TSTP Solution File: SEU090+1 by nanoCoP---2.0
View Problem
- Process Solution
%------------------------------------------------------------------------------
% File : nanoCoP---2.0
% Problem : SEU090+1 : TPTP v8.1.2. Released v3.2.0.
% Transfm : none
% Format : tptp:raw
% Command : nanocop.sh %s %d
% Computer : n003.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 19 12:02:11 EDT 2023
% Result : Theorem 44.92s 43.92s
% Output : Proof 44.92s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.04/0.12 % Problem : SEU090+1 : TPTP v8.1.2. Released v3.2.0.
% 0.04/0.13 % Command : nanocop.sh %s %d
% 0.12/0.34 % Computer : n003.cluster.edu
% 0.12/0.34 % Model : x86_64 x86_64
% 0.12/0.34 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.12/0.34 % Memory : 8042.1875MB
% 0.12/0.34 % OS : Linux 3.10.0-693.el7.x86_64
% 0.12/0.34 % CPULimit : 300
% 0.12/0.34 % WCLimit : 300
% 0.12/0.34 % DateTime : Thu May 18 12:57:15 EDT 2023
% 0.12/0.34 % CPUTime :
% 44.92/43.92
% 44.92/43.92 /export/starexec/sandbox/benchmark/theBenchmark.p is a Theorem
% 44.92/43.92 Start of proof for /export/starexec/sandbox/benchmark/theBenchmark.p
% 44.92/43.92 %-----------------------------------------------------
% 44.92/43.92 ncf(matrix, plain, [(798 ^ _151196) ^ [] : [-(finite(793 ^ []))], (802 ^ _151196) ^ [] : [-(finite(795 ^ []))], (806 ^ _151196) ^ [] : [finite(cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ []))], (804 ^ _151196) ^ [] : [-(finite(796 ^ []))], (800 ^ _151196) ^ [] : [-(finite(794 ^ []))], !, (678 ^ _125526) ^ [] : [-(relation(676 ^ []))], (574 ^ _125526) ^ [_143655] : [-(function(566 ^ [_143655]))], (80 ^ _125526) ^ [_128044, _128046] : [-(epsilon_connected(_128044)), _128046 = _128044, epsilon_connected(_128046)], (512 ^ _125526) ^ [] : [-(relation(510 ^ []))], (130 ^ _125526) ^ [_129519, _129521] : [-(relation_non_empty(_129519)), _129521 = _129519, relation_non_empty(_129521)], (40 ^ _125526) ^ [_126864, _126866] : [-(ordinal_yielding(_126864)), _126866 = _126864, ordinal_yielding(_126866)], (608 ^ _125526) ^ [] : [-(ordinal(594 ^ []))], (222 ^ _125526) ^ [_132498, _132500, _132502, _132504, _132506, _132508] : [-(cartesian_product3(_132508, _132504, _132500) = cartesian_product3(_132506, _132502, _132498)), _132508 = _132506, _132504 = _132502, _132500 = _132498], (635 ^ _125526) ^ [] : [-(empty(631 ^ []))], (572 ^ _125526) ^ [_143587] : [-(relation(566 ^ [_143587]))], (559 ^ _125526) ^ [] : [empty(555 ^ [])], (90 ^ _125526) ^ [_128339, _128341] : [-(ordinal(_128339)), _128341 = _128339, ordinal(_128341)], (20 ^ _125526) ^ [_126274, _126276] : [-(function_yielding(_126274)), _126276 = _126274, function_yielding(_126276)], (437 ^ _125526) ^ [] : [-(one_to_one(empty_set))], (431 ^ _125526) ^ [] : [-(relation(empty_set))], (202 ^ _125526) ^ [_131716, _131718] : [-(finite(_131716)), _131718 = _131716, finite(_131718)], (600 ^ _125526) ^ [] : [-(one_to_one(594 ^ []))], (611 ^ _125526) ^ [] : [-(relation(609 ^ []))], (666 ^ _125526) ^ [] : [-(epsilon_transitive(662 ^ []))], (576 ^ _125526) ^ [_143723] : [-(one_to_one(566 ^ [_143723]))], (659 ^ _125526) ^ [] : [-(function(655 ^ []))], (630 ^ _125526) ^ [] : [empty(628 ^ [])], (772 ^ _125526) ^ [_149962] : [empty(_149962), -(_149962 = empty_set)], (447 ^ _125526) ^ [] : [-(empty(empty_set))], (586 ^ _125526) ^ [_144043] : [-(finite(566 ^ [_144043]))], (617 ^ _125526) ^ [] : [-(ordinal_yielding(609 ^ []))], (413 ^ _125526) ^ [_138737, _138739, _138741] : [-(finite(cartesian_product3(_138741, _138739, _138737))), finite(_138741), finite(_138739), finite(_138737)], (338 ^ _125526) ^ [_136416] : [349 ^ _125526 : [(354 ^ _125526) ^ [] : [-(one_to_one(_136416))], (352 ^ _125526) ^ [] : [-(function(_136416))], (350 ^ _125526) ^ [] : [-(relation(_136416))]], relation(_136416), empty(_136416), function(_136416)], (521 ^ _125526) ^ [] : [-(function(517 ^ []))], (661 ^ _125526) ^ [] : [-(one_to_one(655 ^ []))], (356 ^ _125526) ^ [_136909] : [-(ordinal(_136909)), epsilon_transitive(_136909), epsilon_connected(_136909)], (584 ^ _125526) ^ [_143995] : [-(natural(566 ^ [_143995]))], (150 ^ _125526) ^ [_130137, _130139, _130141, _130143] : [-(subset(_130141, _130137)), subset(_130143, _130139), _130143 = _130141, _130139 = _130137], (120 ^ _125526) ^ [_129224, _129226] : [-(relation(_129224)), _129226 = _129224, relation(_129226)], (596 ^ _125526) ^ [] : [-(relation(594 ^ []))], (565 ^ _125526) ^ [] : [-(ordinal(555 ^ []))], (633 ^ _125526) ^ [] : [-(element(631 ^ [], positive_rationals))], (657 ^ _125526) ^ [] : [-(relation(655 ^ []))], (50 ^ _125526) ^ [_127159, _127161] : [-(natural(_127159)), _127161 = _127159, natural(_127161)], (598 ^ _125526) ^ [] : [-(function(594 ^ []))], (366 ^ _125526) ^ [_137178] : [empty(_137178), 369 ^ _125526 : [(374 ^ _125526) ^ [] : [-(ordinal(_137178))], (372 ^ _125526) ^ [] : [-(epsilon_connected(_137178))], (370 ^ _125526) ^ [] : [-(epsilon_transitive(_137178))]]], (164 ^ _125526) ^ [_130581, _130583, _130585, _130587] : [-(element(_130585, _130581)), element(_130587, _130583), _130587 = _130585, _130583 = _130581], (580 ^ _125526) ^ [_143859] : [-(epsilon_connected(566 ^ [_143859]))], (682 ^ _125526) ^ [] : [-(function(676 ^ []))], (710 ^ _125526) ^ [_147990, _147992] : [in(_147992, _147990), -(element(_147992, _147990))], (582 ^ _125526) ^ [_143927] : [-(ordinal(566 ^ [_143927]))], (606 ^ _125526) ^ [] : [-(epsilon_connected(594 ^ []))], (500 ^ _125526) ^ [] : [-(epsilon_connected(494 ^ []))], (266 ^ _125526) ^ [_134060] : [ordinal(_134060), 269 ^ _125526 : [(270 ^ _125526) ^ [_134200] : [element(_134200, _134060), 273 ^ _125526 : [(278 ^ _125526) ^ [] : [-(ordinal(_134200))], (276 ^ _125526) ^ [] : [-(epsilon_connected(_134200))], (274 ^ _125526) ^ [] : [-(epsilon_transitive(_134200))]]]]], (178 ^ _125526) ^ [_131025, _131027, _131029, _131031] : [-(in(_131029, _131025)), in(_131031, _131027), _131031 = _131029, _131027 = _131025], (502 ^ _125526) ^ [] : [-(ordinal(494 ^ []))], (516 ^ _125526) ^ [] : [-(function_yielding(510 ^ []))], (300 ^ _125526) ^ [_135175] : [empty(_135175), -(relation(_135175))], (392 ^ _125526) ^ [_138014, _138016, _138018, _138020] : [-(cartesian_product4(_138020, _138018, _138016, _138014) = cartesian_product2(cartesian_product3(_138020, _138018, _138016), _138014))], (625 ^ _125526) ^ [_145286] : [-(element(623 ^ [_145286], powerset(_145286)))], (399 ^ _125526) ^ [] : [-(relation(empty_set))], (242 ^ _125526) ^ [_133240, _133242, _133244, _133246, _133248, _133250, _133252, _133254] : [-(cartesian_product4(_133254, _133250, _133246, _133242) = cartesian_product4(_133252, _133248, _133244, _133240)), _133254 = _133252, _133250 = _133248, _133246 = _133244, _133242 = _133240], (554 ^ _125526) ^ [] : [-(empty(552 ^ []))], (519 ^ _125526) ^ [] : [-(relation(517 ^ []))], (563 ^ _125526) ^ [] : [-(epsilon_connected(555 ^ []))], (627 ^ _125526) ^ [_145337] : [-(empty(623 ^ [_145337]))], (435 ^ _125526) ^ [] : [-(function(empty_set))], (496 ^ _125526) ^ [] : [empty(494 ^ [])], (292 ^ _125526) ^ [_134918] : [ordinal(_134918), 295 ^ _125526 : [(298 ^ _125526) ^ [] : [-(epsilon_connected(_134918))], (296 ^ _125526) ^ [] : [-(epsilon_transitive(_134918))]]], (433 ^ _125526) ^ [] : [-(relation_empty_yielding(empty_set))], (526 ^ _125526) ^ [] : [-(epsilon_connected(522 ^ []))], (716 ^ _125526) ^ [_148214, _148216, _148218] : [-(finite(cartesian_product3(_148218, _148216, _148214))), finite(_148218), finite(_148216), finite(_148214)], (140 ^ _125526) ^ [_129814, _129816] : [-(function(_129814)), _129816 = _129814, function(_129816)], (687 ^ _125526) ^ [] : [-(function(683 ^ []))], (70 ^ _125526) ^ [_127749, _127751] : [-(epsilon_transitive(_127749)), _127751 = _127749, epsilon_transitive(_127751)], (328 ^ _125526) ^ [_136079] : [finite(_136079), 331 ^ _125526 : [(332 ^ _125526) ^ [_136211] : [element(_136211, powerset(_136079)), -(finite(_136211))]]], (752 ^ _125526) ^ [_149339, _149341, _149343] : [-(element(_149343, _149339)), in(_149343, _149341), element(_149341, powerset(_149339))], (236 ^ _125526) ^ [_132958, _132960] : [_132960 = _132958, -(powerset(_132960) = powerset(_132958))], (639 ^ _125526) ^ [] : [-(epsilon_connected(631 ^ []))], (192 ^ _125526) ^ [_131441, _131443] : [-(empty(_131441)), _131443 = _131441, empty(_131443)], (540 ^ _125526) ^ [] : [-(empty(538 ^ []))], (680 ^ _125526) ^ [] : [-(relation_empty_yielding(676 ^ []))], (461 ^ _125526) ^ [_140136, _140138, _140140] : [empty(cartesian_product3(_140140, _140138, _140136)), -(empty(_140140)), -(empty(_140138)), -(empty(_140136))], (740 ^ _125526) ^ [_148943, _148945] : [element(_148945, powerset(_148943)), -(subset(_148945, _148943))], (778 ^ _125526) ^ [_150164, _150166] : [in(_150166, _150164), empty(_150164)], (698 ^ _125526) ^ [_147582, _147584] : [-(subset(_147584, _147584))], (593 ^ _125526) ^ [] : [-(function(587 ^ []))], (507 ^ _125526) ^ [] : [empty(505 ^ [])], (589 ^ _125526) ^ [] : [-(relation(587 ^ []))], (535 ^ _125526) ^ [] : [-(ordinal(529 ^ []))], (451 ^ _125526) ^ [_139816, _139818] : [empty(cartesian_product2(_139818, _139816)), -(empty(_139818)), -(empty(_139816))], (10 ^ _125526) ^ [_125961, _125963, _125965] : [-(_125965 = _125961), _125965 = _125963, _125963 = _125961], (2 ^ _125526) ^ [_125650] : [-(_125650 = _125650)], (613 ^ _125526) ^ [] : [-(function(609 ^ []))], (746 ^ _125526) ^ [_149109, _149111] : [subset(_149111, _149109), -(element(_149111, powerset(_149109)))], (498 ^ _125526) ^ [] : [-(epsilon_transitive(494 ^ []))], (312 ^ _125526) ^ [_135599] : [319 ^ _125526 : [(322 ^ _125526) ^ [] : [-(epsilon_connected(_135599))], (324 ^ _125526) ^ [] : [-(ordinal(_135599))], (326 ^ _125526) ^ [] : [-(natural(_135599))], (320 ^ _125526) ^ [] : [-(epsilon_transitive(_135599))]], empty(_135599), ordinal(_135599)], (30 ^ _125526) ^ [_126569, _126571] : [-(being_limit_ordinal(_126569)), _126571 = _126569, being_limit_ordinal(_126571)], (591 ^ _125526) ^ [] : [-(empty(587 ^ []))], (692 ^ _125526) ^ [] : [-(relation(690 ^ []))], (557 ^ _125526) ^ [] : [-(element(555 ^ [], positive_rationals))], (475 ^ _125526) ^ [_140576, _140578, _140580, _140582] : [empty(cartesian_product4(_140582, _140580, _140578, _140576)), -(empty(_140582)), -(empty(_140580)), -(empty(_140578)), -(empty(_140576))], (578 ^ _125526) ^ [_143791] : [-(epsilon_transitive(566 ^ [_143791]))], (531 ^ _125526) ^ [] : [-(epsilon_transitive(529 ^ []))], (664 ^ _125526) ^ [] : [empty(662 ^ [])], (641 ^ _125526) ^ [] : [-(ordinal(631 ^ []))], (570 ^ _125526) ^ [_143519] : [-(empty(566 ^ [_143519]))], (673 ^ _125526) ^ [] : [-(relation(671 ^ []))], (537 ^ _125526) ^ [] : [-(being_limit_ordinal(529 ^ []))], (514 ^ _125526) ^ [] : [-(function(510 ^ []))], (730 ^ _125526) ^ [_148616, _148618] : [element(_148618, _148616), -(empty(_148616)), -(in(_148618, _148616))], (645 ^ _125526) ^ [_145916] : [-(empty(_145916)), 649 ^ _125526 : [(654 ^ _125526) ^ [] : [-(finite(648 ^ [_145916]))], (652 ^ _125526) ^ [] : [empty(648 ^ [_145916])], (650 ^ _125526) ^ [] : [-(element(648 ^ [_145916], powerset(_145916)))]]], (524 ^ _125526) ^ [] : [-(epsilon_transitive(522 ^ []))], (670 ^ _125526) ^ [] : [-(ordinal(662 ^ []))], (397 ^ _125526) ^ [] : [-(empty(empty_set))], (637 ^ _125526) ^ [] : [-(epsilon_transitive(631 ^ []))], (403 ^ _125526) ^ [_138424, _138426] : [-(finite(cartesian_product2(_138426, _138424))), finite(_138426), finite(_138424)], (376 ^ _125526) ^ [_137505] : [element(_137505, positive_rationals), ordinal(_137505), 383 ^ _125526 : [(386 ^ _125526) ^ [] : [-(epsilon_connected(_137505))], (388 ^ _125526) ^ [] : [-(ordinal(_137505))], (390 ^ _125526) ^ [] : [-(natural(_137505))], (384 ^ _125526) ^ [] : [-(epsilon_transitive(_137505))]]], (443 ^ _125526) ^ [] : [-(epsilon_connected(empty_set))], (675 ^ _125526) ^ [] : [-(relation_empty_yielding(671 ^ []))], (212 ^ _125526) ^ [_132111, _132113, _132115, _132117] : [-(cartesian_product2(_132117, _132113) = cartesian_product2(_132115, _132111)), _132117 = _132115, _132113 = _132111], (700 ^ _125526) ^ [_147691, _147693] : [-(finite(cartesian_product2(_147693, _147691))), finite(_147693), finite(_147691)], (694 ^ _125526) ^ [] : [-(relation_non_empty(690 ^ []))], (401 ^ _125526) ^ [] : [-(relation_empty_yielding(empty_set))], (395 ^ _125526) ^ [_138149] : [-(element(393 ^ [_138149], _138149))], (439 ^ _125526) ^ [] : [-(empty(empty_set))], (493 ^ _125526) ^ [] : [empty(positive_rationals)], (620 ^ _125526) ^ [] : [empty(618 ^ [])], (427 ^ _125526) ^ [_139109] : [empty(powerset(_139109))], (602 ^ _125526) ^ [] : [-(empty(594 ^ []))], (784 ^ _125526) ^ [_150351, _150353] : [empty(_150353), -(_150353 = _150351), empty(_150351)], (504 ^ _125526) ^ [] : [-(natural(494 ^ []))], (762 ^ _125526) ^ [_149666, _149668, _149670] : [in(_149670, _149668), element(_149668, powerset(_149666)), empty(_149666)], (561 ^ _125526) ^ [] : [-(epsilon_transitive(555 ^ []))], (533 ^ _125526) ^ [] : [-(epsilon_connected(529 ^ []))], (4 ^ _125526) ^ [_125757, _125759] : [_125759 = _125757, -(_125757 = _125759)], (429 ^ _125526) ^ [] : [-(empty(empty_set))], (689 ^ _125526) ^ [] : [-(transfinite_sequence(683 ^ []))], (449 ^ _125526) ^ [] : [-(relation(empty_set))], (260 ^ _125526) ^ [_133863, _133865] : [in(_133865, _133863), in(_133863, _133865)], (568 ^ _125526) ^ [_143448] : [-(element(566 ^ [_143448], powerset(_143448)))], (280 ^ _125526) ^ [_134546] : [empty(_134546), -(finite(_134546))], (100 ^ _125526) ^ [_128634, _128636] : [-(relation_empty_yielding(_128634)), _128636 = _128634, relation_empty_yielding(_128636)], (622 ^ _125526) ^ [] : [-(relation(618 ^ []))], (615 ^ _125526) ^ [] : [-(transfinite_sequence(609 ^ []))], (685 ^ _125526) ^ [] : [-(relation(683 ^ []))], (528 ^ _125526) ^ [] : [-(ordinal(522 ^ []))], (60 ^ _125526) ^ [_127454, _127456] : [-(one_to_one(_127454)), _127456 = _127454, one_to_one(_127456)], (643 ^ _125526) ^ [] : [-(natural(631 ^ []))], (441 ^ _125526) ^ [] : [-(epsilon_transitive(empty_set))], (696 ^ _125526) ^ [] : [-(function(690 ^ []))], (445 ^ _125526) ^ [] : [-(ordinal(empty_set))], (306 ^ _125526) ^ [_135389, _135391, _135393] : [element(_135389, powerset(cartesian_product2(_135393, _135391))), -(relation(_135389))], (668 ^ _125526) ^ [] : [-(epsilon_connected(662 ^ []))], (604 ^ _125526) ^ [] : [-(epsilon_transitive(594 ^ []))], (286 ^ _125526) ^ [_134732] : [empty(_134732), -(function(_134732))], (544 ^ _125526) ^ [_142605] : [-(empty(_142605)), 548 ^ _125526 : [(551 ^ _125526) ^ [] : [empty(547 ^ [_142605])], (549 ^ _125526) ^ [] : [-(element(547 ^ [_142605], powerset(_142605)))]]], (542 ^ _125526) ^ [] : [-(relation(538 ^ []))], (509 ^ _125526) ^ [] : [-(finite(505 ^ []))], (110 ^ _125526) ^ [_128929, _128931] : [-(transfinite_sequence(_128929)), _128931 = _128929, transfinite_sequence(_128931)]], input).
% 44.92/43.92 ncf('1',plain,[finite(cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ []))],start(806 ^ 0)).
