(************************************************************************) (* v * The Coq Proof Assistant / The Coq Development Team *) (* anomaly (locstr^": cannot find "^(string_of_path sp)) let coq_reference locstr dir s = find_reference locstr ("Coq"::dir) s let coq_constant locstr dir s = constr_of_global (coq_reference locstr dir s) let gen_reference = coq_reference let gen_constant = coq_constant let has_suffix_in_dirs dirs ref = let dir = dirpath (path_of_global ref) in List.exists (fun d -> is_dirpath_prefix_of d dir) dirs let global_of_extended q = try Some (global_of_extended_global q) with Not_found -> None let gen_constant_in_modules locstr dirs s = let dirs = List.map make_dir dirs in let qualid = qualid_of_string s in let all = Nametab.locate_extended_all qualid in let all = list_uniquize (list_map_filter global_of_extended all) in let these = List.filter (has_suffix_in_dirs dirs) all in match these with | [x] -> constr_of_global x | [] -> anomalylabstrm "" (str (locstr^": cannot find "^s^ " in module"^(if List.length dirs > 1 then "s " else " ")) ++ prlist_with_sep pr_comma pr_dirpath dirs) | l -> anomalylabstrm "" (str (locstr^": found more than once object of name "^s^ " in module"^(if List.length dirs > 1 then "s " else " ")) ++ prlist_with_sep pr_comma pr_dirpath dirs) (* For tactics/commands requiring vernacular libraries *) let check_required_library d = let d' = List.map id_of_string d in let dir = make_dirpath (List.rev d') in let mp = (fst(Lib.current_prefix())) in let current_dir = match mp with | MPfile dp -> (dir=dp) | _ -> false in if not (Library.library_is_loaded dir) then if not current_dir then (* Loading silently ... let m, prefix = list_sep_last d' in read_library (dummy_loc,make_qualid (make_dirpath (List.rev prefix)) m) *) (* or failing ...*) error ("Library "^(string_of_dirpath dir)^" has to be required first.") (************************************************************************) (* Specific Coq objects *) let init_reference dir s = gen_reference "Coqlib" ("Init"::dir) s let init_constant dir s = gen_constant "Coqlib" ("Init"::dir) s let logic_constant dir s = gen_constant "Coqlib" ("Logic"::dir) s let arith_dir = ["Coq";"Arith"] let arith_modules = [arith_dir] let numbers_dir = [ "Coq";"Numbers"] let parith_dir = ["Coq";"PArith"] let narith_dir = ["Coq";"NArith"] let zarith_dir = ["Coq";"ZArith"] let zarith_base_modules = [numbers_dir;parith_dir;narith_dir;zarith_dir] let init_dir = ["Coq";"Init"] let init_modules = [ init_dir@["Datatypes"]; init_dir@["Logic"]; init_dir@["Specif"]; init_dir@["Logic_Type"]; init_dir@["Peano"]; init_dir@["Wf"] ] let logic_module_name = ["Coq";"Init";"Logic"] let logic_module = make_dir logic_module_name let logic_type_module_name = ["Coq";"Init";"Logic_Type"] let logic_type_module = make_dir logic_type_module_name let datatypes_module_name = ["Coq";"Init";"Datatypes"] let datatypes_module = make_dir datatypes_module_name let arith_module_name = ["Coq";"Arith";"Arith"] let arith_module = make_dir arith_module_name let jmeq_module_name = ["Coq";"Logic";"JMeq"] let jmeq_module = make_dir jmeq_module_name (* TODO: temporary hack *) let make_kn dir id = Libnames.encode_mind dir id let make_con dir id = Libnames.encode_con dir id (** Identity *) let id = make_con datatypes_module (id_of_string "id") let type_of_id = make_con datatypes_module (id_of_string "ID") let _ = Termops.set_impossible_default_clause (mkConst id,mkConst type_of_id) (** Natural numbers *) let nat_kn = make_kn datatypes_module (id_of_string "nat") let nat_path = Libnames.make_path datatypes_module (id_of_string "nat") let glob_nat = IndRef (nat_kn,0) let path_of_O = ((nat_kn,0),1) let path_of_S = ((nat_kn,0),2) let glob_O = ConstructRef path_of_O let glob_S = ConstructRef path_of_S (** Booleans *) let bool_kn = make_kn datatypes_module (id_of_string "bool") let glob_bool = IndRef (bool_kn,0) let path_of_true = ((bool_kn,0),1) let path_of_false = ((bool_kn,0),2) let glob_true = ConstructRef path_of_true let glob_false = ConstructRef path_of_false (** Equality *) let eq_kn = make_kn logic_module (id_of_string "eq") let glob_eq = IndRef (eq_kn,0) let identity_kn = make_kn datatypes_module (id_of_string "identity") let glob_identity = IndRef (identity_kn,0) let jmeq_kn = make_kn jmeq_module (id_of_string "JMeq") let glob_jmeq = IndRef (jmeq_kn,0) type coq_sigma_data = { proj1 : constr; proj2 : constr; elim : constr; intro : constr; typ : constr } type coq_bool_data = { andb : constr; andb_prop : constr; andb_true_intro : constr} let build_bool_type () = { andb = init_constant ["Datatypes"] "andb"; andb_prop = init_constant ["Datatypes"] "andb_prop"; andb_true_intro = init_constant ["Datatypes"] "andb_true_intro" } let build_sigma_set () = anomaly "Use build_sigma_type" let build_sigma_type () = { proj1 = init_constant ["Specif"] "projT1"; proj2 = init_constant ["Specif"] "projT2"; elim = init_constant ["Specif"] "sigT_rect"; intro = init_constant ["Specif"] "existT"; typ = init_constant ["Specif"] "sigT" } let build_sigma () = { proj1 = init_constant ["Specif"] "proj1_sig"; proj2 = init_constant ["Specif"] "proj2_sig"; elim = init_constant ["Specif"] "sig_rect"; intro = init_constant ["Specif"] "exist"; typ = init_constant ["Specif"] "sig" } let build_prod () = { proj1 = init_constant ["Datatypes"] "fst"; proj2 = init_constant ["Datatypes"] "snd"; elim = init_constant ["Datatypes"] "prod_rec"; intro = init_constant ["Datatypes"] "pair"; typ = init_constant ["Datatypes"] "prod" } (* Equalities *) type coq_eq_data = { eq : constr; ind : constr; refl : constr; sym : constr; trans: constr; congr: constr } (* Data needed for discriminate and injection *) type coq_inversion_data = { inv_eq : constr; (* : forall params, t -> Prop *) inv_ind : constr; (* : forall params P y, eq params y -> P y *) inv_congr: constr (* : forall params B (f:t->B) y, eq params y -> f c=f y *) } let lazy_init_constant dir id = lazy (init_constant dir id) let lazy_logic_constant dir id = lazy (logic_constant dir id) (* Leibniz equality on Type *) let coq_eq_eq = lazy_init_constant ["Logic"] "eq" let coq_eq_refl = lazy_init_constant ["Logic"] "eq_refl" let coq_eq_ind = lazy_init_constant ["Logic"] "eq_ind" let coq_eq_congr = lazy_init_constant ["Logic"] "f_equal" let coq_eq_sym = lazy_init_constant ["Logic"] "eq_sym" let coq_eq_trans = lazy_init_constant ["Logic"] "eq_trans" let coq_f_equal2 = lazy_init_constant ["Logic"] "f_equal2" let coq_eq_congr_canonical = lazy_init_constant ["Logic"] "f_equal_canonical_form" let build_coq_eq_data () = let _ = check_required_library logic_module_name in { eq = Lazy.force coq_eq_eq; ind = Lazy.force coq_eq_ind; refl = Lazy.force coq_eq_refl; sym = Lazy.force coq_eq_sym; trans = Lazy.force coq_eq_trans; congr = Lazy.force coq_eq_congr } let build_coq_eq () = Lazy.force coq_eq_eq let build_coq_eq_refl () = Lazy.force coq_eq_refl let build_coq_eq_sym () = Lazy.force coq_eq_sym let build_coq_f_equal2 () = Lazy.force coq_f_equal2 let build_coq_inversion_eq_data () = let _ = check_required_library logic_module_name in { inv_eq = Lazy.force coq_eq_eq; inv_ind = Lazy.force coq_eq_ind; inv_congr = Lazy.force coq_eq_congr_canonical } (* Heterogenous equality on Type *) let coq_jmeq_eq = lazy_logic_constant ["JMeq"] "JMeq" let coq_jmeq_refl = lazy_logic_constant ["JMeq"] "JMeq_refl" let coq_jmeq_ind = lazy_logic_constant ["JMeq"] "JMeq_ind" let coq_jmeq_sym = lazy_logic_constant ["JMeq"] "JMeq_sym" let coq_jmeq_congr = lazy_logic_constant ["JMeq"] "JMeq_congr" let coq_jmeq_trans = lazy_logic_constant ["JMeq"] "JMeq_trans" let coq_jmeq_congr_canonical = lazy_logic_constant ["JMeq"] "JMeq_congr_canonical_form" let build_coq_jmeq_data () = let _ = check_required_library jmeq_module_name in { eq = Lazy.force coq_jmeq_eq; ind = Lazy.force coq_jmeq_ind; refl = Lazy.force coq_jmeq_refl; sym = Lazy.force coq_jmeq_sym; trans = Lazy.force coq_jmeq_trans; congr = Lazy.force coq_jmeq_congr } let join_jmeq_types eq = mkLambda(Name (id_of_string "A"),Termops.new_Type(), mkLambda(Name (id_of_string "x"),mkRel 1, mkApp (eq,[|mkRel 2;mkRel 1;mkRel 2|]))) let