724)
| ~ hskp75 ),
inference(cnf_transformation,[],[f6]) ).
fof(f309,plain,
( ~ c2_1(a1724)
| ~ hskp75 ),
inference(cnf_transformation,[],[f6]) ).
fof(f310,plain,
( c3_1(a1724)
| ~ hskp75 ),
inference(cnf_transformation,[],[f6]) ).
fof(f311,plain,
! [X88] :
( hskp42
| c3_1(X88)
| ~ c0_1(X88)
| ~ c2_1(X88)
| ~ ndr1_0
| hskp0 ),
inference(cnf_transformation,[],[f6]) ).
fof(f312,plain,
( hskp45
| hskp44
| hskp43 ),
inference(cnf_transformation,[],[f6]) ).
fof(f315,plain,
( hskp3
| hskp2
| hskp47 ),
inference(cnf_transformation,[],[f6]) ).
fof(f320,plain,
! [X78] :
( hskp7
| c3_1(X78)
| ~ c0_1(X78)
| ~ c2_1(X78)
| ~ ndr1_0
| hskp52 ),
inference(cnf_transformation,[],[f6]) ).
fof(f321,plain,
( hskp54
| hskp8
| hskp53 ),
inference(cnf_transformation,[],[f6]) ).
fof(f324,plain,
! [X72] :
( c3_1(X72)
| ~ c2_1(X72)
| ~ c0_1(X72)
| ~ ndr1_0
| hskp55
| hskp9 ),
inference(cnf_transformation,[],[f6]) ).
fof(f328,plain,
! [X66] :
( ~ c1_1(X66)
| ~ c3_1(X66)
| ~ c2_1(X66)
| ~ ndr1_0
| hskp13
| hskp12 ),
inference(cnf_transformation,[],[f6]) ).
fof(f330,plain,
( hskp15
| hskp14
| hskp10 ),
inference(cnf_transformation,[],[f6]) ).
fof(f336,plain,
! [X53] :
( hskp17
| hskp16
| ~ c3_1(X53)
| c1_1(X53)
| ~ c0_1(X53)
| ~ ndr1_0 ),
inference(cnf_transformation,[],[f6]) ).
fof(f346,plain,
( hskp53
| hskp52
| hskp29 ),
inference(cnf_transformation,[],[f6]) ).
fof(f359,plain,
! [X21] :
( hskp72
| c2_1(X21)
| c0_1(X21)
| c3_1(X21)
| ~ ndr1_0
| hskp37 ),
inference(cnf_transformation,[],[f6]) ).
cnf(c_50,negated_conjecture,
( ~ c0_1(X0)
| ~ c1_1(X0)
| ~ c2_1(X1)
| ~ c3_1(X0)
| ~ ndr1_0
| c1_1(X1)
| c3_1(X1)
| hskp40 ),
inference(cnf_transformation,[],[f371]) ).
cnf(c_51,negated_conjecture,
( ~ c1_1(X0)
| ~ c2_1(X0)
| ~ c3_1(X1)
| ~ ndr1_0
| c1_1(X1)
| c2_1(X1)
| c3_1(X0)
| hskp75 ),
inference(cnf_transformation,[],[f372]) ).
cnf(c_52,negated_conjecture,
( ~ c0_1(X0)
| ~ c0_1(X1)
| ~ c1_1(X1)
| ~ ndr1_0
| c2_1(X0)
| c2_1(X1)
| c3_1(X0)
| hskp61 ),
inference(cnf_transformation,[],[f373]) ).
cnf(c_53,negated_conjecture,
( ~ c0_1(X0)
| ~ c3_1(X0)
| ~ c3_1(X1)
| ~ ndr1_0
| c0_1(X1)
| c1_1(X0)
| c1_1(X1)
| hskp29 ),
inference(cnf_transformation,[],[f374]) ).
cnf(c_56,negated_conjecture,
( ~ c0_1(X0)
| ~ c0_1(X1)
| ~ c1_1(X1)
| ~ c3_1(X1)
| ~ c3_1(X2)
| ~ ndr1_0
| c1_1(X0)
| c1_1(X2)
| c2_1(X0)
| c2_1(X2) ),
inference(cnf_transformation,[],[f377]) ).
cnf(c_57,negated_conjecture,
( ~ c0_1(X0)
| ~ c0_1(X1)
| ~ c1_1(X1)
| ~ c3_1(X1)
| ~ ndr1_0
| c2_1(X0)
| c3_1(X0)
| hskp47 ),
inference(cnf_transformation,[],[f378]) ).
cnf(c_59,negated_conjecture,
( ~ c1_1(X0)
| ~ c2_1(X1)
| ~ c3_1(X0)
| ~ c3_1(X1)
| ~ ndr1_0
| c0_1(X0)
| c1_1(X1)
| hskp73 ),
inference(cnf_transformation,[],[f379]) ).
cnf(c_60,negated_conjecture,
( ~ ndr1_0
| c0_1(X0)
| c2_1(X0)
| c3_1(X0)
| hskp72
| hskp37 ),
inference(cnf_transformation,[],[f359]) ).
cnf(c_61,negated_conjecture,
( ~ c0_1(X0)
| ~ c2_1(X0)
| ~ ndr1_0
| c0_1(X1)
| c1_1(X1)
| c1_1(X2)
| c2_1(X1)
| c2_1(X2)
| c3_1(X0)
| c3_1(X2) ),
inference(cnf_transformation,[],[f380]) ).
cnf(c_63,negated_conjecture,
( ~ c0_1(X0)
| ~ c1_1(X0)
| ~ c1_1(X1)
| ~ c2_1(X0)
| ~ c3_1(X1)
| ~ ndr1_0
| c2_1(X1)
| hskp0 ),
inference(cnf_transformation,[],[f381]) ).
cnf(c_66,negated_conjecture,
( ~ c0_1(X0)
| ~ c1_1(X0)
| ~ c1_1(X1)
| ~ c3_1(X0)
| ~ c3_1(X1)
| ~ ndr1_0
| c2_1(X1)
| hskp13 ),
inference(cnf_transformation,[],[f384]) ).
cnf(c_70,negated_conjecture,
( ~ c0_1(X0)
| ~ c2_1(X1)
| ~ c3_1(X0)
| ~ c3_1(X1)
| ~ ndr1_0
| c1_1(X0)
| c1_1(X1)
| hskp67 ),
inference(cnf_transformation,[],[f386]) ).
cnf(c_73,negated_conjecture,
( hskp29
| hskp53
| hskp52 ),
inference(cnf_transformation,[],[f346]) ).
cnf(c_75,negated_conjecture,
( ~ c0_1(X0)
| ~ c2_1(X0)
| ~ c2_1(X1)
| ~ c3_1(X0)
| ~ c3_1(X1)
| ~ ndr1_0
| c1_1(X1)
| hskp26 ),
inference(cnf_transformation,[],[f388]) ).
cnf(c_76,negated_conjecture,
( ~ c1_1(X0)
| ~ c3_1(X0)
| ~ ndr1_0
| c0_1(X0)
| c0_1(X1)
| c1_1(X1)
| c3_1(X1)
| hskp25 ),
inference(cnf_transformation,[],[f389]) ).
cnf(c_80,negated_conjecture,
( ~ c1_1(X0)
| ~ c1_1(X1)
| ~ ndr1_0
| c0_1(X1)
| c2_1(X0)
| c2_1(X1)
| c3_1(X0)
| hskp21 ),
inference(cnf_transformation,[],[f391]) ).
cnf(c_83,negated_conjecture,
( ~ c0_1(X0)
| ~ c3_1(X0)
| ~ ndr1_0
| c1_1(X0)
| hskp17
| hskp16 ),
inference(cnf_transformation,[],[f336]) ).
cnf(c_84,negated_conjecture,
( ~ c0_1(X0)
| ~ c1_1(X1)
| ~ c2_1(X1)
| ~ c3_1(X0)
| ~ c3_1(X1)
| ~ ndr1_0
| c1_1(X0)
| hskp63 ),
inference(cnf_transformation,[],[f392]) ).
cnf(c_85,negated_conjecture,
( ~ c0_1(X0)
| ~ c1_1(X1)
| ~ c2_1(X1)
| ~ c3_1(X0)
| ~ c3_1(X2)
| ~ ndr1_0
| c0_1(X2)
| c1_1(X0)
| c1_1(X2)
| c3_1(X1) ),
inference(cnf_transformation,[],[f393]) ).
cnf(c_87,negated_conjecture,
( ~ c2_1(X0)
| ~ c3_1(X1)
| ~ ndr1_0
| c0_1(X1)
| c1_1(X0)
| c1_1(X1)
| c3_1(X0)
| hskp60 ),
inference(cnf_transformation,[],[f394]) ).
cnf(c_88,negated_conjecture,
( ~ c0_1(X0)
| ~ c2_1(X1)
| ~ c3_1(X0)
| ~ c3_1(X1)
| ~ c3_1(X2)
| ~ ndr1_0
| c0_1(X2)
| c1_1(X1)
| c2_1(X0)
| c2_1(X2) ),
inference(cnf_transformation,[],[f395]) ).
cnf(c_89,negated_conjecture,
( hskp15
| hskp14
| hskp10 ),
inference(cnf_transformation,[],[f330]) ).
cnf(c_91,negated_conjecture,
( ~ c1_1(X0)
| ~ c2_1(X0)
| ~ c3_1(X0)
| ~ ndr1_0
| hskp13
| hskp12 ),
inference(cnf_transformation,[],[f328]) ).
cnf(c_94,negated_conjecture,
( ~ c0_1(X0)
| ~ c0_1(X1)
| ~ c3_1(X0)
| ~ c3_1(X2)
| ~ ndr1_0
| c0_1(X2)
| c1_1(X1)
| c2_1(X0)
| c2_1(X2)
| c3_1(X1) ),
inference(cnf_transformation,[],[f396]) ).
cnf(c_95,negated_conjecture,
( ~ c0_1(X0)
| ~ c2_1(X0)
| ~ ndr1_0
| c3_1(X0)
| hskp55
| hskp9 ),
inference(cnf_transformation,[],[f324]) ).
cnf(c_96,negated_conjecture,
( ~ c0_1(X0)
| ~ c0_1(X1)
| ~ c1_1(X0)
| ~ ndr1_0
| c1_1(X1)
| c3_1(X0)
| c3_1(X1)
| hskp2 ),
inference(cnf_transformation,[],[f397]) ).
cnf(c_97,negated_conjecture,
( ~ c0_1(X0)
| ~ c0_1(X1)
| ~ c2_1(X0)
| ~ c2_1(X1)
| ~ c3_1(X0)
| ~ ndr1_0
| c0_1(X2)
| c1_1(X1)
| c2_1(X2)
| c3_1(X2) ),
inference(cnf_transformation,[],[f398]) ).
