-(* Copyright (C) 2000, HELM Team.
- *
- * This file is part of HELM, an Hypertextual, Electronic
- * Library of Mathematics, developed at the Computer Science
- * Department, University of Bologna, Italy.
- *
- * HELM is free software; you can redistribute it and/or
- * modify it under the terms of the GNU General Public License
- * as published by the Free Software Foundation; either version 2
- * of the License, or (at your option) any later version.
- *
- * HELM is distributed in the hope that it will be useful,
- * but WITHOUT ANY WARRANTY; without even the implied warranty of
- * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
- * GNU General Public License for more details.
- *
- * You should have received a copy of the GNU General Public License
- * along with HELM; if not, write to the Free Software
- * Foundation, Inc., 59 Temple Place - Suite 330, Boston,
- * MA 02111-1307, USA.
- *
- * For details, see the HELM World-Wide-Web page,
- * http://cs.unibo.it/helm/.
- *)
-
-(******************************************************************************)
-(* *)
-(* PROJECT HELM *)
-(* *)
-(* Claudio Sacerdoti Coen <sacerdot@cs.unibo.it> *)
-(* 24/01/2000 *)
-(* *)
-(* This module implements a very simple Coq-like pretty printer that, given *)
-(* an object of cic (internal representation) returns a string describing the *)
-(* object in a syntax similar to that of coq *)
-(* *)
-(******************************************************************************)
-
-exception CicPpInternalError;;
-
-(* Utility functions *)
-
-let string_of_name =
- function
- Cic.Name s -> s
- | Cic.Anonimous -> "_"
-;;
-
-(* get_nth l n returns the nth element of the list l if it exists or raise *)
-(* a CicPpInternalError if l has less than n elements or n < 1 *)
-let rec get_nth l n =
- match (n,l) with
- (1, he::_) -> he
- | (n, he::tail) when n > 1 -> get_nth tail (n-1)
- | (_,_) -> raise CicPpInternalError
-;;
-
-(* pp t l *)
-(* pretty-prints a term t of cic in an environment l where l is a list of *)
-(* identifier names used to resolve DeBrujin indexes. The head of l is the *)
-(* name associated to the greatest DeBrujin index in t *)
-let rec pp t l =
- let module C = Cic in
- match t with
- C.Rel n ->
- (match get_nth l n with
- C.Name s -> s
- | _ -> raise CicPpInternalError
- )
- | C.Var uri -> UriManager.name_of_uri uri
- | C.Meta n -> "?" ^ (string_of_int n)
- | C.Sort s ->
- (match s with
- C.Prop -> "Prop"
- | C.Set -> "Set"
- | C.Type -> "Type"
- )
- | C.Implicit -> "?"
- | C.Prod (b,s,t) ->
- (match b with
- C.Name n -> "(" ^ n ^ ":" ^ pp s l ^ ")" ^ pp t (b::l)
- | C.Anonimous -> "(" ^ pp s l ^ "->" ^ pp t (b::l) ^ ")"
- )
- | C.Cast (v,t) -> pp v l
- | C.Lambda (b,s,t) ->
- "[" ^ string_of_name b ^ ":" ^ pp s l ^ "]" ^ pp t (b::l)
- | C.LetIn (b,s,t) ->
- "[" ^ string_of_name b ^ ":=" ^ pp s l ^ "]" ^ pp t (b::l)
- | C.Appl li ->
- "(" ^
- (List.fold_right
- (fun x i -> pp x l ^ (match i with "" -> "" | _ -> " ") ^ i)
- li ""
- ) ^ ")"
- | C.Const (uri,_) -> UriManager.name_of_uri uri
- | C.Abst uri -> UriManager.name_of_uri uri
- | C.MutInd (uri,_,n) ->
- (match CicCache.get_obj uri with
- C.InductiveDefinition (dl,_,_) ->
- let (name,_,_,_) = get_nth dl (n+1) in
- name
- | _ -> raise CicPpInternalError
- )
- | C.MutConstruct (uri,_,n1,n2) ->
- (match CicCache.get_obj uri with
- C.InductiveDefinition (dl,_,_) ->
- let (_,_,_,cons) = get_nth dl (n1+1) in
- let (id,_,_) = get_nth cons n2 in
- id
- | _ -> raise CicPpInternalError
- )
