let alpha id =
if id.[0] >= '0' && id.[0] <= '9' then !G.alpha ^ id else id
-let add_abst cnt id d w =
+let add_abst cnt id aw w =
let id = if !G.alpha <> "" then alpha id else id in
- let a = E.node_attrs ~name:(id, true) ~degr:(succ d) () in
- D.EBind (cnt, a, D.Abst (N.two, w))
+ let aw = {aw with E.n_name = Some (id, true); E.n_degr = succ aw.E.n_degr} in
+ D.EBind (cnt, aw, D.Abst (N.two, w))
-let mk_lref f a i = f a.E.n_degr (D.TLRef (E.empty_node, i))
+let mk_lref f a i = f a (D.TLRef (a, i))
let id_of_name (id, _, _) =
if !G.alpha <> "" then alpha id else id
(* this is not tail recursive in the GRef branch *)
let rec xlate_term f st lst y lenv = function
| A.Sort s ->
- let f h = f 0 (D.TSort (E.empty_node, h)) in
- if s then f 0 else f 1
+ let h = if s then 0 else 1 in
+ let a = E.node_attrs ~sort:h () in
+ f a (D.TSort (a, h))
| A.Appl (v, t) ->
- let f vv d tt = f d (D.TAppl (E.empty_node, vv, tt)) in
+ let f vv at tt = f at (D.TAppl (at, vv, tt)) in
let f _ vv = xlate_term (f vv) st lst y lenv t in
xlate_term f st lst false lenv v
| A.Abst (name, w, t) ->
let name = if !G.alpha <> "" then alpha name else name in
- let f dw ww =
- let a = E.node_attrs ~name:(name, true) () in
- let f dt tt =
-(* let a = {a with E.n_degr = dt} in *)
- let l = if !G.cc then match y, dt with
+ let name = Some (name, true) in
+ let f aw ww =
+ let f at tt =
+ let l = if !G.cc then match y, at.E.n_degr with
| true, _ -> N.one
| _ , 0 -> N.one
| _ , 1 -> N.unknown st.S.lenv
else N.infinite
in
let b = D.Abst (l, ww) in
- f dt (D.TBind (a, b, tt))
+ let at = {at with E.n_name = name} in
+ f at (D.TBind (at, b, tt))
in
let f lenv = xlate_term f st lst y lenv t in
- push_abst f {a with E.n_degr = succ dw} ww lenv
+ push_abst f {aw with E.n_name = name; E.n_degr = succ aw.E.n_degr} ww lenv
in
xlate_term f st lst true lenv w
| A.GRef (name, args) ->
in
let g qid a cnt =
let gref = D.TGRef (a, uri_of_qid qid) in
- if cnt = D.ESort then f a.E.n_degr gref else
+ if cnt = D.ESort then f a gref else
let f = function
- | D.EAppl (D.ESort, b, v) -> f a.E.n_degr (D.TAppl (b, v, gref))
- | args -> f a.E.n_degr (D.TProj (E.empty_node, args, gref))
+ | D.EAppl (D.ESort, _, v) -> f a (D.TAppl (a, v, gref))
+ | args -> f a (D.TProj (a, args, gref))
in
let f args = C.list_fold_right f map2 args D.ESort in
D.sub_list_strict (D.fold_names f map1 args) cnt args
| A.Block (name, w) ->
let f qid =
let f cnt =
- let f d ww =
- UH.add hcnt (uri_of_qid qid) (add_abst cnt name d ww);
+ let f aw ww =
+ UH.add hcnt (uri_of_qid qid) (add_abst cnt name aw ww);
err {lst with node = Some qid}
in
- xlate_term f st lst true cnt w
+ xlate_term f st lst true cnt w
in
get_cnt_relaxed f lst
in
| A.Decl (name, w) ->
let f lenv =
let f qid =
- let f d ww =
- let a = E.node_attrs ~apix:lst.line ~degr:(succ d) () in
- UH.add henv (uri_of_qid qid) (a, lenv);
+ let f aw ww =
+ let aw = {aw with E.n_apix = lst.line; E.n_degr = succ aw.E.n_degr} in
+ UH.add henv (uri_of_qid qid) (aw, lenv);
let t = add_proj lenv ww in
(*
print_newline (); CrgOutput.pp_term print_string t;
*)
let b = E.Abst t in
- let entity = E.empty_root, a, uri_of_qid qid, b in
+ let entity = E.empty_root, aw, uri_of_qid qid, b in
f {lst with line = succ lst.line} entity
in
xlate_term f st lst true lenv w
let f lenv =
let f qid =
let f _ ww =
- let f d vv =
- let na = E.node_attrs ~apix:lst.line ~degr:d () in
+ let f av vv =
+ let na = {av with E.n_apix = lst.line} in
UH.add henv (uri_of_qid qid) (na, lenv);
- let t = add_proj lenv (D.TCast (E.empty_node, ww, vv)) in
+ let t = add_proj lenv (D.TCast (na, ww, vv)) in
(*
print_newline (); CrgOutput.pp_term print_string t;
*)