(* *)
(***********************************************************************)
-(*
- Time-stamp: <Last modified on 2013-04-22 17:22:38 CEST by Kim Nguyen>
-*)
-
INCLUDE "utils.ml"
open Format
+type move = [ `First_child
+ | `Next_sibling
+ | `Parent
+ | `Previous_sibling
+ | `Stay ]
-type predicate = | First_child
- | Next_sibling
- | Parent
- | Previous_sibling
- | Stay
+type predicate = Move of move * State.t
| Is_first_child
| Is_next_sibling
- | Is of (Tree.NodeKind.t)
+ | Is of Tree.NodeKind.t
| Has_first_child
| Has_next_sibling
-let is_move p = match p with
-| First_child | Next_sibling
-| Parent | Previous_sibling | Stay -> true
-| _ -> false
-
-
-type atom = predicate * bool * State.t
+let is_move = function Move _ -> true | _ -> false
-module Atom : (Formula.ATOM with type data = atom) =
+module Atom : (Boolean.ATOM with type data = predicate) =
struct
module Node =
struct
- type t = atom
+ type t = predicate
let equal n1 n2 = n1 = n2
let hash n = Hashtbl.hash n
end
include Hcons.Make(Node)
let print ppf a =
- let p, b, q = a.node in
- if not b then fprintf ppf "%s" Pretty.lnot;
- match p with
- | First_child -> fprintf ppf "FC(%a)" State.print q
- | Next_sibling -> fprintf ppf "NS(%a)" State.print q
- | Parent -> fprintf ppf "FC%s(%a)" Pretty.inverse State.print q
- | Previous_sibling -> fprintf ppf "NS%s(%a)" Pretty.inverse State.print q
- | Stay -> fprintf ppf "%s(%a)" Pretty.epsilon State.print q
- | Is_first_child -> fprintf ppf "FC%s?" Pretty.inverse
- | Is_next_sibling -> fprintf ppf "NS%s?" Pretty.inverse
+ match a.node with
+ | Move (m, q) -> begin
+ match m with
+ `First_child -> fprintf ppf "%s" Pretty.down_arrow
+ | `Next_sibling -> fprintf ppf "%s" Pretty.right_arrow
+ | `Parent -> fprintf ppf "%s" Pretty.up_arrow
+ | `Previous_sibling -> fprintf ppf "%s" Pretty.left_arrow
+ | `Stay -> fprintf ppf "%s" Pretty.bullet
+ end;
+ fprintf ppf "%a" State.print q
+ | Is_first_child -> fprintf ppf "%s?" Pretty.up_arrow
+ | Is_next_sibling -> fprintf ppf "%s?" Pretty.left_arrow
| Is k -> fprintf ppf "is-%a?" Tree.NodeKind.print k
- | Has_first_child -> fprintf ppf "FC?"
- | Has_next_sibling -> fprintf ppf "NS?"
-
- let neg a =
- let p, b, q = a.node in
- make (p, not b, q)
-
+ | Has_first_child -> fprintf ppf "%s?" Pretty.down_arrow
+ | Has_next_sibling -> fprintf ppf "%s?" Pretty.right_arrow
end
-module SFormula =
+module Formula =
struct
- include Formula.Make(Atom)
+ include Boolean.Make(Atom)
open Tree.NodeKind
- let mk_atom a b c = atom_ (Atom.make (a,b,c))
- let mk_kind k = mk_atom (Is k) true State.dummy
- let has_first_child =
- (mk_atom Has_first_child true State.dummy)
+ let mk_atom a = atom_ (Atom.make a)
+ let mk_kind k = mk_atom (Is k)
+
+ let has_first_child = mk_atom Has_first_child
- let has_next_sibling =
- (mk_atom Has_next_sibling true State.dummy)
+ let has_next_sibling = mk_atom Has_next_sibling
- let is_first_child =
- (mk_atom Is_first_child true State.dummy)
+ let is_first_child = mk_atom Is_first_child
- let is_next_sibling =
