TSTP Solution File: SYN428+1 by Vampire-SAT---4.8
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- Process Solution
%------------------------------------------------------------------------------
% File : Vampire-SAT---4.8
% Problem : SYN428+1 : TPTP v8.1.2. Released v2.1.0.
% Transfm : none
% Format : tptp:raw
% Command : vampire --mode casc_sat -m 16384 --cores 7 -t %d %s
% 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 : Sun May 5 12:10:12 EDT 2024
% Result : CounterSatisfiable 0.20s 0.41s
% Output : Saturation 0.20s
% Verified :
% SZS Type : ERROR: Analysing output (MakeTreeStats fails)
% Comments :
%------------------------------------------------------------------------------
cnf(u1050,axiom,
~ sP82 ).
cnf(u1064,axiom,
ndr1_0 ).
cnf(u1068,axiom,
sP80 ).
cnf(u1073,axiom,
~ c6_1(a2027) ).
cnf(u1078,axiom,
~ c4_1(a2027) ).
cnf(u1083,axiom,
c3_1(a2027) ).
cnf(u1089,axiom,
~ sP79 ).
cnf(u1105,axiom,
~ sP78 ).
cnf(u1108,axiom,
~ c3_1(a2019) ).
cnf(u1114,axiom,
~ ndr1_1(a2019) ).
cnf(u1122,axiom,
c4_1(a2019) ).
cnf(u1128,axiom,
~ sP77 ).
cnf(u1152,axiom,
~ sP76 ).
cnf(u1167,axiom,
sP75 ).
cnf(u1171,axiom,
ndr1_1(a2006) ).
cnf(u1175,axiom,
( c7_2(a2006,X0)
| c9_2(a2006,X0) ) ).
cnf(u1180,axiom,
c4_1(a2006) ).
cnf(u1185,axiom,
~ c2_2(a2006,a2007) ).
cnf(u1190,axiom,
c7_2(a2006,a2007) ).
cnf(u1195,axiom,
c4_2(a2006,a2007) ).
cnf(u1202,axiom,
~ sP73 ).
cnf(u1231,axiom,
~ sP72 ).
cnf(u1265,axiom,
sP71 ).
cnf(u1270,axiom,
c1_2(a1998,a2000) ).
cnf(u1275,axiom,
c9_2(a1998,a2000) ).
cnf(u1280,axiom,
c6_2(a1998,a2000) ).
cnf(u1285,axiom,
ndr1_1(a1998) ).
cnf(u1290,axiom,
c3_2(a1998,a1999) ).
cnf(u1295,axiom,
~ c2_2(a1998,a1999) ).
cnf(u1300,axiom,
c10_2(a1998,a1999) ).
cnf(u1306,axiom,
~ c5_1(a1998) ).
cnf(u1312,axiom,
~ sP70 ).
cnf(u1346,axiom,
~ sP69 ).
cnf(u1365,axiom,
sP66 ).
cnf(u1370,axiom,
~ c5_1(a1988) ).
cnf(u1375,axiom,
c5_2(a1988,a1989) ).
cnf(u1380,axiom,
~ c6_2(a1988,a1989) ).
cnf(u1385,axiom,
~ c3_2(a1988,a1989) ).
cnf(u1390,axiom,
ndr1_1(a1988) ).
cnf(u1394,axiom,
( ~ c2_2(a1988,X0)
| ~ c5_2(a1988,X0)
| ~ c1_2(a1988,X0) ) ).
cnf(u1400,axiom,
~ sP65 ).
cnf(u1403,axiom,
( c1_2(X0,a1983)
| ~ c2_1(X0)
| ~ c5_1(X0) ) ).
cnf(u1407,axiom,
( c8_2(X0,a1983)
| ~ c2_1(X0)
| ~ c5_1(X0) ) ).
cnf(u1411,axiom,
( ~ c5_2(X0,a1983)
| ~ c2_1(X0)
| ~ c5_1(X0) ) ).
cnf(u1419,axiom,
sP64 ).
cnf(u1424,axiom,
~ c7_1(a1986) ).
cnf(u1429,axiom,
~ c9_1(a1986) ).
cnf(u1434,axiom,
~ c2_2(a1986,a1987) ).
cnf(u1439,axiom,
c7_2(a1986,a1987) ).
cnf(u1444,axiom,
~ c5_2(a1986,a1987) ).
cnf(u1449,axiom,
ndr1_1(a1986) ).
cnf(u1455,axiom,
~ sP62 ).
cnf(u1477,axiom,
sP60 ).
