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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 $Id$ i*)

(*i*)
open Util
open Names
open Term
open Sign
open Evd
open Pattern
open Proof_trees
open Coqlib
(*i*)

(*s Given a term with second-order variables in it,
   represented by Meta's, and possibly applied using SoApp
   terms, this function will perform second-order, binding-preserving,
   matching, in the case where the pattern is a pattern in the sense
   of Dale Miller.

   ALGORITHM:

   Given a pattern, we decompose it, flattening casts and apply's,
   recursing on all operators, and pushing the name of the binder each
   time we descend a binder.

   When we reach a first-order variable, we ask that the corresponding
   term's free-rels all be higher than the depth of the current stack.

   When we reach a second-order application, we ask that the
   intersection of the free-rels of the term and the current stack be
   contained in the arguments of the application *)

(*s I implemented the following functions which test whether a term [t]
   is an inductive but non-recursive type, a general conjuction, a
   general disjunction, or a type with no constructors.

   They are more general than matching with [or_term], [and_term], etc,
   since they do not depend on the name of the type. Hence, they
   also work on ad-hoc disjunctions introduced by the user.
   (Eduardo, 6/8/97). *)

type 'a matching_function = constr -> 'a option
type testing_function = constr -> bool

val match_with_non_recursive_type : (constr * constr list) matching_function
val is_non_recursive_type         : testing_function

(* Non recursive type with no indices and exactly one argument for each
   constructor; canonical definition of n-ary disjunction if strict *)
val match_with_disjunction : ?strict:bool -> (constr * constr list) matching_function
val is_disjunction         : ?strict:bool -> testing_function

(* Non recursive tuple (one constructor and no indices) with no inner
   dependencies; canonical definition of n-ary conjunction if strict *)
val match_with_conjunction : ?strict:bool -> (constr * constr list) matching_function
val is_conjunction         : ?strict:bool -> testing_function

(* Non recursive tuple, possibly with inner dependencies *)
val match_with_record      : (constr * constr list) matching_function
val is_record              : testing_function

(* Like record but supports and tells if recursive (e.g. Acc) *)
val match_with_tuple       : (constr * constr list * bool) matching_function
val is_tuple               : testing_function

(* No constructor, possibly with indices *)
val match_with_empty_type  : constr matching_function
val is_empty_type          : testing_function

(* type with only one constructor and no arguments, possibly with indices *)
val match_with_unit_or_eq_type : constr matching_function
val is_unit_or_eq_type     : testing_function

(* type with only one constructor and no arguments, no indices *)
val is_unit_type           : testing_function

(* type with only one constructor, no arguments and at least one dependency *)
val is_inductive_equality  : inductive -> bool
val match_with_equality_type : (constr * constr list) matching_function
val is_equality_type       : testing_function

val match_with_nottype     : (constr * constr) matching_function
val is_nottype             : testing_function

val match_with_forall_term    : (name * constr * constr) matching_function
val is_forall_term            : testing_function

val match_with_imp_term    : (constr * constr) matching_function
val is_imp_term            : testing_function

(* I added these functions to test whether a type contains dependent
  products or not, and if an inductive has constructors with dependent types
 (excluding parameters). this is useful to check whether a conjunction is a
 real conjunction and not a dependent tuple. (Pierre Corbineau, 13/5/2002) *)

val has_nodep_prod_after   : int -> testing_function
val has_nodep_prod         : testing_function

val match_with_nodep_ind   : (constr * constr list * int) matching_function
val is_nodep_ind           : testing_function

val match_with_sigma_type   : (constr * constr list) matching_function
val is_sigma_type           : testing_function

(* Recongnize inductive relation defined by reflexivity *)

type equation_kind =
  | MonomorphicLeibnizEq of constr * constr
  | PolymorphicLeibnizEq of constr * constr * constr
  | HeterogenousEq of constr * constr * constr * constr

exception NoEquationFound

val match_with_equation:
  constr -> coq_eq_data option * constr * equation_kind

(***** Destructing patterns bound to some theory *)

(* Match terms [eq A t u], [identity A t u] or [JMeq A t A u] *)
(* Returns associated lemmas and [A,t,u] or fails PatternMatchingFailure *)
val find_eq_data_decompose : Proof_type.goal sigma -> constr ->
      coq_eq_data * (types * constr * constr)

(* Idem but fails with an error message instead of PatternMatchingFailure *)
val find_this_eq_data_decompose : Proof_type.goal sigma -> constr ->
      coq_eq_data * (types * constr * constr)

(* A variant that returns more informative structure on the equality found *)
val find_eq_data : constr -> coq_eq_data * equation_kind

(* Match a term of the form [(existT A P t p)] *)
(* Returns associated lemmas and [A,P,t,p] *)
val find_sigma_data_decompose : constr ->
  coq_sigma_data * (constr * constr * constr * constr)

(* Match a term of the form [{x:A|P}], returns [A] and [P] *)
val match_sigma : constr -> constr * constr

val is_matching_sigma : constr -> bool

(* Match a decidable equality judgement (e.g [{t=u:>T}+{~t=u}]), returns
   [t,u,T] and a boolean telling if equality is on the left side *)
val match_eqdec : constr -> bool * constr * constr * constr * constr

(* Match an equality up to conversion; returns [(eq,t1,t2)] in normal form *)
open Proof_type
open Tacmach
val dest_nf_eq : goal sigma -> constr -> (constr * constr * constr)

(* Match a negation *)
val is_matching_not : constr -> bool
val is_matching_imp_False : constr -> bool