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(************************************************************************)
(* v * The Coq Proof Assistant / The Coq Development Team *)
(* <O___,, * INRIA - CNRS - LIX - LRI - PPS - Copyright 1999-2016 *)
(* \VV/ **************************************************************)
(* // * This file is distributed under the terms of the *)
(* * GNU Lesser General Public License Version 2.1 *)
(************************************************************************)
open Names
open Term
(** 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 *)
(** {6 Local entries } *)
type local_entry =
| LocalDefEntry of constr
| LocalAssumEntry of constr
(** {6 Declaration of inductive types. } *)
(** Assume the following definition in concrete syntax:
{v Inductive I1 (x1:X1) ... (xn:Xn) : A1 := c11 : T11 | ... | c1n1 : T1n1
...
with Ip (x1:X1) ... (xn:Xn) : Ap := cp1 : Tp1 | ... | cpnp : Tpnp. v}
then, in i{^ th} 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 = {
mind_entry_typename : Id.t;
mind_entry_arity : constr;
mind_entry_template : bool; (* Use template polymorphism *)
mind_entry_consnames : Id.t list;
mind_entry_lc : constr list }
type mutual_inductive_entry = {
mind_entry_record : (Id.t option) option;
(** Some (Some id): primitive record with id the binder name of the record
in projections.
Some None: non-primitive record *)
mind_entry_finite : Decl_kinds.recursivity_kind;
mind_entry_params : (Id.t * local_entry) list;
mind_entry_inds : one_inductive_entry list;
mind_entry_polymorphic : bool;
mind_entry_universes : Univ.universe_info_ind;
(* universe constraints and the constraints for subtyping of
inductive types in the block. *)
mind_entry_private : bool option;
}
(** {6 Constants (Definition/Axiom) } *)
type 'a proof_output = constr Univ.in_universe_context_set * 'a
type 'a const_entry_body = 'a proof_output Future.computation
type 'a definition_entry = {
const_entry_body : 'a const_entry_body;
(* List of section variables *)
const_entry_secctx : Context.Named.t option;
(* State id on which the completion of type checking is reported *)
const_entry_feedback : Stateid.t option;
const_entry_type : types option;
const_entry_polymorphic : bool;
const_entry_universes : Univ.universe_context;
const_entry_opaque : bool;
const_entry_inline_code : bool }
type inline = int option (* inlining level, None for no inlining *)
type parameter_entry =
Context.Named.t option * bool * types Univ.in_universe_context * inline
type projection_entry = {
proj_entry_ind : mutual_inductive;
proj_entry_arg : int }
type 'a constant_entry =
| DefinitionEntry of 'a definition_entry
| ParameterEntry of parameter_entry
| ProjectionEntry of projection_entry
(** {6 Modules } *)
type module_struct_entry = Declarations.module_alg_expr
type module_params_entry =
(MBId.t * module_struct_entry) list (** older first *)
type module_type_entry = module_params_entry * module_struct_entry
type module_entry =
| MType of module_params_entry * module_struct_entry
| MExpr of
module_params_entry * module_struct_entry * module_struct_entry option
type seff_env =
[ `Nothing
(* The proof term and its universes.
Same as the constant_body's but not in an ephemeron *)
| `Opaque of Constr.t * Univ.universe_context_set ]
type side_eff =
| SEsubproof of constant * Declarations.constant_body * seff_env
| SEscheme of (inductive * constant * Declarations.constant_body * seff_env) list * string
type side_effect = {
from_env : Declarations.structure_body CEphemeron.key;
eff : side_eff;
}
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