0.05/0.11 % Problem : theBenchmark.p : TPTP v0.0.0. Released v0.0.0. 0.05/0.11 % Command : eprover-ho %s --delete-bad-limit=2000000000 --definitional-cnf=24 -s --print-statistics -R --print-version --free-numbers -auto-schedule -p --cpu-limit=%d --neg-ext=all --pos-ext=all --ext-sup-max-depth=2 --schedule-kind=CASC 0.11/0.32 % Computer : n031.cluster.edu 0.11/0.32 % Model : x86_64 x86_64 0.11/0.32 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz 0.11/0.32 % Memory : 8042.1875MB 0.11/0.32 % OS : Linux 3.10.0-693.el7.x86_64 0.11/0.32 % CPULimit : 1200 0.11/0.32 % WCLimit : 120 0.11/0.32 % DateTime : Tue Jul 13 13:42:14 EDT 2021 0.11/0.32 % CPUTime : 0.11/0.32 % Number of cores: 8 0.11/0.32 % Python version: Python 3.6.8 0.11/0.33 # Version: 2.6rc1-ho 0.11/0.33 # No SInE strategy applied 0.11/0.33 # Trying AutoSched0 for 59 seconds 59.12/59.37 # AutoSched0-Mode selected heuristic G_E___208_C18_F1_SE_CS_SP_PS_S079N 59.12/59.37 # and selection function SelectGrCQArEqFirst. 59.12/59.37 # 59.12/59.37 # Preprocessing time : 0.027 s 59.12/59.37 # Presaturation interreduction done 59.24/59.48 # No success with AutoSched0 59.24/59.48 # Trying AutoSched1 for 26 seconds 85.21/85.57 # AutoSched1-Mode selected heuristic G_E___208_C18_F1_SE_CS_SP_PS_S5PRR_RG_S04BN 85.21/85.57 # and selection function PSelectComplexExceptUniqMaxHorn. 85.21/85.57 # 85.21/85.57 # Preprocessing time : 0.029 s 85.21/85.57 # Presaturation interreduction done 85.21/85.59 # No success with AutoSched1 85.21/85.59 # Trying AutoSched2 for 8 seconds 93.26/93.59 # AutoSched2-Mode selected heuristic G_E___208_C18_F1_SE_CS_SP_PS_S08CI 93.26/93.59 # and selection function SelectCQIPrecWNTNp. 93.26/93.59 # 93.26/93.59 # Preprocessing time : 0.028 s 93.26/93.59 # Presaturation interreduction done 93.26/93.64 # No success with AutoSched2 93.26/93.64 # Trying AutoSched3 for 7 seconds 100.32/100.64 # AutoSched3-Mode selected heuristic G_E___302_C18_F1_URBAN_S5PRR_RG_S0Y 100.32/100.64 # and selection function SelectMaxLComplexAvoidPosPred. 100.32/100.64 # 100.32/100.64 # Preprocessing time : 0.030 s 100.32/100.65 # No success with AutoSched3 100.32/100.65 # Trying AutoSched4 for 5 seconds 105.30/105.65 # AutoSched4-Mode selected heuristic H_____047_B31_F1_PI_AE_R4_CS_SP_S2S 105.30/105.65 # and selection function SelectNewComplexAHP. 105.30/105.65 # 105.30/105.65 # Preprocessing time : 0.015 s 105.35/105.73 # No success with AutoSched4 105.35/105.73 # Trying AutoSched5 for 3 seconds 108.39/108.73 # AutoSched5-Mode selected heuristic G_E___300_C18_F1_SE_CS_SP_PS_S0Y 108.39/108.73 # and selection function SelectMaxLComplexAvoidPosPred. 108.39/108.73 # 108.39/108.73 # Preprocessing time : 0.028 s 108.39/108.73 # Presaturation interreduction done 108.39/108.74 # No success with AutoSched5 108.39/108.74 # Trying AutoSched6 for 1 seconds 109.33/109.75 # AutoSched6-Mode selected heuristic G_N___023_B07_F1_SP_PI_Q7_CS_SP_CO_S5PRR_S0Y 109.33/109.75 # and selection function SelectMaxLComplexAvoidPosPred. 109.33/109.75 # 109.33/109.75 # Preprocessing time : 0.023 s 109.33/109.75 # No success with AutoSched6 109.33/109.75 # Trying AutoSched7 for 1 seconds 110.38/110.75 # AutoSched7-Mode selected heuristic G_E___208_B07____S_F1_SE_CS_SP_PS_S5PRR_RG_S04AN 110.38/110.75 # and selection function SelectComplexExceptUniqMaxHorn. 110.38/110.75 # 110.38/110.75 # Preprocessing time : 0.023 s 110.38/110.75 # Presaturation interreduction done 110.38/110.75 # No success with AutoSched7 110.38/110.75 # Trying AutoSched8 for 1 seconds 111.39/111.75 # AutoSched8-Mode selected heuristic G_E___107_C41_F1_PI_AE_Q4_CS_SP_PS_S4S 111.39/111.75 # and selection function SelectNewComplexAHPNS. 