0.07/0.09 % Problem : theBenchmark.p : TPTP v0.0.0. Released v0.0.0. 0.07/0.09 % Command : tptp2X_and_run_prover9 %d %s 0.09/0.28 % Computer : n032.cluster.edu 0.09/0.28 % Model : x86_64 x86_64 0.09/0.28 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz 0.09/0.28 % Memory : 8042.1875MB 0.09/0.28 % OS : Linux 3.10.0-693.el7.x86_64 0.09/0.28 % CPULimit : 960 0.09/0.28 % DateTime : Thu Jul 2 11:07:20 EDT 2020 0.09/0.28 % CPUTime : 0.65/0.93 ============================== Prover9 =============================== 0.65/0.93 Prover9 (32) version 2009-11A, November 2009. 0.65/0.93 Process 12522 was started by sandbox2 on n032.cluster.edu, 0.65/0.93 Thu Jul 2 11:07:21 2020 0.65/0.93 The command was "/export/starexec/sandbox2/solver/bin/prover9 -t 960 -f /tmp/Prover9_12359_n032.cluster.edu". 0.65/0.93 ============================== end of head =========================== 0.65/0.93 0.65/0.93 ============================== INPUT ================================= 0.65/0.93 0.65/0.93 % Reading from file /tmp/Prover9_12359_n032.cluster.edu 0.65/0.93 0.65/0.93 set(prolog_style_variables). 0.65/0.93 set(auto2). 0.65/0.93 % set(auto2) -> set(auto). 0.65/0.93 % set(auto) -> set(auto_inference). 0.65/0.93 % set(auto) -> set(auto_setup). 0.65/0.93 % set(auto_setup) -> set(predicate_elim). 0.65/0.93 % set(auto_setup) -> assign(eq_defs, unfold). 0.65/0.93 % set(auto) -> set(auto_limits). 0.65/0.93 % set(auto_limits) -> assign(max_weight, "100.000"). 0.65/0.93 % set(auto_limits) -> assign(sos_limit, 20000). 0.65/0.93 % set(auto) -> set(auto_denials). 0.65/0.93 % set(auto) -> set(auto_process). 0.65/0.93 % set(auto2) -> assign(new_constants, 1). 0.65/0.93 % set(auto2) -> assign(fold_denial_max, 3). 0.65/0.93 % set(auto2) -> assign(max_weight, "200.000"). 0.65/0.93 % set(auto2) -> assign(max_hours, 1). 0.65/0.93 % assign(max_hours, 1) -> assign(max_seconds, 3600). 0.65/0.93 % set(auto2) -> assign(max_seconds, 0). 0.65/0.93 % set(auto2) -> assign(max_minutes, 5). 0.65/0.93 % assign(max_minutes, 5) -> assign(max_seconds, 300). 0.65/0.93 % set(auto2) -> set(sort_initial_sos). 0.65/0.93 % set(auto2) -> assign(sos_limit, -1). 0.65/0.93 % set(auto2) -> assign(lrs_ticks, 3000). 0.65/0.93 % set(auto2) -> assign(max_megs, 400). 0.65/0.93 % set(auto2) -> assign(stats, some). 0.65/0.93 % set(auto2) -> clear(echo_input). 0.65/0.93 % set(auto2) -> set(quiet). 0.65/0.93 % set(auto2) -> clear(print_initial_clauses). 0.65/0.93 % set(auto2) -> clear(print_given). 0.65/0.93 assign(lrs_ticks,-1). 0.65/0.93 assign(sos_limit,10000). 0.65/0.93 assign(order,kbo). 0.65/0.93 set(lex_order_vars). 0.65/0.93 clear(print_given). 0.65/0.93 0.65/0.93 % formulas(sos). % not echoed (76 formulas) 0.65/0.93 0.65/0.93 ============================== end of input ========================== 0.65/0.93 0.65/0.93 % From the command line: assign(max_seconds, 960). 0.65/0.93 0.65/0.93 ============================== PROCESS NON-CLAUSAL FORMULAS ========== 0.65/0.93 0.65/0.93 % Formulas that are not ordinary clauses: 0.65/0.93 1 (all VAR_A_143 all VAR_R_144 (pred_attacker(tuple_T_in_3(VAR_A_143,constr_h(constr_xor(VAR_A_143,constr_xor(name_k0x30,name_ki))))) & pred_attacker(tuple_T_in_1(VAR_R_144)) -> pred_attacker(tuple_T_out_4(name_objective)))) # label(ax74) # label(axiom) # label(non_clause). [assumption]. 0.65/0.93 2 (all VAR_V_44 (pred_attacker(tuple_T_out_2(VAR_V_44)) -> pred_attacker(VAR_V_44))) # label(ax57) # label(axiom) # label(non_clause). [assumption]. 0.65/0.93 3 (all VAR_X_0X30 all VAR_Y_0X30 all VAR_Z_0X30 constr_xor(VAR_X_0X30,constr_xor(VAR_Y_0X30,VAR_Z_0X30)) = constr_xor(constr_xor(VAR_X_0X30,VAR_Y_0X30),VAR_Z_0X30)) # label(ax48) # label(axiom) # label(non_clause). [assumption]. 