cnf(c_98,negated_conjecture,
( hskp53
| hskp54
| hskp8 ),
inference(cnf_transformation,[],[f321]) ).
cnf(c_99,negated_conjecture,
( ~ c0_1(X0)
| ~ c2_1(X0)
| ~ ndr1_0
| c3_1(X0)
| hskp52
| hskp7 ),
inference(cnf_transformation,[],[f320]) ).
cnf(c_104,negated_conjecture,
( hskp47
| hskp2
| hskp3 ),
inference(cnf_transformation,[],[f315]) ).
cnf(c_105,negated_conjecture,
( ~ c0_1(X0)
| ~ ndr1_0
| c0_1(X1)
| c1_1(X0)
| c2_1(X0)
| c2_1(X1)
| c3_1(X1)
| hskp1 ),
inference(cnf_transformation,[],[f400]) ).
cnf(c_107,negated_conjecture,
( hskp45
| hskp44
| hskp43 ),
inference(cnf_transformation,[],[f312]) ).
cnf(c_108,negated_conjecture,
( ~ c0_1(X0)
| ~ c2_1(X0)
| ~ ndr1_0
| c3_1(X0)
| hskp0
| hskp42 ),
inference(cnf_transformation,[],[f311]) ).
cnf(c_109,negated_conjecture,
( ~ hskp75
| c3_1(a1724) ),
inference(cnf_transformation,[],[f310]) ).
cnf(c_110,negated_conjecture,
( ~ c2_1(a1724)
| ~ hskp75 ),
inference(cnf_transformation,[],[f309]) ).
cnf(c_111,negated_conjecture,
( ~ hskp75
| c0_1(a1724) ),
inference(cnf_transformation,[],[f308]) ).
cnf(c_117,negated_conjecture,
( ~ hskp73
| c0_1(a1716) ),
inference(cnf_transformation,[],[f302]) ).
cnf(c_118,negated_conjecture,
( ~ c3_1(a1716)
| ~ hskp73 ),
inference(cnf_transformation,[],[f301]) ).
cnf(c_119,negated_conjecture,
( ~ hskp73
| c2_1(a1716) ),
inference(cnf_transformation,[],[f300]) ).
cnf(c_121,negated_conjecture,
( ~ hskp72
| c3_1(a1715) ),
inference(cnf_transformation,[],[f298]) ).
cnf(c_122,negated_conjecture,
( ~ hskp72
| c1_1(a1715) ),
inference(cnf_transformation,[],[f297]) ).
cnf(c_123,negated_conjecture,
( ~ c2_1(a1715)
| ~ hskp72 ),
inference(cnf_transformation,[],[f296]) ).
cnf(c_141,negated_conjecture,
( ~ hskp67
| c3_1(a1702) ),
inference(cnf_transformation,[],[f278]) ).
cnf(c_142,negated_conjecture,
( ~ hskp67
| c2_1(a1702) ),
inference(cnf_transformation,[],[f277]) ).
cnf(c_143,negated_conjecture,
( ~ hskp67
| c1_1(a1702) ),
inference(cnf_transformation,[],[f276]) ).
cnf(c_157,negated_conjecture,
( ~ hskp63
| c3_1(a1676) ),
inference(cnf_transformation,[],[f262]) ).
cnf(c_159,negated_conjecture,
( ~ c0_1(a1676)
| ~ hskp63 ),
inference(cnf_transformation,[],[f260]) ).
cnf(c_165,negated_conjecture,
( ~ hskp61
| c3_1(a1674) ),
inference(cnf_transformation,[],[f254]) ).
cnf(c_166,negated_conjecture,
( ~ c2_1(a1674)
| ~ hskp61 ),
inference(cnf_transformation,[],[f253]) ).
cnf(c_167,negated_conjecture,
( ~ c1_1(a1674)
| ~ hskp61 ),
inference(cnf_transformation,[],[f252]) ).
cnf(c_169,negated_conjecture,
( ~ hskp60
| c2_1(a1673) ),
inference(cnf_transformation,[],[f250]) ).
cnf(c_170,negated_conjecture,
( ~ hskp60
| c3_1(a1673) ),
inference(cnf_transformation,[],[f249]) ).
cnf(c_171,negated_conjecture,
( ~ c1_1(a1673)
| ~ hskp60 ),
inference(cnf_transformation,[],[f248]) ).
cnf(c_189,negated_conjecture,
( ~ hskp55
| c1_1(a1661) ),
inference(cnf_transformation,[],[f230]) ).
cnf(c_190,negated_conjecture,
( ~ c3_1(a1661)
| ~ hskp55 ),
inference(cnf_transformation,[],[f229]) ).
cnf(c_191,negated_conjecture,
( ~ c2_1(a1661)
| ~ hskp55 ),
inference(cnf_transformation,[],[f228]) ).
cnf(c_193,negated_conjecture,
( ~ hskp54
| c1_1(a1658) ),
inference(cnf_transformation,[],[f226]) ).
cnf(c_194,negated_conjecture,
( ~ c0_1(a1658)
| ~ hskp54 ),
inference(cnf_transformation,[],[f225]) ).
cnf(c_195,negated_conjecture,
( ~ hskp54
| c3_1(a1658) ),
inference(cnf_transformation,[],[f224]) ).
cnf(c_197,negated_conjecture,
( ~ hskp53
| c0_1(a1656) ),
inference(cnf_transformation,[],[f222]) ).
cnf(c_198,negated_conjecture,
( ~ hskp53
| c2_1(a1656) ),
inference(cnf_transformation,[],[f221]) ).
cnf(c_199,negated_conjecture,
( ~ c3_1(a1656)
| ~ hskp53 ),
inference(cnf_transformation,[],[f220]) ).
cnf(c_201,negated_conjecture,
( ~ hskp52
| c3_1(a1654) ),
inference(cnf_transformation,[],[f218]) ).
cnf(c_202,negated_conjecture,
( ~ hskp52
| c2_1(a1654) ),
inference(cnf_transformation,[],[f217]) ).
cnf(c_203,negated_conjecture,
( ~ hskp52
| c0_1(a1654) ),
inference(cnf_transformation,[],[f216]) ).
cnf(c_221,negated_conjecture,
( ~ hskp47
| c3_1(a1644) ),
inference(cnf_transformation,[],[f198]) ).
cnf(c_222,negated_conjecture,
( ~ c0_1(a1644)
| ~ hskp47 ),
inference(cnf_transformation,[],[f197]) ).
cnf(c_223,negated_conjecture,
( ~ c1_1(a1644)
| ~ hskp47 ),
inference(cnf_transformation,[],[f196]) ).
cnf(c_224,negated_conjecture,
( ~ hskp47
| ndr1_0 ),
inference(cnf_transformation,[],[f195]) ).
cnf(c_229,negated_conjecture,
( ~ hskp45
| c2_1(a1641) ),
inference(cnf_transformation,[],[f190]) ).
cnf(c_230,negated_conjecture,
( ~ c1_1(a1641)
| ~ hskp45 ),
inference(cnf_transformation,[],[f189]) ).
cnf(c_231,negated_conjecture,
( ~ c3_1(a1641)
| ~ hskp45 ),
inference(cnf_transformation,[],[f188]) ).
cnf(c_233,negated_conjecture,
( ~ hskp44
| c1_1(a1640) ),
inference(cnf_transformation,[],[f186]) ).
cnf(c_234,negated_conjecture,
( ~ hskp44
| c2_1(a1640) ),
inference(cnf_transformation,[],[f185]) ).
cnf(c_235,negated_conjecture,
( ~ hskp44
| c3_1(a1640) ),
inference(cnf_transformation,[],[f184]) ).
cnf(c_237,negated_conjecture,
( ~ hskp43
| c0_1(a1639) ),
inference(cnf_transformation,[],[f182]) ).
cnf(c_238,negated_conjecture,
( ~ hskp43
| c2_1(a1639) ),
inference(cnf_transformation,[],[f181]) ).
cnf(c_239,negated_conjecture,
( ~ c1_1(a1639)
| ~ hskp43 ),
inference(cnf_transformation,[],[f180]) ).
cnf(c_241,negated_conjecture,
( ~ hskp42
| c0_1(a1638) ),
inference(cnf_transformation,[],[f178]) ).
cnf(c_242,negated_conjecture,
( ~ c3_1(a1638)
| ~ hskp42 ),
inference(cnf_transformation,[],[f177]) ).
cnf(c_243,negated_conjecture,
( ~ hskp42
| c1_1(a1638) ),
inference(cnf_transformation,[],[f176]) ).
cnf(c_249,negated_conjecture,
( ~ c2_1(a1725)
| ~ hskp40 ),
inference(cnf_transformation,[],[f170]) ).
cnf(c_250,negated_conjecture,
( ~ hskp40
| c3_1(a1725) ),
inference(cnf_transformation,[],[f169]) ).
cnf(c_251,negated_conjecture,
( ~ hskp40
| c1_1(a1725) ),
inference(cnf_transformation,[],[f168]) ).
cnf(c_261,negated_conjecture,
( ~ c1_1(a1714)
| ~ hskp37 ),
inference(cnf_transformation,[],[f158]) ).
cnf(c_262,negated_conjecture,
( ~ hskp37
| c0_1(a1714) ),
inference(cnf_transformation,[],[f157]) ).
cnf(c_263,negated_conjecture,
( ~ hskp37
| c2_1(a1714) ),
inference(cnf_transformation,[],[f156]) ).
cnf(c_293,negated_conjecture,
( ~ c3_1(a1695)
| ~ hskp29 ),
inference(cnf_transformation,[],[f126]) ).
cnf(c_294,negated_conjecture,
( ~ hskp29
| c0_1(a1695) ),
inference(cnf_transformation,[],[f125]) ).
cnf(c_295,negated_conjecture,
( ~ hskp29
| c2_1(a1695) ),
inference(cnf_transformation,[],[f124]) ).
cnf(c_305,negated_conjecture,
( ~ c2_1(a1691)
| ~ hskp26 ),
inference(cnf_transformation,[],[f114]) ).
cnf(c_306,negated_conjecture,
( ~ c1_1(a1691)
| ~ hskp26 ),
inference(cnf_transformation,[],[f113]) ).
cnf(c_307,negated_conjecture,
( ~ c3_1(a1691)
| ~ hskp26 ),
inference(cnf_transformation,[],[f112]) ).
cnf(c_309,negated_conjecture,
( ~ c1_1(a1690)
| ~ hskp25 ),
inference(cnf_transformation,[],[f110]) ).