111.39/111.75 # 111.39/111.75 # Preprocessing time : 0.027 s 111.39/111.75 # Presaturation interreduction done 111.39/111.76 # No success with AutoSched8 111.39/111.76 # Trying AutoSched9 for 8 seconds 111.39/111.80 # AutoSched9-Mode selected heuristic G_E___300_C01_S00 111.39/111.80 # and selection function NoSelection. 111.39/111.80 # 111.39/111.80 # Preprocessing time : 0.023 s 111.39/111.80 111.39/111.80 # Proof found! 111.39/111.80 # SZS status Theorem 111.39/111.80 # SZS output start CNFRefutation 111.39/111.80 thf(demorgan1, conjecture, ((((((![X1:$i, X2:$i]:(in @ X2 @ (powerset @ X1)=>![X3:$i]:((setminus @ X1 @ (binintersect @ X2 @ X3))=(binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))<=in @ X3 @ (powerset @ X1)))<=demorgan1b)<=demorgan1a)<=setextT)<=complementT_lem)<=binunionT_lem)<=binintersectT_lem), file('/export/starexec/sandbox2/benchmark/theBenchmark.p', demorgan1)). 111.39/111.80 thf(binintersectT_lem, axiom, (binintersectT_lem<=>![X1:$i, X2:$i]:(in @ X2 @ (powerset @ X1)=>![X3:$i]:(in @ X3 @ (powerset @ X1)=>in @ (binintersect @ X2 @ X3) @ (powerset @ X1)))), file('/export/starexec/sandbox2/benchmark/theBenchmark.p', binintersectT_lem)). 111.39/111.80 thf(binunionT_lem, axiom, (binunionT_lem<=>![X1:$i, X2:$i]:(in @ X2 @ (powerset @ X1)=>![X3:$i]:(in @ X3 @ (powerset @ X1)=>in @ (binunion @ X2 @ X3) @ (powerset @ X1)))), file('/export/starexec/sandbox2/benchmark/theBenchmark.p', binunionT_lem)). 111.39/111.80 thf(complementT_lem, axiom, (complementT_lem<=>![X1:$i, X2:$i]:(in @ X2 @ (powerset @ X1)=>in @ (setminus @ X1 @ X2) @ (powerset @ X1))), file('/export/starexec/sandbox2/benchmark/theBenchmark.p', complementT_lem)). 111.39/111.80 thf(setextT, axiom, (setextT<=>![X1:$i, X2:$i]:(in @ X2 @ (powerset @ X1)=>![X3:$i]:(in @ X3 @ (powerset @ X1)=>(![X4:$i]:(in @ X4 @ X1=>(in @ X4 @ X2=>in @ X4 @ X3))=>(![X4:$i]:(in @ X4 @ X1=>(in @ X4 @ X3=>in @ X4 @ X2))=>(X2)=(X3)))))), file('/export/starexec/sandbox2/benchmark/theBenchmark.p', setextT)). 111.39/111.80 thf(demorgan1a, axiom, (demorgan1a<=>![X1:$i, X2:$i]:(in @ X2 @ (powerset @ X1)=>![X3:$i]:(in @ X3 @ (powerset @ X1)=>![X4:$i]:(in @ X4 @ X1=>(in @ X4 @ (setminus @ X1 @ (binintersect @ X2 @ X3))=>in @ X4 @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))))))), file('/export/starexec/sandbox2/benchmark/theBenchmark.p', demorgan1a)). 111.39/111.80 thf(demorgan1b, axiom, (demorgan1b<=>![X1:$i, X2:$i]:(in @ X2 @ (powerset @ X1)=>![X3:$i]:(in @ X3 @ (powerset @ X1)=>![X4:$i]:(in @ X4 @ X1=>(in @ X4 @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))=>in @ X4 @ (setminus @ X1 @ (binintersect @ X2 @ X3))))))), file('/export/starexec/sandbox2/benchmark/theBenchmark.p', demorgan1b)). 111.39/111.80 thf(c_0_7, negated_conjecture, ~((![X1:$i, X2:$i]:(in @ X2 @ (powerset @ X1)=>![X3:$i]:(in @ X3 @ (powerset @ X1)=>in @ (binintersect @ X2 @ X3) @ (powerset @ X1)))=>(![X1:$i, X2:$i]:(in @ X2 @ (powerset @ X1)=>![X3:$i]:(in @ X3 @ (powerset @ X1)=>in @ (binunion @ X2 @ X3) @ (powerset @ X1)))=>(![X1:$i, X2:$i]:(in @ X2 @ (powerset @ X1)=>in @ (setminus @ X1 @ X2) @ (powerset @ X1))=>(![X1:$i, X2:$i]:(in @ X2 @ (powerset @ X1)=>![X3:$i]:(in @ X3 @ (powerset @ X1)=>(![X4:$i]:(in @ X4 @ X1=>(in @ X4 @ X2=>in @ X4 @ X3))=>(![X4:$i]:(in @ X4 @ X1=>(in @ X4 @ X3=>in @ X4 @ X2))=>(X2)=(X3)))))=>(![X1:$i, X2:$i]:(in @ X2 @ (powerset @ X1)=>![X3:$i]:(in @ X3 @ (powerset @ X1)=>![X4:$i]:(in @ X4 @ X1=>(in @ X4 @ (setminus @ X1 @ (binintersect @ X2 @ X3))=>in @ X4 @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))))))=>(![X1:$i, X2:$i]:(in @ X2 @ (powerset @ X1)=>![X3:$i]:(in @ X3 @ (powerset @ X1)=>![X4:$i]:(in @ X4 @ X1=>(in @ X4 @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))=>in @ X4 @ (setminus @ X1 @ (binintersect @ X2 @ X3))))))=>![X1:$i, X2:$i]:(in @ X2 @ (powerset @ X1)=>![X3:$i]:(in @ X3 @ (powerset @ X1)=>(setminus @ X1 @ (binintersect @ X2 @ X3))=(binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))))))))))), inference(fof_simplification,[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(assume_negation,[status(cth)],[demorgan1]), binintersectT_lem]), binunionT_lem]), complementT_lem]), setextT]), demorgan1a]), demorgan1b])])). 111.39/111.80 thf(c_0_8, negated_conjecture, ![X29:$i, X30:$i, X31:$i, X32:$i, X33:$i, X34:$i, X35:$i, X36:$i, X37:$i, X38:$i, X39:$i, X42:$i, X43:$i, X44:$i, X45:$i, X46:$i, X47:$i, X48:$i, X49:$i]:((~in @ X30 @ (powerset @ X29)|(~in @ X31 @ (powerset @ X29)|in @ (binintersect @ X30 @ X31) @ (powerset @ X29)))&((~in @ X33 @ (powerset @ X32)|(~in @ X34 @ (powerset @ X32)|in @ (binunion @ X33 @ X34) @ (powerset @ X32)))&((~in @ X36 @ (powerset @ X35)|in @ (setminus @ X35 @ X36) @ (powerset @ X35))&((((in @ (esk2_3 @ X37 @ X38 @ X39) @ X37|(X38)=(X39)|in @ (esk1_3 @ X37 @ X38 @ X39) @ X37|~in @ X39 @ (powerset @ X37)|~in @ X38 @ (powerset @ X37))&((in @ (esk2_3 @ X37 @ X38 @ X39) @ X39|(X38)=(X39)|in @ (esk1_3 @ X37 @ X38 @ X39) @ X37|~in @ X39 @ (powerset @ X37)|~in @ X38 @ (powerset @ X37))&(~in @ (esk2_3 @ X37 @ X38 @ X39) @ X38|(X38)=(X39)|in @ (esk1_3 @ X37 @ X38 @ X39) @ X37|~in @ X39 @ (powerset @ X37)|~in @ X38 @ (powerset @ X37))))&(((in @ (esk2_3 @ X37 @ X38 @ X39) @ X37|(X38)=(X39)|in @ (esk1_3 @ X37 @ X38 @ X39) @ X38|~in @ X39 @ (powerset @ X37)|~in @ X38 @ (powerset @ X37))&((in @ (esk2_3 @ X37 @ X38 @ X39) @ X39|(X38)=(X39)|in @ (esk1_3 @ X37 @ X38 @ X39) @ X38|~in @ X39 @ (powerset @ X37)|~in @ X38 @ (powerset @ X37))&(~in @ (esk2_3 @ X37 @ X38 @ X39) @ X38|(X38)=(X39)|in @ (esk1_3 @ X37 @ X38 @ X39) @ X38|~in @ X39 @ (powerset @ X37)|~in @ X38 @ (powerset @ X37))))&((in @ (esk2_3 @ X37 @ X38 @ X39) @ X37|(X38)=(X39)|~in @ (esk1_3 @ X37 @ X38 @ X39) @ X39|~in @ X39 @ (powerset @ X37)|~in @ X38 @ (powerset @ X37))&((in @ (esk2_3 @ X37 @ X38 @ X39) @ X39|(X38)=(X39)|~in @ (esk1_3 @ X37 @ X38 @ X39) @ X39|~in @ X39 @ (powerset @ X37)|~in @ X38 @ (powerset @ X37))&(~in @ (esk2_3 @ X37 @ X38 @ X39) @ X38|(X38)=(X39)|~in @ (esk1_3 @ X37 @ X38 @ X39) @ X39|~in @ X39 @ (powerset @ X37)|~in @ X38 @ (powerset @ X37))))))&((~in @ X43 @ (powerset @ X42)|(~in @ X44 @ (powerset @ X42)|(~in @ X45 @ X42|(~in @ X45 @ (setminus @ X42 @ (binintersect @ X43 @ X44))|in @ X45 @ (binunion @ (setminus @ X42 @ X43) @ (setminus @ X42 @ X44))))))&((~in @ X47 @ (powerset @ X46)|(~in @ X48 @ (powerset @ X46)|(~in @ X49 @ X46|(~in @ X49 @ (binunion @ (setminus @ X46 @ X47) @ (setminus @ X46 @ X48))|in @ X49 @ (setminus @ X46 @ (binintersect @ X47 @ X48))))))&(in @ esk4_0 @ (powerset @ esk3_0)&(in @ esk5_0 @ (powerset @ esk3_0)&(setminus @ esk3_0 @ (binintersect @ esk4_0 @ esk5_0))!=(binunion @ (setminus @ esk3_0 @ esk4_0) @ (setminus @ esk3_0 @ esk5_0)))))))))), inference(distribute,[status(thm)],[inference(shift_quantors,[status(thm)],[inference(skolemize,[status(esa)],[inference(variable_rename,[status(thm)],[inference(fof_nnf,[status(thm)],[c_0_7])])])])])). 