(* *)
(***********************************************************************)
-(*
- Time-stamp: <Last modified on 2013-02-06 14:24:24 CET by Kim Nguyen>
-*)
-
+INCLUDE "utils.ml"
open Format
-type move = [ `Left | `Right | `Up1 | `Up2 | `Epsilon ]
-type state_ctx = { left : StateSet.t;
- right : StateSet.t;
- up1 : StateSet.t;
- up2 : StateSet.t;
- epsilon : StateSet.t}
-type ctx_ = { mutable positive : state_ctx;
- mutable negative : state_ctx }
-type pred_ = move * bool * State.t
-
-module Move : (Formula.PREDICATE with type data = pred_ and type ctx = ctx_ ) =
+open Misc
+type move = [ `First_child
+ | `Next_sibling
+ | `Parent
+ | `Previous_sibling
+ | `Stay ]
+
+module Move =
+struct
+ type t = move
+ type 'a table = 'a array
+ let idx = function
+ | `First_child -> 0
+ | `Next_sibling -> 1
+ | `Parent -> 2
+ | `Previous_sibling -> 3
+ | `Stay -> 4
+ let ridx = function
+ | 0 -> `First_child
+ | 1 -> `Next_sibling
+ | 2 -> `Parent
+ | 3 -> `Previous_sibling
+ | 4 -> `Stay
+ | _ -> assert false
+
+ let create_table a = Array.make 5 a
+ let get m k = m.(idx k)
+ let set m k v = m.(idx k) <- v
+ let iter f m = Array.iteri (fun i v -> f (ridx i) v) m
+ let fold f m acc =
+ let acc = ref acc in
+ iter (fun i v -> acc := f i v !acc) m;
+ !acc
+ let for_all p m =
+ try
+ iter (fun i v -> if not (p i v) then raise Exit) m;
+ true
+ with
+ Exit -> false
+ let for_all2 p m1 m2 =
+ try
+ for i = 0 to 4 do
+ let v1 = m1.(i)
+ and v2 = m2.(i) in
+ if not (p (ridx i) v1 v2) then raise Exit
+ done;
+ true
+ with
+ Exit -> false
+
+ let exists p m =
+ try
+ iter (fun i v -> if p i v then raise Exit) m;
+ false
+ with
+ Exit -> true
+ let print ppf m =
+ 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
+
+ let print_table pr_e ppf m =
+ iter (fun i v -> fprintf ppf "%a: %a" print i pr_e v;
+ if (idx i) < 4 then fprintf ppf ", ") m
+end
+
+type predicate = Move of move * State.t
+ | Is_first_child
+ | Is_next_sibling
+ | Is of Tree.NodeKind.t
+ | Has_first_child
+ | Has_next_sibling
+
+module Atom =
struct
module Node =
struct
- type t = move * bool * State.t
+ type t = predicate
let equal n1 n2 = n1 = n2
let hash n = Hashtbl.hash n
end
- type ctx = ctx_
- let make_ctx a b c d e =
- { left = a; right = b; up1 = c; up2 = d; epsilon = e }
-
include Hcons.Make(Node)
let print ppf a =
- let _ = flush_str_formatter() in
- let fmt = str_formatter in
-
- let m, b, s = a.node in
- let dir,num =
- match m with
- | `Left -> Pretty.down_arrow, Pretty.subscript 1
- | `Right -> Pretty.down_arrow, Pretty.subscript 2
- | `Epsilon -> Pretty.epsilon, ""
- | `Up1 -> Pretty.up_arrow, Pretty.subscript 1
- | `Up2 -> Pretty.up_arrow, Pretty.subscript 2
- in
- fprintf fmt "%s%s" dir num;
- State.print fmt s;
- let str = flush_str_formatter() in
- if b then fprintf ppf "%s" str
- else Pretty.pp_overline ppf str
-
- let neg p =
- let l, b, s = p.node in
- make (l, not b, s)
-
- let eval ctx p =
- let l, b, s = p.node in
- let nctx = if b then ctx.positive else ctx.negative in
- StateSet.mem s begin
- match l with
- `Left -> nctx.left
- | `Right -> nctx.right
- | `Up1 -> nctx.up1
- | `Up2 -> nctx.up2
