aux term
;;
+let rec remove_local_context =
+ function
+ | Cic.Meta (i,_) -> Cic.Meta (i,[])
+ | Cic.Appl l ->
+ Cic.Appl(List.map remove_local_context l)
+ | t -> t
+
(************************* rpo ********************************)
let number = [
module IntSet = Set.Make(OrderedInt)
+let goal_symbols = ref TermSet.empty
+
+let set_of_map m =
+ TermMap.fold (fun k _ s -> TermSet.add k s) m TermSet.empty
+;;
+
+let set_goal_symbols term =
+ let m = symbols_of_term term in
+ goal_symbols := (set_of_map m)
+;;
+
+let symbols_of_eq (ty,left,right,_) =
+ let sty = set_of_map (symbols_of_term ty) in
+ let sl = set_of_map (symbols_of_term left) in
+ let sr = set_of_map (symbols_of_term right) in
+ TermSet.union sty (TermSet.union sl sr)
+;;
+
+let distance sgoal seq =
+ let s = TermSet.diff seq sgoal in
+ TermSet.cardinal s
+;;
+
let compute_equality_weight (ty,left,right,o) =
let factor = 2 in
match o with
w1 + w2 + (factor * (List.length m1)) + (factor * (List.length m2))
;;
+let compute_equality_weight e =
+ let w = compute_equality_weight e in
+ let d = 0 in (* distance !goal_symbols (symbols_of_eq e) in *)
+(*
+ prerr_endline (Printf.sprintf "dist %s --- %s === %d"
+ (String.concat ", " (List.map (CicPp.ppterm) (TermSet.elements
+ !goal_symbols)))
+ (String.concat ", " (List.map (CicPp.ppterm) (TermSet.elements
+ (symbols_of_eq e))))
+ d
+ );
+*)
+ w + d
+;;
+
(* old
let compute_equality_weight (ty,left,right,o) =
let metasw = ref 0 in
end
;;
-type equality_sign = Negative | Positive;;
-
-let string_of_sign = function
- | Negative -> "Negative"
- | Positive -> "Positive"
-;;
-
-
type pos = Left | Right
let string_of_pos = function