0.65/0.93 4 (all VAR_V_78 pred_attacker(name_new0x2Dname(VAR_V_78))) # label(ax72) # label(axiom) # label(non_clause). [assumption]. 0.65/0.93 5 (all VAR_V_33 (pred_attacker(VAR_V_33) -> pred_attacker(constr_h(VAR_V_33)))) # label(ax51) # label(axiom) # label(non_clause). [assumption]. 0.65/0.93 6 (all VAR_V_63 (pred_attacker(VAR_V_63) -> pred_attacker(tuple_T_in_1(VAR_V_63)))) # label(ax61) # label(axiom) # label(non_clause). [assumption]. 0.65/0.93 7 (all VAR_V_72 all VAR_V_73 (pred_mess(VAR_V_73,VAR_V_72) & pred_attacker(VAR_V_73) -> pred_attacker(VAR_V_72))) # label(ax68) # label(axiom) # label(non_clause). [assumption]. 0.65/0.93 8 (all VAR_V_56 all VAR_V_57 (pred_attacker(tuple_T_in_3(VAR_V_56,VAR_V_57)) -> pred_attacker(VAR_V_56))) # label(ax59) # label(axiom) # label(non_clause). [assumption]. 0.65/0.93 9 (all VAR_V_38 (pred_attacker(tuple_T_out_4(VAR_V_38)) -> pred_attacker(VAR_V_38))) # label(ax55) # label(axiom) # label(non_clause). [assumption]. 0.65/0.93 10 (all VAR_V_48 all VAR_V_49 (pred_attacker(VAR_V_49) & pred_attacker(VAR_V_48) -> pred_attacker(tuple_T_in_3(VAR_V_48,VAR_V_49)))) # label(ax58) # label(axiom) # label(non_clause). [assumption]. 0.65/0.93 11 (all VAR_V_35 (pred_attacker(VAR_V_35) -> pred_attacker(tuple_T_out_4(VAR_V_35)))) # label(ax54) # label(axiom) # label(non_clause). [assumption]. 0.65/0.93 12 (all VAR_X_9 constr_ 0.65/0.93 WARNING: denials share constants (see output). 0.65/0.93 0.65/0.94 xor(VAR_X_9,constr_ZERO) = VAR_X_9) # label(ax46) # label(axiom) # label(non_clause). [assumption]. 0.65/0.94 13 (all VAR_V_29 all VAR_V_30X30 (pred_attacker(VAR_V_29) & pred_attacker(VAR_V_30X30) -> pred_attacker(constr_xor(VAR_V_29,VAR_V_30X30)))) # label(ax49) # label(axiom) # label(non_clause). [assumption]. 0.65/0.94 14 (all VAR_X_10X30 constr_ZERO = constr_xor(VAR_X_10X30,VAR_X_10X30)) # label(ax45) # label(axiom) # label(non_clause). [assumption]. 0.65/0.94 15 (all VAR_V_41 (pred_attacker(VAR_V_41) -> pred_attacker(tuple_T_out_2(VAR_V_41)))) # label(ax56) # label(axiom) # label(non_clause). [assumption]. 0.65/0.94 16 (all VAR_V_66 (pred_attacker(tuple_T_in_1(VAR_V_66)) -> pred_attacker(VAR_V_66))) # label(ax62) # label(axiom) # label(non_clause). [assumption]. 0.65/0.94 17 (all VAR_R_10X308 (pred_attacker(tuple_T_in_1(VAR_R_10X308)) -> pred_attacker(tuple_T_out_2(constr_h(constr_xor(VAR_R_10X308,constr_xor(name_k0x30,name_ki))))))) # label(ax73) # label(axiom) # label(non_clause). [assumption]. 0.65/0.94 18 (all VAR_V_77 pred_equal(VAR_V_77,VAR_V_77)) # label(ax71) # label(axiom) # label(non_clause). [assumption]. 0.65/0.94 19 (all VAR_X_7 all VAR_Y_8 constr_xor(VAR_X_7,VAR_Y_8) = constr_xor(VAR_Y_8,VAR_X_7)) # label(ax47) # label(axiom) # label(non_clause). [assumption]. 0.65/0.94 20 (all VAR_V_74 all VAR_V_75 (pred_attacker(VAR_V_74) & pred_attacker(VAR_V_75) -> pred_mess(VAR_V_75,VAR_V_74))) # label(ax69) # label(axiom) # label(non_clause). [assumption]. 0.65/0.94 21 (all VAR_V_59 all VAR_V_60X30 (pred_attacker(tuple_T_in_3(VAR_V_59,VAR_V_60X30)) -> pred_attacker(VAR_V_60X30))) # label(ax60) # label(axiom) # label(non_clause). [assumption]. 0.65/0.94 0.65/0.94 ============================== end of process non-clausal formulas === 0.65/0.94 0.65/0.94 ============================== PROCESS INITIAL CLAUSES =============== 0.65/0.94 0.65/0.94 ============================== PREDICATE ELIMINATION ================= 0.65/0.94 22 -pred_attacker(A) | -pred_attacker(B) | pred_mess(B,A) # label(ax69) # label(axiom). [clausify(20)]. 0.65/0.94 23 -pred_mess(A,B) | -pred_attacker(A) | pred_attacker(B) # label(ax68) # label(axiom). [clausify(7)]. 