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(************************************************************************)
(* * The Coq Proof Assistant / The Coq Development Team *)
(* v * INRIA, CNRS and contributors - Copyright 1999-2018 *)
(* <O___,, * (see CREDITS file for the list of authors) *)
(* \VV/ **************************************************************)
(* // * This file is distributed under the terms of the *)
(* * GNU Lesser General Public License Version 2.1 *)
(* * (see LICENSE file for the text of the license) *)
(************************************************************************)
open Names
open Constr
(** This module defines the internal representation of global
declarations. This includes global constants/axioms, mutual
inductive definitions, modules and module types *)
type set_predicativity = ImpredicativeSet | PredicativeSet
type engagement = set_predicativity
(** {6 Representation of constants (Definition/Axiom) } *)
(** Non-universe polymorphic mode polymorphism (Coq 8.2+): inductives
and constants hiding inductives are implicitely polymorphic when
applied to parameters, on the universes appearing in the whnf of
their parameters and their conclusion, in a template style.
In truely universe polymorphic mode, we always use RegularArity.
*)
type template_arity = {
template_param_levels : Univ.Level.t option list;
template_level : Univ.Universe.t;
}
type ('a, 'b) declaration_arity =
| RegularArity of 'a
| TemplateArity of 'b
(** Inlining level of parameters at functor applications.
None means no inlining *)
type inline = int option
(** A constant can have no body (axiom/parameter), or a
transparent body, or an opaque one *)
(** Projections are a particular kind of constant:
always transparent. *)
type projection_body = {
proj_ind : MutInd.t;
proj_npars : int;
proj_arg : int;
proj_type : types; (* Type under params *)
proj_eta : constr * types; (* Eta-expanded term and type *)
proj_body : constr; (* For compatibility with VMs only, the match version *)
}
(* Global declarations (i.e. constants) can be either: *)
type constant_def =
| Undef of inline (** a global assumption *)
| Def of constr Mod_subst.substituted (** or a transparent global definition *)
| OpaqueDef of Opaqueproof.opaque (** or an opaque global definition *)
type constant_universes =
| Monomorphic_const of Univ.ContextSet.t
| Polymorphic_const of Univ.AUContext.t
(** The [typing_flags] are instructions to the type-checker which
modify its behaviour. The typing flags used in the type-checking
of a constant are tracked in their {!constant_body} so that they
can be displayed to the user. *)
type typing_flags = {
check_guarded : bool; (** If [false] then fixed points and co-fixed
points are assumed to be total. *)
check_universes : bool; (** If [false] universe constraints are not checked *)
conv_oracle : Conv_oracle.oracle; (** Unfolding strategies for conversion *)
}
(* some contraints are in constant_constraints, some other may be in
* the OpaqueDef *)
type constant_body = {
const_hyps : Context.Named.t; (** New: younger hyp at top *)
const_body : constant_def;
const_type : types;
const_body_code : Cemitcodes.to_patch_substituted option;
const_universes : constant_universes;
const_proj : bool;
const_inline_code : bool;
const_typing_flags : typing_flags; (** The typing options which
were used for
type-checking. *)
}
(** {6 Representation of mutual inductive types in the kernel } *)
type recarg =
| Norec
| Mrec of inductive
| Imbr of inductive
type wf_paths = recarg Rtree.t
(**
{v
Inductive I1 (params) : U1 := c11 : T11 | ... | c1p1 : T1p1
...
with In (params) : Un := cn1 : Tn1 | ... | cnpn : Tnpn
v}
*)
(** Record information:
If the record is not primitive, then None
Otherwise, we get:
- The identifier for the binder name of the record in primitive projections.
- The constants associated to each projection.
