-let rec check_type = function
- | C.MutInd (uri, tyno, _) ->
- let lpsno, inductive, arity = get_inductive_type uri tyno in
- let _, psno = split [] arity in
- if lpsno <> psno && inductive then Other else Ind
-(* | C.Const (uri, _) as t ->
- if List.mem (uri, None) types then Con (PET.const_lazy_term t) else Other
-*) | C.Appl (hd :: tl) -> check_type hd
- | _ -> Other
+let is_not_recursive uri tyno tys =
+ let map mutinds (_, ty) =
+(* FG: we can do much better here *)
+ let map mutinds (_, t) = I.S.union mutinds (I.get_mutinds_of_uri uri t) in
+(**********************************)
+ let premises, _ = PEH.split_with_whd ([], ty) in
+ List.fold_left map mutinds (List.tl premises)
+ in
+ let msg = "recursiveness check non implemented for mutually inductive types" in
+ if List.length tys > 1 then raise (PET.Fail (lazy msg)) else
+ let _, _, _, constructors = List.nth tys tyno in
+ let mutinds = List.fold_left map I.S.empty constructors in
+ I.S.is_empty mutinds
+
+let rec check_type sorts metasenv context t =
+ match R.whd ~delta:true context t with
+ | C.MutInd (uri, tyno, _) as t ->
+ let lpsno, tys = get_inductive_def uri in
+ let _, inductive, arity, _ = List.nth tys tyno in
+ let _, psno = PEH.split_with_whd ([], arity) in
+ let not_relation = (lpsno = psno) in
+ let not_recursive = is_not_recursive uri tyno tys in
+ let ty_ty, _ = TC.type_of_aux' metasenv context t Un.empty_ugraph in
+ let sort = match PEH.split_with_whd (context, ty_ty) with
+ | (_, C.Sort sort) ::_ , _ -> CicPp.ppsort sort
+ | (_, C.Meta _) :: _, _ -> CicPp.ppsort (C.Type (Un.fresh ()))
+ | _ -> assert false
+ in
+ let right_sort = List.mem sort sorts in
+ if not_relation && inductive && not_recursive && right_sort then
+ begin
+ HLog.warn (Printf.sprintf "Decomposing %s %u" (UriManager.string_of_uri uri) (succ tyno));
+ true
+ end
+ else false
+ | C.Appl (hd :: tl) -> check_type sorts metasenv context hd
+ | _ -> false