0.65/0.94 0.65/0.94 ============================== end predicate elimination ============= 0.65/0.94 0.65/0.94 Auto_denials: 0.65/0.94 % copying label co0 to answer in negative clause 0.65/0.94 % copying label ax2 to answer in negative clause 0.65/0.94 % copying label ax13 to answer in negative clause 0.65/0.94 % copying label ax27 to answer in negative clause 0.65/0.94 % copying label ax35 to answer in negative clause 0.65/0.94 % copying label ax18 to answer in negative clause 0.65/0.94 % copying label ax21 to answer in negative clause 0.65/0.94 % copying label ax12 to answer in negative clause 0.65/0.94 % copying label ax7 to answer in negative clause 0.65/0.94 % copying label ax11 to answer in negative clause 0.65/0.94 % copying label ax41 to answer in negative clause 0.65/0.94 % copying label ax16 to answer in negative clause 0.65/0.94 % copying label ax36 to answer in negative clause 0.65/0.94 % copying label ax6 to answer in negative clause 0.65/0.94 % copying label ax40 to answer in negative clause 0.65/0.94 % copying label ax42 to answer in negative clause 0.65/0.94 % copying label ax14 to answer in negative clause 0.65/0.94 % copying label ax5 to answer in negative clause 0.65/0.94 % copying label ax37 to answer in negative clause 0.65/0.94 % copying label ax28 to answer in negative clause 0.65/0.94 % copying label ax26 to answer in negative clause 0.65/0.94 % copying label ax3 to answer in negative clause 0.65/0.94 % copying label ax20 to answer in negative clause 0.65/0.94 % copying label ax25 to answer in negative clause 0.65/0.94 % copying label ax9 to answer in negative clause 0.65/0.94 % copying label ax1 to answer in negative clause 0.65/0.94 % copying label ax8 to answer in negative clause 0.65/0.94 % copying label ax33 to answer in negative clause 0.65/0.94 % copying label ax24 to answer in negative clause 0.65/0.94 % copying label ax22 to answer in negative clause 0.65/0.94 % copying label ax19 to answer in negative clause 0.65/0.94 % copying label ax30 to answer in negative clause 0.65/0.94 % copying label ax0 to answer in negative clause 0.65/0.94 % copying label ax10 to answer in negative clause 0.65/0.94 % copying label ax31 to answer in negative clause 0.65/0.94 % copying label ax15 to answer in negative clause 0.65/0.94 % copying label ax39 to answer in negative clause 0.65/0.94 % copying label ax32 to answer in negative clause 0.65/0.94 % copying label ax44 to answer in negative clause 49.23/49.52 % copying label ax4 to answer in negative clause 49.23/49.52 % copying label ax34 to answer in negative clause 49.23/49.52 % copying label ax38 to answer in negative clause 49.23/49.52 % copying label ax29 to answer in negative clause 49.23/49.52 % copying label ax43 to answer in negative clause 49.23/49.52 % copying label ax17 to answer in negative clause 49.23/49.52 % copying label ax23 to answer in negative clause 49.23/49.52 % assign(max_proofs, 46). % (Horn set with more than one neg. clause) 49.23/49.52 49.23/49.52 WARNING, because some of the denials share constants, 49.23/49.52 some of the denials or their descendents may be subsumed, 49.23/49.52 preventing the target number of proofs from being found. 49.23/49.52 The shared constants are: name_ki, constr_CONST_4, constr_CONST_2, constr_ZERO, name_k0x30, constr_CONST_1, name_c, constr_CONST_0x30, constr_CONST_3, name_objective. 49.23/49.52 49.23/49.52 Term ordering decisions: 49.23/49.52 Function symbol KB weights: constr_ZERO=1. name_k0x30=1. name_ki=1. constr_CONST_0x30=1. constr_CONST_1=1. constr_CONST_2=1. constr_CONST_3=1. constr_CONST_4=1. name_c=1. name_objective=1. tuple_false=1. tuple_true=1. constr_xor=1. tuple_T_in_3=1. tuple_T_in_1=1. constr_h=1. tuple_T_out_2=1. tuple_T_out_4=1. name_new0x2Dname=1. 