111.39/111.80 thf(c_0_9, negated_conjecture, ![X1:$i, X2:$i, X4:$i, X3:$i]:(in @ X4 @ (setminus @ X2 @ (binintersect @ X1 @ X3))|~in @ X1 @ (powerset @ X2)|~in @ X3 @ (powerset @ X2)|~in @ X4 @ X2|~in @ X4 @ (binunion @ (setminus @ X2 @ X1) @ (setminus @ X2 @ X3))), inference(split_conjunct,[status(thm)],[c_0_8])). 111.39/111.80 thf(c_0_10, negated_conjecture, ![X3:$i, X2:$i, X1:$i]:(in @ (esk2_3 @ X1 @ X2 @ X3) @ X3|(X2)=(X3)|~in @ (esk1_3 @ X1 @ X2 @ X3) @ X3|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(split_conjunct,[status(thm)],[c_0_8])). 111.39/111.80 thf(c_0_11, negated_conjecture, ![X3:$i, X2:$i, X1:$i]:((X2)=(X3)|~in @ (esk2_3 @ X1 @ X2 @ X3) @ X2|~in @ (esk1_3 @ X1 @ X2 @ X3) @ X3|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(split_conjunct,[status(thm)],[c_0_8])). 111.39/111.80 thf(c_0_12, negated_conjecture, ![X1:$i, X2:$i, X4:$i, X3:$i]:(in @ X4 @ (binunion @ (setminus @ X2 @ X1) @ (setminus @ X2 @ X3))|~in @ X1 @ (powerset @ X2)|~in @ X3 @ (powerset @ X2)|~in @ X4 @ X2|~in @ X4 @ (setminus @ X2 @ (binintersect @ X1 @ X3))), inference(split_conjunct,[status(thm)],[c_0_8])). 111.39/111.80 thf(c_0_13, negated_conjecture, ![X1:$i, X3:$i, X4:$i, X2:$i, X5:$i]:((X1)=(binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))|in @ (esk2_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ (setminus @ X2 @ (binintersect @ X3 @ X4))|~in @ (esk1_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))|~in @ (esk2_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ X2|~in @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4)) @ (powerset @ X5)|~in @ X4 @ (powerset @ X2)|~in @ X3 @ (powerset @ X2)|~in @ X1 @ (powerset @ X5)), inference(pm,[status(thm)],[c_0_9, c_0_10])). 111.39/111.80 thf(c_0_14, negated_conjecture, ![X3:$i, X2:$i, X1:$i]:(in @ (esk2_3 @ X1 @ X2 @ X3) @ X3|(X2)=(X3)|in @ (esk1_3 @ X1 @ X2 @ X3) @ X2|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(split_conjunct,[status(thm)],[c_0_8])). 111.39/111.80 thf(c_0_15, negated_conjecture, ![X1:$i, X5:$i, X4:$i, X3:$i, X2:$i]:((X1)=(binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))|~in @ (esk1_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ (setminus @ X2 @ (binintersect @ X3 @ X4))|~in @ (esk2_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ X1|~in @ (esk1_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ X2|~in @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4)) @ (powerset @ X5)|~in @ X1 @ (powerset @ X5)|~in @ X4 @ (powerset @ X2)|~in @ X3 @ (powerset @ X2)), inference(pm,[status(thm)],[c_0_11, c_0_12])). 111.39/111.80 thf(c_0_16, negated_conjecture, ![X1:$i, X3:$i, X4:$i, X2:$i, X5:$i]:((X1)=(binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))|in @ (esk2_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ (setminus @ X2 @ (binintersect @ X3 @ X4))|~in @ (esk1_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ (setminus @ X2 @ (binintersect @ X3 @ X4))|~in @ (esk2_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ X2|~in @ (esk1_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ X2|~in @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4)) @ (powerset @ X5)|~in @ X4 @ (powerset @ X2)|~in @ X3 @ (powerset @ X2)|~in @ X1 @ (powerset @ X5)), inference(pm,[status(thm)],[c_0_13, c_0_12])). 111.39/111.80 thf(c_0_17, negated_conjecture, ![X3:$i, X2:$i, X1:$i]:((X2)=(X3)|in @ (esk1_3 @ X1 @ X2 @ X3) @ X2|~in @ (esk2_3 @ X1 @ X2 @ X3) @ X2|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(split_conjunct,[status(thm)],[c_0_8])). 