let get_types uri =
let o,_ = CicEnvironment.get_obj CicUniv.empty_ugraph uri in
match o with
- | Cic.InductiveDefinition (l,_,_,_) -> l
+ | Cic.InductiveDefinition (l,_,lpsno,_) -> l, lpsno
| _ -> assert false
let name_of_inductive_type uri i =
- let types = get_types uri in
+ let types, _ = get_types uri in
let (name, _, _, _) = try List.nth types i with Not_found -> assert false in
name
(* returns <name, type> pairs *)
let constructors_of_inductive_type uri i =
- let types = get_types uri in
+ let types, _ = get_types uri in
let (_, _, _, constructors) =
try List.nth types i with Not_found -> assert false
in
fst (List.nth (constructors_of_inductive_type uri i) (j-1))
with Not_found -> assert false)
+ (* returns the number of left parameters *)
+let left_params_no_of_inductive_type uri =
+ snd (get_types uri)
+
let ast_of_acic0 term_info acic k =
let k = k term_info in
let id_to_uris = term_info.uri in
| Cic.ALetIn (id,n,s,t) ->
idref id (Ast.LetIn ((CicNotationUtil.name_of_cic_name n, None),
k s, k t))
- | Cic.AAppl (aid,args) -> idref aid (Ast.Appl (List.map k args))
+ | Cic.AAppl (aid,(Cic.AConst _ as he::tl as args))
+ | Cic.AAppl (aid,(Cic.AMutInd _ as he::tl as args))
+ | Cic.AAppl (aid,(Cic.AMutConstruct _ as he::tl as args)) as t ->
+ let last_n n l =
+ let rec aux =
+ function
+ [] -> assert false
+ | [_] as l -> l,1
+ | he::tl ->
+ let (res,len) as res' = aux tl in
+ if len < n then
+ he::res,len + 1
+ else
+ res'
+ in
+ match fst (aux l) with
+ [] -> assert false
+ | [t] -> t
+ | Ast.AttributedTerm (_,(Ast.Appl l))::tl ->
+ idref aid (Ast.Appl (l@tl))
+ | l -> idref aid (Ast.Appl l)
+ in
+ (match LibraryObjects.destroy_nat t with
+ | Some n -> idref aid (Ast.Num (string_of_int n, -1))
+ | None ->
+ let deannot_he = Deannotate.deannotate_term he in
+ if CoercDb.is_a_coercion' deannot_he && !Acic2content.hide_coercions
+ then
+ (match CoercDb.is_a_coercion_to_funclass deannot_he with
+ | None -> idref aid (last_n 1 (List.map k tl))
+ | Some i -> idref aid (last_n (i+1) (List.map k tl)))
+ else
+ idref aid (Ast.Appl (List.map k args)))
+ | Cic.AAppl (aid,args) ->
+ idref aid (Ast.Appl (List.map k args))
| Cic.AConst (id,uri,substs) ->
register_uri id uri;
idref id (Ast.Ident (UriManager.name_of_uri uri, aux_substs substs))
in
let case_indty = name, Some (UriManager.uri_of_string puri_str) in
let constructors = constructors_of_inductive_type uri typeno in
- let rec eat_branch ty pat =
+ let lpsno = left_params_no_of_inductive_type uri in
+ let rec eat_branch n ty pat =
match (ty, pat) with
+ | Cic.Prod (_, _, t), _ when n > 0 -> eat_branch (pred n) t pat
| Cic.Prod (_, _, t), Cic.ALambda (_, name, s, t') ->
- let (cv, rhs) = eat_branch t t' in
+ let (cv, rhs) = eat_branch 0 t t' in
(CicNotationUtil.name_of_cic_name name, Some (k s)) :: cv, rhs
| _, _ -> [], k pat
in
List.map2
(fun (name, ty) pat ->
incr j;
- let (capture_variables, rhs) = eat_branch ty pat in
+ let (capture_variables, rhs) = eat_branch lpsno ty pat in
((name, Some (ctor_puri !j), capture_variables), rhs))
constructors patterns
with Invalid_argument _ -> assert false
let defs =
List.map
(fun (_, n, decr_idx, ty, bo) ->
- ((Ast.Ident (n, None), Some (k ty)), k bo, decr_idx))
+ let params,bo =
+ let rec aux =
+ function
+ Cic.ALambda (_,name,so,ta) ->
+ let params,rest = aux ta in
+ (CicNotationUtil.name_of_cic_name name,Some (k so))::
+ params, rest
+ | t -> [],t
+ in
+ aux bo
+ in
+ let ty =
+ let rec eat_pis =
+ function
+ 0,ty -> ty
+ | n,Cic.AProd (_,_,_,ta) -> eat_pis (n - 1,ta)
+ | n,ty ->
+ (* I should do a whd here, but I have no context *)
+ assert false
+ in
+ eat_pis ((List.length params),ty)
+ in
+ (params,(Ast.Ident (n, None), Some (k ty)), k bo, decr_idx))
funs
in
let name =
try
(match List.nth defs no with
- | (Ast.Ident (n, _), _), _, _ when n <> "_" -> n
+ | _, (Ast.Ident (n, _), _), _, _ when n <> "_" -> n
| _ -> assert false)
with Not_found -> assert false
in
- idref id (Ast.LetRec (`Inductive, defs, Ast.Ident (name, None)))
+ idref id (Ast.LetRec (`Inductive, defs, Ast.Ident (name, None)))
| Cic.ACoFix (id, no, funs) ->
let defs =
List.map
(fun (_, n, ty, bo) ->
- ((Ast.Ident (n, None), Some (k ty)), k bo, 0))
+ let params,bo =
+ let rec aux =
+ function
+ Cic.ALambda (_,name,so,ta) ->
+ let params,rest = aux ta in
+ (CicNotationUtil.name_of_cic_name name,Some (k so))::
+ params, rest
+ | t -> [],t
+ in
+ aux bo
+ in
+ let ty =
+ let rec eat_pis =
+ function
+ 0,ty -> ty
+ | n,Cic.AProd (_,_,_,ta) -> eat_pis (n - 1,ta)
+ | n,ty ->
+ (* I should do a whd here, but I have no context *)
+ assert false
+ in
+ eat_pis ((List.length params),ty)
+ in
+ (params,(Ast.Ident (n, None), Some (k ty)), k bo, 0))
funs
in
let name =
try
(match List.nth defs no with
- | (Ast.Ident (n, _), _), _, _ when n <> "_" -> n
+ | _, (Ast.Ident (n, _), _), _, _ when n <> "_" -> n
| _ -> assert false)
with Not_found -> assert false
in