49.23/49.52 49.23/49.52 ============================== end of process initial clauses ======== 49.23/49.52 49.23/49.52 ============================== CLAUSES FOR SEARCH ==================== 49.23/49.52 49.23/49.52 ============================== end of clauses for search ============= 49.23/49.52 49.23/49.52 ============================== SEARCH ================================ 49.23/49.52 49.23/49.52 % Starting search at 0.01 seconds. 49.23/49.52 49.23/49.52 Low Water (keep): wt=7.000, iters=3570 49.23/49.52 49.23/49.52 Low Water (keep): wt=6.000, iters=3425 49.23/49.52 49.23/49.52 NOTE: Back_subsumption disabled, ratio of kept to back_subsumed is 1755 (0.00 of 0.69 sec). 49.23/49.52 49.23/49.52 ============================== PROOF ================================= 49.23/49.52 % SZS status Theorem 49.23/49.52 % SZS output start Refutation 49.23/49.52 49.23/49.52 % Proof 1 at 44.21 (+ 4.38) seconds: co0. 49.23/49.52 % Length of proof is 21. 49.23/49.52 % Level of proof is 6. 49.23/49.52 % Maximum clause weight is 15.000. 49.23/49.52 % Given clauses 2937. 49.23/49.52 49.23/49.52 1 (all VAR_A_143 all VAR_R_144 (pred_attacker(tuple_T_in_3(VAR_A_143,constr_h(constr_xor(VAR_A_143,constr_xor(name_k0x30,name_ki))))) & pred_attacker(tuple_T_in_1(VAR_R_144)) -> pred_attacker(tuple_T_out_4(name_objective)))) # label(ax74) # label(axiom) # label(non_clause). [assumption]. 49.23/49.52 2 (all VAR_V_44 (pred_attacker(tuple_T_out_2(VAR_V_44)) -> pred_attacker(VAR_V_44))) # label(ax57) # label(axiom) # label(non_clause). [assumption]. 49.23/49.52 6 (all VAR_V_63 (pred_attacker(VAR_V_63) -> pred_attacker(tuple_T_in_1(VAR_V_63)))) # label(ax61) # label(axiom) # label(non_clause). [assumption]. 49.23/49.52 9 (all VAR_V_38 (pred_attacker(tuple_T_out_4(VAR_V_38)) -> pred_attacker(VAR_V_38))) # label(ax55) # label(axiom) # label(non_clause). [assumption]. 49.23/49.52 10 (all VAR_V_48 all VAR_V_49 (pred_attacker(VAR_V_49) & pred_attacker(VAR_V_48) -> pred_attacker(tuple_T_in_3(VAR_V_48,VAR_V_49)))) # label(ax58) # label(axiom) # label(non_clause). [assumption]. 49.23/49.52 17 (all VAR_R_10X308 (pred_attacker(tuple_T_in_1(VAR_R_10X308)) -> pred_attacker(tuple_T_out_2(constr_h(constr_xor(VAR_R_10X308,constr_xor(name_k0x30,name_ki))))))) # label(ax73) # label(axiom) # label(non_clause). [assumption]. 49.23/49.52 32 pred_attacker(constr_ZERO) # label(ax53) # label(axiom). [assumption]. 49.23/49.52 39 -pred_attacker(name_objective) # label(co0) # label(negated_conjecture) # answer(co0). [assumption]. 49.23/49.52 111 -pred_attacker(tuple_T_out_2(A)) | pred_attacker(A) # label(ax57) # label(axiom). [clausify(2)]. 49.23/49.52 113 -pred_attacker(A) | pred_attacker(tuple_T_in_1(A)) # label(ax61) # label(axiom). [clausify(6)]. 49.23/49.52 114 -pred_attacker(tuple_T_out_4(A)) | pred_attacker(A) # label(ax55) # label(axiom). [clausify(9)]. 49.23/49.52 120 -pred_attacker(A) | -pred_attacker(B) | pred_attacker(tuple_T_in_3(B,A)) # label(ax58) # label(axiom). [clausify(10)]. 49.23/49.52 122 -pred_attacker(tuple_T_in_1(A)) | pred_attacker(tuple_T_out_2(constr_h(constr_xor(A,constr_xor(name_k0x30,name_ki))))) # label(ax73) # label(axiom). [clausify(17)]. 49.23/49.52 123 -pred_attacker(tuple_T_in_3(A,constr_h(constr_xor(A,constr_xor(name_k0x30,name_ki))))) | -pred_attacker(tuple_T_in_1(B)) | pred_attacker(tuple_T_out_4(name_objective)) # label(ax74) # label(axiom). [clausify(1)]. 49.25/49.56 137 pred_attacker(tuple_T_in_1(constr_ZERO)). [hyper(113,a,32,a)]. 49.25/49.56 146 -pred_attacker(tuple_T_out_4(name_objective)) # answer(co0). [ur(114,b,39,a)]. 49.25/49.56 874 pred_attacker(tuple_T_out_2(constr_h(constr_xor(constr_ZERO,constr_xor(name_k0x30,name_ki))))). [hyper(122,a,137,a)]. 