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|
(************************************************************************)
(* v * The Coq Proof Assistant / The Coq Development Team *)
(* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *)
(* \VV/ **************************************************************)
(* // * This file is distributed under the terms of the *)
(* * GNU Lesser General Public License Version 2.1 *)
(************************************************************************)
(*i $Id: term.mli 8049 2006-02-16 10:42:18Z coq $ i*)
(*i*)
open Names
(*i*)
(*s The sorts of CCI. *)
type contents = Pos | Null
type sorts =
| Prop of contents (* Prop and Set *)
| Type of Univ.universe (* Type *)
val mk_Set : sorts
val mk_Prop : sorts
val type_0 : sorts
(*s The sorts family of CCI. *)
type sorts_family = InProp | InSet | InType
val family_of_sort : sorts -> sorts_family
(*s Useful types *)
(*s Existential variables *)
type existential_key = int
(*s Existential variables *)
type metavariable = int
(*s Case annotation *)
type pattern_source = DefaultPat of int | RegularPat
type case_style = LetStyle | IfStyle | MatchStyle | RegularStyle
type case_printing =
{ ind_nargs : int; (* number of real args of the inductive type *)
style : case_style;
source : pattern_source array }
(* the integer is the number of real args, needed for reduction *)
type case_info =
{ ci_ind : inductive;
ci_npar : int;
ci_cstr_nargs : int array; (* number of real args of each constructor *)
ci_pp_info : case_printing (* not interpreted by the kernel *)
}
(*s*******************************************************************)
(* The type of constructions *)
type constr
(* [eq_constr a b] is true if [a] equals [b] modulo alpha, casts,
and application grouping *)
val eq_constr : constr -> constr -> bool
(* [types] is the same as [constr] but is intended to be used where a
{\em type} in CCI sense is expected (Rem:plurial form since [type] is a
reserved ML keyword) *)
type types = constr
(*s Functions about [types] *)
val type_app : (constr -> constr) -> types -> types
val body_of_type : types -> constr
(*s Functions for dealing with constr terms.
The following functions are intended to simplify and to uniform the
manipulation of terms. Some of these functions may be overlapped with
previous ones. *)
(*s Term constructors. *)
(* Constructs a DeBrujin index (DB indices begin at 1) *)
val mkRel : int -> constr
(* Constructs a Variable *)
val mkVar : identifier -> constr
(* Constructs an patvar named "?n" *)
val mkMeta : metavariable -> constr
(* Constructs an existential variable *)
type existential = existential_key * constr array
val mkEvar : existential -> constr
(* Construct a sort *)
val mkSort : sorts -> types
val mkProp : types
val mkSet : types
val mkType : Univ.universe -> types
(* This defines the strategy to use for verifiying a Cast *)
type cast_kind = VMcast | DEFAULTcast
(* Constructs the term [t1::t2], i.e. the term $t_1$ casted with the
type $t_2$ (that means t2 is declared as the type of t1). *)
val mkCast : constr * cast_kind * constr -> constr
(* Constructs the product [(x:t1)t2] *)
val mkProd : name * types * types -> types
val mkNamedProd : identifier -> types -> types -> types
(* non-dependant product $t_1 \rightarrow t_2$, an alias for
[(_:t1)t2]. Beware $t_2$ is NOT lifted.
Eg: A |- A->A is built by [(mkArrow (mkRel 0) (mkRel 1))] *)
val mkArrow : types -> types -> constr
(* Constructs the abstraction $[x:t_1]t_2$ *)
val mkLambda : name * types * constr -> constr
val mkNamedLambda : identifier -> types -> constr -> constr
(* Constructs the product [let x = t1 : t2 in t3] *)
val mkLetIn : name * constr * types * constr -> constr
val mkNamedLetIn : identifier -> constr -> types -> constr -> constr
(* [mkApp (f,[| t_1; ...; t_n |]] constructs the application
$(f~t_1~\dots~t_n)$. *)
val mkApp : constr * constr array -> constr
(* Constructs a constant *)
(* The array of terms correspond to the variables introduced in the section *)
val mkConst : constant -> constr
(* Inductive types *)
(* Constructs the ith (co)inductive type of the block named kn *)
(* The array of terms correspond to the variables introduced in the section *)
val mkInd : inductive -> constr
(* Constructs the jth constructor of the ith (co)inductive type of the
block named kn. The array of terms correspond to the variables
introduced in the section *)
val mkConstruct : constructor -> constr
(* Constructs the term <p>Case c of c1 | c2 .. | cn end *)
val mkCase : case_info * constr * constr * constr array -> constr
(* If [recindxs = [|i1,...in|]]
[funnames = [|f1,.....fn|]]
[typarray = [|t1,...tn|]]
[bodies = [|b1,.....bn|]]
then [ mkFix ((recindxs,i), funnames, typarray, bodies) ]
constructs the $i$th function of the block (counting from 0)
[Fixpoint f1 [ctx1] = b1
with f2 [ctx2] = b2
...
with fn [ctxn] = bn.]
