0.07/0.12 % Problem : theBenchmark.p : TPTP v0.0.0. Released v0.0.0. 0.07/0.12 % Command : run_E /export/starexec/sandbox2/benchmark/theBenchmark.p 240 THM 0.12/0.33 % Computer : n023.cluster.edu 0.12/0.33 % Model : x86_64 x86_64 0.12/0.33 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz 0.12/0.33 % Memory : 8042.1875MB 0.12/0.33 % OS : Linux 3.10.0-693.el7.x86_64 0.12/0.33 % CPULimit : 1920 0.12/0.33 % WCLimit : 240 0.12/0.33 % DateTime : Wed Jul 30 04:53:19 EDT 2025 0.12/0.33 % CPUTime : 0.20/0.48 Running higher-order theorem proving 0.20/0.49 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=8 --cpu-limit=240 /export/starexec/sandbox2/tmp/tmp.hQ1kIfDYPf/E---3.1_4152.p 44.07/6.06 # Version: 3.0.0-ho 44.07/6.06 # partial match(1): HSSSSLSSSLMNHSA 44.07/6.06 # Preprocessing class: HSSSSLSSMLMNHSA. 44.07/6.06 # Scheduled 4 strats onto 8 cores with 240 seconds (1920 total) 44.07/6.06 # Starting new_ho_10 with 1200s (5) cores 44.07/6.06 # Starting new_ho_7 with 240s (1) cores 44.07/6.06 # Starting lpo8_lambda_fix with 240s (1) cores 44.07/6.06 # Starting lpo9_lambda_fix with 240s (1) cores 44.07/6.06 # new_ho_10 with pid 4230 completed with status 0 44.07/6.06 # Result found by new_ho_10 44.07/6.06 # partial match(1): HSSSSLSSSLMNHSA 44.07/6.06 # Preprocessing class: HSSSSLSSMLMNHSA. 44.07/6.06 # Scheduled 4 strats onto 8 cores with 240 seconds (1920 total) 44.07/6.06 # Starting new_ho_10 with 1200s (5) cores 44.07/6.06 # No SInE strategy applied 44.07/6.06 # Search class: HGHSF-FFSF22-SHSSMSBN 44.07/6.06 # partial match(2): HGHNF-FFSF22-SHSSMMBN 44.07/6.06 # Scheduled 5 strats onto 5 cores with 1200 seconds (1200 total) 44.07/6.06 # Starting new_ho_10 with 721s (1) cores 44.07/6.06 # Starting sh5l with 121s (1) cores 44.07/6.06 # Starting new_bool_1 with 121s (1) cores 44.07/6.06 # Starting new_bool_2 with 121s (1) cores 44.07/6.06 # Starting ehoh_best_sine_rwall with 116s (1) cores 44.07/6.06 # new_ho_10 with pid 4237 completed with status 0 44.07/6.06 # Result found by new_ho_10 44.07/6.06 # partial match(1): HSSSSLSSSLMNHSA 44.07/6.06 # Preprocessing class: HSSSSLSSMLMNHSA. 44.07/6.06 # Scheduled 4 strats onto 8 cores with 240 seconds (1920 total) 44.07/6.06 # Starting new_ho_10 with 1200s (5) cores 44.07/6.06 # No SInE strategy applied 44.07/6.06 # Search class: HGHSF-FFSF22-SHSSMSBN 44.07/6.06 # partial match(2): HGHNF-FFSF22-SHSSMMBN 44.07/6.06 # Scheduled 5 strats onto 5 cores with 1200 seconds (1200 total) 44.07/6.06 # Starting new_ho_10 with 721s (1) cores 44.07/6.06 # Preprocessing time : 0.001 s 44.07/6.06 # Presaturation interreduction done 44.07/6.06 44.07/6.06 # Proof found! 44.07/6.06 # SZS status Theorem 44.07/6.06 # SZS output start CNFRefutation 44.07/6.06 thf(decl_23, type, in: $i > $i > $o). 44.07/6.06 thf(decl_24, type, emptyset: $i). 44.07/6.06 thf(decl_25, type, setadjoin: $i > $i > $i). 44.07/6.06 thf(decl_26, type, dsetconstr: $i > ($i > $o) > $i). 44.07/6.06 thf(decl_27, type, dsetconstrI: $o). 44.07/6.06 thf(decl_28, type, dsetconstrEL: $o). 44.07/6.06 thf(decl_29, type, dsetconstrER: $o). 44.07/6.06 thf(decl_30, type, setext: $o). 44.07/6.06 thf(decl_31, type, uniqinunit: $o). 44.07/6.06 thf(decl_32, type, eqinunit: $o). 44.07/6.06 thf(decl_33, type, singleton: $i > $o). 44.07/6.06 thf(decl_34, type, ex1: $i > ($i > $o) > $o). 44.07/6.06 thf(decl_35, type, esk1_2: $i > $i > $i). 44.07/6.06 thf(decl_36, type, esk2_2: $i > $i > $i). 44.07/6.06 thf(decl_37, type, esk3_0: $i). 44.07/6.06 thf(decl_38, type, epred1_0: $i > $o). 44.07/6.06 thf(decl_39, type, esk4_0: $i). 44.07/6.06 thf(ex1, axiom, ((ex1)=(^[X1:$i, X2:$i > $o]:((singleton @ (dsetconstr @ X1 @ (^[X3:$i]:((X2 @ X3)))))))), file('/export/starexec/sandbox2/tmp/tmp.hQ1kIfDYPf/E---3.1_4152.p', ex1)). 44.07/6.06 thf(singleton, axiom, ((singleton)=(^[X1:$i]:(?[X3:$i]:(((in @ X3 @ X1)&((X1)=(setadjoin @ X3 @ emptyset))))))), file('/export/starexec/sandbox2/tmp/tmp.hQ1kIfDYPf/E---3.1_4152.p', singleton)). 44.07/6.06 thf(dsetconstrI, axiom, ((dsetconstrI)<=>![X1:$i, X2:$i > $o, X3:$i]:(((in @ X3 @ X1)=>((X2 @ X3)=>(in @ X3 @ (dsetconstr @ X1 @ (^[X4:$i]:((X2 @ X4))))))))), file('/export/starexec/sandbox2/tmp/tmp.hQ1kIfDYPf/E---3.1_4152.p', dsetconstrI)). 