0.11/0.12	% Problem    : SLH327^1 : TPTP v7.5.0. Released v7.5.0.
0.11/0.13	% Command    : run_E %s %d THM
0.14/0.34	% Computer : n028.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   : 30
0.14/0.34	% WCLimit    : 30
0.14/0.34	% DateTime   : Tue Aug  9 02:55:50 EDT 2022
0.14/0.34	% CPUTime    : 
0.20/0.47	The problem SPC is TH0_THM_EQU_NAR
0.20/0.48	Running higher-order on 1 cores theorem proving
0.20/0.48	Running: /export/starexec/sandbox2/solver/bin/eprover-ho --delete-bad-limit=2000000000 --definitional-cnf=24 -s --print-statistics -R --print-version --proof-object --auto-schedule=1 --cpu-limit=30 /export/starexec/sandbox2/benchmark/theBenchmark.p
0.20/0.48	# Version: 3.0pre003-ho
0.40/0.58	# Preprocessing class: HSLSSMSMSSMNHSA.
0.40/0.58	# Scheduled 1 strats onto 1 cores with 30 seconds (30 total)
0.40/0.58	# Starting ehoh_best2 with 30s (1) cores
0.40/0.58	# ehoh_best2 with pid 14578 completed with status 0
0.40/0.58	# Result found by ehoh_best2
0.40/0.58	# Preprocessing class: HSLSSMSMSSMNHSA.
0.40/0.58	# Scheduled 1 strats onto 1 cores with 30 seconds (30 total)
0.40/0.58	# Starting ehoh_best2 with 30s (1) cores
0.40/0.58	# No SInE strategy applied
0.40/0.58	# Search class: HGHSM-FSLM31-MHSFFSBN
0.40/0.58	# Scheduled 5 strats onto 1 cores with 30 seconds (30 total)
0.40/0.58	# Starting almost_fo_1 with 17s (1) cores
0.40/0.58	# almost_fo_1 with pid 14580 completed with status 0
0.40/0.58	# Result found by almost_fo_1
0.40/0.58	# Preprocessing class: HSLSSMSMSSMNHSA.
0.40/0.58	# Scheduled 1 strats onto 1 cores with 30 seconds (30 total)
0.40/0.58	# Starting ehoh_best2 with 30s (1) cores
0.40/0.58	# No SInE strategy applied
0.40/0.58	# Search class: HGHSM-FSLM31-MHSFFSBN
0.40/0.58	# Scheduled 5 strats onto 1 cores with 30 seconds (30 total)
0.40/0.58	# Starting almost_fo_1 with 17s (1) cores
0.40/0.58	# Preprocessing time       : 0.009 s
0.40/0.58	# Presaturation interreduction done
0.40/0.58	
0.40/0.58	# Proof found!
0.40/0.58	# SZS status Theorem
0.40/0.58	# SZS output start CNFRefutation
0.40/0.58	thf(decl_22, type, elemen341675809l_real: real > real > set_real).
0.40/0.58	thf(decl_23, type, elemen154694473ball_a: a > real > set_a).
0.40/0.58	thf(decl_24, type, elemen848264715dist_a: a > set_a > real).
0.40/0.58	thf(decl_25, type, elemen1197740850pact_a: set_a > $o).
0.40/0.58	thf(decl_26, type, auto_l612940ivl0_a: (a > a) > set_a > a > set_real).
0.40/0.58	thf(decl_27, type, auto_ll_on_flow0_a: (a > a) > set_a > a > real > a).
0.40/0.58	thf(decl_28, type, comp_nat_nat_nat: (nat > nat) > (nat > nat) > nat > nat).
0.40/0.58	thf(decl_29, type, comp_nat_a_nat: (nat > a) > (nat > nat) > nat > a).
0.40/0.58	thf(decl_30, type, comp_nat_a_real: (nat > a) > (real > nat) > real > a).
0.40/0.58	thf(decl_31, type, comp_real_real_real: (real > real) > (real > real) > real > real).
0.40/0.58	thf(decl_32, type, comp_real_a_real: (real > a) > (real > real) > real > a).
0.40/0.58	thf(decl_33, type, comp_a_real_real: (a > real) > (real > a) > real > real).