49.25/49.56 941 -pred_attacker(tuple_T_in_3(A,constr_h(constr_xor(A,constr_xor(name_k0x30,name_ki))))) # answer(co0). [ur(123,b,137,a,c,146,a)]. 49.25/49.56 9346 -pred_attacker(constr_h(constr_xor(constr_ZERO,constr_xor(name_k0x30,name_ki)))) # answer(co0). [ur(120,b,32,a,c,941,a)]. 49.25/49.56 9358 -pred_attacker(tuple_T_out_2(constr_h(constr_xor(constr_ZERO,constr_xor(name_k0x30,name_ki))))) # answer(co0). [ur(111,b,9346,a)]. 49.25/49.56 9359 $F # answer(co0). [resolve(9358,a,874,a)]. 49.25/49.56 49.25/49.56 % SZS output end Refutation 49.25/49.56 ============================== end of proof ========================== 49.25/49.56 49.25/49.56 % Disable descendants (x means already disabled): 49.25/49.56 39 125 146 167 168 169 318 319 320 321 49.25/49.56 322 323 324 325 326 327 328 329 330 331 49.25/49.56 332 333 334 335 336 337 549 550 551 552 49.25/49.56 553 554 555 556 557 558 559 560 561 562 49.25/49.56 563 564 565 566 567 568 854 855 856 857 49.25/49.56 858 859 860 861 862 863 864 865 866 867 49.25/49.56 868 869 870 871 872 873 941 1242 1243 1244 49.25/49.56 1245 1246 1247 1248 1249 1250 1251 1252 1253 1254 49.25/49.56 1255 1256 1257 1258 1259 1260 1261 1702 1703 1704 49.25/49.56 1705 1706 1707 1708 1709 1710 1711 1712 1713 1714 49.25/49.56 1715 1716 1717 1718 1719 1720 1721 2235 2236 2237 49.25/49.56 2238 2239 2240 2241 2242 2243 2244 2245 2246 2247 49.25/49.56 2248 2249 2250 2251 2252 2253 2254 2840 2841 2842 49.25/49.56 2843 2844 2845 2846 2847 2848 2849 2850 2851 2852 49.25/49.56 2853 2854 2855 2856 2857 2858 2859 3524 3525 3526 49.25/49.56 3527 3528 3529 3530 3531 3532 3533 3534 3535 3536 49.25/49.56 3537 3538 3539 3540 3541 3542 3543 3898 3899 3900 49.25/49.56 3901 3902 3903 3904 3905 3906 3907 3908 3909 3910 49.25/49.56 3911 3912 3913 3914 3915 3916 3917 3934 3935 3936 49.25/49.56 3937 3938 3939 3940 3941 3942 3943 3944 3945 3946 49.25/49.56 3947 3948 3949 3950 3951 3952 3953 3970 3971 3972 49.25/49.56 3973 3974 3975 3976 3977 3978 3979 3980 3981 3982 49.25/49.56 3983 3984 3985 3986 3987 3988 3989 4006 4007 4008 49.25/49.56 4009 4010 4011 4012 4013 4014 4015 4016 4017 4018 49.25/49.56 4019 4020 4021 4022 4023 4024 4025 4042 4043 4044 49.25/49.56 4045 4046 4047 4048 4049 4050 4051 4052 4053 4054 49.25/49.56 4055 4056 4057 4058 4059 4060 4061 4078 4079 4080 49.25/49.56 4081 4082 4083 4084 4085 4086 4087 4088 4089 4090 49.25/49.56 4091 4092 4093 4094 4095 4096 4097 4114 4115 4116 49.25/49.56 4117 4118 4119 4120 4121 4122 4123 4124 4125 4126 49.25/49.56 4127 4128 4129 4130 4131 4132 4133 4150 4151 4152 49.25/49.56 4153 4154 4155 4156 4157 4158 4159 4160 4161 4162 49.25/49.56 4163 4164 4165 4166 4167 4168 4169 4186 4187 4188 49.25/49.56 4189 4190 4191 4192 4193 4194 4195 4196 4197 4198 49.25/49.56 4199 4200 4201 4202 4203 4204 4205 4222 4223 4224 49.25/49.56 4225 4226 4227 4228 4229 4230 4231 4232 4233 4234 49.25/49.56 4235 4236 4237 4238 4239 4240 4241 4258 4259 4260 49.25/49.56 4261 4262 4263 4264 4265 4266 4267 4268 4269 4270 49.25/49.56 4271 4272 4273 4274 4275 4276 4277 4294 4295 4296 49.25/49.56 4297 4298 4299 4300 4301 4302 4303 4304 4305 4306 49.25/49.56 4307 4308 4309 4310 4311 4312 4313 4330 4331 4332 49.25/49.56 4333 4334 4335 4336 4337 4338 4339 4340 4341 4342 49.25/49.56 4343 4344 4345 4346 4347 4348 4349 4366 4367 4368 49.25/49.56 4369 4370 4371 4372 4373 4374 4375 4376 4377 4378 49.25/49.56 4379 4380 4381 4382 4383 4384 4385 4402 4403 4404 49.25/49.56 4405 4406 4407 4408 4409 4410 4411 4412 4413 4414 49.25/49.56 4415 4416 4417 4418 4419 4420 4421 4438 4439 4440 49.25/49.56 4441 4442 4443 4444 4445 4446 4447 4448 4449 4450 49.25/49.56 4451 4452 4453 4454 4455 4456 4457 4474 4475 4476 