}
+module QTree = struct
+ type t = query_tree
+ let rec equal q1 q2 =
+ q1 == q2 ||
+ (q1.id == q2.id && q1.id != -1) ||
+ match q1.desc, q2.desc with
+ | Binop(op1,qt1,qt2),Binop(op2,qt3,qt4)-> op1==op2&& (equal qt1 qt3 && equal qt2 qt4)
+
+ | Axis(a1,qt1),Axis(a2,qt2) -> compare_axis a1 a2 && equal qt1 qt2
+ | Tag(t1,k1),Tag(t2,k2) -> t1==t2&& k1==k2
+ | Dom,Dom | Start,Start -> true
+ | _,_ ->false
+ and compare_axis a1 a2 =
+ match a1,a2 with
+ Self ,Self | Attribute, Attribute | Child , Child | Parent , Parent
+ | FollowingSibling , FollowingSibling
+ | PrecedingSibling , PrecedingSibling
+ | Preceding , Preceding | Following , Following -> true
+ | Descendant b1, Descendant b2 -> b1==b2
+ | Ancestor b1, Ancestor b2 -> b1==b2
+ | _,_ -> false
+ let rec hash q =
+ if q.hash != -1 then q.hash
+ else match q.desc with
+ Dom -> 1
+ | Start -> 3
+ | Tag(s,_) -> 5 + 17*QNameSet.hash s
+ | Axis(a,q) -> 7 + 17 * Hashtbl.hash a + 23* hash q
+ | Binop(op,q1,q2) -> 11 + 17* Hashtbl.hash op + 23* hash q1 + 27* hash q2
+end
+module QTreeHash = Hashtbl.Make(QTree)
-(*28/01/2014
- parametres : tree l'arbre xml
- n un noeud
- m move
- retour :un noeud qui correspond ॆ la relation r
-*)
+let compare_node tree a b =
+ compare (Naive_tree.preorder tree a ) (Naive_tree.preorder tree b )
+
+module Tas = struct
+type 'a tas =
+ | Vide
+ | Noeud of 'a tas * 'a * 'a tas
+
+let comp_node tree a b = (Naive_tree.preorder tree a )< (Naive_tree.preorder tree b )
+
+let rec size t =
+ match t with
+ Vide -> 0
+ | Noeud (t1,racine,t2) -> 1+ size t1 + size t2
+
+let rec height t =
+ match t with
+ Vide -> 0
+ | Noeud (t1,racine,t2) -> 1 + max (height t1) (height t2)
+
+let equilibre t =
+ let rec aux t =
+ match t with
+ Vide -> 0
+ | Noeud (t1,racine,t2) -> 1 + min (aux t1) (aux t2)
+ in
+ let max_h = height t in
+ let min_h = aux t in
+ if max_h- min_h >1 then false
+ else true
+
+let is_tas t =
+ if not (equilibre t) then false
+ else
+ let rec aux n t =
+ match t with
+ Vide -> true
+ | Noeud (Vide,racine,Vide) -> racine >= n
+ | Noeud (t1,racine, t2) -> (aux racine t1) && (aux racine t2)
+ in
+ aux 0 t
+
+let rec pop tree t =
+ match t with
+ Vide -> failwith "Tas vide"
+ | Noeud (t1, racine, t2) -> begin
+ match t1,t2 with
+ Vide,t2 -> t2
+ | t1,Vide -> t1
+ | Noeud (t3,r1,t4),Noeud (t5,r2,t6) -> if comp_node tree r1 r2 then Noeud (pop tree t1, r1,t2)
+ else Noeud (pop tree t2, r2, t1)
+ end
+
+let rec push tree t a =
+ match t with
+ Vide -> Noeud(Vide,a,Vide)
+ | Noeud (t1,r,t2) -> if comp_node tree a r then Noeud (t2,a,push tree t1 r)
+ else Noeud(t2,r, push tree t1 a)
+
+let tas_of_list tree l =
+ List.fold_left (push tree) Vide l
+
+let is_empty t = (size t )== 0
+
+let rec list_of_tas tree t =
+ match t with
+ Vide -> []
+ | Noeud(t1,r,t2) -> r::(list_of_tas tree (pop tree t))
+
+let sort_of_list tree l =
+ let t = tas_of_list tree l in
+ list_of_tas tree t
+
+end
