0.12/0.28 % Problem : SLH0335^1 : TPTP v8.2.0. Released v8.2.0. 0.28/0.29 % Command : run_E %s %d THM 0.29/0.50 % Computer : n016.cluster.edu 0.29/0.50 % Model : x86_64 x86_64 0.29/0.50 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz 0.29/0.50 % Memory : 8042.1875MB 0.29/0.50 % OS : Linux 3.10.0-693.el7.x86_64 0.29/0.50 % CPULimit : 30 0.29/0.50 % WCLimit : 30 0.29/0.50 % DateTime : Mon Jul 3 10:28:05 EDT 2023 0.29/0.50 % CPUTime : 0.45/0.63 The problem SPC is TH0_THM_EQU_NAR 0.45/0.63 Running higher-order on 1 cores theorem proving 0.45/0.63 Running: /export/starexec/sandbox/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/sandbox/tmp/tmp.zIQjTRdTAi/Vampire---4.8_1631 0.45/0.63 # Version: 3.0pre003-ho 6.04/6.25 # partial match(1): HSLSSMSMSSMNHSA 6.04/6.25 # Preprocessing class: HMLSSMSMSSMNHSA. 6.04/6.25 # Scheduled 1 strats onto 1 cores with 30 seconds (30 total) 6.04/6.25 # Starting ehoh_best2 with 30s (1) cores 6.04/6.25 # ehoh_best2 with pid 1989 completed with status 0 6.04/6.25 # Result found by ehoh_best2 6.04/6.25 # partial match(1): HSLSSMSMSSMNHSA 6.04/6.25 # Preprocessing class: HMLSSMSMSSMNHSA. 6.04/6.25 # Scheduled 1 strats onto 1 cores with 30 seconds (30 total) 6.04/6.25 # Starting ehoh_best2 with 30s (1) cores 6.04/6.25 # No SInE strategy applied 6.04/6.25 # Search class: HGHSM-SMLM32-DHSFFFBN 6.04/6.25 # partial match(1): HGHSM-SMLM32-DHSFFSBN 6.04/6.25 # Scheduled 5 strats onto 1 cores with 30 seconds (30 total) 6.04/6.25 # Starting new_bool_8 with 18s (1) cores 6.04/6.25 # new_bool_8 with pid 1997 completed with status 0 6.04/6.25 # Result found by new_bool_8 6.04/6.25 # partial match(1): HSLSSMSMSSMNHSA 6.04/6.25 # Preprocessing class: HMLSSMSMSSMNHSA. 6.04/6.25 # Scheduled 1 strats onto 1 cores with 30 seconds (30 total) 6.04/6.25 # Starting ehoh_best2 with 30s (1) cores 6.04/6.25 # No SInE strategy applied 6.04/6.25 # Search class: HGHSM-SMLM32-DHSFFFBN 6.04/6.25 # partial match(1): HGHSM-SMLM32-DHSFFSBN 6.04/6.25 # Scheduled 5 strats onto 1 cores with 30 seconds (30 total) 6.04/6.25 # Starting new_bool_8 with 18s (1) cores 6.04/6.25 # Preprocessing time : 0.034 s 6.04/6.25 # Presaturation interreduction done 6.04/6.25 6.04/6.25 # Proof found! 6.04/6.25 # SZS status Theorem 6.04/6.25 # SZS output start CNFRefutation 6.04/6.25 thf(decl_22, type, finite_card_real: set_real > nat). 6.04/6.25 thf(decl_23, type, finite_card_a: set_a > nat). 6.04/6.25 thf(decl_24, type, finite_finite_int: set_int > $o). 6.04/6.25 thf(decl_25, type, finite_finite_nat: set_nat > $o). 6.04/6.25 thf(decl_26, type, finite_finite_real: set_real > $o). 6.04/6.25 thf(decl_27, type, finite_finite_set_a: set_set_a > $o). 6.04/6.25 thf(decl_28, type, finite_finite_a: set_a > $o). 6.04/6.25 thf(decl_29, type, group_201663378560352916roup_a: set_a > (a > a > a) > a > $o). 6.04/6.25 thf(decl_30, type, group_4866109990395492029noid_a: set_a > (a > a > a) > a > $o). 6.04/6.25 thf(decl_31, type, group_group_a: set_a > (a > a > a) > a > $o). 6.04/6.25 thf(decl_32, type, group_monoid_a: set_a > (a > a > a) > a > $o). 6.04/6.25 thf(decl_33, type, group_Units_a: set_a > (a > a > a) > a > set_a). 6.04/6.25 thf(decl_34, type, group_invertible_a: set_a > (a > a > a) > a > a > $o). 6.04/6.25 thf(decl_35, type, minus_minus_int: int > int > int). 6.04/6.25 thf(decl_36, type, minus_minus_nat: nat > nat > nat). 6.04/6.25 thf(decl_37, type, minus_minus_real: real > real > real). 6.04/6.25 thf(decl_38, type, minus_minus_set_real: set_real > set_real > set_real). 6.04/6.25 thf(decl_39, type, minus_minus_set_a: set_a > set_a > set_a). 6.04/6.25 thf(decl_40, type, one_one_int: int). 6.04/6.25 thf(decl_41, type, one_one_nat: nat). 6.04/6.25 thf(decl_42, type, one_one_real: real). 6.04/6.25 thf(decl_43, type, times_times_int: int > int > int). 6.04/6.25 thf(decl_44, type, times_times_nat: nat > nat > nat). 6.04/6.25 thf(decl_45, type, times_times_real: real > real > real). 6.04/6.25 thf(decl_46, type, zero_zero_int: int). 6.04/6.25 thf(decl_47, type, zero_zero_nat: nat). 6.04/6.25 thf(decl_48, type, zero_zero_real: real). 6.04/6.25 thf(decl_49, type, inf_inf_int: int > int > int). 6.04/6.25 thf(decl_50, type, inf_inf_nat: nat > nat > nat). 6.04/6.25 thf(decl_51, type, inf_inf_real: real > real > real). 6.04/6.25 thf(decl_52, type, inf_inf_set_real: set_real > set_real > set_real). 6.04/6.25 thf(decl_53, type, inf_inf_set_a: set_a > set_a > set_a). 6.04/6.25 thf(decl_54, type, sup_sup_set_a: set_a > set_a > set_a). 6.04/6.25 thf(decl_55, type, semiri1314217659103216013at_int: nat > int). 6.04/6.25 thf(decl_56, type, semiri1316708129612266289at_nat: nat > nat). 6.04/6.25 thf(decl_57, type, semiri5074537144036343181t_real: nat > real). 6.04/6.25 thf(decl_58, type, sqrt: real > real). 