49.25/49.56 4477 4478 4479 4480 4481 4482 4483 4484 4485 4486 49.25/49.56 4487 4488 4489 4490 4491 4492 4493 4510 4511 4512 49.25/49.56 4513 4514 4515 4516 4517 4518 4519 4520 4521 4522 49.25/49.56 4523 4524 4525 4526 4527 4528 4529 4546 4547 4548 49.25/49.56 4549 4550 4551 4552 4553 4554 4555 4556 4557 4558 49.25/49.56 4559 4560 4561 4562 4563 4564 4565 4582 4583 4584 49.25/49.56 4585 4586 4587 4588 4589 4590 4591 4592 4593 4594 49.25/49.56 4595 4596 4597 4598 4599 4600 4601 4622 4623 4624 49.25/49.56 4625 4626 4627 4628 4629 4630 4631 4632 4633 4634 49.25/49.56 4635 4636 4637 4638 4639 4640 4641 4658 4659 4660 49.25/49.56 4661 4662 4663 4664 4665 4666 4667 4668 4669 4670 49.25/49.56 4671 4672 4673 4674 4675 4676 4677 4694 4695 4696 49.25/49.56 4697 4698 4699 4700 4701 4702 4703 4704 4705 4706 49.25/49.56 4707 4708 4709 4710 4711 4712 4713 4730 4731 4732 49.25/49.56 4733 4734 4735 4736 4737 4738 4739 4740 4741 4742 49.25/49.56 4743 4744 4745 4746 4747 4748 4749 4766 4767 4768 49.25/49.56 4769 4770 4771 4772 4773 4774 4775 4776 4777 4778 49.25/49.56 4779 4780 4781 4782 4783 4784 4785 4802 4803 4804 49.25/49.56 4805 4806 4807 4808 4809 4810 4811 4812 4813 4814 49.25/49.56 4815 4816 4817 4818 4819 4820 4821 4838 4839 4840 49.25/49.56 4841 4842 4843 4844 4845 4846 4847 4848 4849 4850 49.25/49.56 4851 4852 4853 4854 4855 4856 4857 4874 4875 4876 49.25/49.56 4877 4878 4879 4880 4881 4882 4883 4884 4885 4886 49.25/49.56 4887 4888 4889 4890 4891 4892 4893 4910 4911 4912 49.25/49.56 4913 4914 4915 4916 4917 4918 4919 4920 4921 4922 49.25/49.56 4923 4924 4925 4926 4927 4928 4929 4946 4947 4948 49.25/49.56 4949 4950 4951 4952 4953 4954 4955 4956 4957 4958 49.25/49.56 4959 4960 4961 4962 4963 4964 4965 4982 4983 4984 49.25/49.56 4985 4986 4987 4988 4989 4990 4991 4992 4993 4994 49.25/49.56 4995 4996 4997 4998 4999 5000 5001 5018 5019 5020 49.25/49.56 5021 5022 5023 5024 5025 5026 5027 5028 5029 5030 49.25/49.56 5031 5032 5033 5034 5035 5036 5037 5038 5055 5056 49.25/49.56 5057 5058 5059 5060 5061 5062 5063 5064 5065 5066 49.25/49.56 5067 5068 5069 5070 5071 5072 5073 5074 5075 5092 49.25/49.56 5093 5094 5095 5096 5097 5098 5099 5100 5101 5102 49.25/49.56 5103 5104 5105 5106 5107 5108 5109 5110 5111 5128 49.25/49.56 5129 5130 5131 5132 5133 5134 5135 5136 5137 5138 49.25/49.56 5139 5140 5141 5142 5143 5144 5145 5146 5147 5164 49.25/49.56 5165 5166 5167 5168 5169 5170 5171 5172 5173 5174 49.25/49.56 5175 5176 5177 5178 5179 5180 5181 5182 5183 5200 49.25/49.56 5201 5202 5203 5204 5205 5206 5207 5208 5209 5210 49.25/49.56 5211 5212 5213 5214 5215 5216 5217 5218 5219 5236 49.25/49.56 5237 5238 5239 5240 5241 5242 5243 5244 5245 5246 49.25/49.56 5247 5248 5249 5250 5251 5252 5253 5254 5255 5272 49.25/49.56 5273 5274 5275 5276 5277 5278 5279 5280 5281 5282 49.25/49.56 5283 5284 5285 5286 5287 5288 5289 5290 5291 5308 49.25/49.56 5309 5310 5311 5312 5313 5314 5315 5316 5317 5318 49.25/49.56 5319 5320 5321 5322 5323 5324 5325 5326 5327 5344 49.25/49.56 5345 5346 5347 5348 5349 5350 5351 5352 5353 5354 49.25/49.56 5355 5356 5357 5358 5359 5360 5361 5362 5363 5380 49.25/49.56 5381 5382 5383 5384 5385 5386 5387 5388 5389 5390 49.25/49.56 5391 5392 5393 5394 5395 5396 5397 5398 5399 5416 49.25/49.56 5417 5418 5419 5420 5421 5422 5423 5424 5425 5426 49.25/49.56 5427 5428 5429 5430 5431 5432 5433 5434 5435 5452 49.25/49.56 5453 5454 5455 5456 5457 5458 5459 5460 5461 5462 49.25/49.56 5463 5464 5465 5466 5467 5468 5469 5470 5471 5488 49.25/49.56 5489 5490 5491 5492 5493 5494 5495 5496 5497 5498 49.25/49.56 5499 5500 5501 5502 5503 5504 5505 5506 5507 5524 49.25/49.56 5525 5526 5527 5528 5529 5530 5531 5532 5533 5534 49.25/49.56 5535 5536 5537 5538 