\noindent where the length of the $j$th context is $ij$.
*)
type rec_declaration = name array * types array * constr array
type fixpoint = (int array * int) * rec_declaration
val mkFix : fixpoint -> constr
(* If [funnames = [|f1,.....fn|]]
[typarray = [|t1,...tn|]]
[bodies = [b1,.....bn]] \par\noindent
then [mkCoFix (i, (typsarray, funnames, bodies))]
constructs the ith function of the block
[CoFixpoint f1 = b1
with f2 = b2
...
with fn = bn.]
*)
type cofixpoint = int * rec_declaration
val mkCoFix : cofixpoint -> constr
(*s Concrete type for making pattern-matching. *)
(* [constr array] is an instance matching definitional [named_context] in
the same order (i.e. last argument first) *)
type 'constr pexistential = existential_key * 'constr array
type ('constr, 'types) prec_declaration =
name array * 'types array * 'constr array
type ('constr, 'types) pfixpoint =
(int array * int) * ('constr, 'types) prec_declaration
type ('constr, 'types) pcofixpoint =
int * ('constr, 'types) prec_declaration
type ('constr, 'types) kind_of_term =
| Rel of int
| Var of identifier
| Meta of metavariable
| Evar of 'constr pexistential
| Sort of sorts
| Cast of 'constr * cast_kind * 'types
| Prod of name * 'types * 'types
| Lambda of name * 'types * 'constr
| LetIn of name * 'constr * 'types * 'constr
| App of 'constr * 'constr array
| Const of constant
| Ind of inductive
| Construct of constructor
| Case of case_info * 'constr * 'constr * 'constr array
| Fix of ('constr, 'types) pfixpoint
| CoFix of ('constr, 'types) pcofixpoint
(* User view of [constr]. For [App], it is ensured there is at
least one argument and the function is not itself an applicative
term *)
val kind_of_term : constr -> (constr, types) kind_of_term
(* Experimental *)
type ('constr, 'types) kind_of_type =
| SortType of sorts
| CastType of 'types * 'types
| ProdType of name * 'types * 'types
| LetInType of name * 'constr * 'types * 'types
| AtomicType of 'constr * 'constr array
val kind_of_type : types -> (constr, types) kind_of_type
(*s Simple term case analysis. *)
val isRel : constr -> bool
val isVar : constr -> bool
val isInd : constr -> bool
val isEvar : constr -> bool
val isMeta : constr -> bool
val isSort : constr -> bool
val isCast : constr -> bool
val isApp : constr -> bool
val isProd : constr -> bool
val isConst : constr -> bool
val isConstruct : constr -> bool
val is_Prop : constr -> bool
val is_Set : constr -> bool
val isprop : constr -> bool
val is_Type : constr -> bool
val iskind : constr -> bool
val is_small : sorts -> bool
(*s Term destructors.
Destructor operations are partial functions and
raise [invalid_arg "dest*"] if the term has not the expected form. *)
(* Destructs a DeBrujin index *)
val destRel : constr -> int
(* Destructs an existential variable *)
val destMeta : constr -> metavariable
(* Destructs a variable *)
val destVar : constr -> identifier
(* Destructs a sort. [is_Prop] recognizes the sort \textsf{Prop}, whether
[isprop] recognizes both \textsf{Prop} and \textsf{Set}. *)
val destSort : constr -> sorts
(* Destructs a casted term *)
val destCast : constr -> constr * cast_kind * constr
(* Destructs the product $(x:t_1)t_2$ *)
val destProd : types -> name * types * types
(* Destructs the abstraction $[x:t_1]t_2$ *)
val destLambda : constr -> name * types * constr
(* Destructs the let $[x:=b:t_1]t_2$ *)
val destLetIn : constr -> name * constr * types * constr
(* Destructs an application *)
val destApp : constr -> constr * constr array
(* Obsolete synonym of destApp *)
val destApplication : constr -> constr * constr array
(* Decompose any term as an applicative term; the list of args can be empty *)
val decompose_app : constr -> constr * constr list
(* Destructs a constant *)
val destConst : constr -> constant
(* Destructs an existential variable *)
val destEvar : constr -> existential
(* Destructs a (co)inductive type *)
val destInd : constr -> inductive
(* Destructs a constructor *)
val destConstruct : constr -> constructor
(* Destructs a term <p>Case c of lc1 | lc2 .. | lcn end *)
val destCase : constr -> case_info * constr * constr * constr array
(* Destructs the $i$th function of the block
$\mathit{Fixpoint} ~ f_1 ~ [ctx_1] = b_1
\mathit{with} ~ f_2 ~ [ctx_2] = b_2
\dots
\mathit{with} ~ f_n ~ [ctx_n] = b_n$,
where the lenght of the $j$th context is $ij$.