- The checked projection bodies. *)
type record_body = (Id.t * Constant.t array * projection_body array) option
type regular_inductive_arity = {
mind_user_arity : types;
mind_sort : Sorts.t;
}
type inductive_arity = (regular_inductive_arity, template_arity) declaration_arity
type one_inductive_body = {
(** {8 Primitive datas } *)
mind_typename : Id.t; (** Name of the type: [Ii] *)
mind_arity_ctxt : Context.Rel.t; (** Arity context of [Ii] with parameters: [forall params, Ui] *)
mind_arity : inductive_arity; (** Arity sort and original user arity *)
mind_consnames : Id.t array; (** Names of the constructors: [cij] *)
mind_user_lc : types array;
(** Types of the constructors with parameters: [forall params, Tij],
where the Ik are replaced by de Bruijn index in the
context I1:forall params, U1 .. In:forall params, Un *)
(** {8 Derived datas } *)
mind_nrealargs : int; (** Number of expected real arguments of the type (no let, no params) *)
mind_nrealdecls : int; (** Length of realargs context (with let, no params) *)
mind_kelim : Sorts.family list; (** List of allowed elimination sorts *)
mind_nf_lc : types array; (** Head normalized constructor types so that their conclusion exposes the inductive type *)
mind_consnrealargs : int array;
(** Number of expected proper arguments of the constructors (w/o params) *)
mind_consnrealdecls : int array;
(** Length of the signature of the constructors (with let, w/o params) *)
mind_recargs : wf_paths; (** Signature of recursive arguments in the constructors *)
(** {8 Datas for bytecode compilation } *)
mind_nb_constant : int; (** number of constant constructor *)
mind_nb_args : int; (** number of no constant constructor *)
mind_reloc_tbl : Cbytecodes.reloc_table;
}
type abstract_inductive_universes =
| Monomorphic_ind of Univ.ContextSet.t
| Polymorphic_ind of Univ.AUContext.t
| Cumulative_ind of Univ.ACumulativityInfo.t
type recursivity_kind =
| Finite (** = inductive *)
| CoFinite (** = coinductive *)
| BiFinite (** = non-recursive, like in "Record" definitions *)
type mutual_inductive_body = {
mind_packets : one_inductive_body array; (** The component of the mutual inductive block *)
mind_record : record_body option; (** The record information *)
mind_finite : recursivity_kind; (** Whether the type is inductive or coinductive *)
mind_ntypes : int; (** Number of types in the block *)
mind_hyps : Context.Named.t; (** Section hypotheses on which the block depends *)
mind_nparams : int; (** Number of expected parameters including non-uniform ones (i.e. length of mind_params_ctxt w/o let-in) *)
mind_nparams_rec : int; (** Number of recursively uniform (i.e. ordinary) parameters *)
mind_params_ctxt : Context.Rel.t; (** The context of parameters (includes let-in declaration) *)
mind_universes : abstract_inductive_universes; (** Information about monomorphic/polymorphic/cumulative inductives and their universes *)
mind_private : bool option; (** allow pattern-matching: Some true ok, Some false blocked *)
mind_typing_flags : typing_flags; (** typing flags at the time of the inductive creation *)
}
(** {6 Module declarations } *)
(** Functor expressions are forced to be on top of other expressions *)
type ('ty,'a) functorize =
| NoFunctor of 'a
| MoreFunctor of MBId.t * 'ty * ('ty,'a) functorize
(** The fully-algebraic module expressions : names, applications, 'with ...'.
They correspond to the user entries of non-interactive modules.
They will be later expanded into module structures in [Mod_typing],
and won't play any role into the kernel after that : they are kept
only for short module printing and for extraction. *)
type with_declaration =
| WithMod of Id.t list * ModPath.t
| WithDef of Id.t list * (constr * Univ.AUContext.t option)
type module_alg_expr =
| MEident of ModPath.t
| MEapply of module_alg_expr * ModPath.t
| MEwith of module_alg_expr * with_declaration
(** A component of a module structure *)
type structure_field_body =
| SFBconst of constant_body
| SFBmind of mutual_inductive_body
| SFBmodule of module_body
| SFBmodtype of module_type_body
(** A module structure is a list of labeled components.
Note : we may encounter now (at most) twice the same label in
a [structure_body], once for a module ([SFBmodule] or [SFBmodtype])
and once for an object ([SFBconst] or [SFBmind]) *)
and structure_body = (Label.t * structure_field_body) list
(** A module signature is a structure, with possibly functors on top of it *)
and module_signature = (module_type_body,structure_body) functorize
(** A module expression is an algebraic expression, possibly functorized. *)
and module_expression = (module_type_body,module_alg_expr) functorize
and module_implementation =
| Abstract (** no accessible implementation *)
| Algebraic of module_expression (** non-interactive algebraic expression *)
| Struct of module_signature (** interactive body *)
| FullStruct (** special case of [Struct] : the body is exactly [mod_type] *)
and 'a generic_module_body =
{ mod_mp : ModPath.t; (** absolute path of the module *)
mod_expr : 'a; (** implementation *)
mod_type : module_signature; (** expanded type *)
mod_type_alg : module_expression option; (** algebraic type *)
mod_constraints : Univ.ContextSet.t; (**
set of all universes constraints in the module *)
mod_delta : Mod_subst.delta_resolver; (**
quotiented set of equivalent constants and inductive names *)
mod_retroknowledge : 'a module_retroknowledge }
(** For a module, there are five possible situations:
- [Declare Module M : T] then [mod_expr = Abstract; mod_type_alg = Some T]
- [Module M := E] then [mod_expr = Algebraic E; mod_type_alg = None]
- [Module M : T := E] then [mod_expr = Algebraic E; mod_type_alg = Some T]
- [Module M. ... End M] then [mod_expr = FullStruct; mod_type_alg = None]
- [Module M : T. ... End M] then [mod_expr = Struct; mod_type_alg = Some T]
And of course, all these situations may be functors or not. *)
and module_body = module_implementation generic_module_body
(** A [module_type_body] is just a [module_body] with no implementation and
also an empty [mod_retroknowledge]. Its [mod_type_alg] contains
the algebraic definition of this module type, or [None]
if it has been built interactively. *)
and module_type_body = unit generic_module_body
and _ module_retroknowledge =
| ModBodyRK :
Retroknowledge.action list -> module_implementation module_retroknowledge
| ModTypeRK : unit module_retroknowledge
(** Extra invariants :
- No [MEwith] inside a [mod_expr] implementation : the 'with' syntax
is only supported for module types
- A module application is atomic, for instance ((M N) P) :
* the head of [MEapply] can only be another [MEapply] or a [MEident]
* the argument of [MEapply] is now directly forced to be a [ModPath.t].
*)
|