0.40/0.58	thf(decl_34, type, comp_a_a_nat: (a > a) > (nat > a) > nat > a).
0.40/0.58	thf(decl_35, type, comp_a_a_real: (a > a) > (real > a) > real > a).
0.40/0.58	thf(decl_36, type, abs_abs_real: real > real).
0.40/0.58	thf(decl_37, type, one_one_real: real).
0.40/0.58	thf(decl_38, type, plus_plus_real: real > real > real).
0.40/0.58	thf(decl_39, type, plus_plus_a: a > a > a).
0.40/0.58	thf(decl_40, type, uminus_uminus_a_a: (a > a) > a > a).
0.40/0.58	thf(decl_41, type, uminus_uminus_real: real > real).
0.40/0.58	thf(decl_42, type, zero_zero_real: real).
0.40/0.58	thf(decl_43, type, zero_zero_a: a).
0.40/0.58	thf(decl_44, type, initia826609931terval: set_real > $o).
0.40/0.58	thf(decl_45, type, auto_l630715367iant_a: (a > a) > set_a > set_a > $o).
0.40/0.58	thf(decl_46, type, inf_inf_set_real: set_real > set_real > set_real).
0.40/0.58	thf(decl_47, type, inf_inf_set_a: set_a > set_a > set_a).
0.40/0.58	thf(decl_48, type, limit_2033113720_set_a: (a > a) > set_a > a > set_a).
0.40/0.58	thf(decl_49, type, line_o609262147t_real: real > real > set_real).
0.40/0.58	thf(decl_50, type, line_open_segment_a: a > a > set_a).
0.40/0.58	thf(decl_51, type, oDE_au1996717075pped_a: (a > a) > set_a > a > set_a > $o).
0.40/0.58	thf(decl_52, type, bot_bot_set_real: set_real).
0.40/0.58	thf(decl_53, type, bot_bot_set_a: set_a).
0.40/0.58	thf(decl_54, type, ord_less_real: real > real > $o).
0.40/0.58	thf(decl_55, type, ord_less_eq_set_a: set_a > set_a > $o).
0.40/0.58	thf(decl_56, type, order_769474267at_nat: (nat > nat) > $o).
0.40/0.58	thf(decl_57, type, top_top_set_real: set_real).
0.40/0.58	thf(decl_58, type, top_top_set_a: set_a).
0.40/0.58	thf(decl_59, type, period720806154rbit_a: (a > a) > set_a > a > $o).
0.40/0.58	thf(decl_60, type, period1305449585riod_a: (a > a) > set_a > a > real).
0.40/0.58	thf(decl_61, type, period138238489rbit_a: (a > a) > set_a > a > $o).
0.40/0.58	thf(decl_62, type, poinca522724647ment_a: (a > a) > set_a > a > a > $o).
0.40/0.58	thf(decl_63, type, collect_real: (real > $o) > set_real).
0.40/0.58	thf(decl_64, type, collect_a: (a > $o) > set_a).
0.40/0.58	thf(decl_65, type, image_nat_nat: (nat > nat) > set_nat > set_nat).
0.40/0.58	thf(decl_66, type, image_nat_a: (nat > a) > set_nat > set_a).
0.40/0.58	thf(decl_67, type, image_real_nat: (real > nat) > set_real > set_nat).
0.40/0.58	thf(decl_68, type, image_real_real: (real > real) > set_real > set_real).
0.40/0.58	thf(decl_69, type, image_real_a: (real > a) > set_real > set_a).
0.40/0.58	thf(decl_70, type, image_a_real: (a > real) > set_a > set_real).
0.40/0.58	thf(decl_71, type, image_a_a: (a > a) > set_a > set_a).
0.40/0.58	thf(decl_72, type, insert_real: real > set_real > set_real).
0.40/0.58	thf(decl_73, type, insert_a: a > set_a > set_a).
0.40/0.58	thf(decl_74, type, topolo1710226732a_real: set_a > (a > real) > $o).
0.40/0.58	thf(decl_75, type, member_real: real > set_real > $o).
0.40/0.58	thf(decl_76, type, member_a: a > set_a > $o).
0.40/0.58	thf(decl_77, type, k: set_a).
0.40/0.58	thf(decl_78, type, x: set_a).
