1132 lines
30 KiB
Prolog
1132 lines
30 KiB
Prolog
/*
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This code implements Red-Black trees as described in:
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"Introduction to Algorithms", Second Edition
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Cormen, Leiserson, Rivest, and Stein,
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MIT Press
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Author: Vitor Santos Costa
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*/
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:- module(rbtrees,
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[rb_new/1,
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rb_empty/1, % ?T
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rb_lookup/3, % +Key, -Value, +T
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rb_update/4, % +T, +Key, +NewVal, -TN
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rb_update/5, % +T, +Key, ?OldVal, +NewVal, -TN
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rb_apply/4, % +T, +Key, :G, -TN
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rb_lookupall/3, % +Key, -Value, +T
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rb_insert/4, % +T0, +Key, ?Value, -TN
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rb_insert_new/4, % +T0, +Key, ?Value, -TN
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rb_delete/3, % +T, +Key, -TN
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rb_delete/4, % +T, +Key, -Val, -TN
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rb_visit/2, % +T, -Pairs
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rb_visit/3,
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rb_keys/2, % +T, +Keys
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rb_keys/3,
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rb_map/2,
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rb_map/3,
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rb_partial_map/4,
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rb_clone/3,
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rb_clone/4,
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rb_min/3,
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rb_max/3,
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rb_del_min/4,
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rb_del_max/4,
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rb_next/4,
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rb_previous/4,
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list_to_rbtree/2,
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ord_list_to_rbtree/2,
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is_rbtree/1,
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rb_size/2,
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rb_in/3
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]).
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/** <module> Red black trees
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Red-Black trees are balanced search binary trees. They are named because
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nodes can be classified as either red or black. The code we include is
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based on "Introduction to Algorithms", second edition, by Cormen,
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Leiserson, Rivest and Stein. The library includes routines to insert,
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lookup and delete elements in the tree.
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A Red black tree is represented as a term t(Nil, Tree), where Nil is the
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Nil-node, a node shared for each nil-node in the tree. Any node has the
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form colour(Left, Key, Value, Right), where _colour_ is one of =red= or
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=black=.
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@author Vitor Santos Costa, Jan Wielemaker
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*/
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:- meta_predicate rb_map(+,:,-), rb_partial_map(+,+,:,-), rb_apply(+,+,:,-).
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/*
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:- use_module(library(type_check)).
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:- type rbtree(K,V) ---> t(tree(K,V),tree(K,V)).
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:- type tree(K,V) ---> black(tree(K,V),K,V,tree(K,V))
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; red(tree(K,V),K,V,tree(K,V))
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; ''.
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:- type cmp ---> (=) ; (<) ; (>).
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:- pred rb_new(rbtree(_K,_V)).
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:- pred rb_empty(rbtree(_K,_V)).
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:- pred rb_lookup(K,V,rbtree(K,V)).
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:- pred lookup(K,V, tree(K,V)).
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:- pred lookup(cmp, K, V, tree(K,V)).
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:- pred rb_min(rbtree(K,V),K,V).
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:- pred min(tree(K,V),K,V).
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:- pred rb_max(rbtree(K,V),K,V).
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:- pred max(tree(K,V),K,V).
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:- pred rb_next(rbtree(K,V),K,pair(K,V),V).
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:- pred next(tree(K,V),K,pair(K,V),V,tree(K,V)).
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*/
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% create an empty tree.
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%% rb_new(-T) is det.
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%
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% Create a new Red-Black tree.
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%
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% @deprecated Use rb_empty/1.
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rb_new(t(Nil,Nil)) :- Nil = black('',_,_,'').
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rb_new(K,V,t(Nil,black(Nil,K,V,Nil))) :- Nil = black('',_,_,'').
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%% rb_empty(?T) is semidet.
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%
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% Succeeds if T is an empty Red-Black tree.
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rb_empty(t(Nil,Nil)) :- Nil = black('',_,_,'').
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%% rb_lookup(+Key, -Value, +T) is semidet.
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%
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% Backtrack through all elements with key Key in the Red-Black
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% tree T, returning for each the value Value.
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rb_lookup(Key, Val, t(_,Tree)) :-
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lookup(Key, Val, Tree).