+
+let comp_node t n1 n2 = (Naive_tree.preorder t n1) < (Naive_tree.preorder t n2)
+
+
+let rec union_list t l1 l2 =
+ match l1,l2 with
+ | [],l2 -> l2
+ | l1, [] -> l1
+ | h1::ll1, h2::ll2 -> if (comp_node t h2 h1) then h2 :: (union_list t l1 ll2)
+ else if (comp_node t h1 h2) then h1::(union_list t ll1 l2)
+ else h1 ::(union_list t ll1 ll2)
+
+let rec inter_list t l1 l2 =
+ match l1,l2 with
+ | [],l2 -> []
+ | l1, [] -> []
+ | h1::ll1, h2::ll2 -> if (comp_node t h1 h2) then inter_list t ll1 l2
+ else if (comp_node t h2 h1) then inter_list t l1 ll2
+ else h1 :: (inter_list t ll1 ll2)
+
+let rec diff_list t l1 l2 =
+ match l1,l2 with
+ | [],l2 -> []
+ | l1, [] -> l1
+ | h1::ll1, h2::ll2 -> if (comp_node t h1 h2) then h1::(diff_list t ll1 l2)
+ else if (comp_node t h2 h1) then h2 :: (diff_list t l1 ll2)
+ else diff_list t ll1 ll2
let print_node_list tree l =
List.iter (fun node ->
*)
-let compare_node tree a b =
- compare (Naive_tree.preorder tree a ) (Naive_tree.preorder tree b )
+
let rec eval_move tree ls m =
match m with
end
done;
let l = Hashtbl.fold (fun k _ acc -> k::acc) h [] in
- List.sort (compare_node tree) l
+ l
+ (*
+ Tas.sort_of_list tree l
+ List.sort (compare_node tree) l*)
+
+let rec compare_node_list tree l1 l2 =
+ match l1,l2 with
+ [],[] -> 0
+ | _,[] -> 1
+ | [],_ -> -1
+ | n1::ll1,n2::ll2 -> let b = compare_node tree n1 n2 in
+ if b=0 then compare_node_list tree ll1 ll2
+ else b
+
+let get_descendant tree ln =
+ let rec aux n acc =
+ if n == Naive_tree.nil then acc
+ else let n1 = Naive_tree.first_child tree n in
+ let acc1 = aux n1 (n::acc) in
+ let n2 = Naive_tree.next_sibling tree n in
+ let acc2 = aux n2 acc1 in
+ acc2
+ in
+ let l = List.fold_left (fun acc n -> if List.mem n acc then acc
+ else let n1 = Naive_tree.first_child tree n in
+ aux n1 acc) [] ln
+ in
+ List.rev l
+
+let get_child tree ln =
+ let rec aux n acc =
+ if n == Naive_tree.nil then acc
+ else
+ let n1 = Naive_tree.next_sibling tree n in
+ aux n1 (n::acc)
+ in
+ let ll = List.map (fun n->
+ let n1 = Naive_tree.first_child tree n in
+ let res = aux n1 [] in
+ List.rev res
+ ) ln in
+ List.fold_left (fun acc l -> union_list tree acc l) [] ll
+
+
+let get_followingSibling tree ln =
+ let rec aux n acc =
+ let n1 = Naive_tree.next_sibling tree n in
+ if n1 == Naive_tree.nil then acc
+ else aux n1 (n1::acc)
+ in
+ let ll = List.map (fun n -> let res = aux n [] in
+ List.rev res ) ln in
+ List.fold_left (fun acc l1 -> union_list tree acc l1) [] ll
+
+
+let rec get_firstBling tree n pred =
+ if n== Naive_tree.nil then pred
+ else get_firstBling tree (Naive_tree.prev_sibling tree n) n
-(*28/01/2014
- parametres : tree l'arbre xml
- ls l'ensemble de noeuds
- a axis
- retour : l'ensemble de noeuds qui correspondent ॆ l'axe
-*)
+let get_parent tree ln =
+ let l = List.fold_left (fun acc n ->
+ let n1 = get_firstBling tree n Naive_tree.nil in
+ let n2 = Naive_tree.parent_of_first tree n1 in