cnf(c_310,negated_conjecture,
( ~ c0_1(a1690)
| ~ hskp25 ),
inference(cnf_transformation,[],[f109]) ).
cnf(c_311,negated_conjecture,
( ~ hskp25
| c2_1(a1690) ),
inference(cnf_transformation,[],[f108]) ).
cnf(c_325,negated_conjecture,
( ~ c1_1(a1683)
| ~ hskp21 ),
inference(cnf_transformation,[],[f94]) ).
cnf(c_326,negated_conjecture,
( ~ hskp21
| c2_1(a1683) ),
inference(cnf_transformation,[],[f93]) ).
cnf(c_327,negated_conjecture,
( ~ hskp21
| c3_1(a1683) ),
inference(cnf_transformation,[],[f92]) ).
cnf(c_341,negated_conjecture,
( ~ c2_1(a1678)
| ~ hskp17 ),
inference(cnf_transformation,[],[f78]) ).
cnf(c_342,negated_conjecture,
( ~ c1_1(a1678)
| ~ hskp17 ),
inference(cnf_transformation,[],[f77]) ).
cnf(c_343,negated_conjecture,
( ~ c0_1(a1678)
| ~ hskp17 ),
inference(cnf_transformation,[],[f76]) ).
cnf(c_345,negated_conjecture,
( ~ c1_1(a1677)
| ~ hskp16 ),
inference(cnf_transformation,[],[f74]) ).
cnf(c_346,negated_conjecture,
( ~ c2_1(a1677)
| ~ hskp16 ),
inference(cnf_transformation,[],[f73]) ).
cnf(c_347,negated_conjecture,
( ~ c0_1(a1677)
| ~ hskp16 ),
inference(cnf_transformation,[],[f72]) ).
cnf(c_349,negated_conjecture,
( ~ c0_1(a1672)
| ~ hskp15 ),
inference(cnf_transformation,[],[f70]) ).
cnf(c_350,negated_conjecture,
( ~ hskp15
| c1_1(a1672) ),
inference(cnf_transformation,[],[f69]) ).
cnf(c_351,negated_conjecture,
( ~ hskp15
| c3_1(a1672) ),
inference(cnf_transformation,[],[f68]) ).
cnf(c_353,negated_conjecture,
( ~ c3_1(a1671)
| ~ hskp14 ),
inference(cnf_transformation,[],[f66]) ).
cnf(c_354,negated_conjecture,
( ~ c1_1(a1671)
| ~ hskp14 ),
inference(cnf_transformation,[],[f65]) ).
cnf(c_355,negated_conjecture,
( ~ hskp14
| c2_1(a1671) ),
inference(cnf_transformation,[],[f64]) ).
cnf(c_357,negated_conjecture,
( ~ c1_1(a1667)
| ~ hskp13 ),
inference(cnf_transformation,[],[f62]) ).
cnf(c_358,negated_conjecture,
( ~ hskp13
| c3_1(a1667) ),
inference(cnf_transformation,[],[f61]) ).
cnf(c_359,negated_conjecture,
( ~ hskp13
| c0_1(a1667) ),
inference(cnf_transformation,[],[f60]) ).
cnf(c_361,negated_conjecture,
( ~ c1_1(a1666)
| ~ hskp12 ),
inference(cnf_transformation,[],[f58]) ).
cnf(c_362,negated_conjecture,
( ~ hskp12
| c3_1(a1666) ),
inference(cnf_transformation,[],[f57]) ).
cnf(c_363,negated_conjecture,
( ~ hskp12
| c2_1(a1666) ),
inference(cnf_transformation,[],[f56]) ).
cnf(c_369,negated_conjecture,
( ~ c0_1(a1663)
| ~ hskp10 ),
inference(cnf_transformation,[],[f50]) ).
cnf(c_370,negated_conjecture,
( ~ c3_1(a1663)
| ~ hskp10 ),
inference(cnf_transformation,[],[f49]) ).
cnf(c_371,negated_conjecture,
( ~ c2_1(a1663)
| ~ hskp10 ),
inference(cnf_transformation,[],[f48]) ).
cnf(c_373,negated_conjecture,
( ~ c1_1(a1660)
| ~ hskp9 ),
inference(cnf_transformation,[],[f46]) ).
cnf(c_374,negated_conjecture,
( ~ c0_1(a1660)
| ~ hskp9 ),
inference(cnf_transformation,[],[f45]) ).
cnf(c_375,negated_conjecture,
( ~ c3_1(a1660)
| ~ hskp9 ),
inference(cnf_transformation,[],[f44]) ).
cnf(c_378,negated_conjecture,
( ~ c1_1(a1657)
| ~ hskp8 ),
inference(cnf_transformation,[],[f41]) ).
cnf(c_379,negated_conjecture,
( ~ hskp8
| c2_1(a1657) ),
inference(cnf_transformation,[],[f40]) ).
cnf(c_381,negated_conjecture,
( ~ c2_1(a1655)
| ~ hskp7 ),
inference(cnf_transformation,[],[f38]) ).
cnf(c_382,negated_conjecture,
( ~ hskp7
| c0_1(a1655) ),
inference(cnf_transformation,[],[f37]) ).
cnf(c_383,negated_conjecture,
( ~ hskp7
| c3_1(a1655) ),
inference(cnf_transformation,[],[f36]) ).
cnf(c_400,negated_conjecture,
( ~ hskp3
| ndr1_0 ),
inference(cnf_transformation,[],[f19]) ).
cnf(c_401,negated_conjecture,
( ~ c3_1(a1645)
| ~ hskp2 ),
inference(cnf_transformation,[],[f18]) ).
cnf(c_402,negated_conjecture,
( ~ c0_1(a1645)
| ~ hskp2 ),
inference(cnf_transformation,[],[f17]) ).
cnf(c_403,negated_conjecture,
( ~ c1_1(a1645)
| ~ hskp2 ),
inference(cnf_transformation,[],[f16]) ).
cnf(c_404,negated_conjecture,
( ~ hskp2
| ndr1_0 ),
inference(cnf_transformation,[],[f15]) ).
cnf(c_405,negated_conjecture,
( ~ c2_1(a1643)
| ~ hskp1 ),
inference(cnf_transformation,[],[f14]) ).
cnf(c_406,negated_conjecture,
( ~ hskp1
| c3_1(a1643) ),
inference(cnf_transformation,[],[f13]) ).
cnf(c_407,negated_conjecture,
( ~ c1_1(a1643)
| ~ hskp1 ),
inference(cnf_transformation,[],[f12]) ).
cnf(c_409,negated_conjecture,
( ~ c2_1(a1637)
| ~ hskp0 ),
inference(cnf_transformation,[],[f10]) ).
cnf(c_410,negated_conjecture,
( ~ hskp0
| c0_1(a1637) ),
inference(cnf_transformation,[],[f9]) ).
cnf(c_411,negated_conjecture,
( ~ hskp0
| c1_1(a1637) ),
inference(cnf_transformation,[],[f8]) ).
cnf(c_412,negated_conjecture,
( ~ hskp0
| ndr1_0 ),
inference(cnf_transformation,[],[f7]) ).
cnf(c_438,plain,
( ~ c0_1(a1637)
| ~ c1_1(a1637)
| ~ c3_1(a1637)
| ~ ndr1_0
| c2_1(a1637)
| hskp13 ),
inference(instantiation,[status(thm)],[c_66]) ).
cnf(c_439,negated_conjecture,
ndr1_0,
inference(global_subsumption_just,[status(thm)],[c_412,c_404,c_400,c_224,c_104]) ).
cnf(c_594,negated_conjecture,
( c0_1(X0)
| c2_1(X0)
| c3_1(X0)
| hskp72
| hskp37 ),
inference(global_subsumption_just,[status(thm)],[c_60,c_404,c_400,c_224,c_104,c_60]) ).
cnf(c_618,plain,
( ~ c2_1(X0)
| ~ c0_1(X0)
| c3_1(X0)
| hskp0
| hskp42 ),
inference(global_subsumption_just,[status(thm)],[c_108,c_404,c_400,c_224,c_104,c_108]) ).
cnf(c_619,negated_conjecture,
( ~ c0_1(X0)
| ~ c2_1(X0)
| c3_1(X0)
| hskp0
| hskp42 ),
inference(renaming,[status(thm)],[c_618]) ).
cnf(c_624,plain,
( ~ c2_1(X0)
| ~ c0_1(X0)
| c3_1(X0)
| hskp52
| hskp7 ),
inference(global_subsumption_just,[status(thm)],[c_99,c_404,c_400,c_224,c_104,c_99]) ).
cnf(c_625,negated_conjecture,
( ~ c0_1(X0)
| ~ c2_1(X0)
| c3_1(X0)
| hskp52
| hskp7 ),
inference(renaming,[status(thm)],[c_624]) ).
cnf(c_627,plain,
( ~ c2_1(X0)
| ~ c0_1(X0)
| c3_1(X0)
| hskp55
| hskp9 ),
inference(global_subsumption_just,[status(thm)],[c_95,c_404,c_400,c_224,c_104,c_95]) ).
cnf(c_628,negated_conjecture,
( ~ c0_1(X0)
| ~ c2_1(X0)
| c3_1(X0)
| hskp55
| hskp9 ),
inference(renaming,[status(thm)],[c_627]) ).
cnf(c_636,plain,
( ~ c3_1(X0)
| ~ c0_1(X0)
| c1_1(X0)
| hskp17
| hskp16 ),
inference(global_subsumption_just,[status(thm)],[c_83,c_404,c_400,c_224,c_104,c_83]) ).
cnf(c_637,negated_conjecture,
( ~ c0_1(X0)
| ~ c3_1(X0)
| c1_1(X0)
| hskp17
| hskp16 ),
inference(renaming,[status(thm)],[c_636]) ).
cnf(c_648,plain,
( ~ c3_1(X0)
| ~ c2_1(X0)
| ~ c1_1(X0)
| hskp13
| hskp12 ),
inference(global_subsumption_just,[status(thm)],[c_91,c_404,c_400,c_224,c_104,c_91]) ).
cnf(c_649,negated_conjecture,
( ~ c1_1(X0)
| ~ c2_1(X0)
| ~ c3_1(X0)
| hskp13
| hskp12 ),
inference(renaming,[status(thm)],[c_648]) ).
cnf(c_654,negated_conjecture,
( ~ c0_1(X0)
| c0_1(X1)
| c1_1(X0)
| c2_1(X0)
| c2_1(X1)
| c3_1(X1)
| hskp1 ),
inference(global_subsumption_just,[status(thm)],[c_105,c_404,c_400,c_224,c_104,c_105]) ).