0.40/0.58	thf(decl_79, type, a2: a).
0.40/0.58	thf(decl_80, type, b: a).
0.40/0.58	thf(decl_81, type, d: real).
0.40/0.58	thf(decl_82, type, f: a > a).
0.40/0.58	thf(decl_83, type, l: a).
0.40/0.58	thf(decl_84, type, n: nat).
0.40/0.58	thf(decl_85, type, p: a).
0.40/0.58	thf(decl_86, type, r: nat > nat).
0.40/0.58	thf(decl_87, type, s: nat > a).
0.40/0.58	thf(decl_88, type, t: a > real).
0.40/0.58	thf(decl_89, type, x2: a).
0.40/0.58	thf(decl_90, type, y: a).
0.40/0.58	thf(decl_91, type, esk1_2: set_a > (a > $o) > a).
0.40/0.58	thf(decl_92, type, esk2_2: set_real > (real > $o) > real).
0.40/0.58	thf(decl_93, type, esk3_1: a > a).
0.40/0.58	thf(decl_94, type, esk4_1: a > a).
0.40/0.58	thf(decl_95, type, esk5_1: a > real).
0.40/0.58	thf(decl_96, type, esk6_0: a).
0.40/0.58	thf(decl_97, type, esk7_0: a).
0.40/0.58	thf(decl_98, type, esk8_0: a).
0.40/0.58	thf(decl_99, type, esk9_0: a).
0.40/0.58	thf(decl_100, type, esk10_0: nat).
0.40/0.58	thf(decl_101, type, esk11_2: (real > $o) > (real > $o) > real).
0.40/0.58	thf(decl_102, type, esk12_2: (a > $o) > (a > $o) > a).
0.40/0.58	thf(decl_103, type, esk13_1: (a > $o) > a).
0.40/0.58	thf(decl_104, type, esk14_1: (real > $o) > real).
0.40/0.58	thf(decl_105, type, esk15_1: (a > $o) > a).
0.40/0.58	thf(decl_106, type, esk16_1: (real > $o) > real).
0.40/0.58	thf(decl_107, type, esk17_1: set_a > a).
0.40/0.58	thf(decl_108, type, esk18_1: set_real > real).
0.40/0.58	thf(decl_109, type, esk19_1: set_a > a).
0.40/0.58	thf(decl_110, type, esk20_1: set_real > real).
0.40/0.58	thf(decl_111, type, esk21_1: set_a > a).
0.40/0.58	thf(decl_112, type, esk22_1: set_real > real).
0.40/0.58	thf(decl_113, type, esk23_2: a > set_a > set_a).
0.40/0.58	thf(decl_114, type, esk24_2: real > set_real > set_real).
0.40/0.58	thf(decl_115, type, esk25_4: a > set_a > a > set_a > set_a).
0.40/0.58	thf(decl_116, type, esk26_4: real > set_real > real > set_real > set_real).
0.40/0.58	thf(decl_117, type, esk27_2: a > set_a > set_a).
0.40/0.58	thf(decl_118, type, esk28_2: real > set_real > set_real).
0.40/0.58	thf(decl_119, type, esk29_2: set_a > set_a > a).
0.40/0.58	thf(decl_120, type, esk30_2: set_a > set_a > a).
0.40/0.58	thf(decl_121, type, esk31_2: set_real > set_real > real).
0.40/0.58	thf(decl_122, type, esk32_2: set_real > set_real > real).
0.40/0.58	thf(decl_123, type, esk33_2: set_a > set_a > a).
0.40/0.58	thf(decl_124, type, esk34_2: set_real > set_real > real).
0.40/0.58	thf(decl_125, type, esk35_2: set_a > set_a > a).
0.40/0.58	thf(decl_126, type, esk36_2: set_real > set_real > real).
0.40/0.58	thf(decl_127, type, esk37_4: a > a > a > real > real).
0.40/0.58	thf(decl_128, type, esk38_4: a > a > a > real > a > real).
0.40/0.58	thf(decl_129, type, esk39_1: a > real).
0.40/0.58	thf(decl_130, type, esk40_1: a > a).
0.40/0.58	thf(decl_131, type, esk41_1: a > a).
0.40/0.58	thf(decl_132, type, esk42_1: a > real).