+ if n2 == Naive_tree.nil or List.mem n2 acc then acc
+ else union_list tree [n2] acc
+ ) [] ln
+ in
+ l
-let keep_elements t l = (*
- List.filter (fun n -> match Naive_tree.kind t n with
- | Element | Text | Document | Attribute -> true | _ -> false) l
- *) l
+
-let keep_attributs t l = (*
- List.filter (fun n -> match Naive_tree.kind t n with
- | Attribute ->true | _ -> false) *) l
+let get_ancestor tree ln =
+ let rec aux tree l1 acc =
+ match l1 with
+ [] -> acc
+ | _ -> let ll1 = get_parent tree l1 in
+ let acc1 = union_list tree acc ll1 in
+ aux tree ll1 acc1
+ in
+ let l = aux tree ln [] in
+ l
+
+let get_preSibling tree ln =
+ let rec aux n acc =
+ let n1 = Naive_tree.prev_sibling tree n in
+ if n1 == Naive_tree.nil then acc
+ else aux n1 (n1::acc)
+ in
+ let ll = List.map (fun n -> aux n [] ) ln in
+ List.fold_left (fun acc l1 -> union_list tree acc l1) [] ll
+
+
let rec eval_axis tree ls a =
let open Xpath.Ast in
match a with
Self -> ls
- | Attribute -> let lfc = eval_move tree ls Firstchild in
- let lc = eval_star tree lfc [Nextsibling] in
- keep_attributs tree lc
+ | Attribute -> get_child tree ls
- | Child -> let lfc = eval_move tree ls Firstchild in
- let lc = eval_star tree lfc [Nextsibling] in
- keep_elements tree lc
+ | Child -> get_child tree ls
- | Descendant c -> let lfc = eval_move tree ls Firstchild in
- let ls2 = eval_star tree lfc [Firstchild;Nextsibling] in
+ | Descendant c -> let ls2 = get_descendant tree ls in
let ldes =
- if not c then ls2
- else List.merge (compare_node tree) ls2 ls
+ if not c then ls2
+ else union_list tree ls2 ls
in
- keep_elements tree ldes
+ ldes
- | FollowingSibling -> let lnexts = eval_move tree ls Nextsibling in
- let lfs = eval_star tree lnexts [Nextsibling] in
- keep_elements tree lfs
+ | FollowingSibling -> get_followingSibling tree ls
- | Parent -> let lprevs = eval_star tree ls [Prevsibling] in
- let lp = eval_move tree lprevs Revfirstchild in
- keep_elements tree lp
+ | Parent -> get_parent tree ls
- | Ancestor b -> let ls2 = eval_star tree ls [Revfirstchild;Prevsibling] in
- let ls3 = eval_move tree ls2 Revfirstchild in
+ | Ancestor b ->
+ let ls3 = get_ancestor tree ls in
let lac =
if not b then ls3
- else List.merge (compare_node tree ) ls3 ls
+ else union_list tree ls3 ls
in
- keep_elements tree lac
+ lac
- | PrecedingSibling -> let ls2 = eval_star tree ls [Prevsibling] in
- let lps = eval_move tree ls2 Prevsibling in
- keep_elements tree lps
+ | PrecedingSibling -> get_preSibling tree ls
| Preceding -> let ls2 = eval_axis tree ls (Ancestor true) in
let ls3 = eval_axis tree ls2 PrecedingSibling in
let lp = eval_axis tree ls3 (Descendant true) in
- keep_elements tree lp
+ lp
| Following -> let ls2 = eval_axis tree ls (Ancestor true) in
let ls3 = eval_axis tree ls2 FollowingSibling in
let lf = eval_axis tree ls3 (Descendant true) in
- keep_elements tree lf
-
-
-
+ lf
+