cnf(c_660,plain,
( ~ c3_1(X1)
| ~ c2_1(X0)
| c0_1(X1)
| c1_1(X0)
| c1_1(X1)
| c3_1(X0)
| hskp60 ),
inference(global_subsumption_just,[status(thm)],[c_87,c_404,c_400,c_224,c_104,c_87]) ).
cnf(c_661,negated_conjecture,
( ~ c2_1(X0)
| ~ c3_1(X1)
| c0_1(X1)
| c1_1(X0)
| c1_1(X1)
| c3_1(X0)
| hskp60 ),
inference(renaming,[status(thm)],[c_660]) ).
cnf(c_662,plain,
( ~ c1_1(X1)
| ~ c1_1(X0)
| c0_1(X1)
| c2_1(X0)
| c2_1(X1)
| c3_1(X0)
| hskp21 ),
inference(global_subsumption_just,[status(thm)],[c_80,c_404,c_400,c_224,c_104,c_80]) ).
cnf(c_663,negated_conjecture,
( ~ c1_1(X0)
| ~ c1_1(X1)
| c0_1(X1)
| c2_1(X0)
| c2_1(X1)
| c3_1(X0)
| hskp21 ),
inference(renaming,[status(thm)],[c_662]) ).
cnf(c_664,plain,
( ~ c1_1(a1637)
| c0_1(a1637)
| c2_1(a1637)
| c3_1(a1637)
| hskp21 ),
inference(instantiation,[status(thm)],[c_663]) ).
cnf(c_667,plain,
( ~ c3_1(X0)
| ~ c1_1(X0)
| c0_1(X0)
| c0_1(X1)
| c1_1(X1)
| c3_1(X1)
| hskp25 ),
inference(global_subsumption_just,[status(thm)],[c_76,c_404,c_400,c_224,c_104,c_76]) ).
cnf(c_668,negated_conjecture,
( ~ c1_1(X0)
| ~ c3_1(X0)
| c0_1(X0)
| c0_1(X1)
| c1_1(X1)
| c3_1(X1)
| hskp25 ),
inference(renaming,[status(thm)],[c_667]) ).
cnf(c_675,plain,
( ~ c1_1(X0)
| ~ c0_1(X1)
| ~ c0_1(X0)
| c1_1(X1)
| c3_1(X0)
| c3_1(X1)
| hskp2 ),
inference(global_subsumption_just,[status(thm)],[c_96,c_404,c_400,c_224,c_104,c_96]) ).
cnf(c_676,negated_conjecture,
( ~ c0_1(X0)
| ~ c0_1(X1)
| ~ c1_1(X0)
| c1_1(X1)
| c3_1(X0)
| c3_1(X1)
| hskp2 ),
inference(renaming,[status(thm)],[c_675]) ).
cnf(c_679,plain,
( ~ c3_1(X1)
| ~ c3_1(X0)
| ~ c0_1(X0)
| c0_1(X1)
| c1_1(X0)
| c1_1(X1)
| hskp29 ),
inference(global_subsumption_just,[status(thm)],[c_53,c_404,c_400,c_224,c_104,c_53]) ).
cnf(c_680,negated_conjecture,
( ~ c0_1(X0)
| ~ c3_1(X0)
| ~ c3_1(X1)
| c0_1(X1)
| c1_1(X0)
| c1_1(X1)
| hskp29 ),
inference(renaming,[status(thm)],[c_679]) ).
cnf(c_681,plain,
( ~ c1_1(X1)
| ~ c0_1(X1)
| ~ c0_1(X0)
| c2_1(X0)
| c2_1(X1)
| c3_1(X0)
| hskp61 ),
inference(global_subsumption_just,[status(thm)],[c_52,c_404,c_400,c_224,c_104,c_52]) ).
cnf(c_682,negated_conjecture,
( ~ c0_1(X0)
| ~ c0_1(X1)
| ~ c1_1(X1)
| c2_1(X0)
| c2_1(X1)
| c3_1(X0)
| hskp61 ),
inference(renaming,[status(thm)],[c_681]) ).
cnf(c_684,plain,
( ~ c3_1(X1)
| ~ c2_1(X0)
| ~ c1_1(X0)
| c1_1(X1)
| c2_1(X1)
| c3_1(X0)
| hskp75 ),
inference(global_subsumption_just,[status(thm)],[c_51,c_404,c_400,c_224,c_104,c_51]) ).
cnf(c_685,negated_conjecture,
( ~ c1_1(X0)
| ~ c2_1(X0)
| ~ c3_1(X1)
| c1_1(X1)
| c2_1(X1)
| c3_1(X0)
| hskp75 ),
inference(renaming,[status(thm)],[c_684]) ).
cnf(c_686,plain,
( ~ c3_1(X1)
| ~ c3_1(X0)
| ~ c2_1(X1)
| ~ c0_1(X0)
| c1_1(X0)
| c1_1(X1)
| hskp67 ),
inference(global_subsumption_just,[status(thm)],[c_70,c_404,c_400,c_224,c_104,c_70]) ).
cnf(c_687,negated_conjecture,
( ~ c0_1(X0)
| ~ c2_1(X1)
| ~ c3_1(X0)
| ~ c3_1(X1)
| c1_1(X0)
| c1_1(X1)
| hskp67 ),
inference(renaming,[status(thm)],[c_686]) ).
cnf(c_691,plain,
( ~ c3_1(X1)
| ~ c3_1(X0)
| ~ c2_1(X1)
| ~ c1_1(X0)
| c0_1(X0)
| c1_1(X1)
| hskp73 ),
inference(global_subsumption_just,[status(thm)],[c_59,c_404,c_400,c_224,c_104,c_59]) ).
cnf(c_692,negated_conjecture,
( ~ c1_1(X0)
| ~ c2_1(X1)
| ~ c3_1(X0)
| ~ c3_1(X1)
| c0_1(X0)
| c1_1(X1)
| hskp73 ),
inference(renaming,[status(thm)],[c_691]) ).
cnf(c_693,plain,
( ~ c3_1(X1)
| ~ c1_1(X1)
| ~ c0_1(X1)
| ~ c0_1(X0)
| c2_1(X0)
| c3_1(X0)
| hskp47 ),
inference(global_subsumption_just,[status(thm)],[c_57,c_404,c_400,c_224,c_104,c_57]) ).
cnf(c_694,negated_conjecture,
( ~ c0_1(X0)
| ~ c0_1(X1)
| ~ c1_1(X1)
| ~ c3_1(X1)
| c2_1(X0)
| c3_1(X0)
| hskp47 ),
inference(renaming,[status(thm)],[c_693]) ).
cnf(c_697,plain,
( ~ c3_1(X0)
| ~ c2_1(X1)
| ~ c1_1(X0)
| ~ c0_1(X0)
| c1_1(X1)
| c3_1(X1)
| hskp40 ),
inference(global_subsumption_just,[status(thm)],[c_50,c_404,c_400,c_224,c_104,c_50]) ).
cnf(c_698,negated_conjecture,
( ~ c0_1(X0)
| ~ c1_1(X0)
| ~ c2_1(X1)
| ~ c3_1(X0)
| c1_1(X1)
| c3_1(X1)
| hskp40 ),
inference(renaming,[status(thm)],[c_697]) ).
cnf(c_699,plain,
( ~ c3_1(X1)
| ~ c3_1(X0)
| ~ c2_1(X1)
| ~ c1_1(X1)
| ~ c0_1(X0)
| c1_1(X0)
| hskp63 ),
inference(global_subsumption_just,[status(thm)],[c_84,c_404,c_400,c_224,c_104,c_84]) ).
cnf(c_700,negated_conjecture,
( ~ c0_1(X0)
| ~ c1_1(X1)
| ~ c2_1(X1)
| ~ c3_1(X0)
| ~ c3_1(X1)
| c1_1(X0)
| hskp63 ),
inference(renaming,[status(thm)],[c_699]) ).
cnf(c_701,plain,
( ~ c3_1(X1)
| ~ c3_1(X0)
| ~ c2_1(X1)
| ~ c2_1(X0)
| ~ c0_1(X0)
| c1_1(X1)
| hskp26 ),
inference(global_subsumption_just,[status(thm)],[c_75,c_404,c_400,c_224,c_104,c_75]) ).
cnf(c_702,negated_conjecture,
( ~ c0_1(X0)
| ~ c2_1(X0)
| ~ c2_1(X1)
| ~ c3_1(X0)
| ~ c3_1(X1)
| c1_1(X1)
| hskp26 ),
inference(renaming,[status(thm)],[c_701]) ).
cnf(c_704,plain,
( ~ c3_1(X1)
| ~ c3_1(X0)
| ~ c1_1(X1)
| ~ c1_1(X0)
| ~ c0_1(X0)
| c2_1(X1)
| hskp13 ),
inference(global_subsumption_just,[status(thm)],[c_66,c_404,c_400,c_224,c_104,c_66]) ).
cnf(c_705,negated_conjecture,
( ~ c0_1(X0)
| ~ c1_1(X0)
| ~ c1_1(X1)
| ~ c3_1(X0)
| ~ c3_1(X1)
| c2_1(X1)
| hskp13 ),
inference(renaming,[status(thm)],[c_704]) ).
cnf(c_707,plain,
( ~ c3_1(X1)
| ~ c2_1(X0)
| ~ c1_1(X1)
| ~ c1_1(X0)
| ~ c0_1(X0)
| c2_1(X1)
| hskp0 ),
inference(global_subsumption_just,[status(thm)],[c_63,c_404,c_400,c_224,c_104,c_63]) ).
cnf(c_708,negated_conjecture,
( ~ c0_1(X0)
| ~ c1_1(X0)
| ~ c1_1(X1)
| ~ c2_1(X0)
| ~ c3_1(X1)
| c2_1(X1)
| hskp0 ),
inference(renaming,[status(thm)],[c_707]) ).
cnf(c_709,plain,
( ~ c2_1(X0)
| ~ c0_1(X0)
| c0_1(X1)
| c1_1(X1)
| c1_1(X2)
| c2_1(X1)
| c2_1(X2)
| c3_1(X0)
| c3_1(X2) ),
inference(global_subsumption_just,[status(thm)],[c_61,c_404,c_400,c_224,c_104,c_61]) ).
cnf(c_710,negated_conjecture,
( ~ c0_1(X0)
| ~ c2_1(X0)
| c0_1(X1)
| c1_1(X1)
| c1_1(X2)
| c2_1(X1)
| c2_1(X2)
| c3_1(X0)
| c3_1(X2) ),
inference(renaming,[status(thm)],[c_709]) ).