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lookup(_, _, black('',_,_,'')) :- !, fail.
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lookup(Key, Val, Tree) :-
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arg(2,Tree,KA),
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compare(Cmp,KA,Key),
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lookup(Cmp,Key,Val,Tree).
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lookup(>, K, V, Tree) :-
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arg(1,Tree,NTree),
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lookup(K, V, NTree).
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lookup(<, K, V, Tree) :-
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arg(4,Tree,NTree),
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lookup(K, V, NTree).
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lookup(=, _, V, Tree) :-
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arg(3,Tree,V).
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%% rb_min(+T, -Key, -Value) is semidet.
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%
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% Key is the minimum key in T, and is associated with Val.
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rb_min(t(_,Tree), Key, Val) :-
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min(Tree, Key, Val).
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min(red(black('',_,_,_),Key,Val,_), Key, Val) :- !.
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min(black(black('',_,_,_),Key,Val,_), Key, Val) :- !.
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min(red(Right,_,_,_), Key, Val) :-
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min(Right,Key,Val).
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min(black(Right,_,_,_), Key, Val) :-
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min(Right,Key,Val).
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%% rb_max(+T, -Key, -Value) is semidet.
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%
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% Key is the maximal key in T, and is associated with Val.
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rb_max(t(_,Tree), Key, Val) :-
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max(Tree, Key, Val).
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max(red(_,Key,Val,black('',_,_,_)), Key, Val) :- !.
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max(black(_,Key,Val,black('',_,_,_)), Key, Val) :- !.
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max(red(_,_,_,Left), Key, Val) :-
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max(Left,Key,Val).
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max(black(_,_,_,Left), Key, Val) :-
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max(Left,Key,Val).
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%% rb_next(+T, +Key, -Next,-Value) is semidet.
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%
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% Next is the next element after Key in T, and is associated with
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% Val.
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rb_next(t(_,Tree), Key, Next, Val) :-
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next(Tree, Key, Next, Val, []).
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next(black('',_,_,''), _, _, _, _) :- !, fail.
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next(Tree, Key, Next, Val, Candidate) :-
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arg(2,Tree,KA),
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arg(3,Tree,VA),
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compare(Cmp,KA,Key),
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next(Cmp, Key, KA, VA, Next, Val, Tree, Candidate).
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next(>, K, KA, VA, NK, V, Tree, _) :-
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arg(1,Tree,NTree),
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next(NTree,K,NK,V,KA-VA).
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next(<, K, _, _, NK, V, Tree, Candidate) :-
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arg(4,Tree,NTree),
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next(NTree,K,NK,V,Candidate).
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next(=, _, _, _, NK, Val, Tree, Candidate) :-
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arg(4,Tree,NTree),
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(
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min(NTree, NK, Val)
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-> true
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;
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Candidate = (NK-Val)
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).
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%% rb_previous(+T, +Key, -Previous, -Value) is semidet.
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%
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% Previous is the previous element after Key in T, and is
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% associated with Val.
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rb_previous(t(_,Tree), Key, Previous, Val) :-
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previous(Tree, Key, Previous, Val, []).
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previous(black('',_,_,''), _, _, _, _) :- !, fail.
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previous(Tree, Key, Previous, Val, Candidate) :-
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arg(2,Tree,KA),
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arg(3,Tree,VA),
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compare(Cmp,KA,Key),
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previous(Cmp, Key, KA, VA, Previous, Val, Tree, Candidate).
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previous(>, K, _, _, NK, V, Tree, Candidate) :-
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arg(1,Tree,NTree),
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previous(NTree,K,NK,V,Candidate).
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previous(<, K, KA, VA, NK, V, Tree, _) :-
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arg(4,Tree,NTree),
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previous(NTree,K,NK,V,KA-VA).
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previous(=, _, _, _, K, Val, Tree, Candidate) :-
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arg(1,Tree,NTree),
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(
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max(NTree, K, Val)
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-> true
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;
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Candidate = (K-Val)
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).
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%% rb_update(+T, +Key, +NewVal, -TN) is semidet.