5539 5540 5541 5542 5543 5560 49.25/49.56 5561 5562 5563 5564 5565 5566 5567 5568 5569 5570 49.25/49.56 5571 5572 5573 5574 5575 5576 5577 5578 5579 5596 49.25/49.56 5597 5598 5599 5600 5601 5602 5603 5604 5605 5606 49.25/49.56 5607 5608 5609 5610 5611 5612 5613 5614 5615 5632 49.25/49.56 5633 5634 5635 5636 5637 5638 5639 5640 5641 5642 49.25/49.56 5643 5644 5645 5646 5647 5648 5649 5650 5651 5668 49.25/49.56 5669 5670 5671 5672 5673 5674 5675 5676 5677 5678 49.25/49.56 5679 5680 5681 5682 5683 5684 5685 5686 5687 5704 49.25/49.56 5705 5706 5707 5708 5709 5710 5711 5712 5713 5714 49.25/49.56 5715 5716 5717 5718 5719 5720 5721 5722 5723 5740 49.25/49.56 5741 5742 5743 5744 5745 5746 5747 5748 5749 5750 49.25/49.56 5751 5752 5753 5754 5755 5756 5757 5758 5759 5776 49.25/49.56 5777 5778 5779 5780 5781 5782 5783 5784 5785 5786 49.25/49.56 5787 5788 5789 5790 5791 5792 5793 5794 5795 5812 49.25/49.56 5813 5814 5815 5816 5817 5818 5819 5820 5821 5822 49.25/49.56 5823 5824 5825 5826 5827 5828 5829 5830 5831 5848 49.25/49.56 5849 5850 5851 5852 5853 5854 5855 5856 5857 5858 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49.25/49.56 7635 7636 7637 7638 7639 7640 7641 7642 7643 7644 49.25/49.56 7645 7646 7647 7648 7649 7650 7651 7652 7653 7654 49.25/49.56 7655 7656 7657 7658 7659 7660 7661 7662 7663 7664 49.25/49.56 7665 7666 7667 7668 7669 7670 7671 7672 7673 7674 49.25/49.56 7675 7676 7677 7678 7679 7680 7681 7682 7683 7684 49.25/49.56 7685 7686 7687 7688 7689 7690 7691 7692 7693 7694 49.25/49.56 7695 7696 7697 7698 7699 7700 7701 7702 7703 7704 49.25/49.56 7705 7706 7707 7708 7709 7710 7711 7712 7713 7714 49.25/49.56 7715 7716 7717 7718 7719 7720 7721 7722 7723 7724 49.25/49.56 7725 7726 7727 7728 7729 7730 7731 7732 7733 7734 49.25/49.56 7735 7736 7737 7738 7739 7740 7741 7742 7743 7744 49.25/49.56 7745 7746 7747 7748 7749 7750 7751 7752 7753 7754 49.25/49.56 7755 7756 7757 7758 7759 7760 7761 7762 7763 7764 49.25/49.56 7765 7766 7767 7768 7769 7770 7771 7772 7773 7774 49.25/49.56 7775 7776 7777 7778 7779 7780 7781 7782 7783 7784 49.25/49.56 7785 7786 7787 7788 7789 7790 7791 7792 7793 7794 49.25/49.56 7795 7796 7797 7798 7799 7800 7801 7802 7803 7804 49.25/49.56 7805 7806 7807 7808 7809 7810 7811 7812 7813 7814 49.25/49.56 7815 7816 7817 7818 7819 7820 7821 7822 7823 7824 49.25/49.56 7825 7826 7827 7828 7829 7830 7831 7832 7833 7834 49.25/49.56 7835 7836 7837 7838 7839 7840 7841 7842 7843 7844 49.25/49.56 7845 7846 7847 7848 7849 7850 7851 7852 7853 7854 49.25/49.56 7855 7856 7857 7858 7859 7860 7861 7862 7863 7864 49.25/49.56 7865 7866 7867 7868 7869 7870 7871 7872 7873 7874 49.25/49.56 7875 7876 7877 7878 7879 7880 7881 7882 7883 7884 49.25/49.56 7885 7886 7887 7888 7889 7890 7891 7892 7893 7894 49.25/49.56 7895 7896 7897 7898 7899 7900 7901 7902 7903 7904 49.25/49.56 7905 7906 7907 7908 7909 7910 7911 7912 7913 7914 49.25/49.56 7915 7916 7917 7918 7919 7920 7921 7922 7923 7924 49.25/49.56 7925 7926 7927 7928 7929 7930 7931 7932 7933 7934 49.25/49.56 7935 7936 7937 7938 7939 7940 7941 7942 7943 7944 49.25/49.56 7945 7946 7947 7948 7949 7950 7951 7952 7953 7954 49.25/49.56 7955 7956 7957 7958 7959 7960 7961 7962 7963 7964 49.25/49.56 7965 7966 7967 7968 7969 7970 7971 7972 7973 7974 49.25/49.56 7975 7976 7977 7978 7979 7980 7981 7982 7983 7984 49.25/49.56 7985 7986 7987 7988 7989 7990 7991 7992 7993 7994 49.25/49.56 7995 7996 7997 7998 7999 8000 8001 8002 8003 8004 49.25/49.56 8005 8006 8007 8008 8009 8010 8011 8012 8013 8014 49.25/49.56 8015 8016 8017 8018 8019 8020 8021 8022 8023 8024 49.25/49.56 8025 8026 8027 8028 8029 8030 8031 8032 8033 8034 49.25/49.56 8035 8036 8037 8038 8039 8040 8041 8042 8043 8044 49.25/49.56 8045 