6.04/6.25 thf(decl_59, type, bot_bot_a_o: a > $o). 6.04/6.25 thf(decl_60, type, bot_bot_nat: nat). 6.04/6.25 thf(decl_61, type, bot_bot_set_int: set_int). 6.04/6.25 thf(decl_62, type, bot_bot_set_nat: set_nat). 6.04/6.25 thf(decl_63, type, bot_bot_set_real: set_real). 6.04/6.25 thf(decl_64, type, bot_bot_set_set_a: set_set_a). 6.04/6.25 thf(decl_65, type, bot_bot_set_a: set_a). 6.04/6.25 thf(decl_66, type, ord_less_int: int > int > $o). 6.04/6.25 thf(decl_67, type, ord_less_nat: nat > nat > $o). 6.04/6.25 thf(decl_68, type, ord_less_real: real > real > $o). 6.04/6.25 thf(decl_69, type, ord_less_set_real: set_real > set_real > $o). 6.04/6.25 thf(decl_70, type, ord_less_set_a: set_a > set_a > $o). 6.04/6.25 thf(decl_71, type, ord_less_eq_int: int > int > $o). 6.04/6.25 thf(decl_72, type, ord_less_eq_nat: nat > nat > $o). 6.04/6.25 thf(decl_73, type, ord_less_eq_real: real > real > $o). 6.04/6.25 thf(decl_74, type, ord_less_eq_set_real: set_real > set_real > $o). 6.04/6.25 thf(decl_75, type, ord_less_eq_set_a: set_a > set_a > $o). 6.04/6.25 thf(decl_76, type, pluenn1014277435162747966p_real: set_real > (real > real > real) > real > $o). 6.04/6.25 thf(decl_77, type, pluenn1164192988769422572roup_a: set_a > (a > a > a) > a > $o). 6.04/6.25 thf(decl_78, type, pluenn5761198478017115492ance_a: set_a > (a > a > a) > a > set_a > set_a > real). 6.04/6.25 thf(decl_79, type, pluenn2534204936789923946sset_a: set_a > (a > a > a) > a > set_a > set_a). 6.04/6.25 thf(decl_80, type, pluenn7361685508355272389t_real: set_real > (real > real > real) > set_real > set_real > set_real). 6.04/6.25 thf(decl_81, type, pluenn3038260743871226533mset_a: set_a > (a > a > a) > set_a > set_a > set_a). 6.04/6.25 thf(decl_82, type, pluenn1960970773371692859ated_a: set_a > (a > a > a) > a > set_a > nat > set_a). 6.04/6.25 thf(decl_83, type, pluenn3384280056939765061p_real: set_real > (real > real > real) > (real > $o) > (real > $o) > real > $o). 6.04/6.25 thf(decl_84, type, pluenn895083305082786853setp_a: set_a > (a > a > a) > (a > $o) > (a > $o) > a > $o). 6.04/6.25 thf(decl_85, type, divide_divide_int: int > int > int). 6.04/6.25 thf(decl_86, type, divide_divide_nat: nat > nat > nat). 6.04/6.25 thf(decl_87, type, divide_divide_real: real > real > real). 6.04/6.25 thf(decl_88, type, collect_real: (real > $o) > set_real). 6.04/6.25 thf(decl_89, type, collect_a: (a > $o) > set_a). 6.04/6.25 thf(decl_90, type, insert_real: real > set_real > set_real). 6.04/6.25 thf(decl_91, type, insert_a: a > set_a > set_a). 6.04/6.25 thf(decl_92, type, member_int: int > set_int > $o). 6.04/6.25 thf(decl_93, type, member_nat: nat > set_nat > $o). 6.04/6.25 thf(decl_94, type, member_real: real > set_real > $o). 6.04/6.25 thf(decl_95, type, member_set_a: set_a > set_set_a > $o). 6.04/6.25 thf(decl_96, type, member_a: a > set_a > $o). 6.04/6.25 thf(decl_97, type, g: set_a). 6.04/6.25 thf(decl_98, type, u: set_a). 6.04/6.25 thf(decl_99, type, v: set_a). 6.04/6.25 thf(decl_100, type, w: set_a). 6.04/6.25 thf(decl_101, type, addition: a > a > a). 6.04/6.25 thf(decl_102, type, zero: a). 6.04/6.25 thf(decl_103, type, esk1_3: a > set_a > set_a > a). 6.04/6.25 thf(decl_104, type, esk2_3: a > set_a > set_a > a). 6.04/6.25 thf(decl_105, type, esk3_3: a > set_a > set_a > a). 6.04/6.25 thf(decl_106, type, esk4_3: a > set_a > set_a > a). 6.04/6.25 thf(decl_107, type, esk5_3: (a > $o) > (a > $o) > a > a). 6.04/6.25 thf(decl_108, type, esk6_3: (a > $o) > (a > $o) > a > a). 6.04/6.25 thf(decl_109, type, esk7_3: (a > $o) > (a > $o) > a > a). 6.04/6.25 thf(decl_110, type, esk8_3: (a > $o) > (a > $o) > a > a). 6.04/6.25 thf(decl_111, type, esk9_1: a > a). 6.04/6.25 thf(decl_112, type, esk10_1: a > a). 6.04/6.25 thf(decl_113, type, esk11_5: set_real > (real > real > real) > real > set_real > set_real > real). 6.04/6.25 thf(decl_114, type, esk12_5: set_real > (real > real > real) > real > set_real > set_real > real). 6.04/6.25 thf(decl_115, type, esk13_5: set_a > (a > a > a) > a > set_a > set_a > a). 6.04/6.25 thf(decl_116, type, esk14_5: set_a > (a > a > a) > a > set_a > set_a > a). 6.04/6.25 thf(decl_117, type, esk15_5: set_real > (real > real > real) > real > set_real > set_real > real). 6.04/6.25 thf(decl_118, type, esk16_5: set_real > (real > real > real) > real > set_real > set_real > real). 6.04/6.25 thf(decl_119, type, esk17_5: set_a > (a > a > a) > a > set_a > set_a > a). 6.04/6.25 thf(decl_120, type, esk18_5: set_a > (a > a > a) > a > set_a > set_a > a). 6.04/6.25 thf(decl_121, type, esk19_5: set_real > (real > real > real) > (real > $o) > (real > $o) > real > real). 6.04/6.25 thf(decl_122, type, esk20_5: set_real > (real > real > real) > (real > $o) > (real > $o) > real > real). 