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%% rb_update(+T, +Key, ?OldVal, +NewVal, -TN) is semidet.
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%
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% Tree TN is tree T, but with value for Key associated with
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% NewVal. Fails if it cannot find Key in T.
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rb_update(t(Nil,OldTree), Key, OldVal, Val, t(Nil,NewTree)) :-
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update(OldTree, Key, OldVal, Val, NewTree).
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rb_update(t(Nil,OldTree), Key, Val, t(Nil,NewTree)) :-
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update(OldTree, Key, _, Val, NewTree).
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update(black(Left,Key0,Val0,Right), Key, OldVal, Val, NewTree) :-
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Left \= [],
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compare(Cmp,Key0,Key),
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(Cmp == (=)
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-> OldVal = Val0,
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NewTree = black(Left,Key0,Val,Right)
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;
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Cmp == (>) ->
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NewTree = black(NewLeft,Key0,Val0,Right),
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update(Left, Key, OldVal, Val, NewLeft)
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;
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NewTree = black(Left,Key0,Val0,NewRight),
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update(Right, Key, OldVal, Val, NewRight)
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).
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update(red(Left,Key0,Val0,Right), Key, OldVal, Val, NewTree) :-
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compare(Cmp,Key0,Key),
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(Cmp == (=)
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-> OldVal = Val0,
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NewTree = red(Left,Key0,Val,Right)
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;
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Cmp == (>)
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-> NewTree = red(NewLeft,Key0,Val0,Right),
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update(Left, Key, OldVal, Val, NewLeft)
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;
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NewTree = red(Left,Key0,Val0,NewRight),
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update(Right, Key, OldVal, Val, NewRight)
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).
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%% rb_apply(+T, +Key, :G, -TN) is semidet.
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%
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% If the value associated with key Key is Val0 in T, and if
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% call(G,Val0,ValF) holds, then TN differs from T only in that Key
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% is associated with value ValF in tree TN. Fails if it cannot
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% find Key in T, or if call(G,Val0,ValF) is not satisfiable.
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rb_apply(t(Nil,OldTree), Key, Goal, t(Nil,NewTree)) :-
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apply(OldTree, Key, Goal, NewTree).
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%apply(black('',_,_,''), _, _, _) :- !, fail.
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apply(black(Left,Key0,Val0,Right), Key, Goal,
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black(NewLeft,Key0,Val,NewRight)) :-
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Left \= [],
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compare(Cmp,Key0,Key),
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(Cmp == (=)
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-> NewLeft = Left,
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NewRight = Right,
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call(Goal,Val0,Val)
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; Cmp == (>)
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-> NewRight = Right,
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Val = Val0,
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apply(Left, Key, Goal, NewLeft)
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;
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NewLeft = Left,
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Val = Val0,
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apply(Right, Key, Goal, NewRight)
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).
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apply(red(Left,Key0,Val0,Right), Key, Goal,
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red(NewLeft,Key0,Val,NewRight)) :-
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compare(Cmp,Key0,Key),
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( Cmp == (=)
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-> NewLeft = Left,
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NewRight = Right,
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call(Goal,Val0,Val)
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; Cmp == (>)
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-> NewRight = Right,
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Val = Val0,
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apply(Left, Key, Goal, NewLeft)
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;
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NewLeft = Left,
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Val = Val0,
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apply(Right, Key, Goal, NewRight)
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).
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%% rb_in(?Key, ?Val, +Tree) is nondet.
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%
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% True if Key-Val appear in Tree. Uses indexing if Key is bound.
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rb_in(Key, Val, t(_,T)) :-
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var(Key), !,
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enum(Key, Val, T).
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rb_in(Key, Val, t(_,T)) :-
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lookup(Key, Val, T).
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enum(Key, Val, black(L,K,V,R)) :-
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L \= '',
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enum_cases(Key, Val, L, K, V, R).
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enum(Key, Val, red(L,K,V,R)) :-
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enum_cases(Key, Val, L, K, V, R).
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enum_cases(Key, Val, L, _, _, _) :-
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enum(Key, Val, L).
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enum_cases(Key, Val, _, Key, Val, _).
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enum_cases(Key, Val, _, _, _, R) :-
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enum(Key, Val, R).
