# No SInE strategy applied
# Trying AutoSched0 for 161 seconds
# AutoSched0-Mode selected heuristic G_E___208_C18AMC_F1_SE_CS_SP_PS_S5PRR_RG_S04AN
# and selection function SelectComplexExceptUniqMaxHorn.
#
# Preprocessing time       : 0.020 s
# Presaturation interreduction done

# Proof found!
# SZS status Theorem
# SZS output start CNFRefutation
fof(cc1_relset_1, axiom, ![X1, X2, X3]:(m1_subset_1(X3,k1_zfmisc_1(k2_zfmisc_1(X1,X2)))=>v1_relat_1(X3)), file('newton07/newton07__t60_newton07', cc1_relset_1)).
fof(dt_m2_finseq_1, axiom, ![X1, X2]:(m2_finseq_1(X2,X1)=>((v1_funct_1(X2)&v1_finseq_1(X2))&m1_subset_1(X2,k1_zfmisc_1(k2_zfmisc_1(k4_ordinal1,X1))))), file('newton07/newton07__t60_newton07', dt_m2_finseq_1)).
fof(rd43_newton04, axiom, ![X1]:(v7_ordinal1(X1)=>k1_funct_1(k6_newton(X1),k2_xcmplx_0(X1,np__1))=np__1), file('newton07/newton07__t60_newton07', rd43_newton04)).
fof(dt_k6_newton, axiom, ![X1]:(v7_ordinal1(X1)=>m2_finseq_1(k6_newton(X1),k1_numbers)), file('newton07/newton07__t60_newton07', dt_k6_newton)).
fof(fc36_newton04, axiom, ![X1]:(v7_ordinal1(X1)=>v3_card_1(k6_newton(X1),k2_xcmplx_0(X1,np__1))), file('newton07/newton07__t60_newton07', fc36_newton04)).
fof(rd40_newton04, axiom, ![X1]:((v7_ordinal1(X1)&~(v8_ordinal1(X1)))=>k1_funct_1(k6_newton(X1),X1)=X1), file('newton07/newton07__t60_newton07', rd40_newton04)).
fof(redefinition_k3_finseq_4, axiom, ![X1, X2, X3, X4]:((((~(v1_xboole_0(X1))&m1_subset_1(X2,X1))&m1_subset_1(X3,X1))&m1_subset_1(X4,X1))=>k3_finseq_4(X1,X2,X3,X4)=k11_finseq_1(X2,X3,X4)), file('newton07/newton07__t60_newton07', redefinition_k3_finseq_4)).
fof(rd10_newton07, axiom, ![X1]:((((v1_relat_1(X1)&v1_funct_1(X1))&v3_card_1(X1,np__3))&v1_finseq_1(X1))=>k11_finseq_1(k1_funct_1(X1,np__1),k1_funct_1(X1,np__2),k1_funct_1(X1,np__3))=X1), file('newton07/newton07__t60_newton07', rd10_newton07)).
fof(rqRealAdd__k2_xcmplx_0__r2_r1_r3, axiom, k2_xcmplx_0(np__2,np__1)=np__3, file('newton07/newton07__t60_newton07', rqRealAdd__k2_xcmplx_0__r2_r1_r3)).
fof(cc8_ordinal1, axiom, ![X1]:(m1_subset_1(X1,k4_ordinal1)=>v7_ordinal1(X1)), file('newton07/newton07__t60_newton07', cc8_ordinal1)).
fof(fc6_ordinal1, axiom, (~(v1_xboole_0(k4_ordinal1))&v3_ordinal1(k4_ordinal1)), file('newton07/newton07__t60_newton07', fc6_ordinal1)).
fof(rd42_newton04, axiom, ![X1]:(v7_ordinal1(X1)=>k1_funct_1(k6_newton(X1),np__1)=np__1), file('newton07/newton07__t60_newton07', rd42_newton04)).
fof(t60_newton07, conjecture, k6_newton(np__2)=k3_finseq_4(k4_ordinal1,np__1,np__2,np__1), file('newton07/newton07__t60_newton07', t60_newton07)).
