package coq

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package coq
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This module defines the entry types for global declarations. This information is entered in the environments. This includes global constants/axioms, mutual inductive definitions, modules and module types

type universes_entry =
  1. | Monomorphic_entry
  2. | Polymorphic_entry of Univ.UContext.t
type inductive_universes_entry =
  1. | Monomorphic_ind_entry
  2. | Polymorphic_ind_entry of Univ.UContext.t
  3. | Template_ind_entry of Univ.ContextSet.t
type variance_entry = Univ.Variance.t option array
type 'a in_universes_entry = 'a * universes_entry
Declaration of inductive types.

Assume the following definition in concrete syntax:

Inductive I1 (x1:X1) ... (xn:Xn) : A1 := c11 : T11 | ... | c1n1 : T1n1
...
with      Ip (x1:X1) ... (xn:Xn) : Ap := cp1 : Tp1 | ... | cpnp : Tpnp.

then, in ith block, mind_entry_params is xn:Xn;...;x1:X1; mind_entry_arity is Ai, defined in context x1:X1;...;xn:Xn; mind_entry_lc is Ti1;...;Tini, defined in context [A'1;...;A'p;x1:X1;...;xn:Xn] where A'i is Ai generalized over [x1:X1;...;xn:Xn].

type one_inductive_entry = {
  1. mind_entry_typename : Names.Id.t;
  2. mind_entry_arity : Constr.constr;
  3. mind_entry_consnames : Names.Id.t list;
  4. mind_entry_lc : Constr.constr list;
}
type mutual_inductive_entry = {
  1. mind_entry_record : Names.Id.t array option option;
    (*

    Some (Some ids): primitive records with ids the binder name of each record in their respective projections. Not used by the kernel. Some None: non-primitive record

    *)
  2. mind_entry_finite : Declarations.recursivity_kind;
  3. mind_entry_params : Constr.rel_context;
  4. mind_entry_inds : one_inductive_entry list;
  5. mind_entry_universes : inductive_universes_entry;
  6. mind_entry_variance : variance_entry option;
  7. mind_entry_private : bool option;
}
Constants (Definition/Axiom)
type definition_entry = {
  1. const_entry_body : Constr.constr;
  2. const_entry_secctx : Names.Id.Set.t option;
  3. const_entry_type : Constr.types option;
  4. const_entry_universes : universes_entry;
  5. const_entry_inline_code : bool;
}
type section_def_entry = {
  1. secdef_body : Constr.constr;
  2. secdef_secctx : Names.Id.Set.t option;
  3. secdef_type : Constr.types option;
}
type 'a opaque_entry = {
  1. opaque_entry_body : 'a;
  2. opaque_entry_secctx : Names.Id.Set.t;
  3. opaque_entry_type : Constr.types;
  4. opaque_entry_universes : universes_entry;
}
type inline = int option
type parameter_entry = {
  1. parameter_entry_secctx : Names.Id.Set.t option;
  2. parameter_entry_type : Constr.types;
  3. parameter_entry_universes : universes_entry;
  4. parameter_entry_inline_code : inline;
}
type primitive_entry = {
  1. prim_entry_type : Constr.types in_universes_entry option;
  2. prim_entry_content : CPrimitives.op_or_type;
}
type 'a proof_output = Constr.constr Univ.in_universe_context_set * 'a
type constant_entry =
  1. | DefinitionEntry : definition_entry -> constant_entry
  2. | ParameterEntry : parameter_entry -> constant_entry
  3. | PrimitiveEntry : primitive_entry -> constant_entry
Modules
type module_struct_entry = (Constr.constr * Univ.AbstractContext.t option) Declarations.module_alg_expr
type module_params_entry = (Names.MBId.t * module_struct_entry * inline) list

older first

type module_type_entry = module_params_entry * module_struct_entry
type module_entry =
  1. | MType of module_params_entry * module_struct_entry
  2. | MExpr of module_params_entry * module_struct_entry * module_struct_entry option