cnf(u1482,axiom,
~ c1_1(a1976) ).
cnf(u1487,axiom,
~ c6_2(a1976,a1977) ).
cnf(u1492,axiom,
c7_2(a1976,a1977) ).
cnf(u1497,axiom,
c8_2(a1976,a1977) ).
cnf(u1502,axiom,
ndr1_1(a1976) ).
cnf(u1507,axiom,
~ c9_1(a1976) ).
cnf(u1513,axiom,
~ sP59 ).
cnf(u1554,axiom,
~ sP58 ).
cnf(u1593,axiom,
sP57 ).
cnf(u1597,axiom,
( ~ c1_1(X0)
| ~ c9_2(X0,a1962)
| c8_1(X0) ) ).
cnf(u1601,axiom,
( ~ c1_1(X0)
| c6_2(X0,a1962)
| c8_1(X0) ) ).
cnf(u1605,axiom,
( ~ c1_1(X0)
| c3_2(X0,a1962)
| c8_1(X0) ) ).
cnf(u1609,axiom,
( ~ c1_1(X0)
| ndr1_1(X0)
| c8_1(X0) ) ).
cnf(u1613,axiom,
sP56 ).
cnf(u1618,axiom,
~ c10_1(a1960) ).
cnf(u1623,axiom,
~ c5_1(a1960) ).
cnf(u1628,axiom,
~ c10_2(a1960,a1961) ).
cnf(u1633,axiom,
~ c3_2(a1960,a1961) ).
cnf(u1638,axiom,
ndr1_1(a1960) ).
cnf(u1643,axiom,
sP55 ).
cnf(u1648,axiom,
~ c5_1(a1958) ).
cnf(u1653,axiom,
~ c9_1(a1958) ).
cnf(u1658,axiom,
c8_2(a1958,a1959) ).
cnf(u1663,axiom,
~ c7_2(a1958,a1959) ).
cnf(u1668,axiom,
c4_2(a1958,a1959) ).
cnf(u1673,axiom,
ndr1_1(a1958) ).
cnf(u1678,axiom,
sP54 ).
cnf(u1682,axiom,
( ~ c1_2(X0,a1955)
| ~ c10_1(X0)
| ~ c7_1(X0) ) ).
cnf(u1686,axiom,
( c3_2(X0,a1955)
| ~ c10_1(X0)
| ~ c7_1(X0) ) ).
cnf(u1690,axiom,
( c5_2(X0,a1955)
| ~ c10_1(X0)
| ~ c7_1(X0) ) ).
cnf(u1694,axiom,
( ~ c7_1(X0)
| ~ c10_1(X0)
| ndr1_1(X0) ) ).
cnf(u1698,axiom,
sP51 ).
cnf(u1703,axiom,
~ c1_1(a1950) ).
cnf(u1708,axiom,
~ ndr1_1(a1950) ).
cnf(u1716,axiom,
c5_1(a1950) ).
cnf(u1722,axiom,
~ sP50 ).
cnf(u1742,axiom,
~ sP49 ).
cnf(u1762,axiom,
~ sP47 ).
cnf(u1796,axiom,
sP46 ).
cnf(u1801,axiom,
~ ndr1_1(a1939) ).
cnf(u1809,axiom,
c10_1(a1939) ).
cnf(u1814,axiom,
~ c2_1(a1939) ).
cnf(u1819,axiom,
sP45 ).
cnf(u1824,axiom,
~ c10_1(a1937) ).
cnf(u1829,axiom,
~ c6_2(a1937,a1938) ).
cnf(u1834,axiom,
~ c7_2(a1937,a1938) ).
cnf(u1839,axiom,
ndr1_1(a1937) ).
cnf(u1844,axiom,
c2_1(a1937) ).
cnf(u1849,axiom,
sP44 ).
cnf(u1854,axiom,
~ c9_1(a1935) ).
cnf(u1858,axiom,
ndr1_1(a1935) ).
cnf(u1862,axiom,
( ~ c8_2(a1935,X0)
| c3_2(a1935,X0)
| c10_2(a1935,X0) ) ).
cnf(u1867,axiom,
c5_2(a1935,a1936) ).
cnf(u1872,axiom,
~ c8_2(a1935,a1936) ).
cnf(u1879,axiom,
~ sP43 ).
cnf(u1914,axiom,
~ sP42 ).
cnf(u1917,axiom,
( ~ c3_2(X0,a1929)
| ~ c2_1(X0)
| ~ c5_1(X0) ) ).
cnf(u1921,axiom,
( c8_2(X0,a1929)
| ~ c2_1(X0)
| ~ c5_1(X0) ) ).