111.39/111.80 thf(c_0_18, negated_conjecture, ![X1:$i, X3:$i, X4:$i, X2:$i, X5:$i]:((X1)=(binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))|in @ (esk2_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ (setminus @ X2 @ (binintersect @ X3 @ X4))|in @ (esk1_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ X1|~in @ (esk2_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ X2|~in @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4)) @ (powerset @ X5)|~in @ X4 @ (powerset @ X2)|~in @ X3 @ (powerset @ X2)|~in @ X1 @ (powerset @ X5)), inference(pm,[status(thm)],[c_0_9, c_0_14])). 111.39/111.80 thf(c_0_19, negated_conjecture, ![X3:$i, X2:$i, X1:$i]:(in @ (esk2_3 @ X1 @ X2 @ X3) @ X1|(X2)=(X3)|~in @ (esk1_3 @ X1 @ X2 @ X3) @ X3|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(split_conjunct,[status(thm)],[c_0_8])). 111.39/111.80 thf(c_0_20, negated_conjecture, ![X3:$i, X2:$i, X1:$i]:(in @ (esk2_3 @ X1 @ X2 @ X3) @ X3|(X2)=(X3)|in @ (esk1_3 @ X1 @ X2 @ X3) @ X1|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(split_conjunct,[status(thm)],[c_0_8])). 111.39/111.80 thf(c_0_21, negated_conjecture, ![X4:$i, X3:$i, X2:$i, X1:$i]:((binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))=(setminus @ X1 @ (binintersect @ X2 @ X3))|~in @ (esk1_3 @ X4 @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))) @ (setminus @ X1 @ (binintersect @ X2 @ X3))|~in @ (esk1_3 @ X4 @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))) @ X1|~in @ (esk2_3 @ X4 @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))) @ X1|~in @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3)) @ (powerset @ X4)|~in @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (powerset @ X4)|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(pm,[status(thm)],[c_0_15, c_0_16])). 111.39/111.80 thf(c_0_22, negated_conjecture, ![X4:$i, X3:$i, X2:$i, X1:$i]:((binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))=(setminus @ X1 @ (binintersect @ X2 @ X3))|in @ (esk1_3 @ X4 @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))) @ (setminus @ X1 @ (binintersect @ X2 @ X3))|~in @ (esk2_3 @ X4 @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))) @ X1|~in @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3)) @ (powerset @ X4)|~in @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (powerset @ X4)|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(pm,[status(thm)],[c_0_17, c_0_18])). 111.39/111.80 thf(c_0_23, negated_conjecture, ![X1:$i, X5:$i, X4:$i, X3:$i, X2:$i]:((X1)=(binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))|in @ (esk2_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ X5|~in @ (esk1_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ (setminus @ X2 @ (binintersect @ X3 @ X4))|~in @ (esk1_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ X2|~in @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4)) @ (powerset @ X5)|~in @ X1 @ (powerset @ X5)|~in @ X4 @ (powerset @ X2)|~in @ X3 @ (powerset @ X2)), inference(pm,[status(thm)],[c_0_19, c_0_12])). 111.39/111.80 thf(c_0_24, negated_conjecture, ![X3:$i, X2:$i, X1:$i]:(in @ (esk2_3 @ X1 @ X2 @ X3) @ X1|(X2)=(X3)|in @ (esk1_3 @ X1 @ X2 @ X3) @ X2|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(split_conjunct,[status(thm)],[c_0_8])). 111.39/111.80 thf(c_0_25, negated_conjecture, ![X3:$i, X2:$i, X1:$i]:((X2)=(X3)|in @ (esk1_3 @ X1 @ X2 @ X3) @ X1|~in @ (esk2_3 @ X1 @ X2 @ X3) @ X2|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(split_conjunct,[status(thm)],[c_0_8])). 