cnf(c_711,plain,
( ~ c3_1(X2)
| ~ c3_1(X0)
| ~ c0_1(X1)
| ~ c0_1(X0)
| c0_1(X2)
| c1_1(X1)
| c2_1(X0)
| c2_1(X2)
| c3_1(X1) ),
inference(global_subsumption_just,[status(thm)],[c_94,c_404,c_400,c_224,c_104,c_94]) ).
cnf(c_712,negated_conjecture,
( ~ c0_1(X0)
| ~ c0_1(X1)
| ~ c3_1(X0)
| ~ c3_1(X2)
| c0_1(X2)
| c1_1(X1)
| c2_1(X0)
| c2_1(X2)
| c3_1(X1) ),
inference(renaming,[status(thm)],[c_711]) ).
cnf(c_713,plain,
( ~ c3_1(X0)
| ~ c2_1(X1)
| ~ c2_1(X0)
| ~ c0_1(X1)
| ~ c0_1(X0)
| c0_1(X2)
| c1_1(X1)
| c2_1(X2)
| c3_1(X2) ),
inference(global_subsumption_just,[status(thm)],[c_97,c_404,c_400,c_224,c_104,c_97]) ).
cnf(c_714,negated_conjecture,
( ~ c0_1(X0)
| ~ c0_1(X1)
| ~ c2_1(X0)
| ~ c2_1(X1)
| ~ c3_1(X0)
| c0_1(X2)
| c1_1(X1)
| c2_1(X2)
| c3_1(X2) ),
inference(renaming,[status(thm)],[c_713]) ).
cnf(c_715,plain,
( ~ c3_1(X2)
| ~ c3_1(X1)
| ~ c3_1(X0)
| ~ c2_1(X1)
| ~ c0_1(X0)
| c0_1(X2)
| c1_1(X1)
| c2_1(X0)
| c2_1(X2) ),
inference(global_subsumption_just,[status(thm)],[c_88,c_404,c_400,c_224,c_104,c_88]) ).
cnf(c_716,negated_conjecture,
( ~ c0_1(X0)
| ~ c2_1(X1)
| ~ c3_1(X0)
| ~ c3_1(X1)
| ~ c3_1(X2)
| c0_1(X2)
| c1_1(X1)
| c2_1(X0)
| c2_1(X2) ),
inference(renaming,[status(thm)],[c_715]) ).
cnf(c_717,plain,
( ~ c3_1(X2)
| ~ c3_1(X0)
| ~ c2_1(X1)
| ~ c1_1(X1)
| ~ c0_1(X0)
| c0_1(X2)
| c1_1(X0)
| c1_1(X2)
| c3_1(X1) ),
inference(global_subsumption_just,[status(thm)],[c_85,c_404,c_400,c_224,c_104,c_85]) ).
cnf(c_718,negated_conjecture,
( ~ c0_1(X0)
| ~ c1_1(X1)
| ~ c2_1(X1)
| ~ c3_1(X0)
| ~ c3_1(X2)
| c0_1(X2)
| c1_1(X0)
| c1_1(X2)
| c3_1(X1) ),
inference(renaming,[status(thm)],[c_717]) ).
cnf(c_719,plain,
( ~ c3_1(X2)
| ~ c3_1(X1)
| ~ c1_1(X1)
| ~ c0_1(X1)
| ~ c0_1(X0)
| c1_1(X0)
| c1_1(X2)
| c2_1(X0)
| c2_1(X2) ),
inference(global_subsumption_just,[status(thm)],[c_56,c_56,c_439]) ).
cnf(c_720,negated_conjecture,
( ~ c0_1(X0)
| ~ c0_1(X1)
| ~ c1_1(X1)
| ~ c3_1(X1)
| ~ c3_1(X2)
| c1_1(X0)
| c1_1(X2)
| c2_1(X0)
| c2_1(X2) ),
inference(renaming,[status(thm)],[c_719]) ).
cnf(c_2468,plain,
( c3_1(a1672)
| hskp14
| hskp10 ),
inference(resolution,[status(thm)],[c_89,c_351]) ).
cnf(c_2478,plain,
( c1_1(a1672)
| hskp14
| hskp10 ),
inference(resolution,[status(thm)],[c_89,c_350]) ).
cnf(c_2488,plain,
( ~ c0_1(a1672)
| hskp14
| hskp10 ),
inference(resolution,[status(thm)],[c_89,c_349]) ).
cnf(c_2507,plain,
( c3_1(a1658)
| hskp53
| hskp8 ),
inference(resolution,[status(thm)],[c_98,c_195]) ).
cnf(c_2517,plain,
( ~ c0_1(a1658)
| hskp53
| hskp8 ),
inference(resolution,[status(thm)],[c_98,c_194]) ).
cnf(c_2527,plain,
( c1_1(a1658)
| hskp53
| hskp8 ),
inference(resolution,[status(thm)],[c_98,c_193]) ).
cnf(c_2585,plain,
( ~ c3_1(a1641)
| hskp44
| hskp43 ),
inference(resolution,[status(thm)],[c_107,c_231]) ).
cnf(c_2595,plain,
( ~ c1_1(a1641)
| hskp44
| hskp43 ),
inference(resolution,[status(thm)],[c_107,c_230]) ).
cnf(c_2605,plain,
( c2_1(a1641)
| hskp44
| hskp43 ),
inference(resolution,[status(thm)],[c_107,c_229]) ).
cnf(c_6101,plain,
( c0_1(a1654)
| hskp29
| hskp53 ),
inference(resolution,[status(thm)],[c_73,c_203]) ).
cnf(c_6111,plain,
( c2_1(a1654)
| hskp29
| hskp53 ),
inference(resolution,[status(thm)],[c_73,c_202]) ).
cnf(c_6121,plain,
( c3_1(a1654)
| hskp29
| hskp53 ),
inference(resolution,[status(thm)],[c_73,c_201]) ).
cnf(c_6740,plain,
( ~ c0_1(a1672)
| c2_1(a1671)
| hskp10 ),
inference(resolution,[status(thm)],[c_2488,c_355]) ).
cnf(c_6750,plain,
( ~ c0_1(a1672)
| ~ c1_1(a1671)
| hskp10 ),
inference(resolution,[status(thm)],[c_2488,c_354]) ).
cnf(c_6760,plain,
( ~ c0_1(a1672)
| ~ c3_1(a1671)
| hskp10 ),
inference(resolution,[status(thm)],[c_2488,c_353]) ).
cnf(c_6770,plain,
( c1_1(a1672)
| c2_1(a1671)
| hskp10 ),
inference(resolution,[status(thm)],[c_2478,c_355]) ).
cnf(c_6780,plain,
( ~ c1_1(a1671)
| c1_1(a1672)
| hskp10 ),
inference(resolution,[status(thm)],[c_2478,c_354]) ).
cnf(c_6790,plain,
( ~ c3_1(a1671)
| c1_1(a1672)
| hskp10 ),
inference(resolution,[status(thm)],[c_2478,c_353]) ).
cnf(c_6800,plain,
( c2_1(a1671)
| c3_1(a1672)
| hskp10 ),
inference(resolution,[status(thm)],[c_2468,c_355]) ).
cnf(c_6810,plain,
( ~ c1_1(a1671)
| c3_1(a1672)
| hskp10 ),
inference(resolution,[status(thm)],[c_2468,c_354]) ).
cnf(c_6820,plain,
( ~ c3_1(a1671)
| c3_1(a1672)
| hskp10 ),
inference(resolution,[status(thm)],[c_2468,c_353]) ).
cnf(c_6857,plain,
( c1_1(a1658)
| c2_1(a1657)
| hskp53 ),
inference(resolution,[status(thm)],[c_2527,c_379]) ).
cnf(c_6867,plain,
( ~ c1_1(a1657)
| c1_1(a1658)
| hskp53 ),
inference(resolution,[status(thm)],[c_2527,c_378]) ).
cnf(c_6887,plain,
( ~ c0_1(a1658)
| c2_1(a1657)
| hskp53 ),
inference(resolution,[status(thm)],[c_2517,c_379]) ).
cnf(c_6897,plain,
( ~ c0_1(a1658)
| ~ c1_1(a1657)
| hskp53 ),
inference(resolution,[status(thm)],[c_2517,c_378]) ).
cnf(c_6917,plain,
( c2_1(a1657)
| c3_1(a1658)
| hskp53 ),
inference(resolution,[status(thm)],[c_2507,c_379]) ).
cnf(c_6927,plain,
( ~ c1_1(a1657)
| c3_1(a1658)
| hskp53 ),
inference(resolution,[status(thm)],[c_2507,c_378]) ).
cnf(c_7091,plain,
( ~ c1_1(a1639)
| c2_1(a1641)
| hskp44 ),
inference(resolution,[status(thm)],[c_2605,c_239]) ).
cnf(c_7101,plain,
( c2_1(a1641)
| c2_1(a1639)
| hskp44 ),
inference(resolution,[status(thm)],[c_2605,c_238]) ).
cnf(c_7111,plain,
( c0_1(a1639)
| c2_1(a1641)
| hskp44 ),
inference(resolution,[status(thm)],[c_2605,c_237]) ).
cnf(c_7121,plain,
( ~ c1_1(a1641)
| ~ c1_1(a1639)
| hskp44 ),
inference(resolution,[status(thm)],[c_2595,c_239]) ).
cnf(c_7131,plain,
( ~ c1_1(a1641)
| c2_1(a1639)
| hskp44 ),
inference(resolution,[status(thm)],[c_2595,c_238]) ).
cnf(c_7141,plain,
( ~ c1_1(a1641)
| c0_1(a1639)
| hskp44 ),
inference(resolution,[status(thm)],[c_2595,c_237]) ).
cnf(c_7151,plain,
( ~ c1_1(a1639)
| ~ c3_1(a1641)
| hskp44 ),
inference(resolution,[status(thm)],[c_2585,c_239]) ).
cnf(c_7161,plain,
( ~ c3_1(a1641)
| c2_1(a1639)
| hskp44 ),
inference(resolution,[status(thm)],[c_2585,c_238]) ).
cnf(c_7171,plain,
( ~ c3_1(a1641)
| c0_1(a1639)
| hskp44 ),
inference(resolution,[status(thm)],[c_2585,c_237]) ).
cnf(c_9340,negated_conjecture,
( ~ c3_1(X0)
| ~ c1_1(X0)
| ~ c0_1(X0)
| ~ sP0_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP0_iProver_def])],[c_720]) ).
cnf(c_9341,negated_conjecture,
( ~ c3_1(X0)
| c2_1(X0)
| c1_1(X0)
| ~ sP1_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP1_iProver_def])],[c_720]) ).