cnf(u1925,axiom,
( ~ c9_2(X0,a1929)
| ~ c2_1(X0)
| ~ c5_1(X0) ) ).
cnf(u1930,axiom,
sP41 ).
cnf(u1935,axiom,
c7_2(a1931,a1932) ).
cnf(u1940,axiom,
~ c9_2(a1931,a1932) ).
cnf(u1945,axiom,
c1_2(a1931,a1932) ).
cnf(u1950,axiom,
ndr1_1(a1931) ).
cnf(u1954,axiom,
( ~ c2_2(a1931,X0)
| ~ c1_2(a1931,X0)
| c5_2(a1931,X0) ) ).
cnf(u1959,axiom,
~ c8_1(a1931) ).
cnf(u1964,axiom,
sP40 ).
cnf(u1969,axiom,
~ ndr1_1(a1924) ).
cnf(u1977,axiom,
~ c5_1(a1924) ).
cnf(u1986,axiom,
sP39 ).
cnf(u1991,axiom,
~ c7_2(a1922,a1923) ).
cnf(u1996,axiom,
c8_2(a1922,a1923) ).
cnf(u2001,axiom,
~ c3_2(a1922,a1923) ).
cnf(u2006,axiom,
ndr1_1(a1922) ).
cnf(u2011,axiom,
c8_1(a1922) ).
cnf(u2015,axiom,
( ~ c2_2(a1922,X0)
| ~ c10_2(a1922,X0)
| ~ c5_2(a1922,X0) ) ).
cnf(u2021,axiom,
~ sP38 ).
cnf(u2055,axiom,
sP37 ).
cnf(u2060,axiom,
c7_1(a1917) ).
cnf(u2064,axiom,
ndr1_1(a1917) ).
cnf(u2068,axiom,
( ~ c9_2(a1917,X0)
| c10_2(a1917,X0)
| c4_2(a1917,X0) ) ).
cnf(u2073,axiom,
c5_2(a1917,a1918) ).
cnf(u2078,axiom,
c2_2(a1917,a1918) ).
cnf(u2083,axiom,
~ c4_2(a1917,a1918) ).
cnf(u2089,axiom,
sP36 ).
cnf(u2093,axiom,
ndr1_1(a1915) ).
cnf(u2097,axiom,
( c1_2(a1915,X0)
| c7_2(a1915,X0) ) ).
cnf(u2102,axiom,
~ c9_2(a1915,a1916) ).
cnf(u2107,axiom,
c5_2(a1915,a1916) ).
cnf(u2113,axiom,
c5_1(a1915) ).
cnf(u2119,axiom,
~ sP35 ).
cnf(u2138,axiom,
sP34 ).
cnf(u2143,axiom,
~ c4_2(a1910,a1911) ).
cnf(u2148,axiom,
~ c3_2(a1910,a1911) ).
cnf(u2153,axiom,
ndr1_1(a1910) ).
cnf(u2157,axiom,
( ~ c7_2(a1910,X0)
| c4_2(a1910,X0) ) ).
cnf(u2161,axiom,
( ~ c2_2(a1910,X1)
| c1_2(a1910,X1) ) ).
cnf(u2166,axiom,
sP33 ).
cnf(u2170,axiom,
( c3_2(X0,a1908)
| c10_1(X0)
| c7_1(X0) ) ).
cnf(u2174,axiom,
( c1_2(X0,a1908)
| c10_1(X0)
| c7_1(X0) ) ).
cnf(u2178,axiom,
( c9_2(X0,a1908)
| c10_1(X0)
| c7_1(X0) ) ).
cnf(u2182,axiom,
( c7_1(X0)
| c10_1(X0)
| ndr1_1(X0) ) ).
cnf(u2187,axiom,
~ sP32 ).
cnf(u2190,axiom,
( ~ c10_2(X0,a1905)
| sP30(X0)
| c6_1(X0) ) ).
cnf(u2194,axiom,
( c5_2(X0,a1905)
| sP30(X0)
| c6_1(X0) ) ).
cnf(u2206,axiom,
sP31 ).
cnf(u2211,axiom,
~ ndr1_1(a1903) ).
cnf(u2219,axiom,
c3_1(a1903) ).
cnf(u2229,axiom,
~ sP29 ).
cnf(u2275,axiom,
~ sP28 ).
cnf(u2290,axiom,
sP27 ).
cnf(u2295,axiom,
c6_2(a1896,a1897) ).
cnf(u2300,axiom,
c7_2(a1896,a1897) ).