8046 8047 8048 8049 8050 8051 8052 8053 8054 49.25/49.56 8055 8056 8057 8058 8059 8060 8061 8062 8063 8064 49.25/49.56 8065 8066 8067 8068 8069 8070 8071 8072 8073 8074 49.25/49.56 8075 8076 8077 8078 8079 8080 8081 8082 8083 8084 49.25/49.56 8085 8086 8087 8088 8089 8090 8091 8092 8093 8094 49.25/49.56 8095 8096 8097 8098 8099 8100 8101 8102 8103 8104 49.25/49.56 8105 8106 8107 8108 8109 8110 8111 8112 8113 8114 49.25/49.56 8115 8116 8117 8118 8119 8120 8121 8122 8123 8124 49.25/49.56 8125 8126 8127 8128 8129 8130 8131 8132 8133 8134 49.25/49.56 8135 8136 8137 8138 8139 8140 8141 8142 8143 8144 49.25/49.56 8145 8146 8147 8148 8149 8150 8151 8152 8153 8154 49.25/49.56 8155 8156 8157 8158 8159 8160 8161 8162 8163 8164 49.25/49.56 8165 8166 8167 8168 8169 8170 8171 8172 8173 8174 49.25/49.56 8175 8176 8177 8178 8179 8180 8181 8182 8183 8184 49.25/49.56 8185 8186 8187 8188 8189 8190 8191 8192 8193 8194 49.25/49.56 8195 8196 8197 8198 8199 8200 8201 8202 8203 8204 49.25/49.56 8205 8206 8207 8208 8209 8210 8211 8212 8213 8214 49.25/49.56 8215 8216 8217 8218 8219 8220 8221 8222 8223 8224 49.25/49.56 8225 8226 8227 8228 8229 8230 8231 8232 8233 8234 49.25/49.56 8235 8236 8237 8238 8239 8240 8241 8242 8243 8244 49.25/49.56 8245 8246 8247 8248 8249 8250 8251 8252 8253 8254 49.25/49.56 8255 8256 8257 8258 8259 8260 8261 8262 8263 8264 49.25/49.56 8265 8266 8267 8268 8269 8270 8271 8272 8273 8274 49.25/49.56 8275 8276 8277 8278 8279 8280 8281 8282 8283 8284 49.25/49.56 8285 8286 8287 8288 8289 8290 8291 8292 8293 8294 49.25/49.56 8295 8296 8297 8298 8299 8300 8301 8302 8303 8304 49.25/49.56 8305 8306 8307 8308 8309 8310 8311 8312 8313 8314 49.25/49.56 8315 8316 8317 8318 8319 8320 8321 8322 8323 8324 49.25/49.56 8325 8326 8327 8328 8329 8330 8331 8332 8333 8334 49.25/49.56 8335 8336 8337 8338 8339 8340 8341 8342 8343 8344 49.25/49.56 8345 8346 8347 8348 8349 8350 8351 8352 8353 8354 49.25/49.56 8355 8356 8357 8358 8359 8360 8361 8362 8363 8364 49.25/49.56 8365 8366 8367 8368 8369 8370 8371 8372 8373 8374 49.25/49.56 8375 8376 8377 8378 8379 8380 8381 8382 8383 8384 49.25/49.56 8385 8386 8387 8388 8389 8390 8391 8392 8393 8394 49.25/49.56 8395 8396 8397 8398 8399 8400 8401 8402 8403 8404 49.25/49.56 8405 8406 8407 8408 8409 8410 8411 8412 8413 8414 49.25/49.56 8415 8416 8417 8418 8419 8420 8421 8422 8423 8424 49.25/49.56 8425 8426 8427 8428 8429 8430 8431 8432 8433 8434 49.25/49.56 8435 8436 8437 8438 8439 8440 8441 8442 8443 8444 49.25/49.56 8445 8446 8447 8448 8449 8450 8451 8452 8453 8454 49.25/49.56 8455 8456 8457 8458 8459 8460 8461 8462 8463 8464 49.25/49.56 8465 8466 8467 8468 8469 8470 8471 8472 8473 8474 49.25/49.56 8475 8476 8477 8478 8479 8480 8481 8482 8483 8484 49.25/49.56 8485 8486 8487 8488 8489 8490 8491 8492 8493 8494 49.25/49.56 8495 8496 8497 8498 8499 8500 8501 8502 8503 8504 49.25/49.56 8505 8506 8507 8508 8509 8510 8511 8512 8513 8514 49.25/49.56 8515 8516 8517 8518 8519 8520 8521 8522 8523 8524 49.25/49.56 8525 8526 8527 8528 8529 8530 8531 8532 8533 8534 49.25/49.56 8535 8536 8537 8538 8539 8540 8541 8542 8543 8544 49.25/49.56 8545 8546 8547 8548 8549 8550 8551 8552 8553 8554 49.25/49.56 8555 8556 8557 8558 8559 8560 8561 8562 8563 8564 49.25/49.56 8565 8566 8567 8568 8569 8570 8571 8572 8573 8574 49.25/49.56 8575 8576 8577 8578 8579 8580 8581 8582 8583 8584 49.25/49.56 8585 8586 8587 8588 8589 8590 8591 8592 8593 8594 49.25/49.56 8595 8596 8597 8598 8599 8600 8601 8602 8603 8604 49.25/49.56 8605 8606 8607 8608 8609 8610 8611 8612 8613 8614 49.25/49.56 8615 8616 8617 8618 8619 8620 8621 8622 8623 8624 49.25/49.56 8625 8626 8627 8628 8629 8630 8631 86Alarm clock 119.69/120.02 Prover9 interrupted 119.69/120.02 EOF