0.40/0.58	thf(decl_133, type, esk43_1: a > real).
0.40/0.58	thf(decl_134, type, esk44_0: a).
0.40/0.58	thf(decl_135, type, esk45_0: real).
0.40/0.58	thf(decl_136, type, esk46_1: set_a > a).
0.40/0.58	thf(decl_137, type, esk47_1: set_real > real).
0.40/0.58	thf(decl_138, type, esk48_1: set_a > a).
0.40/0.58	thf(decl_139, type, esk49_1: set_a > a).
0.40/0.58	thf(decl_140, type, esk50_0: real).
0.40/0.58	thf(decl_141, type, esk51_0: a > real).
0.40/0.58	thf(decl_142, type, esk52_0: real).
0.40/0.58	thf(decl_143, type, esk53_0: a > real).
0.40/0.58	thf(decl_144, type, esk54_0: a).
0.40/0.58	thf(decl_145, type, esk55_2: (real > a) > a > real).
0.40/0.58	thf(decl_146, type, esk56_1: (real > a) > a).
0.40/0.58	thf(decl_147, type, esk57_2: (real > real) > real > real).
0.40/0.58	thf(decl_148, type, esk58_1: (real > real) > real).
0.40/0.58	thf(decl_149, type, esk59_2: (real > a) > (a > real) > a).
0.40/0.58	thf(decl_150, type, esk60_2: (real > real) > (real > real) > real).
0.40/0.58	thf(decl_151, type, esk61_2: (real > a) > a > real).
0.40/0.58	thf(decl_152, type, esk62_2: (real > real) > real > real).
0.40/0.58	thf(decl_153, type, esk63_2: (real > a) > a > real).
0.40/0.58	thf(decl_154, type, esk64_2: (real > real) > real > real).
0.40/0.58	thf(decl_155, type, esk65_3: a > (real > a) > set_real > real).
0.40/0.58	thf(decl_156, type, esk66_3: real > (real > real) > set_real > real).
0.40/0.58	thf(decl_157, type, esk67_3: (real > a) > set_real > (a > $o) > real).
0.40/0.58	thf(decl_158, type, esk68_3: (real > real) > set_real > (real > $o) > real).
0.40/0.58	thf(decl_159, type, esk69_4: set_real > set_real > (real > a) > (real > a) > real).
0.40/0.58	thf(decl_160, type, esk70_4: set_real > set_real > (real > real) > (real > real) > real).
0.40/0.58	thf(decl_161, type, esk71_3: (real > a) > set_real > (a > $o) > a).
0.40/0.58	thf(decl_162, type, esk72_3: (real > real) > set_real > (real > $o) > real).
0.40/0.58	thf(decl_163, type, epred1_1: set_real > real > $o).
0.40/0.58	thf(decl_164, type, epred2_1: set_a > a > $o).
0.40/0.58	thf(decl_165, type, esk73_0: a).
0.40/0.58	thf(decl_166, type, esk74_0: a).
0.40/0.58	thf(decl_167, type, esk75_0: a).
0.40/0.58	thf(fact_21_comp__apply, axiom, ((comp_nat_a_nat)=(^[X13:nat > a, X14:nat > nat, X15:nat]:(X13 @ (X14 @ X15)))), file('/export/starexec/sandbox2/benchmark/theBenchmark.p', fact_21_comp__apply)).
0.40/0.58	thf(fact_139_Int__commute, axiom, ((inf_inf_set_a)=(^[X155:set_a, X156:set_a]:(inf_inf_set_a @ X156 @ X155))), file('/export/starexec/sandbox2/benchmark/theBenchmark.p', fact_139_Int__commute)).
0.40/0.58	thf(fact_13__092_060open_062_092_060omega_062__limit__set_Ax_A_092_060inter_062_A_123a_060_N_N_060b_125_A_061_A_123flow0_A_I_Is_A_092_060circ_062_Ar_J_An_J_A_It_A_I_Is_A_092_060circ_062_Ar_J_An_J_J_125_092_060close_062, axiom, ((inf_inf_set_a @ (limit_2033113720_set_a @ f @ x @ x2) @ (line_open_segment_a @ a2 @ b))=(insert_a @ (auto_ll_on_flow0_a @ f @ x @ (comp_nat_a_nat @ s @ r @ n) @ (t @ (comp_nat_a_nat @ s @ r @ n))) @ bot_bot_set_a)), file('/export/starexec/sandbox2/benchmark/theBenchmark.p', fact_13__092_060open_062_092_060omega_062__limit__set_Ax_A_092_060inter_062_A_123a_060_N_N_060b_125_A_061_A_123flow0_A_I_Is_A_092_060circ_062_Ar_J_An_J_A_It_A_I_Is_A_092_060circ_062_Ar_J_An_J_J_125_092_060close_062)).