cnf(u2305,axiom,
~ c2_2(a1896,a1897) ).
cnf(u2310,axiom,
ndr1_1(a1896) ).
cnf(u2315,axiom,
~ c9_1(a1896) ).
cnf(u2321,axiom,
~ sP26 ).
cnf(u2356,axiom,
~ sP25 ).
cnf(u2391,axiom,
~ sP23 ).
cnf(u2426,axiom,
~ sP22 ).
cnf(u2449,axiom,
~ sP21 ).
cnf(u2484,axiom,
~ sP20 ).
cnf(u2518,axiom,
~ sP19 ).
cnf(u2548,axiom,
~ sP18 ).
cnf(u2570,axiom,
sP17 ).
cnf(u2574,axiom,
( ~ c10_2(X0,a1873)
| ~ c10_1(X0)
| c4_1(X0) ) ).
cnf(u2578,axiom,
( c3_2(X0,a1873)
| ~ c10_1(X0)
| c4_1(X0) ) ).
cnf(u2582,axiom,
( ~ c4_2(X0,a1873)
| ~ c10_1(X0)
| c4_1(X0) ) ).
cnf(u2586,axiom,
( ~ c10_1(X0)
| ndr1_1(X0)
| c4_1(X0) ) ).
cnf(u2591,axiom,
~ sP16 ).
cnf(u2615,axiom,
~ sP15 ).
cnf(u2649,axiom,
sP14 ).
cnf(u2654,axiom,
~ c6_2(a1865,a1868) ).
cnf(u2659,axiom,
~ c7_2(a1865,a1868) ).
cnf(u2664,axiom,
c2_2(a1865,a1868) ).
cnf(u2669,axiom,
ndr1_1(a1865) ).
cnf(u2674,axiom,
~ c5_2(a1865,a1867) ).
cnf(u2679,axiom,
~ c9_2(a1865,a1867) ).
cnf(u2684,axiom,
c3_2(a1865,a1867) ).
cnf(u2690,axiom,
~ c4_2(a1865,a1866) ).
cnf(u2695,axiom,
c8_2(a1865,a1866) ).
cnf(u2700,axiom,
~ c7_2(a1865,a1866) ).
cnf(u2707,axiom,
~ sP12 ).
cnf(u2752,axiom,
~ sP11 ).
cnf(u2787,axiom,
~ sP10 ).
cnf(u2807,axiom,
~ sP8 ).
cnf(u2840,axiom,
~ sP7 ).
cnf(u2875,axiom,
~ sP6 ).
cnf(u2908,axiom,
sP4 ).
cnf(u2913,axiom,
c2_2(a1841,a1842) ).
cnf(u2918,axiom,
c4_2(a1841,a1842) ).
cnf(u2923,axiom,
ndr1_1(a1841) ).
cnf(u2927,axiom,
( ~ c7_2(a1841,X0)
| ~ c2_2(a1841,X0) ) ).
cnf(u2933,axiom,
~ sP3 ).
cnf(u2968,negated_conjecture,
c3_0 ).
cnf(u2984,negated_conjecture,
~ ndr1_1(a2029) ).
cnf(u2990,negated_conjecture,
~ c4_0 ).
cnf(u3000,negated_conjecture,
c10_1(a2029) ).
cnf(u3005,negated_conjecture,
~ c8_0 ).
cnf(u3029,negated_conjecture,
~ c7_0 ).
cnf(u3032,negated_conjecture,
~ c6_0 ).
cnf(u3062,negated_conjecture,
~ c1_0 ).
cnf(u3067,negated_conjecture,
c9_0 ).
cnf(u3071,negated_conjecture,
( ~ c7_1(X7)
| ~ c5_1(X7)
| ~ ndr1_1(X7)
| c5_2(X7,X8)
| c3_2(X7,X8)
| c4_2(X7,X8) ) ).
cnf(u3095,negated_conjecture,
~ c10_0 ).
cnf(u3110,negated_conjecture,
~ c1_1(a2021) ).
cnf(u3115,negated_conjecture,
~ c8_1(a2021) ).
cnf(u3120,negated_conjecture,
~ c3_1(a2021) ).
cnf(u3132,negated_conjecture,
( ~ c9_1(X12)
| ~ c3_1(X12)
| ~ c10_1(X12) ) ).
cnf(u3141,negated_conjecture,
~ c2_0 ).
cnf(u3145,negated_conjecture,
( ~ c4_2(X15,a2018)
| c10_1(X15)
| c8_1(X15) ) ).