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%% rb_lookupall(+Key, -Value, +T)
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%
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% Lookup all elements with key Key in the red-black tree T,
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% returning the value Value.
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rb_lookupall(Key, Val, t(_,Tree)) :-
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lookupall(Key, Val, Tree).
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lookupall(_, _, black('',_,_,'')) :- !, fail.
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lookupall(Key, Val, Tree) :-
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arg(2,Tree,KA),
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compare(Cmp,KA,Key),
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lookupall(Cmp,Key,Val,Tree).
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lookupall(>, K, V, Tree) :-
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arg(4,Tree,NTree),
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rb_lookupall(K, V, NTree).
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lookupall(=, _, V, Tree) :-
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arg(3,Tree,V).
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lookupall(=, K, V, Tree) :-
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arg(1,Tree,NTree),
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lookupall(K, V, NTree).
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lookupall(<, K, V, Tree) :-
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arg(1,Tree,NTree),
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lookupall(K, V, NTree).
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/*******************************
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* TREE INSERTION *
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*******************************/
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% We don't use parent nodes, so we may have to fix the root.
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%% rb_insert(+T0, +Key, ?Value, -TN)
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%
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% Add an element with key Key and Value to the tree T0 creating a
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% new red-black tree TN. Duplicated elements are not allowed.
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rb_insert(t(Nil,Tree0),Key,Val,t(Nil,Tree)) :-
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insert(Tree0,Key,Val,Nil,Tree).
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insert(Tree0,Key,Val,Nil,Tree) :-
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insert2(Tree0,Key,Val,Nil,TreeI,_),
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fix_root(TreeI,Tree).
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%
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% Cormen et al present the algorithm as
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% (1) standard tree insertion;
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% (2) from the viewpoint of the newly inserted node:
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% partially fix the tree;
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% move upwards
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% until reaching the root.
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%
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% We do it a little bit different:
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%
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% (1) standard tree insertion;
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% (2) move upwards:
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% when reaching a black node;
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% if the tree below may be broken, fix it.
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% We take advantage of Prolog unification
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% to do several operations in a single go.
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%
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%
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% actual insertion
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%
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insert2(black('',_,_,''), K, V, Nil, T, Status) :- !,
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T = red(Nil,K,V,Nil),
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Status = not_done.
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insert2(red(L,K0,V0,R), K, V, Nil, NT, Flag) :-
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( K @< K0
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-> NR = R,
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NT = red(NL,K0,V0,R),
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insert2(L, K, V, Nil, NL, Flag)
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; K == K0 ->
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NT = red(L,K0,V,R),
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Flag = done
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;
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NT = red(L,K0,V0,NR),
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insert2(R, K, V, Nil, NR, Flag)
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).
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insert2(black(L,K0,V0,R), K, V, Nil, NT, Flag) :-
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( K @< K0
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-> insert2(L, K, V, Nil, IL, Flag0),
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fix_left(Flag0, black(IL,K0,V0,R), NT, Flag)
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; K == K0 ->
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NT = black(L,K0,V,R),
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Flag = done
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;
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insert2(R, K, V, Nil, IR, Flag0),
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fix_right(Flag0, black(L,K0,V0,IR), NT, Flag)
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).
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% We don't use parent nodes, so we may have to fix the root.
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|
|
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%% rb_insert_new(+T0, +Key, ?Value, -TN)
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%
|
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% Add a new element with key Key and Value to the tree T0 creating a
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% new red-black tree TN. Duplicated elements are not allowed.
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rb_insert_new(t(Nil,Tree0),Key,Val,t(Nil,Tree)) :-
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insert_new(Tree0,Key,Val,Nil,Tree).
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|
|
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insert_new(Tree0,Key,Val,Nil,Tree) :-
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insert_new_2(Tree0,Key,Val,Nil,TreeI,_),
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fix_root(TreeI,Tree).
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|
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%
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|
% actual insertion, copied from insert2
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%
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insert_new_2(black('',_,_,''), K, V, Nil, T, Status) :- !,
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T = red(Nil,K,V,Nil),
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Status = not_done.