44.07/6.06 thf(dsetconstrEL, axiom, ((dsetconstrEL)<=>![X1:$i, X2:$i > $o, X3:$i]:(((in @ X3 @ (dsetconstr @ X1 @ (^[X4:$i]:((X2 @ X4)))))=>(in @ X3 @ X1)))), file('/export/starexec/sandbox2/tmp/tmp.hQ1kIfDYPf/E---3.1_4152.p', dsetconstrEL)). 44.07/6.06 thf(dsetconstrER, axiom, ((dsetconstrER)<=>![X1:$i, X2:$i > $o, X3:$i]:(((in @ X3 @ (dsetconstr @ X1 @ (^[X4:$i]:((X2 @ X4)))))=>(X2 @ X3)))), file('/export/starexec/sandbox2/tmp/tmp.hQ1kIfDYPf/E---3.1_4152.p', dsetconstrER)). 44.07/6.06 thf(ex1I, conjecture, (((dsetconstrEL)=>((dsetconstrER)=>((setext)=>((uniqinunit)=>(![X1:$i, X2:$i > $o, X3:$i]:((((![X4:$i]:((((X2 @ X4)=>((X4)=(X3)))<=(in @ X4 @ X1)))=>(ex1 @ X1 @ (^[X4:$i]:((X2 @ X4)))))<=(X2 @ X3))<=(in @ X3 @ X1)))<=(eqinunit))))))<=(dsetconstrI)), file('/export/starexec/sandbox2/tmp/tmp.hQ1kIfDYPf/E---3.1_4152.p', ex1I)). 44.07/6.06 thf(setext, axiom, ((setext)<=>![X1:$i, X5:$i]:((![X3:$i]:(((in @ X3 @ X1)=>(in @ X3 @ X5)))=>(![X3:$i]:(((in @ X3 @ X5)=>(in @ X3 @ X1)))=>((X1)=(X5)))))), file('/export/starexec/sandbox2/tmp/tmp.hQ1kIfDYPf/E---3.1_4152.p', setext)). 44.07/6.06 thf(uniqinunit, axiom, ((uniqinunit)<=>![X3:$i, X4:$i]:(((in @ X3 @ (setadjoin @ X4 @ emptyset))=>((X3)=(X4))))), file('/export/starexec/sandbox2/tmp/tmp.hQ1kIfDYPf/E---3.1_4152.p', uniqinunit)). 44.07/6.06 thf(eqinunit, axiom, ((eqinunit)<=>![X3:$i, X4:$i]:((((X3)=(X4))=>(in @ X3 @ (setadjoin @ X4 @ emptyset))))), file('/export/starexec/sandbox2/tmp/tmp.hQ1kIfDYPf/E---3.1_4152.p', eqinunit)). 44.07/6.06 thf(c_0_9, plain, ((ex1)=(^[Z0/* 19 */:$i, Z1:$i > $o]:((?[X27:$i]:(((in @ X27 @ (dsetconstr @ Z0 @ (^[Z2/* 3 */:$i]:((Z1 @ Z2)))))&((dsetconstr @ Z0 @ (^[Z2/* 3 */:$i]:((Z1 @ Z2))))=(setadjoin @ X27 @ emptyset)))))))), inference(fof_simplification,[status(thm)],[ex1])). 44.07/6.06 thf(c_0_10, plain, ((singleton)=(^[Z0/* 5 */:$i]:(?[X3:$i]:(((in @ X3 @ Z0)&((Z0)=(setadjoin @ X3 @ emptyset))))))), inference(fof_simplification,[status(thm)],[singleton])). 44.07/6.06 thf(c_0_11, plain, ((dsetconstrI)<=>![X1:$i, X2:$i > $o, X3:$i]:(((in @ X3 @ X1)=>((X2 @ X3)=>(in @ X3 @ (dsetconstr @ X1 @ (^[Z0/* 3 */:$i]:((X2 @ Z0))))))))), inference(fof_simplification,[status(thm)],[dsetconstrI])). 44.07/6.06 thf(c_0_12, plain, ((dsetconstrEL)<=>![X1:$i, X2:$i > $o, X3:$i]:(((in @ X3 @ (dsetconstr @ X1 @ (^[Z0/* 3 */:$i]:((X2 @ Z0)))))=>(in @ X3 @ X1)))), inference(fof_simplification,[status(thm)],[dsetconstrEL])). 44.07/6.06 thf(c_0_13, plain, ((dsetconstrER)<=>![X1:$i, X2:$i > $o, X3:$i]:(((in @ X3 @ (dsetconstr @ X1 @ (^[Z0/* 3 */:$i]:((X2 @ Z0)))))=>(X2 @ X3)))), inference(fof_simplification,[status(thm)],[dsetconstrER])). 44.07/6.06 thf(c_0_14, plain, ((ex1)=(^[Z0/* 19 */:$i, Z1:$i > $o]:((?[X27:$i]:(((in @ X27 @ (dsetconstr @ Z0 @ (^[Z2/* 3 */:$i]:((Z1 @ Z2)))))&((dsetconstr @ Z0 @ (^[Z2/* 3 */:$i]:((Z1 @ Z2))))=(setadjoin @ X27 @ emptyset)))))))), inference(apply_def,[status(thm)],[c_0_9, c_0_10])). 44.07/6.06 thf(c_0_15, negated_conjecture, ~((![X43:$i, X44:$i > $o, X45:$i]:(((in @ X45 @ X43)=>((X44 @ X45)=>(in @ X45 @ (dsetconstr @ X43 @ X44)))))=>(![X28:$i, X29:$i > $o, X30:$i]:(((in @ X30 @ (dsetconstr @ X28 @ X29))=>(in @ X30 @ X28)))=>(![X31:$i, X32:$i > $o, X33:$i]:(((in @ X33 @ (dsetconstr @ X31 @ X32))=>(X32 @ X33)))=>(![X34:$i, X35:$i]:((![X36:$i]:(((in @ X36 @ X34)=>(in @ X36 @ X35)))=>(![X37:$i]:(((in @ X37 @ X35)=>(in @ X37 @ X34)))=>((X34)=(X35)))))=>(![X38:$i, X39:$i]:(((in @ X38 @ (setadjoin @ X39 @ emptyset))=>((X38)=(X39))))=>(![X41:$i, X42:$i]:((((X41)=(X42))=>(in @ X41 @ (setadjoin @ X42 @ emptyset))))=>![X1:$i, X2:$i > $o, X3:$i]:(((in @ X3 @ X1)=>((X2 @ X3)=>(![X4:$i]:(((in @ X4 @ X1)=>((X2 @ X4)=>((X4)=(X3)))))=>?[X40:$i]:(((in @ X40 @ (dsetconstr @ X1 @ X2))&((dsetconstr @ X1 @ X2)=(setadjoin @ X40 @ emptyset))))))))))))))), inference(fof_simplification,[status(thm)],[inference(fool_unroll,[status(thm)],[inference(apply_def,[status(thm)],[inference(apply_def,[status(thm)],[inference(apply_def,[status(thm)],[inference(apply_def,[status(thm)],[inference(apply_def,[status(thm)],[inference(apply_def,[status(thm)],[inference(apply_def,[status(thm)],[inference(fof_simplification,[status(thm)],[inference(assume_negation,[status(cth)],[ex1I])]), c_0_11]), c_0_12]), c_0_13]), setext]), uniqinunit]), eqinunit]), c_0_14])])])). 