cnf(u3149,negated_conjecture,
( ~ c10_2(X15,a2018)
| c10_1(X15)
| c8_1(X15) ) ).
cnf(u3153,negated_conjecture,
( c6_2(X15,a2018)
| c10_1(X15)
| c8_1(X15) ) ).
cnf(u3157,negated_conjecture,
( c8_1(X15)
| ndr1_1(X15)
| c10_1(X15) ) ).
cnf(u3162,negated_conjecture,
~ ndr1_1(a2017) ).
cnf(u3170,negated_conjecture,
c3_1(a2017) ).
cnf(u3175,negated_conjecture,
c8_1(a2017) ).
cnf(u3182,negated_conjecture,
~ ndr1_1(a2014) ).
cnf(u3190,negated_conjecture,
c2_1(a2014) ).
cnf(u3195,negated_conjecture,
~ c7_1(a2014) ).
cnf(u3286,negated_conjecture,
c5_0 ).
cnf(u3454,negated_conjecture,
( ~ c6_2(X53,X54)
| c7_1(X53)
| ~ ndr1_1(X53)
| ~ c3_2(X53,X54) ) ).
cnf(u3497,negated_conjecture,
~ ndr1_1(a1967) ).
cnf(u3568,negated_conjecture,
~ ndr1_1(a1952) ).
cnf(u3576,negated_conjecture,
~ c10_1(a1952) ).
cnf(u3607,negated_conjecture,
~ c4_1(a1945) ).
cnf(u3615,negated_conjecture,
~ ndr1_1(a1945) ).
cnf(u3626,negated_conjecture,
( ~ c9_1(X79)
| ~ c9_2(X79,X81)
| c8_2(X79,X81)
| c2_2(X79,X81)
| ~ ndr1_1(X79)
| c10_2(X79,X80)
| ~ c1_2(X79,X80) ) ).
cnf(u3633,negated_conjecture,
( ~ c10_1(X82)
| c2_1(X82)
| ~ c3_1(X82) ) ).
cnf(u3650,negated_conjecture,
~ c9_1(a1941) ).
cnf(u3655,negated_conjecture,
~ c1_1(a1941) ).
cnf(u3678,negated_conjecture,
( ~ c6_1(X91)
| c9_1(X91)
| c5_1(X91) ) ).
cnf(u3719,negated_conjecture,
( ~ c1_1(X96)
| ~ c9_2(X96,a1927)
| c2_1(X96) ) ).
cnf(u3723,negated_conjecture,
( ~ c1_1(X96)
| c1_2(X96,a1927)
| c2_1(X96) ) ).
cnf(u3727,negated_conjecture,
( ~ c1_1(X96)
| ndr1_1(X96)
| c2_1(X96) ) ).
cnf(u3736,negated_conjecture,
~ c6_1(a1926) ).
cnf(u3741,negated_conjecture,
c5_1(a1926) ).
cnf(u3746,negated_conjecture,
~ c1_1(a1926) ).
cnf(u3788,negated_conjecture,
( ~ c10_2(X103,X104)
| c9_2(X103,X105)
| ~ c1_2(X103,X105)
| c10_2(X103,X105)
| c8_1(X103)
| ~ ndr1_1(X103)
| ~ c7_2(X103,X104)
| c2_2(X103,X104) ) ).
cnf(u3794,negated_conjecture,
~ ndr1_1(a1913) ).
cnf(u3802,negated_conjecture,
~ c2_1(a1913) ).
cnf(u3841,negated_conjecture,
c8_1(a1907) ).
cnf(u3846,negated_conjecture,
~ c10_1(a1907) ).
cnf(u3851,negated_conjecture,
c5_1(a1907) ).
cnf(u3856,negated_conjecture,
( ~ c4_1(X114)
| ~ c3_1(X114) ) ).
cnf(u3863,negated_conjecture,
( ~ c10_2(X116,X117)
| c3_1(X116)
| ~ ndr1_1(X116)
| c1_2(X116,X117)
| ~ c2_2(X116,X117) ) ).
cnf(u3895,negated_conjecture,
~ ndr1_1(a1899) ).
cnf(u3903,negated_conjecture,
~ c1_1(a1899) ).
cnf(u3908,negated_conjecture,
~ c9_1(a1899) ).
cnf(u4024,negated_conjecture,
~ c5_1(a1876) ).
cnf(u4029,negated_conjecture,
~ c2_1(a1876) ).
cnf(u4149,negated_conjecture,
( c5_1(X152)
| c3_1(X152) ) ).
