import
import_segment "hol4"
def_maps
"RES_SELECT" > "RES_SELECT_def"
"RES_FORALL" > "RES_FORALL_def"
"RES_EXISTS_UNIQUE" > "RES_EXISTS_UNIQUE_def"
"RES_EXISTS" > "RES_EXISTS_def"
"RES_ABSTRACT" > "RES_ABSTRACT_def"
"IN" > "IN_def"
"ARB" > "ARB_def"
const_maps
"~" > "Not"
"bool_case" > "Datatype.bool.bool_case"
"\\/" > "op |"
"TYPE_DEFINITION" > "HOL4Setup.TYPE_DEFINITION"
"T" > "True"
"RES_SELECT" > "HOL4Base.bool.RES_SELECT"
"RES_FORALL" > "HOL4Base.bool.RES_FORALL"
"RES_EXISTS_UNIQUE" > "HOL4Base.bool.RES_EXISTS_UNIQUE"
"RES_EXISTS" > "HOL4Base.bool.RES_EXISTS"
"ONTO" > "Fun.surj"
"ONE_ONE" > "HOL4Setup.ONE_ONE"
"LET" > "HOL4Compat.LET"
"IN" > "HOL4Base.bool.IN"
"F" > "False"
"COND" > "HOL.If"
"ARB" > "HOL4Base.bool.ARB"
"?!" > "Ex1"
"?" > "Ex"
"/\\" > "op &"
"!" > "All"
thm_maps
"bool_case_thm" > "HOL4Base.bool.bool_case_thm"
"bool_case_ID" > "HOL4Base.bool.bool_case_ID"
"bool_case_DEF" > "HOL4Compat.bool_case_DEF"
"bool_INDUCT" > "Datatype.bool.induct"
"boolAxiom" > "HOL4Base.bool.boolAxiom"
"UNWIND_THM2" > "HOL.simp_thms_39"
"UNWIND_THM1" > "HOL.simp_thms_40"
"UNWIND_FORALL_THM2" > "HOL.simp_thms_41"
"UNWIND_FORALL_THM1" > "HOL.simp_thms_42"
"UEXISTS_SIMP" > "HOL4Base.bool.UEXISTS_SIMP"
"UEXISTS_OR_THM" > "HOL4Base.bool.UEXISTS_OR_THM"
"T_DEF" > "HOL.True_def"
"TYPE_DEFINITION_THM" > "HOL4Setup.TYPE_DEFINITION"
"TYPE_DEFINITION" > "HOL4Setup.TYPE_DEFINITION"
"TRUTH" > "HOL.TrueI"
"SWAP_FORALL_THM" > "HOL4Base.bool.SWAP_FORALL_THM"
"SWAP_EXISTS_THM" > "HOL4Base.bool.SWAP_EXISTS_THM"
"SKOLEM_THM" > "HOL4Base.bool.SKOLEM_THM"
"SELECT_UNIQUE" > "HOL4Base.bool.SELECT_UNIQUE"
"SELECT_THM" > "HOL4Setup.EXISTS_DEF"
"SELECT_REFL_2" > "Hilbert_Choice.some_sym_eq_trivial"
"SELECT_REFL" > "Hilbert_Choice.some_eq_trivial"
"SELECT_AX" > "Hilbert_Choice.tfl_some"
"RIGHT_OR_OVER_AND" > "HOL.disj_conj_distribR"
"RIGHT_OR_EXISTS_THM" > "HOL.ex_simps_4"
"RIGHT_FORALL_OR_THM" > "HOL.all_simps_4"
"RIGHT_FORALL_IMP_THM" > "HOL.all_simps_6"
"RIGHT_EXISTS_IMP_THM" > "HOL.ex_simps_6"
"RIGHT_EXISTS_AND_THM" > "HOL.ex_simps_2"
"RIGHT_AND_OVER_OR" > "HOL.conj_disj_distribR"
"RIGHT_AND_FORALL_THM" > "HOL.all_simps_2"
"RES_SELECT_def" > "HOL4Base.bool.RES_SELECT_def"
"RES_SELECT_DEF" > "HOL4Base.bool.RES_SELECT_DEF"
"RES_FORALL_def" > "HOL4Base.bool.RES_FORALL_def"
"RES_FORALL_DEF" > "HOL4Base.bool.RES_FORALL_DEF"