44.07/6.06 thf(c_0_16, negated_conjecture, ![X46:$i, X47:$i > $o, X48:$i, X49:$i, X50:$i > $o, X51:$i, X52:$i, X53:$i > $o, X54:$i, X55:$i, X56:$i, X59:$i, X60:$i, X61:$i, X62:$i, X66:$i, X67:$i]:(((~(in @ X48 @ X46)|(~(X47 @ X48)|(in @ X48 @ (dsetconstr @ X46 @ X47))))&((~(in @ X51 @ (dsetconstr @ X49 @ X50))|(in @ X51 @ X49))&((~(in @ X54 @ (dsetconstr @ X52 @ X53))|(X53 @ X54))&(((((in @ (esk2_2 @ X55 @ X56) @ X56)|((X55)=(X56))|(in @ (esk1_2 @ X55 @ X56) @ X55))&(~(in @ (esk2_2 @ X55 @ X56) @ X55)|((X55)=(X56))|(in @ (esk1_2 @ X55 @ X56) @ X55)))&(((in @ (esk2_2 @ X55 @ X56) @ X56)|((X55)=(X56))|~(in @ (esk1_2 @ X55 @ X56) @ X56))&(~(in @ (esk2_2 @ X55 @ X56) @ X55)|((X55)=(X56))|~(in @ (esk1_2 @ X55 @ X56) @ X56))))&((~(in @ X59 @ (setadjoin @ X60 @ emptyset))|((X59)=(X60)))&((((X61)!=(X62))|(in @ X61 @ (setadjoin @ X62 @ emptyset)))&((in @ esk4_0 @ esk3_0)&((epred1_0 @ esk4_0)&((~(in @ X66 @ esk3_0)|(~(epred1_0 @ X66)|((X66)=(esk4_0))))&(~(in @ X67 @ (dsetconstr @ esk3_0 @ epred1_0))|((dsetconstr @ esk3_0 @ epred1_0)!=(setadjoin @ X67 @ emptyset))))))))))))), inference(distribute,[status(thm)],[inference(fof_nnf,[status(thm)],[inference(shift_quantors,[status(thm)],[inference(skolemize,[status(esa)],[inference(variable_rename,[status(thm)],[inference(fof_nnf,[status(thm)],[c_0_15])])])])])])). 44.07/6.06 thf(c_0_17, negated_conjecture, ![X1:$i, X3:$i, X2:$i > $o]:(((in @ X1 @ X3)|~((in @ X1 @ (dsetconstr @ X3 @ X2))))), inference(split_conjunct,[status(thm)],[c_0_16])). 44.07/6.06 thf(c_0_18, negated_conjecture, ![X3:$i, X1:$i]:(((in @ (esk2_2 @ X1 @ X3) @ X3)|((X1)=(X3))|(in @ (esk1_2 @ X1 @ X3) @ X1))), inference(split_conjunct,[status(thm)],[c_0_16])). 44.07/6.06 thf(c_0_19, negated_conjecture, ![X3:$i, X1:$i]:((((X1)=(X3))|(in @ (esk1_2 @ X1 @ X3) @ X1)|~((in @ (esk2_2 @ X1 @ X3) @ X1)))), inference(split_conjunct,[status(thm)],[c_0_16])). 44.07/6.06 thf(c_0_20, negated_conjecture, ![X1:$i, X2:$i > $o, X3:$i]:((((X1)=(dsetconstr @ X3 @ X2))|(in @ (esk1_2 @ X1 @ (dsetconstr @ X3 @ X2)) @ X1)|(in @ (esk2_2 @ X1 @ (dsetconstr @ X3 @ X2)) @ X3))), inference(spm,[status(thm)],[c_0_17, c_0_18])). 44.07/6.06 thf(c_0_21, negated_conjecture, ![X1:$i, X3:$i]:(((in @ (esk2_2 @ X1 @ X3) @ X3)|((X1)=(X3))|~((in @ (esk1_2 @ X1 @ X3) @ X3)))), inference(split_conjunct,[status(thm)],[c_0_16])). 44.07/6.07 thf(c_0_22, negated_conjecture, ![X2:$i > $o, X1:$i]:((((dsetconstr @ X1 @ X2)=(X1))|(in @ (esk1_2 @ X1 @ (dsetconstr @ X1 @ X2)) @ X1))), inference(spm,[status(thm)],[c_0_19, c_0_20])). 44.07/6.07 thf(c_0_23, negated_conjecture, ![X1:$i, X3:$i]:((((X1)=(X3))|~((in @ X1 @ (setadjoin @ X3 @ emptyset))))), inference(split_conjunct,[status(thm)],[c_0_16])). 44.07/6.07 thf(c_0_24, negated_conjecture, ![X1:$i, X3:$i, X2:$i > $o]:((((X1)=(dsetconstr @ X3 @ X2))|(in @ (esk2_2 @ X1 @ (dsetconstr @ X3 @ X2)) @ X3)|~((in @ (esk1_2 @ X1 @ (dsetconstr @ X3 @ X2)) @ (dsetconstr @ X3 @ X2))))), inference(spm,[status(thm)],[c_0_17, c_0_21])). 44.07/6.07 thf(c_0_25, negated_conjecture, ![X3:$i, X2:$i > $o, X1:$i]:(((in @ X1 @ (dsetconstr @ X3 @ X2))|~((in @ X1 @ X3))|~((X2 @ X1)))), inference(split_conjunct,[status(thm)],[c_0_16])). 44.07/6.07 thf(c_0_26, negated_conjecture, ![X1:$i, X3:$i]:(((in @ X1 @ (setadjoin @ X3 @ emptyset))|((X1)!=(X3)))), inference(split_conjunct,[status(thm)],[c_0_16])). 44.07/6.07 thf(c_0_27, negated_conjecture, ![X7:$i > $o, X2:$i > $o, X1:$i]:((((dsetconstr @ (dsetconstr @ X1 @ X2) @ X7)=(dsetconstr @ X1 @ X2))|(in @ (esk1_2 @ (dsetconstr @ X1 @ X2) @ (dsetconstr @ (dsetconstr @ X1 @ X2) @ X7)) @ X1))), inference(spm,[status(thm)],[c_0_17, c_0_22])). 44.07/6.07 thf(c_0_28, negated_conjecture, ![X1:$i, X3:$i]:((((X1)=(X3))|~((in @ (esk2_2 @ X1 @ X3) @ X1))|~((in @ (esk1_2 @ X1 @ X3) @ X3)))), inference(split_conjunct,[status(thm)],[c_0_16])). 