- | `Epsilon -> nctx.epsilon
- end
+ match a.node with
+ | Move (m, q) ->
+ fprintf ppf "%a%a" Move.print m 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 "%s?" Pretty.down_arrow
+ | Has_next_sibling -> fprintf ppf "%s?" Pretty.right_arrow
+
+end
+
+
+module Formula =
+struct
+ include Boolean.Make(Atom)
+ open Tree.NodeKind
+ let mk_atom a = atom_ (Atom.make a)
+ let is k = mk_atom (Is k)
+
+ let has_first_child = mk_atom Has_first_child
+
+ let has_next_sibling = mk_atom Has_next_sibling
+
+ let is_first_child = mk_atom Is_first_child
+
+ let is_next_sibling = mk_atom Is_next_sibling
+
+ let is_attribute = mk_atom (Is Attribute)
+
+ let is_element = mk_atom (Is Element)
+
+ let is_processing_instruction = mk_atom (Is ProcessingInstruction)
+
+ let is_comment = mk_atom (Is Comment)
+
+ let mk_move m q = mk_atom (Move(m,q))
+ let first_child q =
+ and_
+ (mk_move `First_child q)
+ has_first_child
+
+ let next_sibling q =
+ and_
+ (mk_move `Next_sibling q)
+ has_next_sibling
+
+ let parent q =
+ and_
+ (mk_move `Parent q)
+ is_first_child
+
+ let previous_sibling q =
+ and_
+ (mk_move `Previous_sibling q)
+ is_next_sibling
+
+ let stay q = mk_move `Stay q
+
+ let get_states_by_move phi =
+ let table = Move.create_table StateSet.empty in
+ iter (fun phi ->
+ match expr phi with
+ | Boolean.Atom ({ Atom.node = Move(v,q) ; _ }, _) ->
+ let s = Move.get table v in
+ Move.set table v (StateSet.add q s)
+ | _ -> ()
+ ) phi;
+ table
+ let get_states phi =
+ let table = get_states_by_move phi in
+ Move.fold (fun _ s acc -> StateSet.union s acc) table StateSet.empty
+
+end
+
+module Transition =
+struct
+ include Hcons.Make (struct
+ 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), ((Formula.uid c) :> int))
+ end)
+ let print ppf t =
+ let q, l, f = t.node in
+ fprintf ppf "%a, %a %s %a"
+ State.print q
+ QNameSet.print l
+ Pretty.double_right_arrow
+ Formula.print f
end
-module SFormula = Formula.Make(Move)
+
+module TransList : sig
+ include Hlist.S with type elt = Transition.t
+ val print : Format.formatter -> ?sep:string -> t -> unit
+end =
+struct
+ include Hlist.Make(Transition)
+ 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
+ Formula.print f sep) l
+end
+
+type rank = { td : StateSet.t;
+ bu : StateSet.t;
+ exit : StateSet.t }
+
+
type t = {
id : Uid.t;
mutable states : StateSet.t;
- mutable top_states : StateSet.t;
- mutable bottom_states: StateSet.t;
- mutable selection_states: StateSet.t;
- transitions: (State.t, (QNameSet.t*SFormula.t) list) Hashtbl.t;
+ mutable starting_states : StateSet.t;
+ mutable selecting_states: StateSet.t;
+ transitions: (State.t, (QNameSet.t*Formula.t) list) Hashtbl.t;
+ mutable ranked_states : rank array
}
+let uid t = t.id
+let get_states a = a.states
+let get_starting_states a = a.starting_states
+let get_selecting_states a = a.selecting_states
+let get_states_by_rank a = a.ranked_states
+let get_max_rank a = Array.length a.ranked_states - 1
-let next = Uid.make_maker ()
-
-let create () = { id = next ();
- states = StateSet.empty;
- top_states = StateSet.empty;
- bottom_states = StateSet.empty;
- selection_states = StateSet.empty;