111.39/111.80 thf(c_0_26, negated_conjecture, ![X1:$i, X3:$i, X4:$i, X2:$i, X5:$i]:((X1)=(binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))|in @ (esk2_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ (setminus @ X2 @ (binintersect @ X3 @ X4))|in @ (esk1_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ X5|~in @ (esk2_3 @ X5 @ X1 @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4))) @ X2|~in @ (binunion @ (setminus @ X2 @ X3) @ (setminus @ X2 @ X4)) @ (powerset @ X5)|~in @ X4 @ (powerset @ X2)|~in @ X3 @ (powerset @ X2)|~in @ X1 @ (powerset @ X5)), inference(pm,[status(thm)],[c_0_9, c_0_20])). 111.39/111.80 thf(c_0_27, negated_conjecture, ![X4:$i, X3:$i, X2:$i, X1:$i]:((binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))=(setminus @ X1 @ (binintersect @ X2 @ X3))|~in @ (esk1_3 @ X4 @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))) @ X1|~in @ (esk2_3 @ X4 @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))) @ X1|~in @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3)) @ (powerset @ X4)|~in @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (powerset @ X4)|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(pm,[status(thm)],[c_0_21, c_0_22])). 111.39/111.80 thf(c_0_28, negated_conjecture, ![X4:$i, X3:$i, X2:$i, X1:$i]:((binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))=(setminus @ X1 @ (binintersect @ X2 @ X3))|in @ (esk2_3 @ X4 @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))) @ X4|~in @ (esk1_3 @ X4 @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))) @ X1|~in @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3)) @ (powerset @ X4)|~in @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (powerset @ X4)|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(pm,[status(thm)],[c_0_23, c_0_24])). 111.39/111.80 thf(c_0_29, negated_conjecture, ![X4:$i, X3:$i, X2:$i, X1:$i]:((binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))=(setminus @ X1 @ (binintersect @ X2 @ X3))|in @ (esk1_3 @ X4 @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))) @ X4|~in @ (esk2_3 @ X4 @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))) @ X1|~in @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3)) @ (powerset @ X4)|~in @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (powerset @ X4)|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(pm,[status(thm)],[c_0_25, c_0_26])). 111.39/111.80 thf(c_0_30, negated_conjecture, ![X3:$i, X2:$i, X1:$i]:(in @ (esk2_3 @ X1 @ X2 @ X3) @ X1|(X2)=(X3)|in @ (esk1_3 @ X1 @ X2 @ X3) @ X1|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(split_conjunct,[status(thm)],[c_0_8])). 111.39/111.80 thf(c_0_31, negated_conjecture, ![X3:$i, X2:$i, X1:$i]:((binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))=(setminus @ X1 @ (binintersect @ X2 @ X3))|~in @ (esk1_3 @ X1 @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))) @ X1|~in @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3)) @ (powerset @ X1)|~in @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (powerset @ X1)|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(pm,[status(thm)],[c_0_27, c_0_28])). 111.39/111.80 thf(c_0_32, negated_conjecture, ![X3:$i, X2:$i, X1:$i]:((binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))=(setminus @ X1 @ (binintersect @ X2 @ X3))|in @ (esk1_3 @ X1 @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))) @ X1|~in @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3)) @ (powerset @ X1)|~in @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (powerset @ X1)|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(pm,[status(thm)],[c_0_29, c_0_30])). 