44.07/6.07 thf(c_0_29, negated_conjecture, ![X2:$i > $o, X1:$i]:((((esk1_2 @ (setadjoin @ X1 @ emptyset) @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2))=(X1))|((dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2)=(setadjoin @ X1 @ emptyset)))), inference(spm,[status(thm)],[c_0_23, c_0_22])). 44.07/6.07 thf(c_0_30, negated_conjecture, ![X1:$i, X3:$i, X2:$i > $o]:((((X1)=(dsetconstr @ X3 @ X2))|(in @ (esk2_2 @ X1 @ (dsetconstr @ X3 @ X2)) @ X3)|~((in @ (esk1_2 @ X1 @ (dsetconstr @ X3 @ X2)) @ X3))|~((X2 @ (esk1_2 @ X1 @ (dsetconstr @ X3 @ X2)))))), inference(spm,[status(thm)],[c_0_24, c_0_25])). 44.07/6.07 thf(c_0_31, negated_conjecture, ![X1:$i]:((in @ X1 @ (setadjoin @ X1 @ emptyset))), inference(er,[status(thm)],[c_0_26])). 44.07/6.07 thf(c_0_32, negated_conjecture, ![X1:$i, X2:$i > $o, X3:$i]:((((dsetconstr @ X1 @ X2)=(X3))|(in @ (esk1_2 @ (dsetconstr @ X1 @ X2) @ X3) @ (dsetconstr @ X1 @ X2))|~((in @ (esk2_2 @ (dsetconstr @ X1 @ X2) @ X3) @ X1))|~((X2 @ (esk2_2 @ (dsetconstr @ X1 @ X2) @ X3))))), inference(spm,[status(thm)],[c_0_19, c_0_25])). 44.07/6.07 thf(c_0_33, negated_conjecture, ![X3:$i, X2:$i > $o, X1:$i]:((((esk2_2 @ X1 @ (dsetconstr @ (setadjoin @ X3 @ emptyset) @ X2))=(X3))|((X1)=(dsetconstr @ (setadjoin @ X3 @ emptyset) @ X2))|(in @ (esk1_2 @ X1 @ (dsetconstr @ (setadjoin @ X3 @ emptyset) @ X2)) @ X1))), inference(spm,[status(thm)],[c_0_23, c_0_20])). 44.07/6.07 thf(c_0_34, negated_conjecture, ![X1:$i, X7:$i > $o, X2:$i > $o]:((((esk1_2 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2) @ (dsetconstr @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2) @ X7))=(X1))|((dsetconstr @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2) @ X7)=(dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2)))), inference(spm,[status(thm)],[c_0_23, c_0_27])). 44.07/6.07 thf(c_0_35, negated_conjecture, ![X1:$i, X2:$i > $o]:((((dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2)=(setadjoin @ X1 @ emptyset))|~((in @ (esk2_2 @ (setadjoin @ X1 @ emptyset) @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2)) @ (setadjoin @ X1 @ emptyset)))|~((in @ X1 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2))))), inference(spm,[status(thm)],[c_0_28, c_0_29])). 44.07/6.07 thf(c_0_36, negated_conjecture, ![X2:$i > $o, X1:$i]:((((dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2)=(setadjoin @ X1 @ emptyset))|(in @ (esk2_2 @ (setadjoin @ X1 @ emptyset) @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2)) @ (setadjoin @ X1 @ emptyset))|~((X2 @ X1)))), inference(cn,[status(thm)],[inference(rw,[status(thm)],[inference(spm,[status(thm)],[c_0_30, c_0_29]), c_0_31])])). 44.07/6.07 thf(c_0_37, negated_conjecture, ![X1:$i, X3:$i, X2:$i > $o]:(((X2 @ X1)|~((in @ X1 @ (dsetconstr @ X3 @ X2))))), inference(split_conjunct,[status(thm)],[c_0_16])). 44.07/6.07 thf(c_0_38, negated_conjecture, ![X1:$i, X2:$i > $o, X3:$i]:((((dsetconstr @ X1 @ X2)=(X3))|(in @ (esk1_2 @ (dsetconstr @ X1 @ X2) @ X3) @ X1)|~((in @ (esk2_2 @ (dsetconstr @ X1 @ X2) @ X3) @ X1))|~((X2 @ (esk2_2 @ (dsetconstr @ X1 @ X2) @ X3))))), inference(spm,[status(thm)],[c_0_17, c_0_32])). 44.07/6.07 thf(c_0_39, negated_conjecture, ![X2:$i > $o, X7:$i > $o, X3:$i, X1:$i]:((((dsetconstr @ X1 @ X2)=(dsetconstr @ X3 @ X7))|(in @ (esk2_2 @ (dsetconstr @ X1 @ X2) @ (dsetconstr @ X3 @ X7)) @ X3)|(in @ (esk1_2 @ (dsetconstr @ X1 @ X2) @ (dsetconstr @ X3 @ X7)) @ X1))), inference(spm,[status(thm)],[c_0_17, c_0_20])). 44.07/6.07 thf(c_0_40, negated_conjecture, ![X2:$i > $o, X7:$i > $o, X3:$i, X1:$i]:((((esk2_2 @ (dsetconstr @ X1 @ X2) @ (dsetconstr @ (setadjoin @ X3 @ emptyset) @ X7))=(X3))|((dsetconstr @ X1 @ X2)=(dsetconstr @ (setadjoin @ X3 @ emptyset) @ X7))|(in @ (esk1_2 @ (dsetconstr @ X1 @ X2) @ (dsetconstr @ (setadjoin @ X3 @ emptyset) @ X7)) @ X1))), inference(spm,[status(thm)],[c_0_17, c_0_33])). 44.07/6.07 thf(c_0_41, negated_conjecture, ![X1:$i, X7:$i > $o, X2:$i > $o]:((((dsetconstr @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2) @ X7)=(dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2))|(in @ X1 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2)))), inference(spm,[status(thm)],[c_0_22, c_0_34])). 