0.40/0.58	thf(fact_16_luniq, axiom, ((inf_inf_set_a @ (limit_2033113720_set_a @ f @ x @ x2) @ (line_open_segment_a @ a2 @ b))=(insert_a @ l @ bot_bot_set_a)), file('/export/starexec/sandbox2/benchmark/theBenchmark.p', fact_16_luniq)).
0.40/0.58	thf(fact_157_singleton__iff, axiom, ![X3:a, X2:a]:(((member_a @ X3 @ (insert_a @ X2 @ bot_bot_set_a))<=>((X3)=(X2)))), file('/export/starexec/sandbox2/benchmark/theBenchmark.p', fact_157_singleton__iff)).
0.40/0.58	thf(conj_0, conjecture, ((auto_ll_on_flow0_a @ f @ x @ (comp_nat_a_nat @ s @ r @ n) @ (t @ (comp_nat_a_nat @ s @ r @ n)))=(l)), file('/export/starexec/sandbox2/benchmark/theBenchmark.p', conj_0)).
0.40/0.58	thf(fact_131_insertI1, axiom, ![X2:a, X57:set_a]:((member_a @ X2 @ (insert_a @ X2 @ X57))), file('/export/starexec/sandbox2/benchmark/theBenchmark.p', fact_131_insertI1)).
0.40/0.58	thf(c_0_7, plain, ![X1125:nat > a, X1126:nat > nat, X1127:nat]:(((comp_nat_a_nat @ X1125 @ X1126 @ X1127)=(X1125 @ (X1126 @ X1127)))), inference(fof_simplification,[status(thm)],[inference(fof_simplification,[status(thm)],[fact_21_comp__apply])])).
0.40/0.58	thf(c_0_8, plain, ![X1131:set_a, X1132:set_a]:(((inf_inf_set_a @ X1131 @ X1132)=(inf_inf_set_a @ X1132 @ X1131))), inference(fof_simplification,[status(thm)],[inference(fof_simplification,[status(thm)],[fact_139_Int__commute])])).
0.40/0.58	thf(c_0_9, plain, ![X1152:nat > a, X1153:nat > nat, X1154:nat]:(((comp_nat_a_nat @ X1152 @ X1153 @ X1154)=(X1152 @ (X1153 @ X1154)))), inference(variable_rename,[status(thm)],[c_0_7])).
0.40/0.58	thf(c_0_10, plain, ![X1438:set_a, X1439:set_a]:(((inf_inf_set_a @ X1438 @ X1439)=(inf_inf_set_a @ X1439 @ X1438))), inference(variable_rename,[status(thm)],[c_0_8])).
0.40/0.58	thf(c_0_11, plain, ((inf_inf_set_a @ (limit_2033113720_set_a @ f @ x @ x2) @ (line_open_segment_a @ a2 @ b))=(insert_a @ (auto_ll_on_flow0_a @ f @ x @ (comp_nat_a_nat @ s @ r @ n) @ (t @ (comp_nat_a_nat @ s @ r @ n))) @ bot_bot_set_a)), inference(split_conjunct,[status(thm)],[fact_13__092_060open_062_092_060omega_062__limit__set_Ax_A_092_060inter_062_A_123a_060_N_N_060b_125_A_061_A_123flow0_A_I_Is_A_092_060circ_062_Ar_J_An_J_A_It_A_I_Is_A_092_060circ_062_Ar_J_An_J_J_125_092_060close_062])).
0.40/0.58	thf(c_0_12, plain, ![X14:nat > nat, X13:nat > a, X11:nat]:(((comp_nat_a_nat @ X13 @ X14 @ X11)=(X13 @ (X14 @ X11)))), inference(split_conjunct,[status(thm)],[c_0_9])).