- transitions = Hashtbl.create 17;
- }
-
-let add_trans a q s f =
- let trs = try Hashtbl.find a.transitions q with Not_found -> [] in
- let rem, ntrs =
- List.fold_left (fun (rem, atrs) ((labs, phi) as tr) ->
- let nlabs = QNameSet.inter labs rem in
- if QNameSet.is_empty nlabs then
- (rem, tr :: atrs)
- else
- let nrem = QNameSet.diff rem labs in
- nrem, (nlabs, SFormula.or_ phi f)::atrs
- ) (s, []) trs
- in
- let ntrs = if QNameSet.is_empty rem then ntrs
- else (rem, f) :: ntrs
- in
- Hashtbl.replace a.transitions q ntrs
-
+let _pr_buff = Buffer.create 50
+let _str_fmt = formatter_of_buffer _pr_buff
+let _flush_str_fmt () = pp_print_flush _str_fmt ();
+ let s = Buffer.contents _pr_buff in
+ Buffer.clear _pr_buff; s
let print fmt a =
+ let _ = _flush_str_fmt() in
fprintf fmt
- "Unique ID: %i@\n\
- States %a@\n\
- Top states: %a@\n\
- Bottom states: %a@\n\
+ "Internal UID: %i@\n\
+ States: %a@\n\
+ Number of states: %i@\n\
+ Starting states: %a@\n\
Selection states: %a@\n\
+ Ranked states: %a@\n\
Alternating transitions:@\n"
(a.id :> int)
StateSet.print a.states
- StateSet.print a.top_states
- StateSet.print a.bottom_states
- StateSet.print a.selection_states;
+ (StateSet.cardinal a.states)
+ StateSet.print a.starting_states
+ StateSet.print a.selecting_states
+ (let r = ref 0 in Pretty.print_array ~sep:", " (fun ppf s ->
+ fprintf ppf "(%i:{td=%a,bu=%a,exit=%a)" !r
+ StateSet.print s.td StateSet.print s.bu StateSet.print s.exit;
+ incr r)) a.ranked_states;
let trs =
Hashtbl.fold
(fun q t acc -> List.fold_left (fun acc (s , f) -> (q,s,f)::acc) acc t)
a.transitions
[]
in
- let sorted_trs = List.stable_sort (fun (q1, s1, phi1) (q2, s2, phi2) ->
- let c = State.compare q1 q2 in - (if c == 0 then QNameSet.compare s1 s2 else c))
+ let sorted_trs = List.stable_sort (fun (q1, s1, _) (q2, s2, _) ->
+ let c = State.compare q2 q1 in if c == 0 then QNameSet.compare s2 s1 else c)
trs
in
- let sfmt = str_formatter in
- let _ = flush_str_formatter () in
- let strs_strings, maxs = List.fold_left (fun (accl, accm) (q, s, f) ->
- let s1 = State.print sfmt q; flush_str_formatter () in
- let s2 = QNameSet.print sfmt s; flush_str_formatter () in
- let s3 = SFormula.print sfmt f; flush_str_formatter () in
- ( (s1, s2, s3) :: accl,
- max
- accm (2 + String.length s1 + String.length s2))
- ) ([], 0) sorted_trs
+ let _ = _flush_str_fmt () in
+ 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 = 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)
+ ) ([], 0, 0) sorted_trs
in
- List.iter (fun (s1, s2, s3) ->
+ let line = Pretty.line (max_all + max_pre + 6) in
+ let prev_q = ref State.dummy in
+ fprintf fmt "%s@\n" line;
+ List.iter (fun (q, s1, s2, s3) ->
+ if !prev_q != q && !prev_q != State.dummy then fprintf fmt "%s@\n" line;
+ prev_q := q;
fprintf fmt "%s, %s" s1 s2;
- fprintf fmt "%s" (Pretty.padding (maxs - String.length s1 - String.length s2 - 2));
- fprintf fmt "%s %s@\n" Pretty.right_arrow s3) strs_strings
+ fprintf fmt "%s"
+ (Pretty.padding (max_pre - Pretty.length s1 - Pretty.length s2));
+ fprintf fmt " %s %s@\n" Pretty.right_arrow s3;
+ ) strs_strings;
+ fprintf fmt "%s@\n" line
+
+