6.04/6.25 thf(decl_123, type, esk21_5: set_a > (a > a > a) > (a > $o) > (a > $o) > a > a). 6.04/6.25 thf(decl_124, type, esk22_5: set_a > (a > a > a) > (a > $o) > (a > $o) > a > a). 6.04/6.25 thf(decl_125, type, esk23_5: set_real > (real > real > real) > (real > $o) > (real > $o) > real > real). 6.04/6.25 thf(decl_126, type, esk24_5: set_real > (real > real > real) > (real > $o) > (real > $o) > real > real). 6.04/6.25 thf(decl_127, type, esk25_5: set_a > (a > a > a) > (a > $o) > (a > $o) > a > a). 6.04/6.25 thf(decl_128, type, esk26_5: set_a > (a > a > a) > (a > $o) > (a > $o) > a > a). 6.04/6.25 thf(decl_129, type, esk27_2: (nat > $o) > nat > nat). 6.04/6.25 thf(decl_130, type, esk28_1: (nat > $o) > nat). 6.04/6.25 thf(decl_131, type, esk29_2: set_real > real > real). 6.04/6.25 thf(decl_132, type, esk30_2: set_set_a > set_a > set_a). 6.04/6.25 thf(decl_133, type, esk31_2: set_nat > nat > nat). 6.04/6.25 thf(decl_134, type, esk32_2: set_int > int > int). 6.04/6.25 thf(decl_135, type, esk33_2: set_real > real > real). 6.04/6.25 thf(decl_136, type, esk34_2: set_set_a > set_a > set_a). 6.04/6.25 thf(decl_137, type, esk35_2: set_nat > nat > nat). 6.04/6.25 thf(decl_138, type, esk36_2: set_int > int > int). 6.04/6.25 thf(decl_139, type, esk37_1: set_real > real). 6.04/6.25 thf(decl_140, type, esk38_1: set_set_a > set_a). 6.04/6.25 thf(decl_141, type, esk39_1: set_nat > nat). 6.04/6.25 thf(decl_142, type, esk40_1: set_int > int). 6.04/6.25 thf(decl_143, type, esk41_1: set_real > real). 6.04/6.25 thf(decl_144, type, esk42_1: set_set_a > set_a). 6.04/6.25 thf(decl_145, type, esk43_1: set_nat > nat). 6.04/6.25 thf(decl_146, type, esk44_1: set_int > int). 6.04/6.25 thf(decl_147, type, esk45_2: set_a > nat > set_a). 6.04/6.25 thf(decl_148, type, esk46_3: set_a > nat > set_a > set_a). 6.04/6.25 thf(decl_149, type, esk47_2: nat > set_a > set_a). 6.04/6.25 thf(decl_150, type, esk48_2: set_a > nat > set_a). 6.04/6.25 thf(decl_151, type, esk49_1: real > real). 6.04/6.25 thf(decl_152, type, esk50_1: real > real). 6.04/6.25 thf(decl_153, type, esk51_1: (nat > $o) > nat). 6.04/6.25 thf(decl_154, type, esk52_1: (nat > $o) > nat). 6.04/6.25 thf(decl_155, type, esk53_1: (nat > $o) > nat). 6.04/6.25 thf(decl_156, type, esk54_1: (nat > nat) > nat). 6.04/6.25 thf(decl_157, type, esk55_1: (nat > nat) > nat). 6.04/6.25 thf(decl_158, type, esk56_1: (set_real > $o) > set_real). 6.04/6.25 thf(decl_159, type, esk57_1: (set_real > $o) > real). 6.04/6.25 thf(decl_160, type, esk58_1: (set_real > $o) > set_real). 6.04/6.25 thf(decl_161, type, esk59_1: (set_a > $o) > set_a). 6.04/6.25 thf(decl_162, type, esk60_1: (set_a > $o) > a). 6.04/6.25 thf(decl_163, type, esk61_1: (set_a > $o) > set_a). 6.04/6.25 thf(decl_164, type, esk62_2: set_real > (set_real > $o) > real). 6.04/6.25 thf(decl_165, type, esk63_2: set_real > (set_real > $o) > real). 6.04/6.25 thf(decl_166, type, esk64_2: set_real > (set_real > $o) > set_real). 6.04/6.25 thf(decl_167, type, esk65_2: set_a > (set_a > $o) > a). 6.04/6.25 thf(decl_168, type, esk66_2: set_a > (set_a > $o) > a). 6.04/6.25 thf(decl_169, type, esk67_2: set_a > (set_a > $o) > set_a). 6.04/6.25 thf(decl_170, type, esk68_2: set_real > (set_real > $o) > real). 6.04/6.25 thf(decl_171, type, esk69_2: set_real > (set_real > $o) > set_real). 6.04/6.25 thf(decl_172, type, esk70_2: set_a > (set_a > $o) > a). 6.04/6.25 thf(decl_173, type, esk71_2: set_a > (set_a > $o) > set_a). 6.04/6.25 thf(decl_174, type, esk72_1: set_a > set_a). 6.04/6.25 thf(decl_175, type, esk73_1: set_a > a). 6.04/6.25 thf(decl_176, type, esk74_1: set_a > set_a). 6.04/6.25 thf(decl_177, type, esk75_1: set_a > a). 6.04/6.25 thf(decl_178, type, esk76_2: (nat > $o) > nat > nat). 6.04/6.25 thf(decl_179, type, esk77_3: set_real > set_real > (set_real > $o) > real). 6.04/6.25 thf(decl_180, type, esk78_3: set_real > set_real > (set_real > $o) > set_real). 6.04/6.25 thf(decl_181, type, esk79_3: set_a > set_a > (set_a > $o) > a). 6.04/6.25 thf(decl_182, type, esk80_3: set_a > set_a > (set_a > $o) > set_a). 6.04/6.25 thf(decl_183, type, esk81_3: set_real > set_real > (set_real > $o) > real). 6.04/6.25 thf(decl_184, type, esk82_3: set_real > set_real > (set_real > $o) > set_real). 6.04/6.25 thf(decl_185, type, esk83_3: set_a > set_a > (set_a > $o) > a). 6.04/6.25 thf(decl_186, type, esk84_3: set_a > set_a > (set_a > $o) > set_a). 6.04/6.25 thf(decl_187, type, esk85_2: real > real > nat). 6.04/6.25 thf(decl_188, type, esk86_1: set_real > real). 6.04/6.25 thf(decl_189, type, esk87_1: set_a > a). 6.04/6.25 thf(decl_190, type, esk88_1: (a > $o) > a). 6.04/6.25 thf(decl_191, type, esk89_1: (a > $o) > a). 6.04/6.25 thf(decl_192, type, esk90_2: set_real > set_real > real). 6.04/6.25 thf(decl_193, type, esk91_2: set_a > set_a > a). 