44.07/6.07 thf(c_0_42, negated_conjecture, ![X1:$i]:((((X1)=(esk4_0))|~((in @ X1 @ esk3_0))|~((epred1_0 @ X1)))), inference(split_conjunct,[status(thm)],[c_0_16])). 44.07/6.07 thf(c_0_43, negated_conjecture, ![X1:$i, X2:$i > $o]:((((dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2)=(setadjoin @ X1 @ emptyset))|~((in @ X1 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2))))), inference(csr,[status(thm)],[inference(spm,[status(thm)],[c_0_35, c_0_36]), c_0_37])). 44.07/6.07 thf(c_0_44, negated_conjecture, ![X1:$i, X2:$i > $o, X7:$i > $o]:((((dsetconstr @ X1 @ X2)=(dsetconstr @ X1 @ X7))|(in @ (esk1_2 @ (dsetconstr @ X1 @ X2) @ (dsetconstr @ X1 @ X7)) @ X1)|~((X2 @ (esk2_2 @ (dsetconstr @ X1 @ X2) @ (dsetconstr @ X1 @ X7)))))), inference(spm,[status(thm)],[c_0_38, c_0_39])). 44.07/6.07 thf(c_0_45, negated_conjecture, ![X1:$i, X2:$i > $o, X3:$i, X7:$i > $o]:((((esk2_2 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2) @ (dsetconstr @ (setadjoin @ X3 @ emptyset) @ X7))=(X3))|((esk1_2 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2) @ (dsetconstr @ (setadjoin @ X3 @ emptyset) @ X7))=(X1))|((dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2)=(dsetconstr @ (setadjoin @ X3 @ emptyset) @ X7)))), inference(spm,[status(thm)],[c_0_23, c_0_40])). 44.07/6.07 thf(c_0_46, negated_conjecture, ![X1:$i, X7:$i > $o, X3:$i, X2:$i > $o]:(((in @ X1 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2))|(X7 @ X3)|~((in @ X3 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2))))), inference(spm,[status(thm)],[c_0_37, c_0_41])). 44.07/6.07 thf(c_0_47, negated_conjecture, ![X1:$i, X2:$i > $o]:((((esk2_2 @ X1 @ (dsetconstr @ esk3_0 @ X2))=(esk4_0))|((X1)=(dsetconstr @ esk3_0 @ X2))|(in @ (esk1_2 @ X1 @ (dsetconstr @ esk3_0 @ X2)) @ X1)|~((epred1_0 @ (esk2_2 @ X1 @ (dsetconstr @ esk3_0 @ X2)))))), inference(spm,[status(thm)],[c_0_42, c_0_20])). 44.07/6.07 thf(c_0_48, negated_conjecture, ![X3:$i, X2:$i > $o, X1:$i]:((((dsetconstr @ X1 @ X2)=(X3))|(in @ (esk2_2 @ (dsetconstr @ X1 @ X2) @ X3) @ X3)|(in @ (esk1_2 @ (dsetconstr @ X1 @ X2) @ X3) @ X1))), inference(spm,[status(thm)],[c_0_17, c_0_18])). 44.07/6.07 thf(c_0_49, negated_conjecture, ![X2:$i > $o, X1:$i]:((((dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2)=(setadjoin @ X1 @ emptyset))|~((X2 @ X1)))), inference(cn,[status(thm)],[inference(rw,[status(thm)],[inference(spm,[status(thm)],[c_0_43, c_0_25]), c_0_31])])). 44.07/6.07 thf(c_0_50, negated_conjecture, ![X7:$i > $o, X2:$i > $o, X1:$i]:((((esk1_2 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2) @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X7))=(X1))|((dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2)=(dsetconstr @ (setadjoin @ X1 @ emptyset) @ X7))|~((X2 @ X1)))), inference(csr,[status(thm)],[inference(spm,[status(thm)],[c_0_44, c_0_45]), c_0_23])). 44.07/6.07 thf(c_0_51, negated_conjecture, ![X1:$i, X2:$i > $o, X7:$i > $o, X3:$i]:(((in @ X1 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2))|(X7 @ X3)|~((in @ X3 @ (setadjoin @ X1 @ emptyset)))|~((X2 @ X3)))), inference(spm,[status(thm)],[c_0_46, c_0_25])). 44.07/6.07 thf(c_0_52, negated_conjecture, ![X1:$i, X2:$i > $o, X7:$i > $o]:((((esk2_2 @ (dsetconstr @ X1 @ X2) @ (dsetconstr @ esk3_0 @ X7))=(esk4_0))|((dsetconstr @ X1 @ X2)=(dsetconstr @ esk3_0 @ X7))|(in @ (esk1_2 @ (dsetconstr @ X1 @ X2) @ (dsetconstr @ esk3_0 @ X7)) @ X1)|~((epred1_0 @ (esk2_2 @ (dsetconstr @ X1 @ X2) @ (dsetconstr @ esk3_0 @ X7)))))), inference(spm,[status(thm)],[c_0_17, c_0_47])). 44.07/6.07 thf(c_0_53, negated_conjecture, ![X1:$i, X2:$i > $o, X3:$i]:((((esk1_2 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2) @ X3)=(X1))|((dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2)=(X3))|(in @ (esk2_2 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2) @ X3) @ X3))), inference(spm,[status(thm)],[c_0_23, c_0_48])). 44.07/6.07 thf(c_0_54, negated_conjecture, ![X1:$i, X2:$i > $o, X3:$i]:(((X2 @ X1)|~((in @ X1 @ (setadjoin @ X3 @ emptyset)))|~((X2 @ X3)))), inference(spm,[status(thm)],[c_0_37, c_0_49])). 