+let get_trans a tag states =
+ StateSet.fold (fun q acc0 ->
+ try
+ let trs = Hashtbl.find a.transitions q in
+ List.fold_left (fun acc1 (labs, phi) ->
+ if QNameSet.mem tag labs then
+ TransList.cons (Transition.make (q, labs, phi)) acc1
+ else acc1) acc0 trs
+ with Not_found -> acc0
+ ) states TransList.nil
+
+
+let get_form a tag q =
+ try
+ let trs = Hashtbl.find a.transitions q in
+ List.fold_left (fun aphi (labs, phi) ->
+ if QNameSet.mem tag labs then Formula.or_ aphi phi else aphi
+ ) Formula.false_ trs
+ with
+ Not_found -> Formula.false_
+
+(*
+ [complete transitions a] ensures that for each state q
+ and each symbols s in the alphabet, a transition q, s exists.
+ (adding q, s -> F when necessary).
+*)
+
+let complete_transitions a =
+ StateSet.iter (fun q ->
+ if StateSet.mem q a.starting_states then ()
+ else
+ let qtrans = Hashtbl.find a.transitions q in
+ let rem =
+ List.fold_left (fun rem (labels, _) ->
+ QNameSet.diff rem labels) QNameSet.any qtrans
+ in
+ let nqtrans =
+ if QNameSet.is_empty rem then qtrans
+ else
+ (rem, Formula.false_) :: qtrans
+ in
+ Hashtbl.replace a.transitions q nqtrans
+ ) a.states
+
+(* [cleanup_states] remove states that do not lead to a
+ selecting states *)
+
+let cleanup_states a =
+ let memo = ref StateSet.empty in
+ let rec loop q =
+ if not (StateSet.mem q !memo) then begin
+ memo := StateSet.add q !memo;
+ let trs = try Hashtbl.find a.transitions q with Not_found -> [] in
+ List.iter (fun (_, phi) ->
+ StateSet.iter loop (Formula.get_states phi)) trs
+ end
+ in
+ StateSet.iter loop a.selecting_states;
+ let unused = StateSet.diff a.states !memo in
+ StateSet.iter (fun q -> Hashtbl.remove a.transitions q) unused;
+ a.states <- !memo
+
+(* [normalize_negations a] removes negative atoms in the formula
+ complementing the sub-automaton in the negative states.
+ [TODO check the meaning of negative upward arrows]
+*)
+
+let normalize_negations auto =
+ let memo_state = Hashtbl.create 17 in
+ let todo = Queue.create () in
+ let rec flip b f =
+ 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
+ (* does the inverted state of q exist ? *)
+ 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
+ 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 *)
+ StateSet.iter (fun q -> Queue.add (q, true) todo) auto.selecting_states;
+
+ while not (Queue.is_empty todo) do
+ let (q, b) as key = Queue.pop todo in
+ if not (StateSet.mem q auto.starting_states) then
+ let q' =
+ try
+ Hashtbl.find memo_state key
+ with
+ Not_found ->
+ let nq = if b then q else
+ let nq = State.make () in
+ auto.states <- StateSet.add nq auto.states;
+ nq
+ in
+ Hashtbl.add memo_state key nq; nq
+ in
+ let trans = try Hashtbl.find auto.transitions q with Not_found -> [] in
+ let trans' = List.map (fun (lab, f) -> lab, flip b f) trans in
+ Hashtbl.replace auto.transitions q' trans';
+ done;
+ cleanup_states auto
+
+(* [compute_dependencies auto] returns a hash table storing for each
+ states [q] a Move.table containing the set of states on which [q]
+ depends (loosely). [q] depends on [q'] if there is a transition
+ [q, {...} -> phi], where [q'] occurs in [phi].