111.39/111.80 thf(c_0_33, negated_conjecture, ![X3:$i, X2:$i, X1:$i]:((binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))=(setminus @ X1 @ (binintersect @ X2 @ X3))|~in @ (binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3)) @ (powerset @ X1)|~in @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (powerset @ X1)|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(pm,[status(thm)],[c_0_31, c_0_32])). 111.39/111.80 thf(c_0_34, negated_conjecture, ![X1:$i, X3:$i, X2:$i]:(in @ (binunion @ X1 @ X3) @ (powerset @ X2)|~in @ X1 @ (powerset @ X2)|~in @ X3 @ (powerset @ X2)), inference(split_conjunct,[status(thm)],[c_0_8])). 111.39/111.80 thf(c_0_35, negated_conjecture, ![X3:$i, X2:$i, X1:$i]:((binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))=(setminus @ X1 @ (binintersect @ X2 @ X3))|~in @ (setminus @ X1 @ (binintersect @ X2 @ X3)) @ (powerset @ X1)|~in @ (setminus @ X1 @ X3) @ (powerset @ X1)|~in @ (setminus @ X1 @ X2) @ (powerset @ X1)|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(pm,[status(thm)],[c_0_33, c_0_34])). 111.39/111.80 thf(c_0_36, negated_conjecture, ![X1:$i, X2:$i]:(in @ (setminus @ X2 @ X1) @ (powerset @ X2)|~in @ X1 @ (powerset @ X2)), inference(split_conjunct,[status(thm)],[c_0_8])). 111.39/111.80 thf(c_0_37, negated_conjecture, (setminus @ esk3_0 @ (binintersect @ esk4_0 @ esk5_0))!=(binunion @ (setminus @ esk3_0 @ esk4_0) @ (setminus @ esk3_0 @ esk5_0)), inference(split_conjunct,[status(thm)],[c_0_8])). 111.39/111.80 thf(c_0_38, negated_conjecture, ![X3:$i, X2:$i, X1:$i]:((binunion @ (setminus @ X1 @ X2) @ (setminus @ X1 @ X3))=(setminus @ X1 @ (binintersect @ X2 @ X3))|~in @ (setminus @ X1 @ X3) @ (powerset @ X1)|~in @ (setminus @ X1 @ X2) @ (powerset @ X1)|~in @ (binintersect @ X2 @ X3) @ (powerset @ X1)|~in @ X3 @ (powerset @ X1)|~in @ X2 @ (powerset @ X1)), inference(pm,[status(thm)],[c_0_35, c_0_36])). 111.39/111.80 thf(c_0_39, negated_conjecture, in @ esk5_0 @ (powerset @ esk3_0), inference(split_conjunct,[status(thm)],[c_0_8])). 111.39/111.80 thf(c_0_40, negated_conjecture, in @ esk4_0 @ (powerset @ esk3_0), inference(split_conjunct,[status(thm)],[c_0_8])). 111.39/111.80 thf(c_0_41, negated_conjecture, (~in @ (setminus @ esk3_0 @ esk5_0) @ (powerset @ esk3_0)|~in @ (setminus @ esk3_0 @ esk4_0) @ (powerset @ esk3_0)|~in @ (binintersect @ esk4_0 @ esk5_0) @ (powerset @ esk3_0)), inference(cn,[status(thm)],[inference(rw,[status(thm)],[inference(rw,[status(thm)],[inference(pm,[status(thm)],[c_0_37, c_0_38]), c_0_39]), c_0_40])])). 111.39/111.80 thf(c_0_42, negated_conjecture, ![X1:$i, X3:$i, X2:$i]:(in @ (binintersect @ X1 @ X3) @ (powerset @ X2)|~in @ X1 @ (powerset @ X2)|~in @ X3 @ (powerset @ X2)), inference(split_conjunct,[status(thm)],[c_0_8])). 111.39/111.80 thf(c_0_43, negated_conjecture, (~in @ (setminus @ esk3_0 @ esk5_0) @ (powerset @ esk3_0)|~in @ (setminus @ esk3_0 @ esk4_0) @ (powerset @ esk3_0)), inference(cn,[status(thm)],[inference(rw,[status(thm)],[inference(rw,[status(thm)],[inference(pm,[status(thm)],[c_0_41, c_0_42]), c_0_39]), c_0_40])])). 111.39/111.80 thf(c_0_44, negated_conjecture, ~in @ (setminus @ esk3_0 @ esk5_0) @ (powerset @ esk3_0), inference(cn,[status(thm)],[inference(rw,[status(thm)],[inference(pm,[status(thm)],[c_0_43, c_0_36]), c_0_40])])). 