*)
val destFix : constr -> fixpoint
val destCoFix : constr -> cofixpoint
(*s A {\em declaration} has the form (name,body,type). It is either an
{\em assumption} if [body=None] or a {\em definition} if
[body=Some actualbody]. It is referred by {\em name} if [na] is an
identifier or by {\em relative index} if [na] is not an identifier
(in the latter case, [na] is of type [name] but just for printing
purpose *)
type named_declaration = identifier * constr option * types
type rel_declaration = name * constr option * types
val map_named_declaration :
(constr -> constr) -> named_declaration -> named_declaration
val map_rel_declaration :
(constr -> constr) -> rel_declaration -> rel_declaration
(* Constructs either [(x:t)c] or [[x=b:t]c] *)
val mkProd_or_LetIn : rel_declaration -> types -> types
val mkNamedProd_or_LetIn : named_declaration -> types -> types
val mkNamedProd_wo_LetIn : named_declaration -> types -> types
(* Constructs either [[x:t]c] or [[x=b:t]c] *)
val mkLambda_or_LetIn : rel_declaration -> constr -> constr
val mkNamedLambda_or_LetIn : named_declaration -> constr -> constr
(*s Other term constructors. *)
val abs_implicit : constr -> constr
val lambda_implicit : constr -> constr
val lambda_implicit_lift : int -> constr -> constr
(* [applist (f,args)] and co work as [mkApp] *)
val applist : constr * constr list -> constr
val applistc : constr -> constr list -> constr
val appvect : constr * constr array -> constr
val appvectc : constr -> constr array -> constr
(* [prodn n l b] = $(x_1:T_1)..(x_n:T_n)b$
where $l = [(x_n,T_n);\dots;(x_1,T_1);Gamma]$ *)
val prodn : int -> (name * constr) list -> constr -> constr
(* [compose_prod l b] = $(x_1:T_1)..(x_n:T_n)b$
where $l = [(x_n,T_n);\dots;(x_1,T_1)]$.
Inverse of [decompose_prod]. *)
val compose_prod : (name * constr) list -> constr -> constr
(* [lamn n l b] = $[x_1:T_1]..[x_n:T_n]b$
where $l = [(x_n,T_n);\dots;(x_1,T_1);Gamma]$ *)
val lamn : int -> (name * constr) list -> constr -> constr
(* [compose_lam l b] = $[x_1:T_1]..[x_n:T_n]b$
where $l = [(x_n,T_n);\dots;(x_1,T_1)]$.
Inverse of [decompose_lam] *)
val compose_lam : (name * constr) list -> constr -> constr
(* [to_lambda n l]
= $[x_1:T_1]...[x_n:T_n]T$
where $l = (x_1:T_1)...(x_n:T_n)T$ *)
val to_lambda : int -> constr -> constr
(* [to_prod n l]
= $(x_1:T_1)...(x_n:T_n)T$
where $l = [x_1:T_1]...[x_n:T_n]T$ *)
val to_prod : int -> constr -> constr
(* pseudo-reduction rule *)
(* [prod_appvect] $(x1:B1;...;xn:Bn)B a1...an \rightarrow B[a1...an]$ *)
val prod_appvect : constr -> constr array -> constr
val prod_applist : constr -> constr list -> constr
(*s Other term destructors. *)
(* Transforms a product term $(x_1:T_1)..(x_n:T_n)T$ into the pair
$([(x_n,T_n);...;(x_1,T_1)],T)$, where $T$ is not a product.
It includes also local definitions *)
val decompose_prod : constr -> (name*constr) list * constr
(* Transforms a lambda term $[x_1:T_1]..[x_n:T_n]T$ into the pair
$([(x_n,T_n);...;(x_1,T_1)],T)$, where $T$ is not a lambda. *)
val decompose_lam : constr -> (name*constr) list * constr
(* Given a positive integer n, transforms a product term
$(x_1:T_1)..(x_n:T_n)T$
into the pair $([(xn,Tn);...;(x1,T1)],T)$. *)
val decompose_prod_n : int -> constr -> (name * constr) list * constr
(* Given a positive integer $n$, transforms a lambda term
$[x_1:T_1]..[x_n:T_n]T$ into the pair $([(x_n,T_n);...;(x_1,T_1)],T)$ *)
val decompose_lam_n : int -> constr -> (name * constr) list * constr
(* [nb_lam] $[x_1:T_1]...[x_n:T_n]c$ where $c$ is not an abstraction
gives $n$ (casts are ignored) *)
val nb_lam : constr -> int
(* similar to [nb_lam], but gives the number of products instead *)
val nb_prod : constr -> int
(* flattens application lists *)
val collapse_appl : constr -> constr
(* Removes recursively the casts around a term i.e.