% 44.92/43.92 ncf('1.1',plain,[-(finite(cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ []))), 332 : element(cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ []), powerset(cartesian_product2(cartesian_product3(793 ^ [], 794 ^ [], 795 ^ []), 796 ^ []))), 332 : finite(cartesian_product2(cartesian_product3(793 ^ [], 794 ^ [], 795 ^ []), 796 ^ []))],extension(328 ^ 1,bind([[_136079, _136211], [cartesian_product2(cartesian_product3(793 ^ [], 794 ^ [], 795 ^ []), 796 ^ []), cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ [])]]))).
% 44.92/43.92 ncf('1.1.1',plain,[-(element(cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ []), powerset(cartesian_product2(cartesian_product3(793 ^ [], 794 ^ [], 795 ^ []), 796 ^ [])))), subset(cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ []), cartesian_product2(cartesian_product3(793 ^ [], 794 ^ [], 795 ^ []), 796 ^ []))],extension(746 ^ 4,bind([[_149109, _149111], [cartesian_product2(cartesian_product3(793 ^ [], 794 ^ [], 795 ^ []), 796 ^ []), cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ [])]]))).
% 44.92/43.92 ncf('1.1.1.1',plain,[-(subset(cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ []), cartesian_product2(cartesian_product3(793 ^ [], 794 ^ [], 795 ^ []), 796 ^ []))), subset(cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ []), cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ [])), cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ []) = cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ []), cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ []) = cartesian_product2(cartesian_product3(793 ^ [], 794 ^ [], 795 ^ []), 796 ^ [])],extension(150 ^ 5,bind([[_130137, _130139, _130141, _130143], [cartesian_product2(cartesian_product3(793 ^ [], 794 ^ [], 795 ^ []), 796 ^ []), cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ []), cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ []), cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ [])]]))).
% 44.92/43.92 ncf('1.1.1.1.1',plain,[-(subset(cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ []), cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ [])))],extension(698 ^ 6,bind([[_147582, _147584], [_94343, cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ [])]]))).
% 44.92/43.92 ncf('1.1.1.1.2',plain,[-(cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ []) = cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ []))],extension(2 ^ 6,bind([[_125650], [cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ [])]]))).
% 44.92/43.92 ncf('1.1.1.1.3',plain,[-(cartesian_product4(793 ^ [], 794 ^ [], 795 ^ [], 796 ^ []) = cartesian_product2(cartesian_product3(793 ^ [], 794 ^ [], 795 ^ []), 796 ^ []))],extension(392 ^ 6,bind([[_138014, _138016, _138018, _138020], [796 ^ [], 795 ^ [], 794 ^ [], 793 ^ []]]))).
% 44.92/43.92 ncf('1.1.2',plain,[-(finite(cartesian_product2(cartesian_product3(793 ^ [], 794 ^ [], 795 ^ []), 796 ^ []))), finite(cartesian_product3(793 ^ [], 794 ^ [], 795 ^ [])), finite(796 ^ [])],extension(403 ^ 2,bind([[_138424, _138426], [796 ^ [], cartesian_product3(793 ^ [], 794 ^ [], 795 ^ [])]]))).
% 44.92/43.92 ncf('1.1.2.1',plain,[-(finite(cartesian_product3(793 ^ [], 794 ^ [], 795 ^ []))), finite(793 ^ []), finite(794 ^ []), finite(795 ^ [])],extension(413 ^ 3,bind([[_138737, _138739, _138741], [795 ^ [], 794 ^ [], 793 ^ []]]))).
% 44.92/43.92 ncf('1.1.2.1.1',plain,[-(finite(793 ^ []))],extension(798 ^ 4)).
% 44.92/43.92 ncf('1.1.2.1.2',plain,[-(finite(794 ^ []))],extension(800 ^ 4)).
% 44.92/43.92 ncf('1.1.2.1.3',plain,[-(finite(795 ^ []))],extension(802 ^ 4)).
% 44.92/43.92 ncf('1.1.2.2',plain,[-(finite(796 ^ []))],extension(804 ^ 3)).
% 44.92/43.92 %-----------------------------------------------------
% 44.92/43.92 End of proof for /export/starexec/sandbox/benchmark/theBenchmark.p
%------------------------------------------------------------------------------