build_coq_inversion_jmeq_data () = let _ = check_required_library logic_module_name in { inv_eq = join_jmeq_types (Lazy.force coq_jmeq_eq); inv_ind = Lazy.force coq_jmeq_ind; inv_congr = Lazy.force coq_jmeq_congr_canonical } (* Specif *) let coq_sumbool = lazy_init_constant ["Specif"] "sumbool" let build_coq_sumbool () = Lazy.force coq_sumbool (* Equality on Type as a Type *) let coq_identity_eq = lazy_init_constant ["Datatypes"] "identity" let coq_identity_refl = lazy_init_constant ["Datatypes"] "identity_refl" let coq_identity_ind = lazy_init_constant ["Datatypes"] "identity_ind" let coq_identity_congr = lazy_init_constant ["Logic_Type"] "identity_congr" let coq_identity_sym = lazy_init_constant ["Logic_Type"] "identity_sym" let coq_identity_trans = lazy_init_constant ["Logic_Type"] "identity_trans" let coq_identity_congr_canonical = lazy_init_constant ["Logic_Type"] "identity_congr_canonical_form" let build_coq_identity_data () = let _ = check_required_library datatypes_module_name in { eq = Lazy.force coq_identity_eq; ind = Lazy.force coq_identity_ind; refl = Lazy.force coq_identity_refl; sym = Lazy.force coq_identity_sym; trans = Lazy.force coq_identity_trans; congr = Lazy.force coq_identity_congr } let build_coq_inversion_identity_data () = let _ = check_required_library datatypes_module_name in let _ = check_required_library logic_type_module_name in { inv_eq = Lazy.force coq_identity_eq; inv_ind = Lazy.force coq_identity_ind; inv_congr = Lazy.force coq_identity_congr_canonical } (* Equality to true *) let coq_eq_true_eq = lazy_init_constant ["Datatypes"] "eq_true" let coq_eq_true_ind = lazy_init_constant ["Datatypes"] "eq_true_ind" let coq_eq_true_congr = lazy_init_constant ["Logic"] "eq_true_congr" let build_coq_inversion_eq_true_data () = let _ = check_required_library datatypes_module_name in let _ = check_required_library logic_module_name in { inv_eq = Lazy.force coq_eq_true_eq; inv_ind = Lazy.force coq_eq_true_ind; inv_congr = Lazy.force coq_eq_true_congr } (* The False proposition *) let coq_False = lazy_init_constant ["Logic"] "False" (* The True proposition and its unique proof *) let coq_True = lazy_init_constant ["Logic"] "True" let coq_I = lazy_init_constant ["Logic"] "I" (* Connectives *) let coq_not = lazy_init_constant ["Logic"] "not" let coq_and = lazy_init_constant ["Logic"] "and" let coq_conj = lazy_init_constant ["Logic"] "conj" let coq_or = lazy_init_constant ["Logic"] "or" let coq_ex = lazy_init_constant ["Logic"] "ex" let coq_iff = lazy_init_constant ["Logic"] "iff" let coq_iff_left_proj = lazy_init_constant ["Logic"] "proj1" let coq_iff_right_proj = lazy_init_constant ["Logic"] "proj2" (* Runtime part *) let build_coq_True () = Lazy.force coq_True let build_coq_I () = Lazy.force coq_I let build_coq_False () = Lazy.force coq_False let build_coq_not () = Lazy.force coq_not let build_coq_and () = Lazy.force coq_and let build_coq_conj () = Lazy.force coq_conj let build_coq_or () = Lazy.force coq_or let build_coq_ex () = Lazy.force coq_ex let build_coq_iff () = Lazy.force coq_iff let build_coq_iff_left_proj () = Lazy.force coq_iff_left_proj let build_coq_iff_right_proj () = Lazy.force coq_iff_right_proj (* The following is less readable but does not depend on parsing *) let coq_eq_ref = lazy (init_reference ["Logic"] "eq") let coq_identity_ref = lazy (init_reference ["Datatypes"] "identity") let coq_jmeq_ref = lazy (gen_reference "Coqlib" ["Logic";"JMeq"] "JMeq") let coq_eq_true_ref = lazy (gen_reference "Coqlib" ["Init";"Datatypes"] "eq_true") let coq_existS_ref = lazy (anomaly "use coq_existT_ref") let coq_existT_ref = lazy (init_reference ["Specif"] "existT") let coq_exist_ref = lazy (init_reference ["Specif"] "exist") let coq_not_ref = lazy (init_reference ["Logic"] "not") let coq_False_ref = lazy (init_reference ["Logic"] "False") let coq_sumbool_ref = lazy (init_reference ["Specif"] "sumbool") let coq_sig_ref = lazy (init_reference ["Specif"] "sig") let coq_or_ref = lazy (init_reference ["Logic"] "or") let coq_iff_ref = lazy (init_reference ["Logic"] "iff")