fof(spc1_numerals, axiom, (v2_xxreal_0(np__1)&m1_subset_1(np__1,k4_ordinal1)), file('newton07/newton07__t60_newton07', spc1_numerals)).
fof(cc4_nat_1, axiom, ![X1]:((v7_ordinal1(X1)&v8_ordinal1(X1))=>(v7_ordinal1(X1)&~(v2_xxreal_0(X1)))), file('newton07/newton07__t60_newton07', cc4_nat_1)).
fof(spc2_numerals, axiom, (v2_xxreal_0(np__2)&m1_subset_1(np__2,k4_ordinal1)), file('newton07/newton07__t60_newton07', spc2_numerals)).
fof(c_0_16, plain, ![X22, X23, X24]:(~m1_subset_1(X24,k1_zfmisc_1(k2_zfmisc_1(X22,X23)))|v1_relat_1(X24)), inference(variable_rename,[status(thm)],[inference(fof_nnf,[status(thm)],[cc1_relset_1])])).
fof(c_0_17, plain, ![X28, X29]:(((v1_funct_1(X29)|~m2_finseq_1(X29,X28))&(v1_finseq_1(X29)|~m2_finseq_1(X29,X28)))&(m1_subset_1(X29,k1_zfmisc_1(k2_zfmisc_1(k4_ordinal1,X28)))|~m2_finseq_1(X29,X28))), inference(distribute,[status(thm)],[inference(variable_rename,[status(thm)],[inference(fof_nnf,[status(thm)],[dt_m2_finseq_1])])])).
fof(c_0_18, plain, ![X34]:(~v7_ordinal1(X34)|k1_funct_1(k6_newton(X34),k2_xcmplx_0(X34,np__1))=np__1), inference(variable_rename,[status(thm)],[inference(fof_nnf,[status(thm)],[rd43_newton04])])).
cnf(c_0_19, plain, (v1_relat_1(X1)|~m1_subset_1(X1,k1_zfmisc_1(k2_zfmisc_1(X2,X3)))), inference(split_conjunct,[status(thm)],[c_0_16])).
cnf(c_0_20, plain, (m1_subset_1(X1,k1_zfmisc_1(k2_zfmisc_1(k4_ordinal1,X2)))|~m2_finseq_1(X1,X2)), inference(split_conjunct,[status(thm)],[c_0_17])).
fof(c_0_21, plain, ![X27]:(~v7_ordinal1(X27)|m2_finseq_1(k6_newton(X27),k1_numbers)), inference(variable_rename,[status(thm)],[inference(fof_nnf,[status(thm)],[dt_k6_newton])])).
fof(c_0_22, plain, ![X30]:(~v7_ordinal1(X30)|v3_card_1(k6_newton(X30),k2_xcmplx_0(X30,np__1))), inference(variable_rename,[status(thm)],[inference(fof_nnf,[status(thm)],[fc36_newton04])])).
fof(c_0_23, plain, ![X1]:((v7_ordinal1(X1)&~v8_ordinal1(X1))=>k1_funct_1(k6_newton(X1),X1)=X1), inference(fof_simplification,[status(thm)],[rd40_newton04])).
fof(c_0_24, plain, ![X1, X2, X3, X4]:((((~v1_xboole_0(X1)&m1_subset_1(X2,X1))&m1_subset_1(X3,X1))&m1_subset_1(X4,X1))=>k3_finseq_4(X1,X2,X3,X4)=k11_finseq_1(X2,X3,X4)), inference(fof_simplification,[status(thm)],[redefinition_k3_finseq_4])).
fof(c_0_25, plain, ![X31]:(~v1_relat_1(X31)|~v1_funct_1(X31)|~v3_card_1(X31,np__3)|~v1_finseq_1(X31)|k11_finseq_1(k1_funct_1(X31,np__1),k1_funct_1(X31,np__2),k1_funct_1(X31,np__3))=X31), inference(variable_rename,[status(thm)],[inference(fof_nnf,[status(thm)],[rd10_newton07])])).
cnf(c_0_26, plain, (k1_funct_1(k6_newton(X1),k2_xcmplx_0(X1,np__1))=np__1|~v7_ordinal1(X1)), inference(split_conjunct,[status(thm)],[c_0_18])).