cnf(u4207,negated_conjecture,
( ~ c5_2(X161,X162)
| ~ ndr1_1(X161)
| c6_1(X161)
| c7_2(X161,X162)
| c3_2(X161,X162) ) ).
cnf(u4236,negated_conjecture,
c10_1(a2021) ).
cnf(u4240,negated_conjecture,
ndr1_1(a2021) ).
cnf(u4247,negated_conjecture,
~ c3_1(a2029) ).
cnf(u4317,axiom,
~ c7_1(a1915) ).
cnf(u4329,axiom,
~ c5_1(a1935) ).
cnf(u4358,negated_conjecture,
~ c3_2(a1998,a2000) ).
cnf(u4368,negated_conjecture,
~ c3_2(a1896,a1897) ).
cnf(u4395,negated_conjecture,
c6_1(a1915) ).
cnf(u4401,negated_conjecture,
c3_2(a1917,a1918) ).
cnf(u4415,negated_conjecture,
c3_2(a1935,a1936) ).
cnf(u4430,negated_conjecture,
c7_2(a1988,a1989) ).
cnf(u4446,negated_conjecture,
~ c5_1(a1917) ).
cnf(u4455,negated_conjecture,
~ c7_2(a1998,a1999) ).
cnf(u4470,negated_conjecture,
~ c2_2(a1841,a1905) ).
cnf(u4502,negated_conjecture,
c4_2(a1910,a1905) ).
cnf(u4283,negated_conjecture,
~ c3_1(a2014) ).
cnf(u409,axiom,
( ~ sP48(X0)
| c2_2(X0,a1947) ) ).
cnf(u4273,axiom,
c4_1(a1939) ).
cnf(u679,axiom,
( ~ sP2(X0)
| c6_2(X0,a1837) ) ).
cnf(u4349,negated_conjecture,
c3_1(a1935) ).
cnf(u329,axiom,
( ~ sP63(X0)
| ndr1_1(X0) ) ).
cnf(u677,axiom,
( ~ sP2(X0)
| ndr1_1(X0) ) ).
cnf(u268,axiom,
( ~ sP74(X0)
| ~ c2_2(X0,a2008) ) ).
cnf(u4229,negated_conjecture,
c3_1(a1960) ).
cnf(u685,axiom,
( ~ sP0(X0)
| ndr1_1(X0) ) ).
cnf(u304,axiom,
( ~ sP68(X0)
| ~ c2_2(X0,a1992) ) ).
cnf(u267,axiom,
( ~ sP74(X0)
| c3_2(X0,a2008) ) ).
cnf(u639,axiom,
( ~ sP9(X0)
| c6_2(X0,a1855) ) ).
cnf(u681,axiom,
( ~ sP1(X0)
| ndr1_1(X0) ) ).
cnf(u233,axiom,
( ~ sP81(X0)
| ndr1_1(X0) ) ).
cnf(u680,axiom,
( ~ sP2(X0)
| ~ c3_2(X0,a1837) ) ).
cnf(u688,axiom,
( ~ sP0(X0)
| c7_2(X0,a1834) ) ).
cnf(u410,axiom,
( ~ sP48(X0)
| c7_2(X0,a1947) ) ).
cnf(u392,axiom,
( ~ sP52(X0)
| c4_2(X0,a1953) ) ).
cnf(u612,axiom,
( ~ sP13(X0)
| c8_2(X0,a1863) ) ).
cnf(u505,axiom,
( ~ sP30(X0)
| ndr1_1(X0) ) ).
cnf(u614,axiom,
( ~ sP13(X0)
| ~ c1_2(X0,a1863) ) ).
cnf(u389,axiom,
( ~ sP53(X0)
| c1_2(X0,a1956) ) ).
cnf(u407,axiom,
( ~ sP48(X0)
| ndr1_1(X0) ) ).
cnf(u236,axiom,
( ~ sP81(X0)
| ~ c1_2(X0,a2032) ) ).
cnf(u330,axiom,
( ~ sP63(X0)
| c8_2(X0,a1984) ) ).
cnf(u4374,negated_conjecture,
( ~ c3_2(X0,a2018)
| c7_1(X0)
| c10_1(X0)
| c8_1(X0) ) ).
cnf(u687,axiom,
( ~ sP0(X0)
| ~ c3_2(X0,a1834) ) ).
cnf(u4382,negated_conjecture,
( c7_2(X0,a1905)
| c6_1(X0)
| ~ ndr1_1(X0)
| c3_2(X0,a1905)
| sP30(X0) ) ).
cnf(u337,axiom,
( ~ sP61(X0)
| ndr1_1(X0) ) ).