111.39/111.80 thf(c_0_45, negated_conjecture, ($false), inference(cn,[status(thm)],[inference(rw,[status(thm)],[inference(pm,[status(thm)],[c_0_44, c_0_36]), c_0_39])]), ['proof']). 111.39/111.80 # SZS output end CNFRefutation 111.39/111.80 # Proof object total steps : 46 111.39/111.80 # Proof object clause steps : 37 111.39/111.80 # Proof object formula steps : 9 111.39/111.80 # Proof object conjectures : 40 111.39/111.80 # Proof object clause conjectures : 37 111.39/111.80 # Proof object formula conjectures : 3 111.39/111.80 # Proof object initial clauses used : 17 111.39/111.80 # Proof object initial formulas used : 7 111.39/111.80 # Proof object generating inferences : 20 111.39/111.80 # Proof object simplifying inferences : 10 111.39/111.80 # Training examples: 0 positive, 0 negative 111.39/111.80 # Parsed axioms : 18 111.39/111.80 # Removed by relevancy pruning/SinE : 0 111.39/111.80 # Initial clauses : 28 111.39/111.80 # Removed in clause preprocessing : 11 111.39/111.80 # Initial clauses in saturation : 17 111.39/111.80 # Processed clauses : 110 111.39/111.80 # ...of these trivial : 0 111.39/111.80 # ...subsumed : 37 111.39/111.80 # ...remaining for further processing : 73 111.39/111.80 # Other redundant clauses eliminated : 0 111.39/111.80 # Clauses deleted for lack of memory : 0 111.39/111.80 # Backward-subsumed : 7 111.39/111.80 # Backward-rewritten : 0 111.39/111.80 # Generated clauses : 308 111.39/111.80 # ...of the previous two non-trivial : 297 111.39/111.80 # Contextual simplify-reflections : 0 111.39/111.80 # Paramodulations : 308 111.39/111.80 # Factorizations : 0 111.39/111.80 # NegExts : 0 111.39/111.80 # Equation resolutions : 0 111.39/111.80 # Propositional unsat checks : 0 111.39/111.80 # Propositional check models : 0 111.39/111.80 # Propositional check unsatisfiable : 0 111.39/111.80 # Propositional clauses : 0 111.39/111.80 # Propositional clauses after purity: 0 111.39/111.80 # Propositional unsat core size : 0 111.39/111.80 # Propositional preprocessing time : 0.000 111.39/111.80 # Propositional encoding time : 0.000 111.39/111.80 # Propositional solver time : 0.000 111.39/111.80 # Success case prop preproc time : 0.000 111.39/111.80 # Success case prop encoding time : 0.000 111.39/111.80 # Success case prop solver time : 0.000 111.39/111.80 # Current number of processed clauses : 66 111.39/111.80 # Positive orientable unit clauses : 2 111.39/111.80 # Positive unorientable unit clauses: 0 111.39/111.80 # Negative unit clauses : 2 111.39/111.80 # Non-unit-clauses : 62 111.39/111.80 # Current number of unprocessed clauses: 203 111.39/111.80 # ...number of literals in the above : 1930 111.39/111.80 # Current number of archived formulas : 0 111.39/111.80 # Current number of archived clauses : 7 111.39/111.80 # Clause-clause subsumption calls (NU) : 575 111.39/111.80 # Rec. Clause-clause subsumption calls : 47 111.39/111.80 # Non-unit clause-clause subsumptions : 44 111.39/111.80 # Unit Clause-clause subsumption calls : 1 111.39/111.80 # Rewrite failures with RHS unbound : 0 111.39/111.80 # BW rewrite match attempts : 0 111.39/111.80 # BW rewrite match successes : 0 111.39/111.80 # Condensation attempts : 0 111.39/111.80 # Condensation successes : 0 111.39/111.80 # Termbank termtop insertions : 27262 111.39/111.81 111.39/111.81 # ------------------------------------------------- 111.39/111.81 # User time : 108.465 s 111.39/111.81 # System time : 2.864 s 111.39/111.81 # Total time : 111.328 s 111.39/111.81 # Maximum resident set size: 1692 pages 111.39/111.81 EOF