cnf(c_0_27, plain, (k2_xcmplx_0(np__2,np__1)=np__3), inference(split_conjunct,[status(thm)],[rqRealAdd__k2_xcmplx_0__r2_r1_r3])).
cnf(c_0_28, plain, (v1_relat_1(X1)|~m2_finseq_1(X1,X2)), inference(spm,[status(thm)],[c_0_19, c_0_20])).
cnf(c_0_29, plain, (m2_finseq_1(k6_newton(X1),k1_numbers)|~v7_ordinal1(X1)), inference(split_conjunct,[status(thm)],[c_0_21])).
cnf(c_0_30, plain, (v1_funct_1(X1)|~m2_finseq_1(X1,X2)), inference(split_conjunct,[status(thm)],[c_0_17])).
cnf(c_0_31, plain, (v1_finseq_1(X1)|~m2_finseq_1(X1,X2)), inference(split_conjunct,[status(thm)],[c_0_17])).
cnf(c_0_32, plain, (v3_card_1(k6_newton(X1),k2_xcmplx_0(X1,np__1))|~v7_ordinal1(X1)), inference(split_conjunct,[status(thm)],[c_0_22])).
fof(c_0_33, plain, ![X32]:(~v7_ordinal1(X32)|v8_ordinal1(X32)|k1_funct_1(k6_newton(X32),X32)=X32), inference(variable_rename,[status(thm)],[inference(fof_nnf,[status(thm)],[c_0_23])])).
fof(c_0_34, plain, ![X26]:(~m1_subset_1(X26,k4_ordinal1)|v7_ordinal1(X26)), inference(variable_rename,[status(thm)],[inference(fof_nnf,[status(thm)],[cc8_ordinal1])])).
fof(c_0_35, plain, ![X35, X36, X37, X38]:(v1_xboole_0(X35)|~m1_subset_1(X36,X35)|~m1_subset_1(X37,X35)|~m1_subset_1(X38,X35)|k3_finseq_4(X35,X36,X37,X38)=k11_finseq_1(X36,X37,X38)), inference(variable_rename,[status(thm)],[inference(fof_nnf,[status(thm)],[c_0_24])])).
fof(c_0_36, plain, (~v1_xboole_0(k4_ordinal1)&v3_ordinal1(k4_ordinal1)), inference(fof_simplification,[status(thm)],[fc6_ordinal1])).
cnf(c_0_37, plain, (k11_finseq_1(k1_funct_1(X1,np__1),k1_funct_1(X1,np__2),k1_funct_1(X1,np__3))=X1|~v1_relat_1(X1)|~v1_funct_1(X1)|~v3_card_1(X1,np__3)|~v1_finseq_1(X1)), inference(split_conjunct,[status(thm)],[c_0_25])).
cnf(c_0_38, plain, (k1_funct_1(k6_newton(np__2),np__3)=np__1|~v7_ordinal1(np__2)), inference(spm,[status(thm)],[c_0_26, c_0_27])).
cnf(c_0_39, plain, (v1_relat_1(k6_newton(X1))|~v7_ordinal1(X1)), inference(spm,[status(thm)],[c_0_28, c_0_29])).
cnf(c_0_40, plain, (v1_funct_1(k6_newton(X1))|~v7_ordinal1(X1)), inference(spm,[status(thm)],[c_0_30, c_0_29])).
cnf(c_0_41, plain, (v1_finseq_1(k6_newton(X1))|~v7_ordinal1(X1)), inference(spm,[status(thm)],[c_0_31, c_0_29])).
cnf(c_0_42, plain, (v3_card_1(k6_newton(np__2),np__3)|~v7_ordinal1(np__2)), inference(spm,[status(thm)],[c_0_32, c_0_27])).
fof(c_0_43, plain, ![X33]:(~v7_ordinal1(X33)|k1_funct_1(k6_newton(X33),np__1)=np__1), inference(variable_rename,[status(thm)],[inference(fof_nnf,[status(thm)],[rd42_newton04])])).