6.04/6.25 thf(decl_194, type, esk92_2: set_real > set_real > real). 6.04/6.25 thf(decl_195, type, esk93_2: set_a > set_a > a). 6.04/6.25 thf(decl_196, type, esk94_2: set_a > set_a > a). 6.04/6.25 thf(decl_197, type, esk95_2: set_a > set_a > a). 6.04/6.25 thf(decl_198, type, esk96_2: set_real > set_real > real). 6.04/6.25 thf(decl_199, type, esk97_2: set_a > set_a > a). 6.04/6.25 thf(decl_200, type, esk98_2: set_real > set_real > real). 6.04/6.25 thf(decl_201, type, esk99_2: set_a > set_a > a). 6.04/6.25 thf(decl_202, type, esk100_4: set_real > set_real > (real > $o) > (real > $o) > real). 6.04/6.25 thf(decl_203, type, esk101_4: set_a > set_a > (a > $o) > (a > $o) > a). 6.04/6.25 thf(decl_204, type, esk102_2: set_a > (set_a > $o) > set_a). 6.04/6.25 thf(decl_205, type, esk103_2: set_a > (set_a > $o) > set_a). 6.04/6.25 thf(decl_206, type, esk104_2: real > real > nat). 6.04/6.25 thf(decl_207, type, esk105_2: (set_a > $o) > set_a > set_a). 6.04/6.25 thf(decl_208, type, esk106_2: set_real > (set_real > $o) > real). 6.04/6.25 thf(decl_209, type, esk107_2: set_real > (set_real > $o) > set_real). 6.04/6.25 thf(decl_210, type, esk108_2: set_a > (set_a > $o) > a). 6.04/6.25 thf(decl_211, type, esk109_2: set_a > (set_a > $o) > set_a). 6.04/6.25 thf(decl_212, type, esk110_1: set_real > real). 6.04/6.25 thf(decl_213, type, esk111_1: set_a > a). 6.04/6.25 thf(decl_214, type, esk112_1: set_real > real). 6.04/6.25 thf(decl_215, type, esk113_1: set_a > a). 6.04/6.25 thf(decl_216, type, esk114_2: set_real > set_real > real). 6.04/6.25 thf(decl_217, type, esk115_2: set_a > set_a > a). 6.04/6.25 thf(decl_218, type, esk116_2: set_real > set_real > real). 6.04/6.25 thf(decl_219, type, esk117_2: set_a > set_a > a). 6.04/6.25 thf(decl_220, type, esk118_2: (a > $o) > (a > $o) > a). 6.04/6.25 thf(decl_221, type, esk119_2: (a > $o) > (a > $o) > a). 6.04/6.25 thf(decl_222, type, esk120_2: set_real > real > real). 6.04/6.25 thf(decl_223, type, esk121_1: set_real > real). 6.04/6.25 thf(decl_224, type, esk122_2: set_real > real > real). 6.04/6.25 thf(decl_225, type, esk123_2: a > set_a > set_a). 6.04/6.25 thf(decl_226, type, esk124_2: real > set_real > set_real). 6.04/6.25 thf(decl_227, type, esk125_4: a > set_a > a > set_a > set_a). 6.04/6.25 thf(decl_228, type, esk126_4: real > set_real > real > set_real > set_real). 6.04/6.25 thf(decl_229, type, esk127_2: a > set_a > set_a). 6.04/6.25 thf(decl_230, type, esk128_2: real > set_real > set_real). 6.04/6.25 thf(decl_231, type, esk129_2: (set_real > $o) > set_real > set_real). 6.04/6.25 thf(decl_232, type, esk130_2: (set_a > $o) > set_a > set_a). 6.04/6.25 thf(decl_233, type, esk131_2: set_real > (set_real > $o) > set_real). 6.04/6.25 thf(decl_234, type, esk132_2: set_a > (set_a > $o) > set_a). 6.04/6.25 thf(decl_235, type, esk133_2: real > real > real). 6.04/6.25 thf(decl_236, type, esk134_1: (real > real > real) > real). 6.04/6.25 thf(decl_237, type, esk135_1: (real > real > real) > real). 6.04/6.25 thf(decl_238, type, esk136_1: (real > real > real) > real). 6.04/6.25 thf(decl_239, type, esk137_1: (real > real > real) > real). 6.04/6.25 thf(decl_240, type, esk138_1: (real > real > real) > real). 6.04/6.25 thf(decl_241, type, esk139_1: (real > real > real) > real). 6.04/6.25 thf(decl_242, type, esk140_1: (real > real > real) > real). 6.04/6.25 thf(decl_243, type, esk141_1: (set_a > set_a > set_a) > set_a). 6.04/6.25 thf(decl_244, type, esk142_1: (set_a > set_a > set_a) > set_a). 6.04/6.25 thf(decl_245, type, esk143_1: (set_a > set_a > set_a) > set_a). 6.04/6.25 thf(decl_246, type, esk144_1: (set_a > set_a > set_a) > set_a). 6.04/6.25 thf(decl_247, type, esk145_1: (set_a > set_a > set_a) > set_a). 6.04/6.25 thf(decl_248, type, esk146_1: (set_a > set_a > set_a) > set_a). 6.04/6.25 thf(decl_249, type, esk147_1: (set_a > set_a > set_a) > set_a). 6.04/6.25 thf(decl_250, type, esk148_1: (nat > nat > nat) > nat). 6.04/6.25 thf(decl_251, type, esk149_1: (nat > nat > nat) > nat). 6.04/6.25 thf(decl_252, type, esk150_1: (nat > nat > nat) > nat). 6.04/6.25 thf(decl_253, type, esk151_1: (nat > nat > nat) > nat). 6.04/6.25 thf(decl_254, type, esk152_1: (nat > nat > nat) > nat). 6.04/6.25 thf(decl_255, type, esk153_1: (nat > nat > nat) > nat). 6.04/6.25 thf(decl_256, type, esk154_1: (nat > nat > nat) > nat). 6.04/6.25 thf(decl_257, type, esk155_1: (int > int > int) > int). 6.04/6.25 thf(decl_258, type, esk156_1: (int > int > int) > int). 6.04/6.25 thf(decl_259, type, esk157_1: (int > int > int) > int). 6.04/6.25 thf(decl_260, type, esk158_1: (int > int > int) > int). 6.04/6.25 thf(decl_261, type, esk159_1: (int > int > int) > int). 6.04/6.25 thf(decl_262, type, esk160_1: (int > int > int) > int). 6.04/6.25 thf(decl_263, type, esk161_1: (int > int > int) > int). 