cnf(c_9342,negated_conjecture,
( c2_1(X0)
| c1_1(X0)
| ~ c0_1(X0)
| ~ sP2_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP2_iProver_def])],[c_720]) ).
cnf(c_9343,negated_conjecture,
( sP0_iProver_def
| sP1_iProver_def
| sP2_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_720]) ).
cnf(c_9344,negated_conjecture,
( ~ c3_1(X0)
| c1_1(X0)
| c0_1(X0)
| ~ sP3_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP3_iProver_def])],[c_718]) ).
cnf(c_9345,negated_conjecture,
( c3_1(X0)
| ~ c2_1(X0)
| ~ c1_1(X0)
| ~ sP4_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP4_iProver_def])],[c_718]) ).
cnf(c_9346,negated_conjecture,
( ~ c3_1(X0)
| c1_1(X0)
| ~ c0_1(X0)
| ~ sP5_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP5_iProver_def])],[c_718]) ).
cnf(c_9347,negated_conjecture,
( sP3_iProver_def
| sP4_iProver_def
| sP5_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_718]) ).
cnf(c_9348,negated_conjecture,
( ~ c3_1(X0)
| ~ c2_1(X0)
| c1_1(X0)
| ~ sP6_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP6_iProver_def])],[c_716]) ).
cnf(c_9349,negated_conjecture,
( ~ c3_1(X0)
| c2_1(X0)
| c0_1(X0)
| ~ sP7_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP7_iProver_def])],[c_716]) ).
cnf(c_9350,negated_conjecture,
( ~ c3_1(X0)
| c2_1(X0)
| ~ c0_1(X0)
| ~ sP8_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP8_iProver_def])],[c_716]) ).
cnf(c_9351,negated_conjecture,
( sP6_iProver_def
| sP7_iProver_def
| sP8_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_716]) ).
cnf(c_9352,negated_conjecture,
( ~ c2_1(X0)
| c1_1(X0)
| ~ c0_1(X0)
| ~ sP9_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP9_iProver_def])],[c_714]) ).
cnf(c_9353,negated_conjecture,
( c3_1(X0)
| c2_1(X0)
| c0_1(X0)
| ~ sP10_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP10_iProver_def])],[c_714]) ).
cnf(c_9354,negated_conjecture,
( ~ c3_1(X0)
| ~ c2_1(X0)
| ~ c0_1(X0)
| ~ sP11_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP11_iProver_def])],[c_714]) ).
cnf(c_9355,negated_conjecture,
( sP9_iProver_def
| sP10_iProver_def
| sP11_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_714]) ).
cnf(c_9356,negated_conjecture,
( c3_1(X0)
| c1_1(X0)
| ~ c0_1(X0)
| ~ sP12_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP12_iProver_def])],[c_712]) ).
cnf(c_9358,negated_conjecture,
( c2_1(X0)
| c1_1(X0)
| c0_1(X0)
| ~ sP13_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP13_iProver_def])],[c_710]) ).
cnf(c_9359,negated_conjecture,
( c3_1(X0)
| c2_1(X0)
| c1_1(X0)
| ~ sP14_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP14_iProver_def])],[c_710]) ).
cnf(c_9360,negated_conjecture,
( c3_1(X0)
| ~ c2_1(X0)
| ~ c0_1(X0)
| ~ sP15_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP15_iProver_def])],[c_710]) ).
cnf(c_9361,negated_conjecture,
( sP13_iProver_def
| sP14_iProver_def
| sP15_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_710]) ).
cnf(c_9362,negated_conjecture,
( ~ c3_1(X0)
| c2_1(X0)
| ~ c1_1(X0)
| ~ sP16_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP16_iProver_def])],[c_708]) ).
cnf(c_9365,negated_conjecture,
( hskp13
| sP0_iProver_def
| sP16_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_705]) ).
cnf(c_9366,negated_conjecture,
( hskp26
| sP6_iProver_def
| sP11_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_702]) ).
cnf(c_9367,negated_conjecture,
( ~ c3_1(X0)
| ~ c2_1(X0)
| ~ c1_1(X0)
| ~ sP18_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP18_iProver_def])],[c_700]) ).
cnf(c_9368,negated_conjecture,
( hskp63
| sP5_iProver_def
| sP18_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_700]) ).
cnf(c_9369,negated_conjecture,
( c3_1(X0)
| ~ c2_1(X0)
| c1_1(X0)
| ~ sP19_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP19_iProver_def])],[c_698]) ).
cnf(c_9370,negated_conjecture,
( hskp40
| sP0_iProver_def
| sP19_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_698]) ).
cnf(c_9373,negated_conjecture,
( c3_1(X0)
| c2_1(X0)
| ~ c0_1(X0)
| ~ sP21_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP21_iProver_def])],[c_694]) ).
cnf(c_9374,negated_conjecture,
( hskp47
| sP0_iProver_def
| sP21_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_694]) ).
cnf(c_9375,negated_conjecture,
( ~ c3_1(X0)
| ~ c1_1(X0)
| c0_1(X0)
| ~ sP22_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP22_iProver_def])],[c_692]) ).
cnf(c_9376,negated_conjecture,
( hskp73
| sP6_iProver_def
| sP22_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_692]) ).
cnf(c_9378,negated_conjecture,
( hskp67
| sP5_iProver_def
| sP6_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_687]) ).
cnf(c_9379,negated_conjecture,
( hskp75
| sP1_iProver_def
| sP4_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_685]) ).
cnf(c_9380,negated_conjecture,
( c2_1(X0)
| ~ c1_1(X0)
| ~ c0_1(X0)
| ~ sP23_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP23_iProver_def])],[c_682]) ).
cnf(c_9381,negated_conjecture,
( hskp61
| sP21_iProver_def
| sP23_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_682]) ).
cnf(c_9382,negated_conjecture,
( hskp29
| sP3_iProver_def
| sP5_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_680]) ).
cnf(c_9384,negated_conjecture,
( c3_1(X0)
| ~ c1_1(X0)
| ~ c0_1(X0)
| ~ sP24_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP24_iProver_def])],[c_676]) ).
cnf(c_9385,negated_conjecture,
( hskp2
| sP12_iProver_def
| sP24_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_676]) ).
cnf(c_9391,negated_conjecture,
( c3_1(X0)
| c1_1(X0)
| c0_1(X0)
| ~ sP27_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[sP27_iProver_def])],[c_668]) ).
cnf(c_9392,negated_conjecture,
( hskp25
| sP22_iProver_def
| sP27_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_668]) ).
cnf(c_9396,negated_conjecture,
( hskp60
| sP3_iProver_def
| sP19_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_661]) ).
cnf(c_9400,negated_conjecture,
( hskp1
| sP2_iProver_def
| sP10_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_654]) ).
cnf(c_9402,negated_conjecture,
( hskp13
| hskp12
| sP18_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_649]) ).
cnf(c_9406,negated_conjecture,
( hskp17
| hskp16
| sP5_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_637]) ).
cnf(c_9409,negated_conjecture,
( hskp55
| hskp9
| sP15_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_628]) ).
cnf(c_9410,negated_conjecture,
( hskp52
| hskp7
| sP15_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_625]) ).
cnf(c_9412,negated_conjecture,
( hskp0
| hskp42
| sP15_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_619]) ).
cnf(c_9420,negated_conjecture,
( hskp72
| hskp37
| sP10_iProver_def ),
inference(splitting,[splitting(split),new_symbols(definition,[])],[c_594]) ).
cnf(c_9425,plain,
( ~ sP27_iProver_def
| c0_1(a1637)
| c1_1(a1637)
| c3_1(a1637) ),
inference(instantiation,[status(thm)],[c_9391]) ).
cnf(c_9427,plain,
( ~ c0_1(a1637)
| ~ sP2_iProver_def
| c1_1(a1637)
| c2_1(a1637) ),
inference(instantiation,[status(thm)],[c_9342]) ).
cnf(c_9428,plain,
( ~ c3_1(a1637)
| ~ sP3_iProver_def
| c0_1(a1637)
| c1_1(a1637) ),
inference(instantiation,[status(thm)],[c_9344]) ).
cnf(c_9432,plain,
( ~ c0_1(a1637)
| ~ sP21_iProver_def
| c2_1(a1637)
| c3_1(a1637) ),
inference(instantiation,[status(thm)],[c_9373]) ).
cnf(c_9437,plain,
( ~ c1_1(a1637)
| ~ c2_1(a1637)
| ~ sP4_iProver_def
| c3_1(a1637) ),
inference(instantiation,[status(thm)],[c_9345]) ).
cnf(c_9441,plain,
( ~ c0_1(a1637)
| ~ c2_1(a1637)
| ~ sP9_iProver_def
| c1_1(a1637) ),
inference(instantiation,[status(thm)],[c_9352]) ).
cnf(c_9443,plain,
( ~ c1_1(a1637)
| ~ c3_1(a1637)
| ~ sP16_iProver_def
| c2_1(a1637) ),
inference(instantiation,[status(thm)],[c_9362]) ).
cnf(c_9447,plain,
( ~ c0_1(a1637)
| ~ c1_1(a1637)
| ~ sP24_iProver_def
| c3_1(a1637) ),
inference(instantiation,[status(thm)],[c_9384]) ).
cnf(c_9451,plain,
( ~ c1_1(a1637)
| ~ c2_1(a1637)
| ~ c3_1(a1637)
| ~ sP18_iProver_def ),
inference(instantiation,[status(thm)],[c_9367]) ).
cnf(c_9452,plain,
( ~ c1_1(a1724)
| ~ c3_1(a1724)
| ~ sP16_iProver_def
| c2_1(a1724) ),
inference(instantiation,[status(thm)],[c_9362]) ).
cnf(c_9457,plain,
( ~ c0_1(a1716)
| ~ c2_1(a1716)
| ~ sP15_iProver_def
| c3_1(a1716) ),
inference(instantiation,[status(thm)],[c_9360]) ).
cnf(c_9473,plain,
( ~ c1_1(a1702)
| ~ c2_1(a1702)
| ~ c3_1(a1702)
| ~ sP18_iProver_def ),
inference(instantiation,[status(thm)],[c_9367]) ).
cnf(c_9490,plain,
( ~ c1_1(a1676)
| ~ c3_1(a1676)
| ~ sP22_iProver_def
| c0_1(a1676) ),
inference(instantiation,[status(thm)],[c_9375]) ).
cnf(c_9495,plain,
( ~ c3_1(a1676)
| ~ sP3_iProver_def
| c0_1(a1676)
| c1_1(a1676) ),
inference(instantiation,[status(thm)],[c_9344]) ).
cnf(c_9506,plain,
( ~ c3_1(a1674)
| ~ sP1_iProver_def
| c1_1(a1674)
| c2_1(a1674) ),
inference(instantiation,[status(thm)],[c_9341]) ).