44.07/6.07 thf(c_0_55, negated_conjecture, ![X7:$i > $o, X2:$i > $o, X1:$i]:((((dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2)=(dsetconstr @ (setadjoin @ X1 @ emptyset) @ X7))|(in @ (esk2_2 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2) @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X7)) @ (setadjoin @ X1 @ emptyset))|(in @ X1 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2))|~((X2 @ X1)))), inference(spm,[status(thm)],[c_0_20, c_0_50])). 44.07/6.07 thf(c_0_56, negated_conjecture, ![X7:$i > $o, X2:$i > $o, X1:$i]:(((in @ X1 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2))|(X7 @ X1)|~((X2 @ X1)))), inference(spm,[status(thm)],[c_0_51, c_0_31])). 44.07/6.07 thf(c_0_57, negated_conjecture, ![X1:$i, X2:$i > $o, X7:$i > $o]:((((esk2_2 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2) @ (dsetconstr @ esk3_0 @ X7))=(esk4_0))|((esk1_2 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2) @ (dsetconstr @ esk3_0 @ X7))=(X1))|((dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2)=(dsetconstr @ esk3_0 @ X7))|~((epred1_0 @ (esk2_2 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2) @ (dsetconstr @ esk3_0 @ X7)))))), inference(spm,[status(thm)],[c_0_23, c_0_52])). 44.07/6.07 thf(c_0_58, negated_conjecture, ![X1:$i, X2:$i > $o, X3:$i, X7:$i > $o]:((((esk1_2 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2) @ (dsetconstr @ X3 @ X7))=(X1))|((dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2)=(dsetconstr @ X3 @ X7))|(X7 @ (esk2_2 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2) @ (dsetconstr @ X3 @ X7))))), inference(spm,[status(thm)],[c_0_37, c_0_53])). 44.07/6.07 thf(c_0_59, negated_conjecture, ![X7:$i > $o, X2:$i > $o, X1:$i]:((((dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2)=(dsetconstr @ (setadjoin @ X1 @ emptyset) @ X7))|(in @ X1 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2))|~((X2 @ X1)))), inference(csr,[status(thm)],[inference(csr,[status(thm)],[inference(spm,[status(thm)],[c_0_32, c_0_50]), c_0_54]), c_0_55])). 44.07/6.07 thf(c_0_60, negated_conjecture, (epred1_0 @ esk4_0), inference(split_conjunct,[status(thm)],[c_0_16])). 44.07/6.07 thf(c_0_61, negated_conjecture, ![X1:$i, X2:$i > $o, X7:$i > $o, X3:$i]:(((in @ (dsetconstr @ X1 @ X2) @ (dsetconstr @ (setadjoin @ (dsetconstr @ X1 @ X2) @ emptyset) @ (in @ X3)))|(X7 @ (dsetconstr @ X1 @ X2))|~((in @ X3 @ X1))|~((X2 @ X3)))), inference(spm,[status(thm)],[c_0_56, c_0_25])). 44.07/6.07 thf(c_0_62, negated_conjecture, (in @ esk4_0 @ esk3_0), inference(split_conjunct,[status(thm)],[c_0_16])). 44.07/6.07 thf(c_0_63, negated_conjecture, ![X1:$i, X3:$i]:((((esk1_2 @ (setadjoin @ X1 @ emptyset) @ X3)=(X1))|((setadjoin @ X1 @ emptyset)=(X3))|(in @ (esk2_2 @ (setadjoin @ X1 @ emptyset) @ X3) @ X3))), inference(spm,[status(thm)],[c_0_23, c_0_18])). 44.07/6.07 thf(c_0_64, negated_conjecture, ![X1:$i, X2:$i > $o]:((((esk2_2 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2) @ (dsetconstr @ esk3_0 @ epred1_0))=(esk4_0))|((esk1_2 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2) @ (dsetconstr @ esk3_0 @ epred1_0))=(X1))|((dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2)=(dsetconstr @ esk3_0 @ epred1_0)))), inference(spm,[status(thm)],[c_0_57, c_0_58])). 44.07/6.07 thf(c_0_65, negated_conjecture, ![X2:$i > $o]:((((dsetconstr @ (setadjoin @ esk4_0 @ emptyset) @ epred1_0)=(dsetconstr @ (setadjoin @ esk4_0 @ emptyset) @ X2))|(in @ esk4_0 @ (dsetconstr @ (setadjoin @ esk4_0 @ emptyset) @ epred1_0)))), inference(spm,[status(thm)],[c_0_59, c_0_60])). 44.07/6.07 thf(c_0_66, negated_conjecture, ![X2:$i > $o]:(((in @ esk4_0 @ (dsetconstr @ (setadjoin @ esk4_0 @ emptyset) @ epred1_0))|(X2 @ esk4_0))), inference(spm,[status(thm)],[c_0_56, c_0_60])). 44.07/6.07 thf(c_0_67, negated_conjecture, ![X7:$i > $o, X2:$i > $o]:(((in @ (dsetconstr @ esk3_0 @ X2) @ (dsetconstr @ (setadjoin @ (dsetconstr @ esk3_0 @ X2) @ emptyset) @ (in @ esk4_0)))|(X7 @ (dsetconstr @ esk3_0 @ X2))|~((X2 @ esk4_0)))), inference(spm,[status(thm)],[c_0_61, c_0_62])). 