6.04/6.25 thf(decl_264, type, esk162_1: set_a > a). 6.04/6.25 thf(decl_265, type, esk163_2: real > real > real). 6.04/6.25 thf(decl_266, type, esk164_3: int > int > (int > $o) > int). 6.04/6.25 thf(decl_267, type, esk165_3: int > int > (int > $o) > int). 6.04/6.25 thf(decl_268, type, esk166_1: int > nat). 6.04/6.25 thf(decl_269, type, esk167_1: int > nat). 6.04/6.25 thf(decl_270, type, esk168_1: int > nat). 6.04/6.25 thf(decl_271, type, esk169_1: int > nat). 6.04/6.25 thf(decl_272, type, esk170_2: int > (int > $o) > int). 6.04/6.25 thf(decl_273, type, esk171_2: int > (int > $o) > int). 6.04/6.25 thf(decl_274, type, esk172_2: int > (int > $o) > int). 6.04/6.25 thf(decl_275, type, esk173_4: int > (int > $o) > (int > $o) > int > int). 6.04/6.25 thf(decl_276, type, esk174_3: int > (int > $o) > (int > $o) > int). 6.04/6.25 thf(decl_277, type, esk175_2: int > (int > $o) > int). 6.04/6.25 thf(decl_278, type, esk176_2: int > (int > $o) > int). 6.04/6.25 thf(decl_279, type, esk177_4: int > (int > $o) > (int > $o) > int > int). 6.04/6.25 thf(decl_280, type, esk178_3: int > (int > $o) > (int > $o) > int). 6.04/6.25 thf(decl_281, type, esk179_3: real > real > (real > real > $o) > real). 6.04/6.25 thf(decl_282, type, esk180_3: real > real > (real > real > $o) > real). 6.04/6.25 thf(decl_283, type, esk181_3: real > real > (real > real > $o) > real). 6.04/6.25 thf(decl_284, type, esk182_3: real > real > (real > real > $o) > real). 6.04/6.25 thf(decl_285, type, esk183_4: real > real > (real > real > $o) > real > real). 6.04/6.25 thf(decl_286, type, esk184_4: real > real > (real > real > $o) > real > real). 6.04/6.25 thf(decl_287, type, epred1_1: set_a > a > $o). 6.04/6.25 thf(decl_288, type, epred2_1: set_real > real > $o). 6.04/6.25 thf(decl_289, type, esk185_1: set_a > a). 6.04/6.25 thf(decl_290, type, esk186_1: real > real). 6.04/6.25 thf(decl_291, type, esk187_1: int > nat). 6.04/6.25 thf(decl_292, type, esk188_1: real > nat). 6.04/6.25 thf(fact_42_Ruzsa__distance__def, axiom, ![X7:set_a, X8:set_a]:(((pluenn5761198478017115492ance_a @ g @ addition @ zero @ X7 @ X8)=(divide_divide_real @ (semiri5074537144036343181t_real @ (finite_card_a @ (pluenn3038260743871226533mset_a @ g @ addition @ X7 @ (pluenn2534204936789923946sset_a @ g @ addition @ zero @ X8)))) @ (times_times_real @ (sqrt @ (semiri5074537144036343181t_real @ (finite_card_a @ X7))) @ (sqrt @ (semiri5074537144036343181t_real @ (finite_card_a @ X8))))))), file('/export/starexec/sandbox/tmp/tmp.zIQjTRdTAi/Vampire---4.8_1631', fact_42_Ruzsa__distance__def)). 6.04/6.25 thf(fact_496_real__sqrt__mult, axiom, ![X772:real, X773:real]:(((sqrt @ (times_times_real @ X772 @ X773))=(times_times_real @ (sqrt @ X772) @ (sqrt @ X773)))), file('/export/starexec/sandbox/tmp/tmp.zIQjTRdTAi/Vampire---4.8_1631', fact_496_real__sqrt__mult)). 6.04/6.25 thf(fact_118_of__nat__mult, axiom, ![X98:nat, X99:nat]:(((semiri5074537144036343181t_real @ (times_times_nat @ X98 @ X99))=(times_times_real @ (semiri5074537144036343181t_real @ X98) @ (semiri5074537144036343181t_real @ X99)))), file('/export/starexec/sandbox/tmp/tmp.zIQjTRdTAi/Vampire---4.8_1631', fact_118_of__nat__mult)). 6.04/6.25 thf(fact_920_mult_Ocommute, axiom, ((times_times_nat)=(^[X1302:nat, X1303:nat]:(times_times_nat @ X1303 @ X1302))), file('/export/starexec/sandbox/tmp/tmp.zIQjTRdTAi/Vampire---4.8_1631', fact_920_mult_Ocommute)). 6.04/6.25 thf(fact_919_mult_Ocommute, axiom, ((times_times_real)=(^[X1300:real, X1301:real]:(times_times_real @ X1301 @ X1300))), file('/export/starexec/sandbox/tmp/tmp.zIQjTRdTAi/Vampire---4.8_1631', fact_919_mult_Ocommute)). 6.04/6.25 thf(conj_0, conjecture, (ord_less_eq_real @ (pluenn5761198478017115492ance_a @ g @ addition @ zero @ v @ w) @ (times_times_real @ (pluenn5761198478017115492ance_a @ g @ addition @ zero @ v @ u) @ (pluenn5761198478017115492ance_a @ g @ addition @ zero @ u @ w))), file('/export/starexec/sandbox/tmp/tmp.zIQjTRdTAi/Vampire---4.8_1631', conj_0)). 6.04/6.25 thf(fact_28_card__differenceset__commute, axiom, ![X8:set_a, X7:set_a]:(((finite_card_a @ (pluenn3038260743871226533mset_a @ g @ addition @ X8 @ (pluenn2534204936789923946sset_a @ g @ addition @ zero @ X7)))=(finite_card_a @ (pluenn3038260743871226533mset_a @ g @ addition @ X7 @ (pluenn2534204936789923946sset_a @ g @ addition @ zero @ X8))))), file('/export/starexec/sandbox/tmp/tmp.zIQjTRdTAi/Vampire---4.8_1631', fact_28_card__differenceset__commute)). 6.04/6.26 thf(fact_139_times__divide__eq__right, axiom, ![X112:real, X113:real, X114:real]:(((times_times_real @ X112 @ (divide_divide_real @ X113 @ X114))=(divide_divide_real @ (times_times_real @ X112 @ X113) @ X114))), file('/export/starexec/sandbox/tmp/tmp.zIQjTRdTAi/Vampire---4.8_1631', fact_139_times__divide__eq__right)). 