- (mk_atom Is_next_sibling true State.dummy)
+ let is_next_sibling = mk_atom Is_next_sibling
- let is_attribute =
- (mk_atom (Is Attribute) true State.dummy)
+ let is_attribute = mk_atom (Is Attribute)
- let is_element =
- (mk_atom (Is Element) true State.dummy)
+ let is_element = mk_atom (Is Element)
- let is_processing_instruction =
- (mk_atom (Is ProcessingInstruction) true State.dummy)
+ let is_processing_instruction = mk_atom (Is ProcessingInstruction)
- let is_comment =
- (mk_atom (Is Comment) true State.dummy)
+ let is_comment = mk_atom (Is Comment)
+ let mk_move m q = mk_atom (Move(m,q))
let first_child q =
- and_
- (mk_atom First_child true q)
- has_first_child
+ and_
+ (mk_move `First_child q)
+ has_first_child
let next_sibling q =
and_
- (mk_atom Next_sibling true q)
+ (mk_move `Next_sibling q)
has_next_sibling
let parent q =
and_
- (mk_atom Parent true q)
+ (mk_move `Parent q)
is_first_child
let previous_sibling q =
and_
- (mk_atom Previous_sibling true q)
+ (mk_move `Previous_sibling q)
is_next_sibling
- let stay q =
- (mk_atom Stay true q)
+ let stay q = mk_move `Stay q
let get_states phi =
fold (fun phi acc ->
match expr phi with
- | Formula.Atom a -> let _, _, q = Atom.node a in
- if q != State.dummy then StateSet.add q acc else acc
+ | Boolean.Atom ({ Atom.node = Move(_,q) ; _ }, _) -> StateSet.add q acc
| _ -> acc
) phi StateSet.empty
module Transition = Hcons.Make (struct
- type t = State.t * QNameSet.t * SFormula.t
+ type t = State.t * QNameSet.t * Formula.t
let equal (a, b, c) (d, e, f) =
a == d && b == e && c == f
let hash (a, b, c) =
- HASHINT4 (PRIME1, a, ((QNameSet.uid b) :> int), ((SFormula.uid c) :> int))
+ HASHINT4 (PRIME1, a, ((QNameSet.uid b) :> int), ((Formula.uid c) :> int))
end)
let print ppf ?(sep="\n") l =
iter (fun t ->
let q, lab, f = Transition.node t in
- fprintf ppf "%a, %a -> %a%s" State.print q QNameSet.print lab SFormula.print f sep) l
+ fprintf ppf "%a, %a -> %a%s" State.print q QNameSet.print lab Formula.print f sep) l
end
id : Uid.t;
mutable states : StateSet.t;
mutable selection_states: StateSet.t;
- transitions: (State.t, (QNameSet.t*SFormula.t) list) Hashtbl.t;
+ transitions: (State.t, (QNameSet.t*Formula.t) list) Hashtbl.t;
mutable cache2 : TransList.t Cache.N2.t;
mutable cache4 : Config.t Cache.N4.t;
}
let next = Uid.make_maker ()
let dummy2 = TransList.cons
- (Transition.make (State.dummy,QNameSet.empty, SFormula.false_))
+ (Transition.make (State.dummy,QNameSet.empty, Formula.false_))
TransList.nil
-let dummy_config = Config.make { sat = StateSet.empty;
- unsat = StateSet.empty;
- todo = TransList.nil;
- summary = dummy_summary
- }
+let dummy_config =
+ Config.make { sat = StateSet.empty;
+ unsat = StateSet.empty;
+ todo = TransList.nil;
+ summary = dummy_summary
+ }
let create s ss =
let n2 = ref 0 in
Cache.N2.iteri (fun _ _ _ b -> if b then incr n2) auto.cache2;
Cache.N4.iteri (fun _ _ _ _ _ b -> if b then incr n4) auto.cache4;
- Format.eprintf "STATS: automaton %i, cache2: %i entries, cache6: %i entries\n%!"