cnf(u338,axiom,
( ~ sP61(X0)
| c1_2(X0,a1980) ) ).
cnf(u683,axiom,
( ~ sP1(X0)
| ~ c4_2(X0,a1836) ) ).
cnf(u4228,negated_conjecture,
c3_1(a1958) ).
cnf(u4263,negated_conjecture,
c10_1(a2014) ).
cnf(u613,axiom,
( ~ sP13(X0)
| ~ c3_2(X0,a1863) ) ).
cnf(u309,axiom,
( ~ sP67(X0)
| c10_2(X0,a1990) ) ).
cnf(u310,axiom,
( ~ sP67(X0)
| ~ c2_2(X0,a1990) ) ).
cnf(u265,axiom,
( ~ sP74(X0)
| ndr1_1(X0) ) ).
cnf(u305,axiom,
( ~ sP68(X0)
| c8_2(X0,a1992) ) ).
cnf(u306,axiom,
( ~ sP68(X0)
| c10_2(X0,a1992) ) ).
cnf(u662,axiom,
( ~ sP5(X0)
| c9_2(X0,a1843) ) ).
cnf(u506,axiom,
( ~ sP30(X0)
| ~ c8_2(X0,a1904) ) ).
cnf(u390,axiom,
( ~ sP53(X0)
| ~ c6_2(X0,a1956) ) ).
cnf(u4227,negated_conjecture,
c3_1(a1924) ).
cnf(u408,axiom,
( ~ sP48(X0)
| c9_2(X0,a1947) ) ).
cnf(u393,axiom,
( ~ sP52(X0)
| c10_2(X0,a1953) ) ).
cnf(u332,axiom,
( ~ sP63(X0)
| c9_2(X0,a1984) ) ).
cnf(u4280,negated_conjecture,
c4_1(a2029) ).
cnf(u663,axiom,
( ~ sP5(X0)
| c7_2(X0,a1843) ) ).
cnf(u331,axiom,
( ~ sP63(X0)
| ~ c10_2(X0,a1984) ) ).
cnf(u340,axiom,
( ~ sP61(X0)
| c4_2(X0,a1980) ) ).
cnf(u661,axiom,
( ~ sP5(X0)
| ndr1_1(X0) ) ).
cnf(u638,axiom,
( ~ sP9(X0)
| c1_2(X0,a1855) ) ).
cnf(u544,axiom,
( ~ sP24(X0)
| ~ c6_2(X0,a1888) ) ).
cnf(u4448,negated_conjecture,
c3_1(a1917) ).
cnf(u4222,negated_conjecture,
~ c3_1(a2006) ).
cnf(u266,axiom,
( ~ sP74(X0)
| ~ c5_2(X0,a2008) ) ).
cnf(u4231,negated_conjecture,
c3_1(a1998) ).
cnf(u339,axiom,
( ~ sP61(X0)
| c7_2(X0,a1980) ) ).
cnf(u611,axiom,
( ~ sP13(X0)
| ndr1_1(X0) ) ).
cnf(u546,axiom,
( ~ sP24(X0)
| ~ c7_2(X0,a1888) ) ).
cnf(u4253,negated_conjecture,
~ c3_1(a1939) ).
cnf(u4230,negated_conjecture,
c3_1(a1988) ).
cnf(u235,axiom,
( ~ sP81(X0)
| c7_2(X0,a2032) ) ).
cnf(u303,axiom,
( ~ sP68(X0)
| ndr1_1(X0) ) ).
cnf(u664,axiom,
( ~ sP5(X0)
| ~ c3_2(X0,a1843) ) ).
cnf(u308,axiom,
( ~ sP67(X0)
| ~ c5_2(X0,a1990) ) ).
cnf(u543,axiom,
( ~ sP24(X0)
| ndr1_1(X0) ) ).
cnf(u4274,negated_conjecture,
c4_1(a2014) ).
cnf(u307,axiom,
( ~ sP67(X0)
| ndr1_1(X0) ) ).
cnf(u637,axiom,
( ~ sP9(X0)
| c10_2(X0,a1855) ) ).
cnf(u508,axiom,
( ~ sP30(X0)
| c10_2(X0,a1904) ) ).
cnf(u678,axiom,
( ~ sP2(X0)
| c7_2(X0,a1837) ) ).
cnf(u684,axiom,
( ~ sP1(X0)
| c6_2(X0,a1836) ) ).
cnf(u394,axiom,
( ~ sP52(X0)
| ~ c6_2(X0,a1953) ) ).
cnf(u545,axiom,
( ~ sP24(X0)
| ~ c5_2(X0,a1888) ) ).