0.40/0.58	thf(c_0_13, plain, ![X28:set_a, X5:set_a]:(((inf_inf_set_a @ X5 @ X28)=(inf_inf_set_a @ X28 @ X5))), inference(split_conjunct,[status(thm)],[c_0_10])).
0.40/0.58	thf(c_0_14, plain, ((inf_inf_set_a @ (limit_2033113720_set_a @ f @ x @ x2) @ (line_open_segment_a @ a2 @ b))=(insert_a @ l @ bot_bot_set_a)), inference(split_conjunct,[status(thm)],[fact_16_luniq])).
0.40/0.58	thf(c_0_15, plain, ![X1484:a, X1485:a]:(((~(member_a @ X1484 @ (insert_a @ X1485 @ bot_bot_set_a))|((X1484)=(X1485)))&(((X1484)!=(X1485))|(member_a @ X1484 @ (insert_a @ X1485 @ bot_bot_set_a))))), inference(variable_rename,[status(thm)],[inference(fof_nnf,[status(thm)],[fact_157_singleton__iff])])).
0.40/0.58	thf(c_0_16, plain, ((insert_a @ (auto_ll_on_flow0_a @ f @ x @ (s @ (r @ n)) @ (t @ (s @ (r @ n)))) @ bot_bot_set_a)=(inf_inf_set_a @ (line_open_segment_a @ a2 @ b) @ (limit_2033113720_set_a @ f @ x @ x2))), inference(rw,[status(thm)],[inference(rw,[status(thm)],[inference(rw,[status(thm)],[c_0_11, c_0_12]), c_0_12]), c_0_13])).
0.40/0.58	thf(c_0_17, plain, ((inf_inf_set_a @ (line_open_segment_a @ a2 @ b) @ (limit_2033113720_set_a @ f @ x @ x2))=(insert_a @ l @ bot_bot_set_a)), inference(rw,[status(thm)],[c_0_14, c_0_13])).
0.40/0.58	thf(c_0_18, negated_conjecture, ((auto_ll_on_flow0_a @ f @ x @ (comp_nat_a_nat @ s @ r @ n) @ (t @ (comp_nat_a_nat @ s @ r @ n)))!=(l)), inference(fof_simplification,[status(thm)],[inference(assume_negation,[status(cth)],[conj_0])])).
0.40/0.58	thf(c_0_19, plain, ![X1:a, X2:a]:((((X1)=(X2))|~((member_a @ X1 @ (insert_a @ X2 @ bot_bot_set_a))))), inference(split_conjunct,[status(thm)],[c_0_15])).
0.40/0.58	thf(c_0_20, plain, ((insert_a @ (auto_ll_on_flow0_a @ f @ x @ (s @ (r @ n)) @ (t @ (s @ (r @ n)))) @ bot_bot_set_a)=(insert_a @ l @ bot_bot_set_a)), inference(rw,[status(thm)],[c_0_16, c_0_17])).
0.40/0.58	thf(c_0_21, plain, ![X1418:a, X1419:set_a]:((member_a @ X1418 @ (insert_a @ X1418 @ X1419))), inference(variable_rename,[status(thm)],[fact_131_insertI1])).
0.40/0.58	thf(c_0_22, negated_conjecture, ((auto_ll_on_flow0_a @ f @ x @ (comp_nat_a_nat @ s @ r @ n) @ (t @ (comp_nat_a_nat @ s @ r @ n)))!=(l)), inference(split_conjunct,[status(thm)],[c_0_18])).
0.40/0.58	thf(c_0_23, plain, ![X1:a]:((((X1)=(auto_ll_on_flow0_a @ f @ x @ (s @ (r @ n)) @ (t @ (s @ (r @ n)))))|~((member_a @ X1 @ (insert_a @ l @ bot_bot_set_a))))), inference(spm,[status(thm)],[c_0_19, c_0_20])).
0.40/0.58	thf(c_0_24, plain, ![X1:a, X5:set_a]:((member_a @ X1 @ (insert_a @ X1 @ X5))), inference(split_conjunct,[status(thm)],[c_0_21])).