"RES_EXISTS_def" > "HOL4Base.bool.RES_EXISTS_def"
"RES_EXISTS_UNIQUE_def" > "HOL4Base.bool.RES_EXISTS_UNIQUE_def"
"RES_EXISTS_UNIQUE_DEF" > "HOL4Base.bool.RES_EXISTS_UNIQUE_DEF"
"RES_EXISTS_DEF" > "HOL4Base.bool.RES_EXISTS_DEF"
"RES_ABSTRACT_DEF" > "HOL4Base.bool.RES_ABSTRACT_DEF"
"REFL_CLAUSE" > "HOL.simp_thms_6"
"OR_INTRO_THM2" > "HOL.disjI2"
"OR_INTRO_THM1" > "HOL.disjI1"
"OR_IMP_THM" > "HOL4Base.bool.OR_IMP_THM"
"OR_ELIM_THM" > "Recdef.tfl_disjE"
"OR_DEF" > "HOL.or_def"
"OR_CONG" > "HOL4Base.bool.OR_CONG"
"OR_CLAUSES" > "HOL4Base.bool.OR_CLAUSES"
"ONTO_THM" > "Fun.surj_def"
"ONTO_DEF" > "Fun.surj_def"
"ONE_ONE_THM" > "HOL4Base.bool.ONE_ONE_THM"
"ONE_ONE_DEF" > "HOL4Setup.ONE_ONE_DEF"
"NOT_IMP" > "HOL.not_imp"
"NOT_FORALL_THM" > "Inductive.basic_monos_15"
"NOT_F" > "HOL.Eq_FalseI"
"NOT_EXISTS_THM" > "Inductive.basic_monos_16"
"NOT_DEF" > "HOL.simp_thms_19"
"NOT_CLAUSES" > "HOL4Base.bool.NOT_CLAUSES"
"NOT_AND" > "HOL4Base.bool.NOT_AND"
"MONO_OR" > "Inductive.basic_monos_3"
"MONO_NOT" > "HOL.rev_contrapos"
"MONO_IMP" > "Set.imp_mono"
"MONO_EXISTS" > "Inductive.basic_monos_5"
"MONO_COND" > "HOL4Base.bool.MONO_COND"
"MONO_AND" > "Inductive.basic_monos_4"
"MONO_ALL" > "Inductive.basic_monos_6"
"LET_THM" > "HOL.Let_def"
"LET_RATOR" > "HOL4Base.bool.LET_RATOR"
"LET_RAND" > "HOL4Base.bool.LET_RAND"
"LET_DEF" > "HOL4Compat.LET_def"
"LET_CONG" > "Recdef.let_cong"
"LEFT_OR_OVER_AND" > "HOL.disj_conj_distribL"
"LEFT_OR_EXISTS_THM" > "HOL.ex_simps_3"
"LEFT_FORALL_OR_THM" > "HOL.all_simps_3"
"LEFT_FORALL_IMP_THM" > "HOL.imp_ex"
"LEFT_EXISTS_IMP_THM" > "HOL.imp_all"
"LEFT_EXISTS_AND_THM" > "HOL.ex_simps_1"
"LEFT_AND_OVER_OR" > "HOL.conj_disj_distribL"
"LEFT_AND_FORALL_THM" > "HOL.all_simps_1"
"IN_def" > "HOL4Base.bool.IN_def"
"IN_DEF" > "HOL4Base.bool.IN_DEF"
"INFINITY_AX" > "HOL4Setup.INFINITY_AX"
"IMP_F_EQ_F" > "HOL4Base.bool.IMP_F_EQ_F"
"IMP_F" > "HOL.notI"
"IMP_DISJ_THM" > "Inductive.basic_monos_11"
"IMP_CONG" > "HOL.imp_cong"
"IMP_CLAUSES" > "HOL4Base.bool.IMP_CLAUSES"
"IMP_ANTISYM_AX" > "HOL4Setup.light_imp_as"
"F_IMP" > "HOL4Base.bool.F_IMP"
"F_DEF" > "HOL.False_def"
"FUN_EQ_THM" > "Fun.expand_fun_eq"
"FORALL_THM" > "HOL4Base.bool.FORALL_THM"
"FORALL_SIMP" > "HOL.simp_thms_35"
"FORALL_DEF" > "HOL.All_def"
"FORALL_AND_THM" > "HOL.all_conj_distrib"