cnf(c_0_44, plain, (v8_ordinal1(X1)|k1_funct_1(k6_newton(X1),X1)=X1|~v7_ordinal1(X1)), inference(split_conjunct,[status(thm)],[c_0_33])).
cnf(c_0_45, plain, (v7_ordinal1(X1)|~m1_subset_1(X1,k4_ordinal1)), inference(split_conjunct,[status(thm)],[c_0_34])).
fof(c_0_46, negated_conjecture, k6_newton(np__2)!=k3_finseq_4(k4_ordinal1,np__1,np__2,np__1), inference(fof_simplification,[status(thm)],[inference(assume_negation,[status(cth)],[t60_newton07])])).
cnf(c_0_47, plain, (v1_xboole_0(X1)|k3_finseq_4(X1,X2,X3,X4)=k11_finseq_1(X2,X3,X4)|~m1_subset_1(X2,X1)|~m1_subset_1(X3,X1)|~m1_subset_1(X4,X1)), inference(split_conjunct,[status(thm)],[c_0_35])).
cnf(c_0_48, plain, (m1_subset_1(np__1,k4_ordinal1)), inference(split_conjunct,[status(thm)],[spc1_numerals])).
cnf(c_0_49, plain, (~v1_xboole_0(k4_ordinal1)), inference(split_conjunct,[status(thm)],[c_0_36])).
fof(c_0_50, plain, ![X1]:((v7_ordinal1(X1)&v8_ordinal1(X1))=>(v7_ordinal1(X1)&~v2_xxreal_0(X1))), inference(fof_simplification,[status(thm)],[cc4_nat_1])).
cnf(c_0_51, plain, (k11_finseq_1(k1_funct_1(k6_newton(np__2),np__1),k1_funct_1(k6_newton(np__2),np__2),np__1)=k6_newton(np__2)|~v7_ordinal1(np__2)), inference(csr,[status(thm)],[inference(csr,[status(thm)],[inference(csr,[status(thm)],[inference(csr,[status(thm)],[inference(spm,[status(thm)],[c_0_37, c_0_38]), c_0_39]), c_0_40]), c_0_41]), c_0_42])).
cnf(c_0_52, plain, (k1_funct_1(k6_newton(X1),np__1)=np__1|~v7_ordinal1(X1)), inference(split_conjunct,[status(thm)],[c_0_43])).
cnf(c_0_53, plain, (k1_funct_1(k6_newton(X1),X1)=X1|v8_ordinal1(X1)|~m1_subset_1(X1,k4_ordinal1)), inference(spm,[status(thm)],[c_0_44, c_0_45])).
cnf(c_0_54, plain, (m1_subset_1(np__2,k4_ordinal1)), inference(split_conjunct,[status(thm)],[spc2_numerals])).
cnf(c_0_55, negated_conjecture, (k6_newton(np__2)!=k3_finseq_4(k4_ordinal1,np__1,np__2,np__1)), inference(split_conjunct,[status(thm)],[c_0_46])).
cnf(c_0_56, plain, (k3_finseq_4(k4_ordinal1,X1,X2,np__1)=k11_finseq_1(X1,X2,np__1)|~m1_subset_1(X2,k4_ordinal1)|~m1_subset_1(X1,k4_ordinal1)), inference(sr,[status(thm)],[inference(spm,[status(thm)],[c_0_47, c_0_48]), c_0_49])).
fof(c_0_57, plain, ![X25]:((v7_ordinal1(X25)|(~v7_ordinal1(X25)|~v8_ordinal1(X25)))&(~v2_xxreal_0(X25)|(~v7_ordinal1(X25)|~v8_ordinal1(X25)))), inference(distribute,[status(thm)],[inference(variable_rename,[status(thm)],[inference(fof_nnf,[status(thm)],[c_0_50])])])).
cnf(c_0_58, plain, (k11_finseq_1(np__1,k1_funct_1(k6_newton(np__2),np__2),np__1)=k6_newton(np__2)|~v7_ordinal1(np__2)), inference(spm,[status(thm)],[c_0_51, c_0_52])).
cnf(c_0_59, plain, (k1_funct_1(k6_newton(np__2),np__2)=np__2|v8_ordinal1(np__2)), inference(spm,[status(thm)],[c_0_53, c_0_54])).