cnf(c_9519,plain,
( ~ c2_1(a1673)
| ~ c3_1(a1673)
| ~ sP6_iProver_def
| c1_1(a1673) ),
inference(instantiation,[status(thm)],[c_9348]) ).
cnf(c_9568,plain,
( ~ c0_1(a1639)
| ~ c2_1(a1639)
| ~ sP9_iProver_def
| c1_1(a1639) ),
inference(instantiation,[status(thm)],[c_9352]) ).
cnf(c_9571,plain,
( ~ c0_1(a1639)
| ~ c2_1(a1639)
| ~ sP15_iProver_def
| c3_1(a1639) ),
inference(instantiation,[status(thm)],[c_9360]) ).
cnf(c_9598,plain,
( ~ sP10_iProver_def
| c0_1(a1661)
| c2_1(a1661)
| c3_1(a1661) ),
inference(instantiation,[status(thm)],[c_9353]) ).
cnf(c_9635,plain,
( ~ sP13_iProver_def
| c0_1(a1691)
| c1_1(a1691)
| c2_1(a1691) ),
inference(instantiation,[status(thm)],[c_9358]) ).
cnf(c_9645,plain,
( ~ sP13_iProver_def
| c0_1(a1677)
| c1_1(a1677)
| c2_1(a1677) ),
inference(instantiation,[status(thm)],[c_9358]) ).
cnf(c_9646,plain,
( ~ sP10_iProver_def
| c0_1(a1677)
| c2_1(a1677)
| c3_1(a1677) ),
inference(instantiation,[status(thm)],[c_9353]) ).
cnf(c_9647,plain,
( ~ c3_1(a1677)
| ~ sP7_iProver_def
| c0_1(a1677)
| c2_1(a1677) ),
inference(instantiation,[status(thm)],[c_9349]) ).
cnf(c_9651,plain,
( ~ sP10_iProver_def
| c0_1(a1663)
| c2_1(a1663)
| c3_1(a1663) ),
inference(instantiation,[status(thm)],[c_9353]) ).
cnf(c_9653,plain,
( ~ c1_1(a1655)
| ~ c3_1(a1655)
| ~ sP16_iProver_def
| c2_1(a1655) ),
inference(instantiation,[status(thm)],[c_9362]) ).
cnf(c_9654,plain,
( ~ c0_1(a1655)
| ~ c3_1(a1655)
| ~ sP8_iProver_def
| c2_1(a1655) ),
inference(instantiation,[status(thm)],[c_9350]) ).
cnf(c_9794,plain,
( ~ c0_1(a1661)
| ~ c1_1(a1661)
| ~ sP23_iProver_def
| c2_1(a1661) ),
inference(instantiation,[status(thm)],[c_9380]) ).
cnf(c_9865,plain,
( ~ c0_1(a1695)
| ~ c2_1(a1695)
| ~ sP15_iProver_def
| c3_1(a1695) ),
inference(instantiation,[status(thm)],[c_9360]) ).
cnf(c_9867,plain,
( ~ c2_1(a1690)
| ~ sP19_iProver_def
| c1_1(a1690)
| c3_1(a1690) ),
inference(instantiation,[status(thm)],[c_9369]) ).
cnf(c_9910,plain,
( ~ sP13_iProver_def
| c0_1(a1678)
| c1_1(a1678)
| c2_1(a1678) ),
inference(instantiation,[status(thm)],[c_9358]) ).
cnf(c_9911,plain,
( ~ sP10_iProver_def
| c0_1(a1678)
| c2_1(a1678)
| c3_1(a1678) ),
inference(instantiation,[status(thm)],[c_9353]) ).
cnf(c_9925,plain,
( ~ c2_1(a1657)
| ~ sP19_iProver_def
| c1_1(a1657)
| c3_1(a1657) ),
inference(instantiation,[status(thm)],[c_9369]) ).
cnf(c_9933,plain,
( ~ sP10_iProver_def
| c0_1(a1645)
| c2_1(a1645)
| c3_1(a1645) ),
inference(instantiation,[status(thm)],[c_9353]) ).
cnf(c_9934,plain,
( ~ c2_1(a1645)
| ~ sP19_iProver_def
| c1_1(a1645)
| c3_1(a1645) ),
inference(instantiation,[status(thm)],[c_9369]) ).
cnf(c_9941,plain,
( ~ c3_1(a1643)
| ~ sP1_iProver_def
| c1_1(a1643)
| c2_1(a1643) ),
inference(instantiation,[status(thm)],[c_9341]) ).
cnf(c_9955,plain,
( ~ c0_1(a1655)
| ~ c1_1(a1655)
| ~ c3_1(a1655)
| ~ sP0_iProver_def ),
inference(instantiation,[status(thm)],[c_9340]) ).
cnf(c_9967,plain,
( ~ c0_1(a1656)
| ~ c2_1(a1656)
| ~ sP15_iProver_def
| c3_1(a1656) ),
inference(instantiation,[status(thm)],[c_9360]) ).
cnf(c_9982,plain,
( ~ sP10_iProver_def
| c0_1(a1641)
| c2_1(a1641)
| c3_1(a1641) ),
inference(instantiation,[status(thm)],[c_9353]) ).
cnf(c_9983,plain,
( ~ c2_1(a1641)
| ~ sP19_iProver_def
| c1_1(a1641)
| c3_1(a1641) ),
inference(instantiation,[status(thm)],[c_9369]) ).
cnf(c_10000,plain,
( ~ c2_1(a1641)
| ~ c3_1(a1641)
| ~ sP6_iProver_def
| c1_1(a1641) ),
inference(instantiation,[status(thm)],[c_9348]) ).
cnf(c_10006,plain,
( ~ c2_1(a1683)
| ~ c3_1(a1683)
| ~ sP6_iProver_def
| c1_1(a1683) ),
inference(instantiation,[status(thm)],[c_9348]) ).
cnf(c_10007,plain,
( ~ c2_1(a1666)
| ~ c3_1(a1666)
| ~ sP6_iProver_def
| c1_1(a1666) ),
inference(instantiation,[status(thm)],[c_9348]) ).
cnf(c_10008,plain,
( ~ c2_1(a1657)
| ~ c3_1(a1657)
| ~ sP6_iProver_def
| c1_1(a1657) ),
inference(instantiation,[status(thm)],[c_9348]) ).
cnf(c_10014,plain,
( ~ c0_1(a1639)
| ~ sP12_iProver_def
| c1_1(a1639)
| c3_1(a1639) ),
inference(instantiation,[status(thm)],[c_9356]) ).
cnf(c_10018,plain,
( ~ c2_1(a1654)
| ~ c3_1(a1654)
| ~ sP6_iProver_def
| c1_1(a1654) ),
inference(instantiation,[status(thm)],[c_9348]) ).
cnf(c_10022,plain,
( ~ c0_1(a1654)
| ~ c2_1(a1654)
| ~ c3_1(a1654)
| ~ sP11_iProver_def ),
inference(instantiation,[status(thm)],[c_9354]) ).
cnf(c_10023,plain,
( ~ c0_1(a1654)
| ~ c1_1(a1654)
| ~ c3_1(a1654)
| ~ sP0_iProver_def ),
inference(instantiation,[status(thm)],[c_9340]) ).
cnf(c_10053,plain,
( ~ c2_1(a1671)
| ~ sP19_iProver_def
| c1_1(a1671)
| c3_1(a1671) ),
inference(instantiation,[status(thm)],[c_9369]) ).
cnf(c_10069,plain,
( ~ c2_1(a1695)
| ~ sP19_iProver_def
| c1_1(a1695)
| c3_1(a1695) ),
inference(instantiation,[status(thm)],[c_9369]) ).
cnf(c_10070,plain,
( ~ c1_1(a1695)
| ~ c2_1(a1695)
| ~ sP4_iProver_def
| c3_1(a1695) ),
inference(instantiation,[status(thm)],[c_9345]) ).
cnf(c_10079,plain,
( ~ c3_1(a1678)
| ~ sP7_iProver_def
| c0_1(a1678)
| c2_1(a1678) ),
inference(instantiation,[status(thm)],[c_9349]) ).
cnf(c_10088,plain,
( ~ c1_1(a1657)
| ~ c2_1(a1657)
| ~ c3_1(a1657)
| ~ sP18_iProver_def ),
inference(instantiation,[status(thm)],[c_9367]) ).
cnf(c_10089,plain,
( ~ c1_1(a1640)
| ~ c2_1(a1640)
| ~ c3_1(a1640)
| ~ sP18_iProver_def ),
inference(instantiation,[status(thm)],[c_9367]) ).
cnf(c_10110,plain,
( ~ c1_1(a1672)
| ~ c3_1(a1672)
| ~ sP22_iProver_def
| c0_1(a1672) ),
inference(instantiation,[status(thm)],[c_9375]) ).
cnf(c_10112,plain,
( ~ c1_1(a1658)
| ~ c3_1(a1658)
| ~ sP22_iProver_def
| c0_1(a1658) ),
inference(instantiation,[status(thm)],[c_9375]) ).
cnf(c_10139,plain,
( ~ c0_1(a1714)
| ~ c2_1(a1714)
| ~ sP9_iProver_def
| c1_1(a1714) ),
inference(instantiation,[status(thm)],[c_9352]) ).
cnf(c_10163,plain,
( ~ c0_1(a1724)
| ~ sP2_iProver_def
| c1_1(a1724)
| c2_1(a1724) ),
inference(instantiation,[status(thm)],[c_9342]) ).
cnf(c_10166,plain,
( ~ c0_1(a1691)
| ~ sP2_iProver_def
| c1_1(a1691)
| c2_1(a1691) ),
inference(instantiation,[status(thm)],[c_9342]) ).
cnf(c_10172,plain,
( ~ c0_1(a1691)
| ~ sP21_iProver_def
| c2_1(a1691)
| c3_1(a1691) ),
inference(instantiation,[status(thm)],[c_9373]) ).
cnf(c_10176,plain,
( ~ c3_1(a1644)
| ~ sP3_iProver_def
| c0_1(a1644)
| c1_1(a1644) ),
inference(instantiation,[status(thm)],[c_9344]) ).
cnf(c_10178,plain,
( ~ c3_1(a1690)
| ~ sP3_iProver_def
| c0_1(a1690)
| c1_1(a1690) ),
inference(instantiation,[status(thm)],[c_9344]) ).
cnf(c_10180,plain,
( ~ c3_1(a1678)
| ~ sP3_iProver_def
| c0_1(a1678)
| c1_1(a1678) ),
inference(instantiation,[status(thm)],[c_9344]) ).