0.40/0.58	thf(c_0_25, negated_conjecture, ((auto_ll_on_flow0_a @ f @ x @ (s @ (r @ n)) @ (t @ (s @ (r @ n))))!=(l)), inference(rw,[status(thm)],[inference(rw,[status(thm)],[c_0_22, c_0_12]), c_0_12])).
0.40/0.58	thf(c_0_26, plain, ($false), inference(sr,[status(thm)],[inference(spm,[status(thm)],[c_0_23, c_0_24]), c_0_25]), ['proof']).
0.40/0.58	# SZS output end CNFRefutation
0.40/0.58	# Parsed axioms                        : 427
0.40/0.58	# Removed by relevancy pruning/SinE    : 0
0.40/0.58	# Initial clauses                      : 609
0.40/0.58	# Removed in clause preprocessing      : 84
0.40/0.58	# Initial clauses in saturation        : 525
0.40/0.58	# Processed clauses                    : 733
0.40/0.58	# ...of these trivial                  : 19
0.40/0.58	# ...subsumed                          : 128
0.40/0.58	# ...remaining for further processing  : 586
0.40/0.58	# Other redundant clauses eliminated   : 84
0.40/0.58	# Clauses deleted for lack of memory   : 0
0.40/0.58	# Backward-subsumed                    : 2
0.40/0.58	# Backward-rewritten                   : 10
0.40/0.58	# Generated clauses                    : 216
0.40/0.58	# ...of the previous two non-redundant : 127
0.40/0.58	# ...aggressively subsumed             : 0
0.40/0.58	# Contextual simplify-reflections      : 4
0.40/0.58	# Paramodulations                      : 122
0.40/0.58	# Factorizations                       : 0
0.40/0.58	# NegExts                              : 3
0.40/0.58	# Equation resolutions                 : 84
0.40/0.58	# Propositional unsat checks           : 0
0.40/0.58	#    Propositional check models        : 0
0.40/0.58	#    Propositional check unsatisfiable : 0
0.40/0.58	#    Propositional clauses             : 0
0.40/0.58	#    Propositional clauses after purity: 0
0.40/0.58	#    Propositional unsat core size     : 0
0.40/0.58	#    Propositional preprocessing time  : 0.000
0.40/0.58	#    Propositional encoding time       : 0.000
0.40/0.58	#    Propositional solver time         : 0.000
0.40/0.58	#    Success case prop preproc time    : 0.000
0.40/0.58	#    Success case prop encoding time   : 0.000
0.40/0.58	#    Success case prop solver time     : 0.000
0.40/0.58	# Current number of processed clauses  : 140
0.40/0.58	#    Positive orientable unit clauses  : 59
0.40/0.58	#    Positive unorientable unit clauses: 0
0.40/0.58	#    Negative unit clauses             : 16
0.40/0.58	#    Non-unit-clauses                  : 65
0.40/0.58	# Current number of unprocessed clauses: 301
0.40/0.58	# ...number of literals in the above   : 696
0.40/0.58	# Current number of archived formulas  : 0
0.40/0.58	# Current number of archived clauses   : 395
0.40/0.58	# Clause-clause subsumption calls (NU) : 13671
0.40/0.58	# Rec. Clause-clause subsumption calls : 8634
0.40/0.58	# Non-unit clause-clause subsumptions  : 95
0.40/0.58	# Unit Clause-clause subsumption calls : 627
0.40/0.58	# Rewrite failures with RHS unbound    : 0
0.40/0.58	# BW rewrite match attempts            : 129
0.40/0.58	# BW rewrite match successes           : 74
0.40/0.58	# Condensation attempts                : 0
0.40/0.58	# Condensation successes               : 0
0.40/0.58	# Termbank termtop insertions          : 44240
0.40/0.58	
0.40/0.58	# -------------------------------------------------
0.40/0.58	# User time                : 0.084 s
0.40/0.58	# System time              : 0.006 s
0.40/0.58	# Total time               : 0.090 s
0.40/0.58	# Maximum resident set size: 4300 pages
0.40/0.58	
0.40/0.58	# -------------------------------------------------
0.40/0.58	# User time                : 0.098 s
0.40/0.58	# System time              : 0.007 s
0.40/0.58	# Total time               : 0.105 s
0.40/0.58	# Maximum resident set size: 2300 pages
0.40/0.58	EOF