(* Copyright (C) 2003-2005, 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/. *) module C = Cic module Rf = CicRefine module Un = CicUniv module Pp = CicPp module TC = CicTypeChecker module PEH = ProofEngineHelpers module E = CicEnvironment module UM = UriManager module D = Deannotate (* fresh name generator *****************************************************) let split name = let rec aux i = if i <= 0 then assert false else let c = name.[pred i] in if c >= '0' && c <= '9' then aux (pred i) else Str.string_before name i, Str.string_after name i in let before, after = aux (String.length name) in let i = if after = "" then -1 else int_of_string after in before, i let join (s, i) = C.Name (if i < 0 then s else s ^ string_of_int i) let mk_fresh_name context (name, k) = let rec aux i = function | [] -> name, i | Some (C.Name s, _) :: entries -> let m, j = split s in if m = name && j >= i then aux (succ j) entries else aux i entries | _ :: entries -> aux i entries in join (aux k context) let mk_fresh_name context = function | C.Anonymous -> C.Anonymous | C.Name s -> mk_fresh_name context (split s) (* helper functions *********************************************************) let rec list_map_cps g map = function | [] -> g [] | hd :: tl -> let h hd = let g tl = g (hd :: tl) in list_map_cps g map tl in map h hd let identity x = x let compose f g x = f (g x) let fst3 (x, _, _) = x let refine c t = try let t, _, _, _ = Rf.type_of_aux' [] c t Un.oblivion_ugraph in t with e -> Printf.eprintf "REFINE EROR: %s\n" (Printexc.to_string e); Printf.eprintf "Ref: context: %s\n" (Pp.ppcontext c); Printf.eprintf "Ref: term : %s\n" (Pp.ppterm t); raise e let get_type c t = try let ty, _ = TC.type_of_aux' [] c t Un.oblivion_ugraph in ty with e -> Printf.eprintf "TC: context: %s\n" (Pp.ppcontext c); Printf.eprintf "TC: term : %s\n" (Pp.ppterm t); raise e let get_tail c t = match PEH.split_with_whd (c, t) with | (_, hd) :: _, _ -> hd | _ -> assert false let is_proof c t = match get_tail c (get_type c (get_type c t)) with | C.Sort C.Prop -> true | C.Sort _ -> false | _ -> assert false let is_sort = function | C.Sort _ -> true | _ -> false let is_unsafe h (c, t) = true let is_not_atomic = function | C.Sort _ | C.Rel _ | C.Const _ | C.Var _ | C.MutInd _ | C.MutConstruct _ -> false | _ -> true let is_atomic t = not (is_not_atomic t) let get_ind_type uri tyno = match E.get_obj Un.oblivion_ugraph uri with | C.InductiveDefinition (tys, _, lpsno, _), _ -> lpsno, List.nth tys tyno | _ -> assert false let get_default_eliminator context uri tyno ty = let _, (name, _, _, _) = get_ind_type uri tyno in let ext = match get_tail context (get_type context ty) with | C.Sort C.Prop -> "_ind" | C.Sort C.Set -> "_rec" | C.Sort C.CProp -> "_rec" | C.Sort (C.Type _) -> "_rect" | t -> Printf.eprintf "CicPPP get_default_eliminator: %s\n" (Pp.ppterm t); assert false in let buri = UM.buri_of_uri uri in let uri = UM.uri_of_string (buri ^ "/" ^ name ^ ext ^ ".con") in C.Const (uri, []) let get_ind_parameters c t = let ty = get_type c t in let ps = match get_tail c ty with | C.MutInd _ -> [] | C.Appl (C.MutInd _ :: args) -> args | _ -> assert false in let disp = match get_tail c (get_type c ty) with | C.Sort C.Prop -> 0 | C.Sort _ -> 1 | _ -> assert false in ps, disp let cic = D.deannotate_term (* Ensuring Barendregt convenction ******************************************) let rec add_entries map c = function | [] -> c | hd :: tl -> let sname, w = map hd in let entry = Some (Cic.Name sname, C.Decl w) in add_entries map (entry :: c) tl let get_sname c i = try match List.nth c (pred i) with | Some (Cic.Name sname, _) -> sname | _ -> assert false with | Failure _ -> assert false | Invalid_argument _ -> assert false let cic_bc c t = let get_fix_decl (sname, i, w, v) = sname, w in let get_cofix_decl (sname, w, v) = sname, w in let rec bc c = function | C.LetIn (name, v, ty, t) -> let name = mk_fresh_name c name in let entry = Some (name, C.Def (v, ty)) in let v, ty, t = bc c v, bc c ty, bc (entry :: c) t in C.LetIn (name, v, ty, t) | C.Lambda (name, w, t) -> let name = mk_fresh_name c name in let entry = Some (name, C.Decl w) in let w, t = bc c w, bc (entry :: c) t in C.Lambda (name, w, t) | C.Prod (name, w, t) -> let name = mk_fresh_name c name in let entry = Some (name, C.Decl w) in let w, t = bc c w, bc (entry :: c) t in C.Prod (name, w, t) | C.Appl vs -> let vs = List.map (bc c) vs in C.Appl vs | C.MutCase (uri, tyno, u, v, ts) -> let u, v, ts = bc c u, bc c v, List.map (bc c) ts in C.MutCase (uri, tyno, u, v, ts) | C.Cast (t, u) -> let t, u = bc c t, bc c u in C.Cast (t, u) | C.Fix (i, fixes) -> let d = add_entries get_fix_decl c fixes in let bc_fix (sname, i, w, v) = (sname, i, bc c w, bc d v) in let fixes = List.map bc_fix fixes in C.Fix (i, fixes) | C.CoFix (i, cofixes) -> let d = add_entries get_cofix_decl c cofixes in let bc_cofix (sname, w, v) = (sname, bc c w, bc d v) in let cofixes = List.map bc_cofix cofixes in C.CoFix (i, cofixes) | t -> t in bc c t let acic_bc c t = let get_fix_decl (id, sname, i, w, v) = sname, cic w in let get_cofix_decl (id, sname, w, v) = sname, cic w in let rec bc c = function | C.ALetIn (id, name, v, ty, t) -> let name = mk_fresh_name c name in let entry = Some (name, C.Def (cic v, cic ty)) in let v, ty, t = bc c v, bc c ty, bc (entry :: c) t in C.ALetIn (id, name, v, ty, t) | C.ALambda (id, name, w, t) -> let name = mk_fresh_name c name in let entry = Some (name, C.Decl (cic w)) in let w, t = bc c w, bc (entry :: c) t in C.ALambda (id, name, w, t) | C.AProd (id, name, w, t) -> let name = mk_fresh_name c name in let entry = Some (name, C.Decl (cic w)) in let w, t = bc c w, bc (entry :: c) t in C.AProd (id, name, w, t) | C.AAppl (id, vs) -> let vs = List.map (bc c) vs in C.AAppl (id, vs) | C.AMutCase (id, uri, tyno, u, v, ts) -> let u, v, ts = bc c u, bc c v, List.map (bc c) ts in C.AMutCase (id, uri, tyno, u, v, ts) | C.ACast (id, t, u) -> let t, u = bc c t, bc c u in C.ACast (id, t, u) | C.AFix (id, i, fixes) -> let d = add_entries get_fix_decl c fixes in let bc_fix (id, sname, i, w, v) = (id, sname, i, bc c w, bc d v) in let fixes = List.map bc_fix fixes in C.AFix (id, i, fixes) | C.ACoFix (id, i, cofixes) -> let d = add_entries get_cofix_decl c cofixes in let bc_cofix (id, sname, w, v) = (id, sname, bc c w, bc d v) in let cofixes = List.map bc_cofix cofixes in C.ACoFix (id, i, cofixes) | C.ARel (id1, id2, i, sname) -> let sname = get_sname c i in C.ARel (id1, id2, i, sname) | t -> t in bc c t