+ Logger.msg `STATS "automaton %i, cache2: %i entries, cache6: %i entries"
(auto.id :> int) !n2 !n4;
let c2l, c2u = Cache.N2.stats auto.cache2 in
let c4l, c4u = Cache.N4.stats auto.cache4 in
- Format.eprintf "STATS: cache2: length: %i, used: %i, occupation: %f\n%!" c2l c2u (float c2u /. float c2l);
- Format.eprintf "STATS: cache4: length: %i, used: %i, occupation: %f\n%!" c4l c4u (float c4u /. float c4l)
+ Logger.msg `STATS
+ "cache2: length: %i, used: %i, occupation: %f"
+ c2l c2u (float c2u /. float c2l);
+ Logger.msg `STATS
+ "cache4: length: %i, used: %i, occupation: %f"
+ c4l c4u (float c4u /. float c4l)
);
auto
let reset a =
- a.cache2 <- Cache.N2.create (Cache.N2.dummy a.cache2);
a.cache4 <- Cache.N4.create (Cache.N4.dummy a.cache4)
+let full_reset a =
+ reset a;
+ a.cache2 <- Cache.N2.create (Cache.N2.dummy a.cache2)
+
let get_trans_aux a tag states =
StateSet.fold (fun q acc0 ->
(states.StateSet.id :> int) trs; trs)
else trs
-
-(*
-let eval_form phi fcs nss ps ss is_left is_right has_left has_right kind =
- 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 ->
- if b == StateSet.mem q fcs then SFormula.true_ else phi
- | Next_sibling ->
- if b == StateSet.mem q nss then SFormula.true_ else phi
- | Parent | Previous_sibling ->
- if b == StateSet.mem q ps then SFormula.true_ else phi
- | Stay ->
- if b == StateSet.mem q ss then SFormula.true_ else phi
- | Is_first_child -> SFormula.of_bool (b == is_left)
- | Is_next_sibling -> SFormula.of_bool (b == is_right)
- | Is k -> SFormula.of_bool (b == (k == kind))
- | Has_first_child -> SFormula.of_bool (b == has_left)
- | Has_next_sibling -> SFormula.of_bool (b == has_right)
- 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 int_of_conf 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)
-
-let eval_trans auto ltrs fcs nss ps ss is_left is_right has_left has_right kind =
- let n = int_of_conf is_left is_right has_left has_right kind
- and k = (fcs.StateSet.id :> int)
- and l = (nss.StateSet.id :> int)
- and m = (ps.StateSet.id :> int) in
- let rec loop ltrs ss =
- let i = (ltrs.TransList.id :> int)
- and j = (ss.StateSet.id :> int) in
- let (new_ltrs, new_ss) as res =
- let res = Cache.N6.find auto.cache6 i j k l m n in
- if res == dummy6 then
- let res =
- TransList.fold (fun trs (acct, accs) ->
- let q, lab, phi = Transition.node trs in
- if StateSet.mem q accs then (acct, accs) else
- let new_phi =
- eval_form
- phi fcs nss ps accs
- is_left is_right has_left has_right kind
- in
- if SFormula.is_true new_phi then
- (acct, StateSet.add q accs)
- else if SFormula.is_false new_phi then
- (acct, accs)
- else
- let new_tr = Transition.make (q, lab, new_phi) in
- (TransList.cons new_tr acct, accs)
- ) ltrs (TransList.nil, ss)
- in
- Cache.N6.add auto.cache6 i j k l m n res; res
- else
- res
- in
- if new_ss == ss then res else
- loop new_ltrs new_ss
- in
- loop ltrs ss
-
-*)
-
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_
+ || ((not pos) && StateSet.mem q config.unsat) then Formula.true_
else if (pos && StateSet.mem q config.unsat)
- || ((not pos) && StateSet.mem q config.sat) then SFormula.false_
+ || ((not pos) && StateSet.mem q config.sat) then Formula.false_
else atom
-
let eval_form 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))
+ begin match Formula.expr phi with
+ Boolean.True | Boolean.False -> phi
+ | Boolean.Atom (a, b) ->
+ begin
+ match a.Atom.node with
+ | Move (m, q) ->
+ let states = match m with
+ `First_child -> fcs
+ | `Next_sibling -> nss
+ | `Parent | `Previous_sibling -> ps
+ | `Stay -> ss
+ in simplify_atom phi b q states
+ | Is_first_child -> Formula.of_bool (b == (is_left summary))
+ | Is_next_sibling -> Formula.of_bool (b == (is_right summary))
+ | Is k -> Formula.of_bool (b == (k == (kind summary)))
+ | Has_first_child -> Formula.of_bool (b == (has_left summary))
+ | Has_next_sibling -> Formula.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)
+ | Boolean.And(phi1, phi2) -> Formula.and_ (loop phi1) (loop phi2)
+ | Boolean.Or (phi1, phi2) -> Formula.or_ (loop phi1) (loop phi2)