cnf(u507,axiom,
( ~ sP30(X0)
| ~ c7_2(X0,a1904) ) ).
cnf(u388,axiom,
( ~ sP53(X0)
| c8_2(X0,a1956) ) ).
cnf(u636,axiom,
( ~ sP9(X0)
| ndr1_1(X0) ) ).
cnf(u686,axiom,
( ~ sP0(X0)
| ~ c9_2(X0,a1834) ) ).
cnf(u391,axiom,
( ~ sP52(X0)
| ndr1_1(X0) ) ).
cnf(u4226,negated_conjecture,
c3_1(a1876) ).
cnf(u682,axiom,
( ~ sP1(X0)
| c1_2(X0,a1836) ) ).
cnf(u387,axiom,
( ~ sP53(X0)
| ndr1_1(X0) ) ).
cnf(u234,axiom,
( ~ sP81(X0)
| c2_2(X0,a2032) ) ).
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.06/0.12 % Problem : SYN428+1 : TPTP v8.1.2. Released v2.1.0.
% 0.06/0.14 % Command : vampire --mode casc_sat -m 16384 --cores 7 -t %d %s
% 0.13/0.35 % Computer : n022.cluster.edu
% 0.13/0.35 % Model : x86_64 x86_64
% 0.13/0.35 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.13/0.35 % Memory : 8042.1875MB
% 0.13/0.35 % OS : Linux 3.10.0-693.el7.x86_64
% 0.13/0.35 % CPULimit : 300
% 0.13/0.35 % WCLimit : 300
% 0.13/0.35 % DateTime : Fri May 3 17:53:53 EDT 2024
% 0.13/0.35 % CPUTime :
% 0.13/0.35 % (31679)Running in auto input_syntax mode. Trying TPTP
% 0.13/0.38 % (31685)dis+11_4:5_nm=4_216 on theBenchmark for (216ds/0Mi)
% 0.13/0.38 % (31680)fmb+10_1_fmbas=off:fmbsr=1.3:nm=2_1451 on theBenchmark for (1451ds/0Mi)
% 0.13/0.38 % (31686)fmb+10_1_fmbas=off:fmbsr=1.3:nm=2:si=on:rtra=on:rawr=on:rp=on:fmbksg=on_1451 on theBenchmark for (1451ds/0Mi)
% 0.13/0.38 % (31683)fmb+10_1_bce=on:fmbas=expand:fmbksg=on:fmbsr=1.3:gsp=on:nm=4_470 on theBenchmark for (470ds/0Mi)
% 0.13/0.38 % (31681)fmb+10_1_bce=on:fmbas=expand:fmbksg=on:fmbsr=1.3_569 on theBenchmark for (569ds/0Mi)
% 0.13/0.38 % (31682)dis-2_2:3_amm=sco:anc=none:bce=on:fsr=off:gsp=on:nm=16:nwc=1.2:nicw=on:sac=on:sp=weighted_frequency_476 on theBenchmark for (476ds/0Mi)
% 0.13/0.38 % (31684)dis+1_20_av=off:lcm=predicate:nm=2:nwc=2.0_396 on theBenchmark for (396ds/0Mi)
% 0.13/0.40 Detected minimum model sizes of [1]
% 0.13/0.40 Detected maximum model sizes of [199]
% 0.13/0.40 TRYING [1]
% 0.13/0.40 Detected minimum model sizes of [1]
% 0.20/0.40 Detected maximum model sizes of [199]
% 0.20/0.40 TRYING [1]
% 0.20/0.41 TRYING [2]
% 0.20/0.41 % (31685)First to succeed.
% 0.20/0.41 TRYING [2]
% 0.20/0.41 % (31685)Solution written to "/export/starexec/sandbox/tmp/vampire-proof-31679"
% 0.20/0.41 % SZS status CounterSatisfiable for theBenchmark
% 0.20/0.41 % (31685)# SZS output start Saturation.
% See solution above
% 0.20/0.41 % (31685)------------------------------
% 0.20/0.41 % (31685)Version: Vampire 4.8 (commit 3a798227e on 2024-05-03 07:42:47 +0200)
% 0.20/0.41 % (31685)Termination reason: Satisfiable
% 0.20/0.41
% 0.20/0.41 % (31685)Memory used [KB]: 2904
% 0.20/0.41 % (31685)Time elapsed: 0.030 s
% 0.20/0.41 % (31685)Instructions burned: 51 (million)
% 0.20/0.41 % (31679)Success in time 0.048 s
%------------------------------------------------------------------------------