6.04/6.26 thf(fact_21__092_060open_062real_A_Icard_A_Idifferenceset_AV_AW_J_J_A_P_A_Isqrt_A_Ireal_A_Icard_AV_J_J_A_K_Asqrt_A_Ireal_A_Icard_AW_J_J_J_A_092_060le_062_Areal_A_Icard_A_Idifferenceset_AV_AU_J_J_A_P_A_Isqrt_A_Ireal_A_Icard_AU_J_J_A_K_Asqrt_A_Ireal_A_Icard_AV_J_J_J_A_K_Areal_A_Icard_A_Idifferenceset_AU_AW_J_J_A_P_A_Isqrt_A_Ireal_A_Icard_AU_J_J_A_K_Asqrt_A_Ireal_A_Icard_AW_J_J_J_092_060close_062, axiom, (ord_less_eq_real @ (divide_divide_real @ (semiri5074537144036343181t_real @ (finite_card_a @ (pluenn3038260743871226533mset_a @ g @ addition @ v @ (pluenn2534204936789923946sset_a @ g @ addition @ zero @ w)))) @ (times_times_real @ (sqrt @ (semiri5074537144036343181t_real @ (finite_card_a @ v))) @ (sqrt @ (semiri5074537144036343181t_real @ (finite_card_a @ w))))) @ (divide_divide_real @ (times_times_real @ (divide_divide_real @ (semiri5074537144036343181t_real @ (finite_card_a @ (pluenn3038260743871226533mset_a @ g @ addition @ v @ (pluenn2534204936789923946sset_a @ g @ addition @ zero @ u)))) @ (times_times_real @ (sqrt @ (semiri5074537144036343181t_real @ (finite_card_a @ u))) @ (sqrt @ (semiri5074537144036343181t_real @ (finite_card_a @ v))))) @ (semiri5074537144036343181t_real @ (finite_card_a @ (pluenn3038260743871226533mset_a @ g @ addition @ u @ (pluenn2534204936789923946sset_a @ g @ addition @ zero @ w))))) @ (times_times_real @ (sqrt @ (semiri5074537144036343181t_real @ (finite_card_a @ u))) @ (sqrt @ (semiri5074537144036343181t_real @ (finite_card_a @ w)))))), file('/export/starexec/sandbox/tmp/tmp.zIQjTRdTAi/Vampire---4.8_1631', fact_21__092_060open_062real_A_Icard_A_Idifferenceset_AV_AW_J_J_A_P_A_Isqrt_A_Ireal_A_Icard_AV_J_J_A_K_Asqrt_A_Ireal_A_Icard_AW_J_J_J_A_092_060le_062_Areal_A_Icard_A_Idifferenceset_AV_AU_J_J_A_P_A_Isqrt_A_Ireal_A_Icard_AU_J_J_A_K_Asqrt_A_Ireal_A_Icard_AV_J_J_J_A_K_Areal_A_Icard_A_Idifferenceset_AU_AW_J_J_A_P_A_Isqrt_A_Ireal_A_Icard_AU_J_J_A_K_Asqrt_A_Ireal_A_Icard_AW_J_J_J_092_060close_062)). 6.04/6.26 thf(c_0_9, plain, ![X5221:set_a, X5222:set_a]:(((pluenn5761198478017115492ance_a @ g @ addition @ zero @ X5221 @ X5222)=(divide_divide_real @ (semiri5074537144036343181t_real @ (finite_card_a @ (pluenn3038260743871226533mset_a @ g @ addition @ X5221 @ (pluenn2534204936789923946sset_a @ g @ addition @ zero @ X5222)))) @ (times_times_real @ (sqrt @ (semiri5074537144036343181t_real @ (finite_card_a @ X5221))) @ (sqrt @ (semiri5074537144036343181t_real @ (finite_card_a @ X5222))))))), inference(variable_rename,[status(thm)],[fact_42_Ruzsa__distance__def])). 6.04/6.26 thf(c_0_10, plain, ![X6443:real, X6444:real]:(((sqrt @ (times_times_real @ X6443 @ X6444))=(times_times_real @ (sqrt @ X6443) @ (sqrt @ X6444)))), inference(variable_rename,[status(thm)],[fact_496_real__sqrt__mult])). 6.04/6.26 thf(c_0_11, plain, ![X5506:nat, X5507:nat]:(((semiri5074537144036343181t_real @ (times_times_nat @ X5506 @ X5507))=(times_times_real @ (semiri5074537144036343181t_real @ X5506) @ (semiri5074537144036343181t_real @ X5507)))), inference(variable_rename,[status(thm)],[fact_118_of__nat__mult])). 6.04/6.26 thf(c_0_12, plain, ![X5076:nat, X5077:nat]:(((times_times_nat @ X5076 @ X5077)=(times_times_nat @ X5077 @ X5076))), inference(fof_simplification,[status(thm)],[inference(fof_simplification,[status(thm)],[fact_920_mult_Ocommute])])). 6.04/6.26 thf(c_0_13, plain, ![X5074:real, X5075:real]:(((times_times_real @ X5074 @ X5075)=(times_times_real @ X5075 @ X5074))), inference(fof_simplification,[status(thm)],[inference(fof_simplification,[status(thm)],[fact_919_mult_Ocommute])])). 6.04/6.26 thf(c_0_14, plain, ![X7:set_a, X8:set_a]:(((pluenn5761198478017115492ance_a @ g @ addition @ zero @ X7 @ X8)=(divide_divide_real @ (semiri5074537144036343181t_real @ (finite_card_a @ (pluenn3038260743871226533mset_a @ g @ addition @ X7 @ (pluenn2534204936789923946sset_a @ g @ addition @ zero @ X8)))) @ (times_times_real @ (sqrt @ (semiri5074537144036343181t_real @ (finite_card_a @ X7))) @ (sqrt @ (semiri5074537144036343181t_real @ (finite_card_a @ X8))))))), inference(split_conjunct,[status(thm)],[c_0_9])). 6.04/6.26 thf(c_0_15, plain, ![X27:real, X30:real]:(((sqrt @ (times_times_real @ X27 @ X30))=(times_times_real @ (sqrt @ X27) @ (sqrt @ X30)))), inference(split_conjunct,[status(thm)],[c_0_10])). 6.04/6.26 thf(c_0_16, plain, ![X87:nat, X88:nat]:(((semiri5074537144036343181t_real @ (times_times_nat @ X87 @ X88))=(times_times_real @ (semiri5074537144036343181t_real @ X87) @ (semiri5074537144036343181t_real @ X88)))), inference(split_conjunct,[status(thm)],[c_0_11])). 6.04/6.26 thf(c_0_17, plain, ![X7572:nat, X7573:nat]:(((times_times_nat @ X7572 @ X7573)=(times_times_nat @ X7573 @ X7572))), inference(variable_rename,[status(thm)],[c_0_12])). 