- | C.MutCase (uri,_,n1,ty,te,patterns) ->
- let connames =
- (match CicCache.get_obj uri with
- C.InductiveDefinition (dl,_,_) ->
- let (_,_,_,cons) = get_nth dl (n1+1) in
- List.map (fun (id,_,_) -> id) cons
- | _ -> raise CicPpInternalError
- )
- in
- "\n<" ^ pp ty l ^ ">Cases " ^ pp te l ^ " of " ^
- List.fold_right (fun (x,y) i -> "\n " ^ x ^ " => " ^ pp y l ^ i)
- (List.combine connames patterns) "" ^
- "\nend"
- | C.Fix (no, funs) ->
- let snames = List.map (fun (name,_,_,_) -> name) funs in
- let names = List.rev (List.map (function name -> C.Name name) snames) in
- "\nFix " ^ get_nth snames (no + 1) ^ " {" ^
- List.fold_right
- (fun (name,ind,ty,bo) i -> "\n" ^ name ^ " / " ^ string_of_int ind ^
- " : " ^ pp ty l ^ " := \n" ^
- pp bo (names@l) ^ i)
- funs "" ^
- "}\n"
- | C.CoFix (no,funs) ->
- let snames = List.map (fun (name,_,_) -> name) funs in
- let names = List.rev (List.map (function name -> C.Name name) snames) in
- "\nCoFix " ^ get_nth snames (no + 1) ^ " {" ^
- List.fold_right
- (fun (name,ty,bo) i -> "\n" ^ name ^
- " : " ^ pp ty l ^ " := \n" ^
- pp bo (names@l) ^ i)
- funs "" ^
- "}\n"
-;;
-
-(* ppinductiveType (typename, inductive, arity, cons) names *)
-(* pretty-prints a single inductive definition (typename, inductive, arity, *)
-(* cons) where the cic terms in the inductive definition need to be *)
-(* evaluated in the environment names that is the list of typenames of the *)
-(* mutual inductive definitions defined in the block of mutual inductive *)
-(* definitions to which this one belongs to *)
-let ppinductiveType (typename, inductive, arity, cons) names =
- (if inductive then "\nInductive " else "\nCoInductive ") ^ typename ^ ": " ^
- (*CSC: bug found: was pp arity names ^ " =\n " ^*)
- pp arity [] ^ " =\n " ^
- List.fold_right
- (fun (id,ty,_) i -> id ^ " : " ^ pp ty names ^
- (if i = "" then "\n" else "\n | ") ^ i)
- cons ""
-;;
-
-(* ppobj obj returns a string with describing the cic object obj in a syntax *)
-(* similar to the one used by Coq *)
-let ppobj obj =
- let module C = Cic in
- let module U = UriManager in
- match obj with
- C.Definition (id, t1, t2, params) ->
- "Definition of " ^ id ^
- "(" ^
- List.fold_right
- (fun (_,x) i ->
- List.fold_right
- (fun x i ->
- U.string_of_uri x ^ match i with "" -> "" | i' -> " " ^ i'
- ) x "" ^ match i with "" -> "" | i' -> " " ^ i'
- ) params "" ^ ")" ^
- ":\n" ^ pp t1 [] ^ " : " ^ pp t2 []
- | C.Axiom (id, ty, params) ->
- "Axiom " ^ id ^ "(" ^
- List.fold_right
- (fun (_,x) i ->
- List.fold_right
- (fun x i ->
- U.string_of_uri x ^ match i with "" -> "" | i' -> " " ^ i'
- ) x "" ^ match i with "" -> "" | i' -> " " ^ i'
- ) params "" ^
- "):\n" ^ pp ty []
- | C.Variable (name, bo, ty) ->
- "Variable " ^ name ^ ":\n" ^ pp ty [] ^ "\n" ^
- (match bo with None -> "" | Some bo -> ":= " ^ pp bo [])
- | C.CurrentProof (name, conjectures, value, ty) ->
- "Current Proof:\n" ^
- List.fold_right
- (fun (n, t) i -> "?" ^ (string_of_int n) ^ ": " ^ pp t [] ^ "\n" ^ i)
- conjectures "" ^
- "\n" ^ pp value [] ^ " : " ^ pp ty []
- | C.InductiveDefinition (l, params, nparams) ->
- "Parameters = " ^
- List.fold_right
- (fun (_,x) i ->
- List.fold_right
- (fun x i ->
- U.string_of_uri x ^ match i with "" -> "" | i' -> " " ^ i'
- ) x "" ^ match i with "" -> "" | i' -> " " ^ i'
- ) params "" ^ "\n" ^
- "NParams = " ^ string_of_int nparams ^ "\n" ^
- let names = List.rev (List.map (fun (n,_,_,_) -> C.Name n) l) in
- List.fold_right (fun x i -> ppinductiveType x names ^ i) l ""
-;;