+*)
+let compute_dependencies auto =
+ let edges = Hashtbl.create 17 in
+ StateSet.iter
+ (fun q -> Hashtbl.add edges q (Move.create_table StateSet.empty))
+ auto.starting_states;
+ Hashtbl.iter (fun q trans ->
+ let moves = try Hashtbl.find edges q with Not_found ->
+ let m = Move.create_table StateSet.empty in
+ Hashtbl.add edges q m;
+ m
+ in
+ List.iter (fun (_, phi) ->
+ let m_phi = Formula.get_states_by_move phi in
+ Move.iter (fun m set ->
+ Move.set moves m (StateSet.union set (Move.get moves m)))
+ m_phi) trans) auto.transitions;
+
+ edges
+
+let state_prerequisites dir auto q =
+ let trans = Hashtbl.find auto.transitions q in
+ List.fold_left (fun acc (_, phi) ->
+ let m_phi = Formula.get_states_by_move phi in
+ let prereq = Move.get m_phi dir in
+ StateSet.union prereq acc)
+ StateSet.empty trans
+
+
+let compute_rank auto =
+ let dependencies = compute_dependencies auto in
+ let upward = [ `Stay ; `Parent ; `Previous_sibling ] in
+ let downward = [ `Stay; `First_child; `Next_sibling ] in
+ let swap dir = if dir == upward then downward else upward in
+ let is_satisfied dir q t =
+ Move.for_all (fun d set ->
+ if List.mem d dir then
+ StateSet.(is_empty (remove q set))
+ else StateSet.is_empty set) t
+ in
+ let update_dependencies dir initacc =
+ let rec loop acc =
+ let new_acc =
+ Hashtbl.fold (fun q deps acc ->
+ let to_remove = StateSet.union acc initacc in
+ List.iter
+ (fun m ->
+ Move.set deps m (StateSet.diff (Move.get deps m) to_remove)
+ )
+ dir;
+ if is_satisfied dir q deps then StateSet.add q acc else acc
+ ) dependencies acc
+ in
+ if acc == new_acc then new_acc else loop new_acc
+ in
+ let satisfied = loop StateSet.empty in
+ StateSet.iter (fun q ->
+ Hashtbl.remove dependencies q) satisfied;
+ satisfied
+ in
+ let current_states = ref StateSet.empty in
+ let rank_list = ref [] in
+ let rank = ref 0 in
+ let current_dir = ref upward in
+ let detect_cycle = ref 0 in
+ while Hashtbl.length dependencies != 0 do
+ let new_sat = update_dependencies !current_dir !current_states in
+ if StateSet.is_empty new_sat then incr detect_cycle;
+ if !detect_cycle > 2 then assert false;
+ rank_list := (!rank, new_sat) :: !rank_list;
+ rank := !rank + 1;
+ current_dir := swap !current_dir;
+ current_states := StateSet.union new_sat !current_states;
+ done;
+ let by_rank = Hashtbl.create 17 in
+ List.iter (fun (r,s) ->
+ let set = try Hashtbl.find by_rank r with Not_found -> StateSet.empty in
+ Hashtbl.replace by_rank r (StateSet.union s set)) !rank_list;
+ let rank = Hashtbl.length by_rank in
+ if rank mod 2 == 1 then Hashtbl.replace by_rank rank StateSet.empty;
+ let rank = Hashtbl.length by_rank in
+ assert (rank mod 2 == 0);
+ let rank_array =
+ Array.init (rank / 2)
+ (fun i ->
+ let td_set = Hashtbl.find by_rank (2 * i) in
+ let bu_set = Hashtbl.find by_rank (2 * i + 1) in
+ { td = td_set; bu = bu_set ; exit = StateSet.empty }