44.07/6.07 thf(c_0_68, negated_conjecture, ![X1:$i, X2:$i > $o]:((((esk2_2 @ (setadjoin @ X1 @ emptyset) @ (dsetconstr @ esk3_0 @ X2))=(esk4_0))|((esk1_2 @ (setadjoin @ X1 @ emptyset) @ (dsetconstr @ esk3_0 @ X2))=(X1))|((setadjoin @ X1 @ emptyset)=(dsetconstr @ esk3_0 @ X2))|~((epred1_0 @ (esk2_2 @ (setadjoin @ X1 @ emptyset) @ (dsetconstr @ esk3_0 @ X2)))))), inference(spm,[status(thm)],[c_0_23, c_0_47])). 44.07/6.07 thf(c_0_69, negated_conjecture, ![X1:$i, X3:$i, X2:$i > $o]:((((esk1_2 @ (setadjoin @ X1 @ emptyset) @ (dsetconstr @ X3 @ X2))=(X1))|((setadjoin @ X1 @ emptyset)=(dsetconstr @ X3 @ X2))|(X2 @ (esk2_2 @ (setadjoin @ X1 @ emptyset) @ (dsetconstr @ X3 @ X2))))), inference(spm,[status(thm)],[c_0_37, c_0_63])). 44.07/6.07 thf(c_0_70, negated_conjecture, ![X1:$i, X2:$i > $o]:((((esk1_2 @ (dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2) @ (dsetconstr @ esk3_0 @ epred1_0))=(X1))|((dsetconstr @ (setadjoin @ X1 @ emptyset) @ X2)=(dsetconstr @ esk3_0 @ epred1_0))|~((in @ esk4_0 @ (setadjoin @ X1 @ emptyset)))|~((X2 @ esk4_0)))), inference(csr,[status(thm)],[inference(spm,[status(thm)],[c_0_38, c_0_64]), c_0_23])). 44.07/6.07 thf(c_0_71, negated_conjecture, ((dsetconstr @ (setadjoin @ esk4_0 @ emptyset) @ epred1_0)=(setadjoin @ esk4_0 @ emptyset)), inference(csr,[status(thm)],[inference(csr,[status(thm)],[inference(spm,[status(thm)],[c_0_49, c_0_65]), c_0_66]), c_0_43])). 44.07/6.07 thf(c_0_72, negated_conjecture, ![X2:$i > $o]:(((in @ (dsetconstr @ esk3_0 @ epred1_0) @ (dsetconstr @ (setadjoin @ (dsetconstr @ esk3_0 @ epred1_0) @ emptyset) @ (in @ esk4_0)))|(X2 @ (dsetconstr @ esk3_0 @ epred1_0)))), inference(spm,[status(thm)],[c_0_67, c_0_60])). 44.07/6.07 thf(c_0_73, negated_conjecture, ![X1:$i]:((((esk2_2 @ (setadjoin @ X1 @ emptyset) @ (dsetconstr @ esk3_0 @ epred1_0))=(esk4_0))|((esk1_2 @ (setadjoin @ X1 @ emptyset) @ (dsetconstr @ esk3_0 @ epred1_0))=(X1))|((setadjoin @ X1 @ emptyset)=(dsetconstr @ esk3_0 @ epred1_0)))), inference(spm,[status(thm)],[c_0_68, c_0_69])). 44.07/6.07 thf(c_0_74, negated_conjecture, (((esk1_2 @ (setadjoin @ esk4_0 @ emptyset) @ (dsetconstr @ esk3_0 @ epred1_0))=(esk4_0))|((setadjoin @ esk4_0 @ emptyset)=(dsetconstr @ esk3_0 @ epred1_0))), inference(cn,[status(thm)],[inference(rw,[status(thm)],[inference(rw,[status(thm)],[inference(spm,[status(thm)],[c_0_70, c_0_71]), c_0_31]), c_0_60])])). 44.07/6.07 thf(c_0_75, negated_conjecture, (in @ esk4_0 @ (dsetconstr @ esk3_0 @ epred1_0)), inference(condense,[status(thm)],[inference(spm,[status(thm)],[c_0_37, c_0_72])])). 44.07/6.07 thf(c_0_76, negated_conjecture, ![X1:$i, X3:$i, X2:$i > $o]:((((X1)=(dsetconstr @ X3 @ X2))|(X2 @ (esk2_2 @ X1 @ (dsetconstr @ X3 @ X2)))|~((in @ (esk1_2 @ X1 @ (dsetconstr @ X3 @ X2)) @ (dsetconstr @ X3 @ X2))))), inference(spm,[status(thm)],[c_0_37, c_0_21])). 44.07/6.07 thf(c_0_77, negated_conjecture, ![X1:$i]:((((esk1_2 @ (setadjoin @ X1 @ emptyset) @ (dsetconstr @ esk3_0 @ epred1_0))=(X1))|((setadjoin @ X1 @ emptyset)=(dsetconstr @ esk3_0 @ epred1_0))|~((in @ esk4_0 @ (setadjoin @ X1 @ emptyset))))), inference(csr,[status(thm)],[inference(spm,[status(thm)],[c_0_19, c_0_73]), c_0_23])). 44.07/6.07 thf(c_0_78, negated_conjecture, ![X1:$i]:((~((in @ X1 @ (dsetconstr @ esk3_0 @ epred1_0)))|((dsetconstr @ esk3_0 @ epred1_0)!=(setadjoin @ X1 @ emptyset)))), inference(split_conjunct,[status(thm)],[c_0_16])). 44.07/6.07 thf(c_0_79, negated_conjecture, (((setadjoin @ esk4_0 @ emptyset)=(dsetconstr @ esk3_0 @ epred1_0))|(in @ (esk2_2 @ (setadjoin @ esk4_0 @ emptyset) @ (dsetconstr @ esk3_0 @ epred1_0)) @ esk3_0)), inference(cn,[status(thm)],[inference(rw,[status(thm)],[inference(spm,[status(thm)],[c_0_24, c_0_74]), c_0_75])])). 44.07/6.07 thf(c_0_80, negated_conjecture, (((setadjoin @ esk4_0 @ emptyset)=(dsetconstr @ esk3_0 @ epred1_0))|(epred1_0 @ (esk2_2 @ (setadjoin @ esk4_0 @ emptyset) @ (dsetconstr @ esk3_0 @ epred1_0)))), inference(cn,[status(thm)],[inference(rw,[status(thm)],[inference(spm,[status(thm)],[c_0_76, c_0_74]), c_0_75])])). 