6.04/6.26 thf(c_0_18, negated_conjecture, ~(ord_less_eq_real @ (pluenn5761198478017115492ance_a @ g @ addition @ zero @ v @ w) @ (times_times_real @ (pluenn5761198478017115492ance_a @ g @ addition @ zero @ v @ u) @ (pluenn5761198478017115492ance_a @ g @ addition @ zero @ u @ w))), inference(fof_simplification,[status(thm)],[inference(assume_negation,[status(cth)],[conj_0])])). 6.04/6.26 thf(c_0_19, plain, ![X7570:real, X7571:real]:(((times_times_real @ X7570 @ X7571)=(times_times_real @ X7571 @ X7570))), inference(variable_rename,[status(thm)],[c_0_13])). 6.04/6.26 thf(c_0_20, plain, ![X5199:set_a, X5200:set_a]:(((finite_card_a @ (pluenn3038260743871226533mset_a @ g @ addition @ X5199 @ (pluenn2534204936789923946sset_a @ g @ addition @ zero @ X5200)))=(finite_card_a @ (pluenn3038260743871226533mset_a @ g @ addition @ X5200 @ (pluenn2534204936789923946sset_a @ g @ addition @ zero @ X5199))))), inference(variable_rename,[status(thm)],[fact_28_card__differenceset__commute])). 6.04/6.26 thf(c_0_21, plain, ![X7:set_a, X8:set_a]:(((divide_divide_real @ (semiri5074537144036343181t_real @ (finite_card_a @ (pluenn3038260743871226533mset_a @ g @ addition @ X7 @ (pluenn2534204936789923946sset_a @ g @ addition @ zero @ X8)))) @ (sqrt @ (semiri5074537144036343181t_real @ (times_times_nat @ (finite_card_a @ X7) @ (finite_card_a @ X8)))))=(pluenn5761198478017115492ance_a @ g @ addition @ zero @ X7 @ X8))), inference(rw,[status(thm)],[inference(rw,[status(thm)],[c_0_14, c_0_15]), c_0_16])). 6.04/6.26 thf(c_0_22, plain, ![X88:nat, X87:nat]:(((times_times_nat @ X87 @ X88)=(times_times_nat @ X88 @ X87))), inference(split_conjunct,[status(thm)],[c_0_17])). 6.04/6.26 thf(c_0_23, plain, ![X5538:real, X5539:real, X5540:real]:(((times_times_real @ X5538 @ (divide_divide_real @ X5539 @ X5540))=(divide_divide_real @ (times_times_real @ X5538 @ X5539) @ X5540))), inference(variable_rename,[status(thm)],[fact_139_times__divide__eq__right])). 6.04/6.26 thf(c_0_24, negated_conjecture, ~((ord_less_eq_real @ (pluenn5761198478017115492ance_a @ g @ addition @ zero @ v @ w) @ (times_times_real @ (pluenn5761198478017115492ance_a @ g @ addition @ zero @ v @ u) @ (pluenn5761198478017115492ance_a @ g @ addition @ zero @ u @ w)))), inference(split_conjunct,[status(thm)],[c_0_18])). 6.04/6.26 thf(c_0_25, plain, ![X30:real, X27:real]:(((times_times_real @ X27 @ X30)=(times_times_real @ X30 @ X27))), inference(split_conjunct,[status(thm)],[c_0_19])). 6.04/6.26 thf(c_0_26, plain, ![X8:set_a, X7:set_a]:(((finite_card_a @ (pluenn3038260743871226533mset_a @ g @ addition @ X7 @ (pluenn2534204936789923946sset_a @ g @ addition @ zero @ X8)))=(finite_card_a @ (pluenn3038260743871226533mset_a @ g @ addition @ X8 @ (pluenn2534204936789923946sset_a @ g @ addition @ zero @ X7))))), inference(split_conjunct,[status(thm)],[c_0_20])). 6.04/6.26 thf(c_0_27, plain, ![X7:set_a, X8:set_a]:(((divide_divide_real @ (semiri5074537144036343181t_real @ (finite_card_a @ (pluenn3038260743871226533mset_a @ g @ addition @ X7 @ (pluenn2534204936789923946sset_a @ g @ addition @ zero @ X8)))) @ (sqrt @ (semiri5074537144036343181t_real @ (times_times_nat @ (finite_card_a @ X8) @ (finite_card_a @ X7)))))=(pluenn5761198478017115492ance_a @ g @ addition @ zero @ X7 @ X8))), inference(spm,[status(thm)],[c_0_21, c_0_22])). 6.04/6.26 thf(c_0_28, plain, (ord_less_eq_real @ (divide_divide_real @ (semiri5074537144036343181t_real @ (finite_card_a @ (pluenn3038260743871226533mset_a @ g @ addition @ v @ (pluenn2534204936789923946sset_a @ g @ addition @ zero @ w)))) @ (times_times_real @ (sqrt @ (semiri5074537144036343181t_real @ (finite_card_a @ v))) @ (sqrt @ (semiri5074537144036343181t_real @ (finite_card_a @ w))))) @ (divide_divide_real @ (times_times_real @ (divide_divide_real @ (semiri5074537144036343181t_real @ (finite_card_a @ (pluenn3038260743871226533mset_a @ g @ addition @ v @ (pluenn2534204936789923946sset_a @ g @ addition @ zero @ u)))) @ (times_times_real @ (sqrt @ (semiri5074537144036343181t_real @ (finite_card_a @ u))) @ (sqrt @ (semiri5074537144036343181t_real @ (finite_card_a @ v))))) @ (semiri5074537144036343181t_real @ (finite_card_a @ (pluenn3038260743871226533mset_a @ g @ addition @ u @ (pluenn2534204936789923946sset_a @ g @ addition @ zero @ w))))) @ (times_times_real @ (sqrt @ (semiri5074537144036343181t_real @ (finite_card_a @ u))) @ (sqrt @ (semiri5074537144036343181t_real @ (finite_card_a @ w)))))), inference(split_conjunct,[status(thm)],[fact_21__092_060open_062real_A_Icard_A_Idifferenceset_AV_AW_J_J_A_P_A_Isqrt_A_Ireal_A_Icard_AV_J_J_A_K_Asqrt_A_Ireal_A_Icard_AW_J_J_J_A_092_060le_062_Areal_A_Icard_A_Idifferenceset_AV_AU_J_J_A_P_A_Isqrt_A_Ireal_A_Icard_AU_J_J_A_K_Asqrt_A_Ireal_A_Icard_AV_J_J_J_A_K_Areal_A_Icard_A_Idifferenceset_AU_AW_J_J_A_P_A_Isqrt_A_Ireal_A_Icard_AU_J_J_A_K_Asqrt_A_Ireal_A_Icard_AW_J_J_J_092_060close_062])). 