+ )
+ in
+ let max_rank = Array.length rank_array - 1 in
+ for i = 0 to max_rank do
+ let this_rank = rank_array.(i) in
+ let exit = if i == max_rank then auto.selecting_states else
+ let next = rank_array.(i+1) in
+ let res =
+ StateSet.fold (fun q acc ->
+ List.fold_left (fun acc m ->
+ StateSet.union acc (state_prerequisites m auto q ))
+ acc [`First_child; `Next_sibling; `Parent; `Previous_sibling; `Stay]
+ ) (StateSet.union next.td next.bu) StateSet.empty
+ in
+
+ StateSet.(
+ union auto.selecting_states ( inter res (union this_rank.td this_rank.bu)))
+
+ in
+ rank_array.(i) <- {this_rank with exit = exit };
+ done;
+ auto.ranked_states <- rank_array
+
+
+module Builder =
+struct
+ type auto = t
+ type t = auto
+ let next = Uid.make_maker ()
+
+ let make () =
+ let auto =
+ {
+ id = next ();
+ states = StateSet.empty;
+ starting_states = StateSet.empty;
+ selecting_states = StateSet.empty;
+ transitions = Hashtbl.create MED_H_SIZE;
+ ranked_states = [| |]
+ }
+ in
+ auto
+
+ let add_state a ?(starting=false) ?(selecting=false) q =
+ a.states <- StateSet.add q a.states;
+ if starting then a.starting_states <- StateSet.add q a.starting_states;
+ if selecting then a.selecting_states <- StateSet.add q a.selecting_states
+
+ let add_trans a q s f =
+ if not (StateSet.mem q a.states) then add_state a q;
+ let trs = try Hashtbl.find a.transitions q with Not_found -> [] in
+ let cup, ntrs =
+ List.fold_left (fun (acup, atrs) (labs, phi) ->
+ let lab1 = QNameSet.inter labs s in
+ let lab2 = QNameSet.diff labs s in
+ let tr1 =
+ if QNameSet.is_empty lab1 then []
+ else [ (lab1, Formula.or_ phi f) ]
+ in
+ let tr2 =
+ if QNameSet.is_empty lab2 then []
+ else [ (lab2, Formula.or_ phi f) ]
+ in
+ (QNameSet.union acup labs, tr1@ tr2 @ atrs)
+ ) (QNameSet.empty, []) trs
+ in
+ let rem = QNameSet.diff s cup in
+ let ntrs = if QNameSet.is_empty rem then ntrs
+ else (rem, f) :: ntrs
+ in
+ Hashtbl.replace a.transitions q ntrs
+
+ let finalize a =
+ complete_transitions a;
+ normalize_negations a;
+ compute_rank a;
+ a
+end
+
+
+let map_set f s =
+ StateSet.fold (fun q a -> StateSet.add (f q) a) s StateSet.empty
+
+let map_hash fk fv h =
+ let h' = Hashtbl.create (Hashtbl.length h) in
+ let () = Hashtbl.iter (fun k v -> Hashtbl.add h' (fk k) (fv v)) h in
+ h'
+
+let rec map_form f phi =
+ match Formula.expr phi with
+ | Boolean.Or(phi1, phi2) -> Formula.or_ (map_form f phi1) (map_form f phi2)
+ | Boolean.And(phi1, phi2) -> Formula.and_ (map_form f phi1) (map_form f phi2)
+ | Boolean.Atom({ Atom.node = Move(m,q); _}, b) ->
+ let a = Formula.mk_atom (Move (m,f q)) in
+ if b then a else Formula.not_ a
+ | _ -> phi
+
+let rename_states mapper a =
+ let rename q = try Hashtbl.find mapper q with Not_found -> q in
+ { Builder.make () with
+ states = map_set rename a.states;
+ starting_states = map_set rename a.starting_states;