"FALSITY" > "HOL.FalseE"
"EXISTS_UNIQUE_THM" > "HOL4Compat.EXISTS_UNIQUE_DEF"
"EXISTS_UNIQUE_REFL" > "HOL.ex1_eq_1"
"EXISTS_UNIQUE_DEF" > "HOL4Compat.EXISTS_UNIQUE_DEF"
"EXISTS_THM" > "HOL4Base.bool.EXISTS_THM"
"EXISTS_SIMP" > "HOL.simp_thms_36"
"EXISTS_REFL" > "HOL.simp_thms_37"
"EXISTS_OR_THM" > "HOL.ex_disj_distrib"
"EXISTS_DEF" > "HOL4Setup.EXISTS_DEF"
"EXCLUDED_MIDDLE" > "HOL4Base.bool.EXCLUDED_MIDDLE"
"ETA_THM" > "Presburger.fm_modd_pinf"
"ETA_AX" > "Presburger.fm_modd_pinf"
"EQ_TRANS" > "Set.basic_trans_rules_31"
"EQ_SYM_EQ" > "HOL.eq_sym_conv"
"EQ_SYM" > "HOL.meta_eq_to_obj_eq"
"EQ_REFL" > "Presburger.fm_modd_pinf"
"EQ_IMP_THM" > "HOL.iff_conv_conj_imp"
"EQ_EXT" > "HOL.meta_eq_to_obj_eq"
"EQ_EXPAND" > "HOL4Base.bool.EQ_EXPAND"
"EQ_CLAUSES" > "HOL4Base.bool.EQ_CLAUSES"
"DISJ_SYM" > "HOL.disj_comms_1"
"DISJ_IMP_THM" > "HOL.imp_disjL"
"DISJ_COMM" > "HOL.disj_comms_1"
"DISJ_ASSOC" > "Recdef.tfl_disj_assoc"
"DE_MORGAN_THM" > "HOL4Base.bool.DE_MORGAN_THM"
"CONJ_SYM" > "HOL.conj_comms_1"
"CONJ_COMM" > "HOL.conj_comms_1"
"CONJ_ASSOC" > "HOL.conj_assoc"
"COND_RATOR" > "HOL4Base.bool.COND_RATOR"
"COND_RAND" > "HOL.if_distrib"
"COND_ID" > "HOL.if_cancel"
"COND_EXPAND" > "HOL4Base.bool.COND_EXPAND"
"COND_DEF" > "HOL4Compat.COND_DEF"
"COND_CONG" > "HOL4Base.bool.COND_CONG"
"COND_CLAUSES" > "HOL4Base.bool.COND_CLAUSES"
"COND_ABS" > "HOL4Base.bool.COND_ABS"
"BOTH_FORALL_OR_THM" > "HOL4Base.bool.BOTH_FORALL_OR_THM"
"BOTH_FORALL_IMP_THM" > "HOL4Base.bool.BOTH_FORALL_IMP_THM"
"BOTH_EXISTS_IMP_THM" > "HOL4Base.bool.BOTH_EXISTS_IMP_THM"
"BOTH_EXISTS_AND_THM" > "HOL4Base.bool.BOTH_EXISTS_AND_THM"
"BOOL_FUN_INDUCT" > "HOL4Base.bool.BOOL_FUN_INDUCT"
"BOOL_FUN_CASES_THM" > "HOL4Base.bool.BOOL_FUN_CASES_THM"
"BOOL_EQ_DISTINCT" > "HOL4Base.bool.BOOL_EQ_DISTINCT"
"BOOL_CASES_AX" > "Datatype.bool.nchotomy"
"BETA_THM" > "Presburger.fm_modd_pinf"
"ARB_def" > "HOL4Base.bool.ARB_def"
"ARB_DEF" > "HOL4Base.bool.ARB_DEF"
"AND_INTRO_THM" > "HOL.conjI"
"AND_IMP_INTRO" > "HOL.imp_conjL"
"AND_DEF" > "HOL.and_def"
"AND_CONG" > "HOL4Base.bool.AND_CONG"
"AND_CLAUSES" > "HOL4Base.bool.AND_CLAUSES"
"AND2_THM" > "HOL.conjunct2"
"AND1_THM" > "HOL.conjunct1"
"ABS_SIMP" > "Presburger.fm_modd_pinf"
"ABS_REP_THM" > "HOL4Base.bool.ABS_REP_THM"
ignore_thms
"UNBOUNDED_THM"
"UNBOUNDED_DEF"
"BOUNDED_THM"
"BOUNDED_DEF"
end