44.07/6.07 thf(c_0_81, negated_conjecture, ![X1:$i]:((~((in @ (esk2_2 @ (setadjoin @ X1 @ emptyset) @ (dsetconstr @ esk3_0 @ epred1_0)) @ (setadjoin @ X1 @ emptyset)))|~((in @ X1 @ (dsetconstr @ esk3_0 @ epred1_0)))|~((in @ esk4_0 @ (setadjoin @ X1 @ emptyset))))), inference(csr,[status(thm)],[inference(spm,[status(thm)],[c_0_28, c_0_77]), c_0_78])). 44.07/6.07 thf(c_0_82, negated_conjecture, (((esk2_2 @ (setadjoin @ esk4_0 @ emptyset) @ (dsetconstr @ esk3_0 @ epred1_0))=(esk4_0))|((setadjoin @ esk4_0 @ emptyset)=(dsetconstr @ esk3_0 @ epred1_0))), inference(csr,[status(thm)],[inference(spm,[status(thm)],[c_0_42, c_0_79]), c_0_80])). 44.07/6.07 thf(c_0_83, negated_conjecture, ((setadjoin @ esk4_0 @ emptyset)=(dsetconstr @ esk3_0 @ epred1_0)), inference(cn,[status(thm)],[inference(rw,[status(thm)],[inference(rw,[status(thm)],[inference(spm,[status(thm)],[c_0_81, c_0_82]), c_0_31]), c_0_75])])). 44.07/6.07 thf(c_0_84, negated_conjecture, ($false), inference(cn,[status(thm)],[inference(rw,[status(thm)],[inference(spm,[status(thm)],[c_0_78, c_0_83]), c_0_75])]), ['proof']). 44.07/6.07 # SZS output end CNFRefutation 44.07/6.07 # Parsed axioms : 21 44.07/6.07 # Removed by relevancy pruning/SinE : 0 44.07/6.07 # Initial clauses : 25 44.07/6.07 # Removed in clause preprocessing : 12 44.07/6.07 # Initial clauses in saturation : 13 44.07/6.07 # Processed clauses : 5630 44.07/6.07 # ...of these trivial : 24 44.07/6.07 # ...subsumed : 3828 44.07/6.07 # ...remaining for further processing : 1778 44.07/6.07 # Other redundant clauses eliminated : 24 44.07/6.07 # Clauses deleted for lack of memory : 0 44.07/6.07 # Backward-subsumed : 226 44.07/6.07 # Backward-rewritten : 288 44.07/6.07 # Generated clauses : 188893 44.07/6.07 # ...of the previous two non-redundant : 180881 44.07/6.07 # ...aggressively subsumed : 0 44.07/6.07 # Contextual simplify-reflections : 100 44.07/6.07 # Paramodulations : 188866 44.07/6.07 # Factorizations : 3 44.07/6.07 # NegExts : 0 44.07/6.07 # Equation resolutions : 24 44.07/6.07 # Disequality decompositions : 0 44.07/6.07 # Total rewrite steps : 15544 44.07/6.07 # ...of those cached : 15427 44.07/6.07 # Propositional unsat checks : 0 44.07/6.07 # Propositional check models : 0 44.07/6.07 # Propositional check unsatisfiable : 0 44.07/6.07 # Propositional clauses : 0 44.07/6.07 # Propositional clauses after purity: 0 44.07/6.07 # Propositional unsat core size : 0 44.07/6.07 # Propositional preprocessing time : 0.000 44.07/6.07 # Propositional encoding time : 0.000 44.07/6.07 # Propositional solver time : 0.000 44.07/6.07 # Success case prop preproc time : 0.000 44.07/6.07 # Success case prop encoding time : 0.000 44.07/6.07 # Success case prop solver time : 0.000 44.07/6.07 # Current number of processed clauses : 1250 44.07/6.07 # Positive orientable unit clauses : 10 44.07/6.07 # Positive unorientable unit clauses: 0 44.07/6.07 # Negative unit clauses : 1 44.07/6.07 # Non-unit-clauses : 1239 44.07/6.07 # Current number of unprocessed clauses: 174074 44.07/6.07 # ...number of literals in the above : 947559 44.07/6.07 # Current number of archived formulas : 0 44.07/6.07 # Current number of archived clauses : 527 44.07/6.07 # Clause-clause subsumption calls (NU) : 1113128 44.07/6.07 # Rec. Clause-clause subsumption calls : 59570 44.07/6.07 # Non-unit clause-clause subsumptions : 4278 44.07/6.07 # Unit Clause-clause subsumption calls : 2161 44.07/6.07 # Rewrite failures with RHS unbound : 0 44.07/6.07 # BW rewrite match attempts : 64 44.07/6.07 # BW rewrite match successes : 8 44.07/6.07 # Condensation attempts : 5630 44.07/6.07 # Condensation successes : 160 44.07/6.07 # Termbank termtop insertions : 7420864 44.07/6.07 # Search garbage collected termcells : 808 44.07/6.07 44.07/6.07 # ------------------------------------------------- 44.07/6.07 # User time : 5.398 s 44.07/6.07 # System time : 0.101 s 44.07/6.07 # Total time : 5.499 s 44.07/6.07 # Maximum resident set size: 1964 pages 44.07/6.07 44.07/6.07 # ------------------------------------------------- 44.07/6.07 # User time : 26.885 s 44.07/6.07 # System time : 0.499 s 44.07/6.07 # Total time : 27.384 s 44.07/6.07 # Maximum resident set size: 1736 pages 44.07/6.07 % E exiting 44.07/6.07 % E exiting 44.07/6.07 EOF