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insert_new_2(red(L,K0,V0,R), K, V, Nil, NT, Flag) :-
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( K @< K0
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-> NR = R,
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NT = red(NL,K0,V0,R),
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insert_new_2(L, K, V, Nil, NL, Flag)
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; K == K0 ->
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fail
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;
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NT = red(L,K0,V0,NR),
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insert_new_2(R, K, V, Nil, NR, Flag)
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).
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insert_new_2(black(L,K0,V0,R), K, V, Nil, NT, Flag) :-
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( K @< K0
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-> insert_new_2(L, K, V, Nil, IL, Flag0),
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fix_left(Flag0, black(IL,K0,V0,R), NT, Flag)
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; K == K0 ->
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fail
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;
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insert_new_2(R, K, V, Nil, IR, Flag0),
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fix_right(Flag0, black(L,K0,V0,IR), NT, Flag)
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).
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%
|
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% make sure the root is always black.
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%
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fix_root(black(L,K,V,R),black(L,K,V,R)).
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fix_root(red(L,K,V,R),black(L,K,V,R)).
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|
|
|
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%
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% How to fix if we have inserted on the left
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%
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fix_left(done,T,T,done) :- !.
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fix_left(not_done,Tmp,Final,Done) :-
|
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fix_left(Tmp,Final,Done).
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|
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%
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|
% case 1 of RB: just need to change colors.
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%
|
|
fix_left(black(red(Al,AK,AV,red(Be,BK,BV,Ga)),KC,VC,red(De,KD,VD,Ep)),
|
|
red(black(Al,AK,AV,red(Be,BK,BV,Ga)),KC,VC,black(De,KD,VD,Ep)),
|
|
not_done) :- !.
|
|
fix_left(black(red(red(Al,KA,VA,Be),KB,VB,Ga),KC,VC,red(De,KD,VD,Ep)),
|
|
red(black(red(Al,KA,VA,Be),KB,VB,Ga),KC,VC,black(De,KD,VD,Ep)),
|
|
not_done) :- !.
|
|
%
|
|
% case 2 of RB: got a knee so need to do rotations
|
|
%
|
|
fix_left(black(red(Al,KA,VA,red(Be,KB,VB,Ga)),KC,VC,De),
|
|
black(red(Al,KA,VA,Be),KB,VB,red(Ga,KC,VC,De)),
|
|
done) :- !.
|
|
%
|
|
% case 3 of RB: got a line
|
|
%
|
|
fix_left(black(red(red(Al,KA,VA,Be),KB,VB,Ga),KC,VC,De),
|
|
black(red(Al,KA,VA,Be),KB,VB,red(Ga,KC,VC,De)),
|
|
done) :- !.
|
|
%
|
|
% case 4 of RB: nothing to do
|
|
%
|
|
fix_left(T,T,done).
|
|
|
|
%
|
|
% How to fix if we have inserted on the right
|
|
%
|
|
fix_right(done,T,T,done) :- !.
|
|
fix_right(not_done,Tmp,Final,Done) :-
|
|
fix_right(Tmp,Final,Done).
|
|
|
|
%
|
|
% case 1 of RB: just need to change colors.
|
|
%
|
|
fix_right(black(red(Ep,KD,VD,De),KC,VC,red(red(Ga,KB,VB,Be),KA,VA,Al)),
|
|
red(black(Ep,KD,VD,De),KC,VC,black(red(Ga,KB,VB,Be),KA,VA,Al)),
|
|
not_done) :- !.
|
|
fix_right(black(red(Ep,KD,VD,De),KC,VC,red(Ga,Ka,Va,red(Be,KB,VB,Al))),
|
|
red(black(Ep,KD,VD,De),KC,VC,black(Ga,Ka,Va,red(Be,KB,VB,Al))),
|
|
not_done) :- !.
|
|
%
|
|
% case 2 of RB: got a knee so need to do rotations
|
|
%
|
|
fix_right(black(De,KC,VC,red(red(Ga,KB,VB,Be),KA,VA,Al)),
|
|
black(red(De,KC,VC,Ga),KB,VB,red(Be,KA,VA,Al)),
|
|
done) :- !.