end
in
loop phi
let new_phi =
eval_form phi fcs nss ps old_config old_summary
in
- if SFormula.is_true new_phi then
+ if Formula.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
+ else if Formula.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
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
+ let new_config = Config.make { old_config.Config.node with sat; unsat; todo; } in
Cache.N4.add auto.cache4 oid fcsid nssid psid new_config;
new_config
in
let lab2 = QNameSet.diff labs s in
let tr1 =
if QNameSet.is_empty lab1 then []
- else [ (lab1, SFormula.or_ phi f) ]
+ else [ (lab1, Formula.or_ phi f) ]
in
let tr2 =
if QNameSet.is_empty lab2 then []
- else [ (lab2, SFormula.or_ phi f) ]
+ else [ (lab2, Formula.or_ phi f) ]
in
(QNameSet.union acup labs, tr1@ tr2 @ atrs)
) (QNameSet.empty, []) trs
let strs_strings, max_pre, max_all = List.fold_left (fun (accl, accp, acca) (q, s, f) ->
let s1 = State.print _str_fmt q; _flush_str_fmt () in
let s2 = QNameSet.print _str_fmt s; _flush_str_fmt () in
- let s3 = SFormula.print _str_fmt f; _flush_str_fmt () in
+ let s3 = Formula.print _str_fmt f; _flush_str_fmt () in
let pre = Pretty.length s1 + Pretty.length s2 in
let all = Pretty.length s3 in
( (q, s1, s2, s3) :: accl, max accp pre, max acca all)
let nqtrans =
if QNameSet.is_empty rem then qtrans
else
- (rem, SFormula.false_) :: qtrans
+ (rem, Formula.false_) :: qtrans
in
Hashtbl.replace a.transitions q nqtrans
) a.states
memo := StateSet.add q !memo;
let trs = try Hashtbl.find a.transitions q with Not_found -> [] in
List.iter (fun (_, phi) ->
- StateSet.iter loop (SFormula.get_states phi)) trs
+ StateSet.iter loop (Formula.get_states phi)) trs
end
in
StateSet.iter loop a.selection_states;
let memo_state = Hashtbl.create 17 in
let todo = Queue.create () in
let rec flip b f =
- match SFormula.expr f with
- Formula.True | Formula.False -> if b then f else SFormula.not_ f
- | Formula.Or(f1, f2) -> (if b then SFormula.or_ else SFormula.and_)(flip b f1) (flip b f2)
- | Formula.And(f1, f2) -> (if b then SFormula.and_ else SFormula.or_)(flip b f1) (flip b f2)
- | Formula.Atom(a) -> begin
- let l, b', q = Atom.node a in
- if q == State.dummy then if b then f else SFormula.not_ f
- else
- if b == b' then begin
- (* a appears positively, either no negation or double negation *)
- if not (Hashtbl.mem memo_state (q,b)) then Queue.add (q,true) todo;
- SFormula.atom_ (Atom.make (l, true, q))
- end else begin
+ match Formula.expr f with
+ Boolean.True | Boolean.False -> if b then f else Formula.not_ f
+ | Boolean.Or(f1, f2) -> (if b then Formula.or_ else Formula.and_)(flip b f1) (flip b f2)
+ | Boolean.And(f1, f2) -> (if b then Formula.and_ else Formula.or_)(flip b f1) (flip b f2)
+ | Boolean.Atom(a, b') -> begin
+ match a.Atom.node with
+ | Move (m, q) ->
+ if b == b' then begin
+ (* a appears positively, either no negation or double negation *)
+ if not (Hashtbl.mem memo_state (q,b)) then Queue.add (q,true) todo;
+ Formula.mk_atom (Move(m, q))
+ end else begin
(* need to reverse the atom
either we have a positive state deep below a negation
or we have a negative state in a positive formula
b' = sign of the state
b = sign of the enclosing formula
*)
- let not_q =
- try
+ let not_q =
+ try
(* does the inverted state of q exist ? *)
- Hashtbl.find memo_state (q, false)
- with
- Not_found ->
+ Hashtbl.find memo_state (q, false)
+ with
+ Not_found ->
(* create a new state and add it to the todo queue *)
- let nq = State.make () in
- auto.states <- StateSet.add nq auto.states;
- Hashtbl.add memo_state (q, false) nq;
- Queue.add (q, false) todo; nq
- in
- SFormula.atom_ (Atom.make (l, true, not_q))
- end
+ let nq = State.make () in
+ auto.states <- StateSet.add nq auto.states;
+ Hashtbl.add memo_state (q, false) nq;
+ Queue.add (q, false) todo; nq
+ in
+ Formula.mk_atom (Move (m,not_q))
+ end
+ | _ -> if b then f else Formula.not_ f
end
in
(* states that are not reachable from a selection stat are not interesting *)
Hashtbl.replace auto.transitions q' trans';
done;
cleanup_states auto
-
-