+ selecting_states = map_set rename a.selecting_states;
+ transitions =
+ map_hash
+ rename
+ (fun l ->
+ (List.map (fun (labels, form) -> (labels, map_form rename form)) l))
+ a.transitions;
+ ranked_states = Array.map (fun s ->
+ { td = map_set rename s.td;
+ bu = map_set rename s.bu;
+ exit = map_set rename s.exit;
+ }) a.ranked_states
+ }
+
+let copy a =
+ let mapper = Hashtbl.create MED_H_SIZE in
+ let () =
+ StateSet.iter (fun q -> Hashtbl.add mapper q (State.make())) a.states
+ in
+ rename_states mapper a
+
+
+let concat a1 a2 =
+ let a1 = copy a1 in
+ let a2 = copy a2 in
+ let link_phi =
+ StateSet.fold
+ (fun q phi -> Formula.(or_ (stay q) phi))
+ a1.selecting_states Formula.false_
+ in
+ Hashtbl.iter (fun q trs -> Hashtbl.add a1.transitions q trs)
+ a2.transitions;
+ StateSet.iter
+ (fun q ->
+ Hashtbl.replace a1.transitions q [(QNameSet.any, link_phi)])
+ a2.starting_states;
+ let a = { a1 with
+ states = StateSet.union a1.states a2.states;
+ selecting_states = a2.selecting_states;
+ transitions = a1.transitions;
+ }
+ in compute_rank a; a
+
+let merge a1 a2 =
+ let a1 = copy a1 in
+ let a2 = copy a2 in
+ let a = { a1 with
+ states = StateSet.union a1.states a2.states;
+ selecting_states = StateSet.union a1.selecting_states a2.selecting_states;
+ starting_states = StateSet.union a1.starting_states a2.starting_states;
+ transitions =
+ let () =
+ Hashtbl.iter (fun k v -> Hashtbl.add a1.transitions k v) a2.transitions
+ in
+ a1.transitions
+ } in
+ compute_rank a ; a
+
+
+let link a1 a2 q link_phi =
+ let a = { a1 with
+ states = StateSet.union a1.states a2.states;
+ selecting_states = StateSet.singleton q;
+ starting_states = StateSet.union a1.starting_states a2.starting_states;
+ transitions =
+ let () =
+ Hashtbl.iter (fun k v -> Hashtbl.add a1.transitions k v) a2.transitions
+ in
+ Hashtbl.add a1.transitions q [(QNameSet.any, link_phi)];
+ a1.transitions
+ }
+ in
+ compute_rank a; a
+
+let union a1 a2 =
+ let a1 = copy a1 in
+ let a2 = copy a2 in
+ let q = State.make () in
+ let link_phi =
+ StateSet.fold
+ (fun q phi -> Formula.(or_ (stay q) phi))
+ (StateSet.union a1.selecting_states a2.selecting_states)
+ Formula.false_
+ in
+ link a1 a2 q link_phi
+
+let inter a1 a2 =
+ let a1 = copy a1 in
+ let a2 = copy a2 in
+ let q = State.make () in
+ let link_phi =
+ StateSet.fold
+ (fun q phi -> Formula.(and_ (stay q) phi))
+ (StateSet.union a1.selecting_states a2.selecting_states)
+ Formula.true_
+ in
+ link a1 a2 q link_phi
+
+let neg a =
+ let a = copy a in
+ let q = State.make () in
+ let link_phi =
+ StateSet.fold
+ (fun q phi -> Formula.(and_ (not_(stay q)) phi))
+ a.selecting_states
+ Formula.true_
+ in
+ let () = Hashtbl.add a.transitions q [(QNameSet.any, link_phi)] in
+ let a =
+ { a with
+ selecting_states = StateSet.singleton q;
+ }
+ in
+ normalize_negations a; compute_rank a; a
+
+let diff a1 a2 = inter a1 (neg a2)