[strip_outer_cast] (Cast (Cast ... (Cast c, t) ... ))] is [c]. *)
val strip_outer_cast : constr -> constr
(* Apply a function letting Casted types in place *)
val under_casts : (constr -> constr) -> constr -> constr
(* Apply a function under components of Cast if any *)
val under_outer_cast : (constr -> constr) -> constr -> constr
(*s Occur checks *)
(* [closed0 M] is true iff [M] is a (deBruijn) closed term *)
val closed0 : constr -> bool
(* [noccurn n M] returns true iff [Rel n] does NOT occur in term [M] *)
val noccurn : int -> constr -> bool
(* [noccur_between n m M] returns true iff [Rel p] does NOT occur in term [M]
for n <= p < n+m *)
val noccur_between : int -> int -> constr -> bool
(* Checking function for terms containing existential- or
meta-variables. The function [noccur_with_meta] considers only
meta-variable applied to some terms (intented to be its local
context) (for existential variables, it is necessarily the case) *)
val noccur_with_meta : int -> int -> constr -> bool
(*s Relocation and substitution *)
(* [exliftn el c] lifts [c] with lifting [el] *)
val exliftn : Esubst.lift -> constr -> constr
(* [liftn n k c] lifts by [n] indexes above [k] in [c] *)
val liftn : int -> int -> constr -> constr
(* [lift n c] lifts by [n] the positive indexes in [c] *)
val lift : int -> constr -> constr
(* [substnl [a1;...;an] k c] substitutes in parallel [a1],...,[an]
for respectively [Rel(k+1)],...,[Rel(k+n)] in [c]; it relocates
accordingly indexes in [a1],...,[an] *)
val substnl : constr list -> int -> constr -> constr
val substl : constr list -> constr -> constr
val subst1 : constr -> constr -> constr
val substl_decl : constr list -> named_declaration -> named_declaration
val subst1_decl : constr -> named_declaration -> named_declaration
val replace_vars : (identifier * constr) list -> constr -> constr
val subst_var : identifier -> constr -> constr
(* [subst_vars [id1;...;idn] t] substitute [VAR idj] by [Rel j] in [t]
if two names are identical, the one of least indice is keeped *)
val subst_vars : identifier list -> constr -> constr
(* [substn_vars n [id1;...;idn] t] substitute [VAR idj] by [Rel j+n-1] in [t]
if two names are identical, the one of least indice is keeped *)
val substn_vars : int -> identifier list -> constr -> constr
(*s Functionals working on the immediate subterm of a construction *)
(* [fold_constr f acc c] folds [f] on the immediate subterms of [c]
starting from [acc] and proceeding from left to right according to
the usual representation of the constructions; it is not recursive *)
val fold_constr : ('a -> constr -> 'a) -> 'a -> constr -> 'a
(* [map_constr f c] maps [f] on the immediate subterms of [c]; it is
not recursive and the order with which subterms are processed is
not specified *)
val map_constr : (constr -> constr) -> constr -> constr
(* [map_constr_with_binders g f n c] maps [f n] on the immediate
subterms of [c]; it carries an extra data [n] (typically a lift
index) which is processed by [g] (which typically add 1 to [n]) at
each binder traversal; it is not recursive and the order with which
subterms are processed is not specified *)
val map_constr_with_binders :
('a -> 'a) -> ('a -> constr -> constr) -> 'a -> constr -> constr
(* [iter_constr f c] iters [f] on the immediate subterms of [c]; it is
not recursive and the order with which subterms are processed is
not specified *)
val iter_constr : (constr -> unit) -> constr -> unit
(* [iter_constr_with_binders g f n c] iters [f n] on the immediate
subterms of [c]; it carries an extra data [n] (typically a lift
index) which is processed by [g] (which typically add 1 to [n]) at
each binder traversal; it is not recursive and the order with which
subterms are processed is not specified *)
val iter_constr_with_binders :
('a -> 'a) -> ('a -> constr -> unit) -> 'a -> constr -> unit
(* [compare_constr f c1 c2] compare [c1] and [c2] using [f] to compare
the immediate subterms of [c1] of [c2] if needed; Cast's, binders
name and Cases annotations are not taken into account *)
val compare_constr : (constr -> constr -> bool) -> constr -> constr -> bool
(*********************************************************************)
val hcons_constr:
(constant -> constant) *
(kernel_name -> kernel_name) *
(dir_path -> dir_path) *
(name -> name) *
(identifier -> identifier) *
(string -> string)
->
(constr -> constr) *
(types -> types)
val hcons1_constr : constr -> constr
val hcons1_types : types -> types
(**************************************)
type values
|