(***********************************************************************)
(*
- Time-stamp: <Last modified on 2013-04-04 21:16:04 CEST by Kim Nguyen>
+ Time-stamp: <Last modified on 2013-04-22 14:46:08 CEST by Kim Nguyen>
*)
INCLUDE "utils.ml"
in
loop ltrs ss
+type node_summary = int
+let dummy_summary = -1
+(*
+4444444444443210
+4 -> kind
+3 -> is_left
+2 -> is_right
+1 -> has_left
+0 -> has_right
+*)
+
+let has_right (s : node_summary) : bool =
+ Obj.magic (s land 1)
+let has_left (s : node_summary) : bool =
+ Obj.magic ((s lsr 1) land 1)
+
+let is_right (s : node_summary) : bool =
+ Obj.magic ((s lsr 2) land 1)
+
+let is_left (s : node_summary) : bool =
+ Obj.magic ((s lsr 3) land 1)
+
+let kind (s : node_summary ) : Tree.NodeKind.t =
+ Obj.magic (s lsr 4)
+
+let node_summary is_left is_right has_left has_right kind =
+ ((Obj.magic kind) lsl 4) lor
+ ((Obj.magic is_left) lsl 3) lor
+ ((Obj.magic is_right) lsl 2) lor
+ ((Obj.magic has_left) lsl 1) lor
+ (Obj.magic has_right)
+
+
+
+type config = {
+ sat : StateSet.t;
+ unsat : StateSet.t;
+ todo : TransList.t;
+ summary : node_summary;
+}
+
+module Config = Hcons.Make(struct
+ type t = config
+ let equal c d =
+ c == d ||
+ c.sat == d.sat &&
+ c.unsat == d.unsat &&
+ c.todo == d.todo &&
+ c.summary == d.summary
+
+ let hash c =
+ HASHINT4((c.sat.StateSet.id :> int),
+ (c.unsat.StateSet.id :> int),
+ (c.todo.TransList.id :> int),
+ c.summary)
+end
+)
+let simplify_atom atom pos q { Config.node=config; _ } =
+ if (pos && StateSet.mem q config.sat)
+ || ((not pos) && StateSet.mem q config.unsat) then SFormula.true_
+ else if (pos && StateSet.mem q config.unsat)
+ || ((not pos) && StateSet.mem q config.sat) then SFormula.false_
+ else atom
+let eval_form2 phi fcs nss ps ss summary =
+ let rec loop phi =
+ begin match SFormula.expr phi with
+ Formula.True | Formula.False -> phi
+ | Formula.Atom a ->
+ let p, b, q = Atom.node a in begin
+ match p with
+ | First_child -> simplify_atom phi b q fcs
+ | Next_sibling -> simplify_atom phi b q nss
+ | Parent | Previous_sibling -> simplify_atom phi b q ps
+ | Stay -> simplify_atom phi b q ss
+ | Is_first_child -> SFormula.of_bool (b == (is_left summary))
+ | Is_next_sibling -> SFormula.of_bool (b == (is_right summary))
+ | Is k -> SFormula.of_bool (b == (k == (kind summary)))
+ | Has_first_child -> SFormula.of_bool (b == (has_left summary))
+ | Has_next_sibling -> SFormula.of_bool (b == (has_right summary))
+ end
+ | Formula.And(phi1, phi2) -> SFormula.and_ (loop phi1) (loop phi2)
+ | Formula.Or (phi1, phi2) -> SFormula.or_ (loop phi1) (loop phi2)
+ end
+ in
+ loop phi
+
+
+
+let eval_trans auto fcs nss ps ss =
+ let rec loop old_config =
+ let { sat = old_sat;
+ unsat = old_unsat;
+ todo = old_todo;
+ summary = old_summary } = old_config.Config.node
+ in
+ let sat, unsat, removed, kept, todo =
+ TransList.fold
+ (fun trs acc ->
+ let q, lab, phi = Transition.node trs in
+ let a_sat, a_unsat, a_rem, a_kept, a_todo = acc in
+ if StateSet.mem q a_sat || StateSet.mem q a_unsat then acc else
+ let new_phi =
+ eval_form2 phi fcs nss ps old_config old_summary
+ in
+ if SFormula.is_true new_phi then
+ StateSet.add q a_sat, a_unsat, StateSet.add q a_rem, a_kept, a_todo
+ else if SFormula.is_false new_phi then
+ a_sat, StateSet.add q a_unsat, StateSet.add q a_rem, a_kept, a_todo
+ else
+ let new_tr = Transition.make (q, lab, new_phi) in
+ (a_sat, a_unsat, a_rem, StateSet.add q a_kept, (TransList.cons new_tr a_todo))
+ ) old_todo (old_sat, old_unsat, StateSet.empty, StateSet.empty, TransList.nil)
+ in
+ (* States that have been removed from the todo list and not kept are now
+ unsatisfiable *)
+ let unsat = StateSet.union unsat (StateSet.diff removed kept) in
+ (* States that were found once to be satisfiable remain so *)
+ let unsat = StateSet.diff unsat sat in
+ let new_config = Config.make { sat; unsat; todo ; summary = old_summary } in
+ if sat == old_sat && unsat == old_unsat && todo == old_todo then new_config
+ else loop new_config
+ in
+ loop ss
(*
[add_trans a q labels f] adds a transition [(q,labels) -> f] to the