cnf(c_0_60, negated_conjecture, (k11_finseq_1(np__1,np__2,np__1)!=k6_newton(np__2)), inference(cn,[status(thm)],[inference(rw,[status(thm)],[inference(rw,[status(thm)],[inference(spm,[status(thm)],[c_0_55, c_0_56]), c_0_54]), c_0_48])])).
cnf(c_0_61, plain, (~v2_xxreal_0(X1)|~v7_ordinal1(X1)|~v8_ordinal1(X1)), inference(split_conjunct,[status(thm)],[c_0_57])).
cnf(c_0_62, plain, (v8_ordinal1(np__2)|~v7_ordinal1(np__2)), inference(sr,[status(thm)],[inference(spm,[status(thm)],[c_0_58, c_0_59]), c_0_60])).
cnf(c_0_63, plain, (v2_xxreal_0(np__2)), inference(split_conjunct,[status(thm)],[spc2_numerals])).
cnf(c_0_64, plain, (~v7_ordinal1(np__2)), inference(cn,[status(thm)],[inference(rw,[status(thm)],[inference(spm,[status(thm)],[c_0_61, c_0_62]), c_0_63])])).
cnf(c_0_65, plain, ($false), inference(cn,[status(thm)],[inference(rw,[status(thm)],[inference(spm,[status(thm)],[c_0_64, c_0_45]), c_0_54])]), ['proof']).
# SZS output end CNFRefutation
# Proof object total steps             : 66
# Proof object clause steps            : 34
# Proof object formula steps           : 32
# Proof object conjectures             : 4
# Proof object clause conjectures      : 2
# Proof object formula conjectures     : 2
# Proof object initial clauses used    : 19
# Proof object initial formulas used   : 16
# Proof object generating inferences   : 15
# Proof object simplifying inferences  : 13
# Training examples: 0 positive, 0 negative
# Parsed axioms                        : 16
# Removed by relevancy pruning/SinE    : 0
# Initial clauses                      : 22
# Removed in clause preprocessing      : 1
# Initial clauses in saturation        : 21
# Processed clauses                    : 63
# ...of these trivial                  : 0
# ...subsumed                          : 1
# ...remaining for further processing  : 62
# Other redundant clauses eliminated   : 0
# Clauses deleted for lack of memory   : 0
# Backward-subsumed                    : 2
# Backward-rewritten                   : 0
# Generated clauses                    : 25
# ...of the previous two non-trivial   : 24
# Contextual simplify-reflections      : 6
# Paramodulations                      : 25
# Factorizations                       : 0
# NegExts                              : 0
# Equation resolutions                 : 0
# Propositional unsat checks           : 0
#    Propositional check models        : 0
#    Propositional check unsatisfiable : 0
#    Propositional clauses             : 0
#    Propositional clauses after purity: 0
#    Propositional unsat core size     : 0
#    Propositional preprocessing time  : 0.000
#    Propositional encoding time       : 0.000
#    Propositional solver time         : 0.000
#    Success case prop preproc time    : 0.000
#    Success case prop encoding time   : 0.000
#    Success case prop solver time     : 0.000
# Current number of processed clauses  : 39
#    Positive orientable unit clauses  : 6
#    Positive unorientable unit clauses: 0
#    Negative unit clauses             : 4
#    Non-unit-clauses                  : 29
# Current number of unprocessed clauses: 3
# ...number of literals in the above   : 17
# Current number of archived formulas  : 0
# Current number of archived clauses   : 23
# Clause-clause subsumption calls (NU) : 241
# Rec. Clause-clause subsumption calls : 78
# Non-unit clause-clause subsumptions  : 9
# Unit Clause-clause subsumption calls : 6
# Rewrite failures with RHS unbound    : 0
# BW rewrite match attempts            : 0
# BW rewrite match successes           : 0
# Condensation attempts                : 0
# Condensation successes               : 0
# Termbank termtop insertions          : 2186

# -------------------------------------------------
# User time                : 0.018 s
# System time              : 0.008 s
# Total time               : 0.025 s
# Maximum resident set size: 3476 pages