cnf(c_10196,plain,
( ~ c0_1(a1641)
| ~ sP12_iProver_def
| c1_1(a1641)
| c3_1(a1641) ),
inference(instantiation,[status(thm)],[c_9356]) ).
cnf(c_10233,plain,
( ~ sP27_iProver_def
| c0_1(a1641)
| c1_1(a1641)
| c3_1(a1641) ),
inference(instantiation,[status(thm)],[c_9391]) ).
cnf(c_10254,plain,
( ~ c0_1(a1654)
| ~ c3_1(a1654)
| ~ sP5_iProver_def
| c1_1(a1654) ),
inference(instantiation,[status(thm)],[c_9346]) ).
cnf(c_10256,plain,
( ~ c0_1(a1639)
| ~ c3_1(a1639)
| ~ sP5_iProver_def
| c1_1(a1639) ),
inference(instantiation,[status(thm)],[c_9346]) ).
cnf(c_10260,plain,
( ~ c0_1(a1655)
| ~ c3_1(a1655)
| ~ sP5_iProver_def
| c1_1(a1655) ),
inference(instantiation,[status(thm)],[c_9346]) ).
cnf(c_10291,plain,
( ~ c0_1(a1667)
| ~ c3_1(a1667)
| ~ sP5_iProver_def
| c1_1(a1667) ),
inference(instantiation,[status(thm)],[c_9346]) ).
cnf(c_10293,plain,
( ~ c3_1(a1641)
| ~ sP1_iProver_def
| c1_1(a1641)
| c2_1(a1641) ),
inference(instantiation,[status(thm)],[c_9341]) ).
cnf(c_10299,plain,
( ~ c3_1(a1667)
| ~ sP1_iProver_def
| c1_1(a1667)
| c2_1(a1667) ),
inference(instantiation,[status(thm)],[c_9341]) ).
cnf(c_10305,plain,
( ~ c1_1(a1725)
| ~ c3_1(a1725)
| ~ sP16_iProver_def
| c2_1(a1725) ),
inference(instantiation,[status(thm)],[c_9362]) ).
cnf(c_10396,plain,
( ~ sP13_iProver_def
| c0_1(a1660)
| c1_1(a1660)
| c2_1(a1660) ),
inference(instantiation,[status(thm)],[c_9358]) ).
cnf(c_10416,plain,
( ~ c2_1(a1660)
| ~ sP19_iProver_def
| c1_1(a1660)
| c3_1(a1660) ),
inference(instantiation,[status(thm)],[c_9369]) ).
cnf(c_10424,plain,
( ~ c1_1(a1715)
| ~ c3_1(a1715)
| ~ sP16_iProver_def
| c2_1(a1715) ),
inference(instantiation,[status(thm)],[c_9362]) ).
cnf(c_10464,plain,
( ~ c3_1(a1677)
| ~ sP3_iProver_def
| c0_1(a1677)
| c1_1(a1677) ),
inference(instantiation,[status(thm)],[c_9344]) ).
cnf(c_10472,plain,
( ~ sP14_iProver_def
| c1_1(a1691)
| c2_1(a1691)
| c3_1(a1691) ),
inference(instantiation,[status(thm)],[c_9359]) ).
cnf(c_10473,plain,
( ~ sP14_iProver_def
| c1_1(a1677)
| c2_1(a1677)
| c3_1(a1677) ),
inference(instantiation,[status(thm)],[c_9359]) ).
cnf(c_10482,plain,
( ~ c0_1(a1638)
| ~ c1_1(a1638)
| ~ sP24_iProver_def
| c3_1(a1638) ),
inference(instantiation,[status(thm)],[c_9384]) ).
cnf(c_10500,plain,
( ~ sP14_iProver_def
| c1_1(a1678)
| c2_1(a1678)
| c3_1(a1678) ),
inference(instantiation,[status(thm)],[c_9359]) ).
cnf(c_10517,plain,
( ~ c2_1(a1667)
| ~ c3_1(a1667)
| ~ sP6_iProver_def
| c1_1(a1667) ),
inference(instantiation,[status(thm)],[c_9348]) ).
cnf(c_10555,plain,
( ~ c0_1(a1641)
| ~ sP21_iProver_def
| c2_1(a1641)
| c3_1(a1641) ),
inference(instantiation,[status(thm)],[c_9373]) ).
cnf(c_10604,plain,
( ~ c0_1(a1667)
| ~ sP2_iProver_def
| c1_1(a1667)
| c2_1(a1667) ),
inference(instantiation,[status(thm)],[c_9342]) ).
cnf(c_10605,plain,
$false,
inference(prop_impl_just,[status(thm)],[c_10604,c_10555,c_10517,c_10500,c_10482,c_10473,c_10472,c_10464,c_10424,c_10416,c_10396,c_10305,c_10299,c_10293,c_10291,c_10260,c_10256,c_10254,c_10233,c_10196,c_10180,c_10178,c_10176,c_10172,c_10166,c_10163,c_10139,c_10112,c_10110,c_10089,c_10088,c_10079,c_10069,c_10070,c_10053,c_10022,c_10023,c_10018,c_10014,c_10008,c_10007,c_10006,c_10000,c_9983,c_9982,c_9967,c_9955,c_9941,c_9934,c_9933,c_9925,c_9910,c_9911,c_9867,c_9865,c_9794,c_9653,c_9654,c_9651,c_9645,c_9646,c_9647,c_9635,c_9598,c_9568,c_9571,c_9519,c_9506,c_9490,c_9495,c_9473,c_9457,c_9452,c_9451,c_9447,c_9443,c_9441,c_9437,c_9432,c_9428,c_9427,c_9425,c_9420,c_9412,c_9410,c_9409,c_9406,c_9402,c_9400,c_9396,c_9392,c_9385,c_9382,c_9381,c_9379,c_9378,c_9376,c_9374,c_9370,c_9368,c_9366,c_9365,c_9361,c_9355,c_9351,c_9347,c_9343,c_7171,c_7161,c_7151,c_7141,c_7131,c_7121,c_7111,c_7101,c_7091,c_6927,c_6917,c_6897,c_6887,c_6867,c_6857,c_6820,c_6810,c_6800,c_6790,c_6780,c_6770,c_6760,c_6750,c_6740,c_6121,c_6111,c_6101,c_664,c_439,c_438,c_110,c_118,c_123,c_159,c_166,c_167,c_171,c_190,c_191,c_199,c_222,c_223,c_242,c_249,c_261,c_293,c_305,c_306,c_307,c_309,c_310,c_325,c_341,c_342,c_343,c_345,c_346,c_347,c_357,c_361,c_369,c_370,c_371,c_373,c_374,c_375,c_381,c_401,c_402,c_403,c_405,c_407,c_409,c_109,c_111,c_117,c_119,c_121,c_122,c_141,c_142,c_143,c_157,c_165,c_169,c_170,c_189,c_197,c_198,c_201,c_202,c_203,c_221,c_233,c_234,c_235,c_241,c_243,c_250,c_251,c_262,c_263,c_294,c_295,c_311,c_326,c_327,c_358,c_359,c_362,c_363,c_382,c_383,c_406,c_410,c_411,c_73]) ).
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.03/0.12 % Problem : SYN457+1 : TPTP v8.1.2. Released v2.1.0.
% 0.14/0.13 % Command : run_iprover %s %d THM
% 0.14/0.34 % Computer : n022.cluster.edu
% 0.14/0.34 % Model : x86_64 x86_64
% 0.14/0.34 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.14/0.34 % Memory : 8042.1875MB
% 0.14/0.34 % OS : Linux 3.10.0-693.el7.x86_64
% 0.14/0.34 % CPULimit : 300
% 0.14/0.34 % WCLimit : 300
% 0.14/0.34 % DateTime : Thu May 2 20:53:27 EDT 2024
% 0.14/0.34 % CPUTime :
% 0.21/0.47 Running first-order theorem proving
% 0.21/0.47 Running: /export/starexec/sandbox/solver/bin/run_problem --schedule fof_schedule --heuristic_context casc_unsat --no_cores 8 /export/starexec/sandbox/benchmark/theBenchmark.p 300
% 4.08/1.16 % SZS status Started for theBenchmark.p
% 4.08/1.16 % SZS status Theorem for theBenchmark.p
% 4.08/1.16
% 4.08/1.16 %---------------- iProver v3.9 (pre CASC 2024/SMT-COMP 2024) ----------------%
% 4.08/1.16
% 4.08/1.16 ------ iProver source info
% 4.08/1.16
% 4.08/1.16 git: date: 2024-05-02 19:28:25 +0000
% 4.08/1.16 git: sha1: a33b5eb135c74074ba803943bb12f2ebd971352f
% 4.08/1.16 git: non_committed_changes: false
% 4.08/1.16
% 4.08/1.16 ------ Parsing...
% 4.08/1.16 ------ Clausification by vclausify_rel & Parsing by iProver...
% 4.08/1.16
% 4.08/1.16 ------ Preprocessing... sf_s rm: 1 0s sf_e pe_s pe:1:0s pe:2:0s pe:4:0s pe_e
% 4.08/1.16
% 4.08/1.16 ------ Preprocessing... gs_s sp: 89 0s gs_e snvd_s sp: 0 0s snvd_e
% 4.08/1.16 ------ Proving...
% 4.08/1.16 ------ Problem Properties
% 4.08/1.16
% 4.08/1.16
% 4.08/1.16 clauses 311
% 4.08/1.16 conjectures 290
% 4.08/1.16 EPR 311
% 4.08/1.16 Horn 222
% 4.08/1.16 unary 0
% 4.08/1.16 binary 207
% 4.08/1.16 lits 756
% 4.08/1.16 lits eq 0
% 4.08/1.16 fd_pure 0
% 4.08/1.16 fd_pseudo 0
% 4.08/1.16 fd_cond 0
% 4.08/1.16 fd_pseudo_cond 0
% 4.08/1.16 AC symbols 0
% 4.08/1.16
% 4.08/1.16 ------ Input Options Time Limit: Unbounded
% 4.08/1.16
% 4.08/1.16
% 4.08/1.16 ------
% 4.08/1.16 Current options:
% 4.08/1.16 ------
% 4.08/1.16
% 4.08/1.16
% 4.08/1.16
% 4.08/1.16
% 4.08/1.16 ------ Proving...
% 4.08/1.16
% 4.08/1.16
% 4.08/1.16 % SZS status Theorem for theBenchmark.p
% 4.08/1.16
% 4.08/1.16 % SZS output start CNFRefutation for theBenchmark.p
% See solution above
% 4.08/1.16
% 4.08/1.17
%------------------------------------------------------------------------------