6.04/6.26 thf(c_0_29, plain, ![X27:real, X30:real, X37:real]:(((times_times_real @ X27 @ (divide_divide_real @ X30 @ X37))=(divide_divide_real @ (times_times_real @ X27 @ X30) @ X37))), inference(split_conjunct,[status(thm)],[c_0_23])). 6.04/6.26 thf(c_0_30, negated_conjecture, ~((ord_less_eq_real @ (pluenn5761198478017115492ance_a @ g @ addition @ zero @ v @ w) @ (times_times_real @ (pluenn5761198478017115492ance_a @ g @ addition @ zero @ u @ w) @ (pluenn5761198478017115492ance_a @ g @ addition @ zero @ v @ u)))), inference(rw,[status(thm)],[c_0_24, c_0_25])). 6.04/6.26 thf(c_0_31, plain, ![X8:set_a, X7:set_a]:(((pluenn5761198478017115492ance_a @ g @ addition @ zero @ X7 @ X8)=(pluenn5761198478017115492ance_a @ g @ addition @ zero @ X8 @ X7))), inference(rw,[status(thm)],[inference(spm,[status(thm)],[c_0_21, c_0_26]), c_0_27])). 6.04/6.26 thf(c_0_32, plain, (ord_less_eq_real @ (pluenn5761198478017115492ance_a @ g @ addition @ zero @ v @ w) @ (times_times_real @ (pluenn5761198478017115492ance_a @ g @ addition @ zero @ u @ v) @ (pluenn5761198478017115492ance_a @ g @ addition @ zero @ u @ w))), inference(rw,[status(thm)],[inference(rw,[status(thm)],[inference(rw,[status(thm)],[inference(rw,[status(thm)],[inference(rw,[status(thm)],[inference(rw,[status(thm)],[inference(rw,[status(thm)],[inference(rw,[status(thm)],[inference(rw,[status(thm)],[inference(rw,[status(thm)],[inference(rw,[status(thm)],[c_0_28, c_0_15]), c_0_16]), c_0_21]), c_0_26]), c_0_15]), c_0_16]), c_0_21]), c_0_15]), c_0_16]), c_0_29]), c_0_21])). 6.04/6.26 thf(c_0_33, negated_conjecture, ($false), inference(cn,[status(thm)],[inference(rw,[status(thm)],[inference(rw,[status(thm)],[inference(spm,[status(thm)],[c_0_30, c_0_31]), c_0_25]), c_0_32])]), ['proof']). 6.04/6.26 # SZS output end CNFRefutation 6.04/6.26 # Parsed axioms : 1361 6.04/6.26 # Removed by relevancy pruning/SinE : 0 6.04/6.26 # Initial clauses : 2373 6.04/6.26 # Removed in clause preprocessing : 164 6.04/6.26 # Initial clauses in saturation : 2209 6.04/6.26 # Processed clauses : 51372 6.04/6.26 # ...of these trivial : 3236 6.04/6.26 # ...subsumed : 39556 6.04/6.26 # ...remaining for further processing : 8579 6.04/6.26 # Other redundant clauses eliminated : 2013 6.04/6.26 # Clauses deleted for lack of memory : 0 6.04/6.26 # Backward-subsumed : 390 6.04/6.26 # Backward-rewritten : 121 6.04/6.26 # Generated clauses : 376405 6.04/6.26 # ...of the previous two non-redundant : 333167 6.04/6.26 # ...aggressively subsumed : 0 6.04/6.26 # Contextual simplify-reflections : 81 6.04/6.26 # Paramodulations : 374278 6.04/6.26 # Factorizations : 8 6.04/6.26 # NegExts : 1 6.04/6.26 # Equation resolutions : 2072 6.04/6.26 # Propositional unsat checks : 1 6.04/6.26 # Propositional check models : 0 6.04/6.26 # Propositional check unsatisfiable : 0 6.04/6.26 # Propositional clauses : 0 6.04/6.26 # Propositional clauses after purity: 0 6.04/6.26 # Propositional unsat core size : 0 6.04/6.26 # Propositional preprocessing time : 0.000 6.04/6.26 # Propositional encoding time : 0.069 6.04/6.26 # Propositional solver time : 0.038 6.04/6.26 # Success case prop preproc time : 0.000 6.04/6.26 # Success case prop encoding time : 0.000 6.04/6.26 # Success case prop solver time : 0.000 6.04/6.26 # Current number of processed clauses : 6376 6.04/6.26 # Positive orientable unit clauses : 601 6.04/6.26 # Positive unorientable unit clauses: 48 6.04/6.26 # Negative unit clauses : 340 6.04/6.26 # Non-unit-clauses : 5387 6.04/6.26 # Current number of unprocessed clauses: 284548 6.04/6.26 # ...number of literals in the above : 854707 6.04/6.26 # Current number of archived formulas : 0 6.04/6.26 # Current number of archived clauses : 2022 6.04/6.26 # Clause-clause subsumption calls (NU) : 7878867 6.04/6.26 # Rec. Clause-clause subsumption calls : 4455659 6.04/6.26 # Non-unit clause-clause subsumptions : 17692 6.04/6.26 # Unit Clause-clause subsumption calls : 503795 6.04/6.26 # Rewrite failures with RHS unbound : 0 6.04/6.26 # BW rewrite match attempts : 3888 6.04/6.26 # BW rewrite match successes : 574 6.04/6.26 # Condensation attempts : 0 6.04/6.26 # Condensation successes : 0 6.04/6.26 # Termbank termtop insertions : 6166039 6.04/6.26 6.04/6.26 # ------------------------------------------------- 6.04/6.26 # User time : 5.391 s 6.04/6.26 # System time : 0.169 s 6.04/6.26 # Total time : 5.560 s 6.04/6.26 # Maximum resident set size: 12072 pages 6.04/6.26 6.04/6.26 # ------------------------------------------------- 6.04/6.26 # User time : 5.450 s 6.04/6.26 # System time : 0.175 s 6.04/6.26 # Total time : 5.625 s 6.04/6.26 # Maximum resident set size: 4420 pages 6.04/6.26 EOF