|
|
%
|
|
% case 3 of RB: got a line
|
|
%
|
|
fix_right(black(De,KC,VC,red(Ga,KB,VB,red(Be,KA,VA,Al))),
|
|
black(red(De,KC,VC,Ga),KB,VB,red(Be,KA,VA,Al)),
|
|
done) :- !.
|
|
%
|
|
% case 4 of RB: nothing to do.
|
|
%
|
|
fix_right(T,T,done).
|
|
|
|
%
|
|
% simplified processor
|
|
%
|
|
%
|
|
pretty_print(t(_,T)) :-
|
|
pretty_print(T,6).
|
|
|
|
pretty_print(black('',_,_,''),_) :- !.
|
|
pretty_print(red(L,K,_,R),D) :-
|
|
DN is D+6,
|
|
pretty_print(L,DN),
|
|
format("~t~a:~d~*|~n",[r,K,D]),
|
|
pretty_print(R,DN).
|
|
pretty_print(black(L,K,_,R),D) :-
|
|
DN is D+6,
|
|
pretty_print(L,DN),
|
|
format("~t~a:~d~*|~n",[b,K,D]),
|
|
pretty_print(R,DN).
|
|
|
|
|
|
rb_delete(t(Nil,T), K, t(Nil,NT)) :-
|
|
delete(T, K, _, NT, _).
|
|
|
|
%% rb_delete(+T, +Key, -TN).
|
|
%% rb_delete(+T, +Key, -Val, -TN).
|
|
%
|
|
% Delete element with key Key from the tree T, returning the value
|
|
% Val associated with the key and a new tree TN.
|
|
|
|
rb_delete(t(Nil,T), K, V, t(Nil,NT)) :-
|
|
delete(T, K, V0, NT, _),
|
|
V = V0.
|
|
|
|
%
|
|
% I am afraid our representation is not as nice for delete
|
|
%
|
|
delete(red(L,K0,V0,R), K, V, NT, Flag) :-
|
|
K @< K0, !,
|
|
delete(L, K, V, NL, Flag0),
|
|
fixup_left(Flag0,red(NL,K0,V0,R),NT, Flag).
|
|
delete(red(L,K0,V0,R), K, V, NT, Flag) :-
|
|
K @> K0, !,
|
|
delete(R, K, V, NR, Flag0),
|
|
fixup_right(Flag0,red(L,K0,V0,NR),NT, Flag).
|
|
delete(red(L,_,V,R), _, V, OUT, Flag) :-
|
|
% K == K0,
|
|
delete_red_node(L,R,OUT,Flag).
|
|
delete(black(L,K0,V0,R), K, V, NT, Flag) :-
|
|
K @< K0, !,
|
|
delete(L, K, V, NL, Flag0),
|
|
fixup_left(Flag0,black(NL,K0,V0,R),NT, Flag).
|
|
delete(black(L,K0,V0,R), K, V, NT, Flag) :-
|
|
K @> K0, !,
|
|
delete(R, K, V, NR, Flag0),
|
|
fixup_right(Flag0,black(L,K0,V0,NR),NT, Flag).
|
|
delete(black(L,_,V,R), _, V, OUT, Flag) :-
|
|
% K == K0,
|
|
delete_black_node(L,R,OUT,Flag).
|
|
|
|
%% rb_del_min(+T, -Key, -Val, -TN)
|
|
%
|
|
% Delete the least element from the tree T, returning the key Key,
|
|
% the value Val associated with the key and a new tree TN.
|
|
|
|
rb_del_min(t(Nil,T), K, Val, t(Nil,NT)) :-
|
|
del_min(T, K, Val, Nil, NT, _).
|
|
|
|
del_min(red(black('',_,_,_),K,V,R), K, V, Nil, OUT, Flag) :- !,
|
|
delete_red_node(Nil,R,OUT,Flag).
|
|
del_min(red(L,K0,V0,R), K, V, Nil, NT, Flag) :-
|
|
del_min(L, K, V, Nil, NL, Flag0),
|
|
fixup_left(Flag0,red(NL,K0,V0,R), NT, Flag).
|
|
del_min(black(black('',_,_,_),K,V,R), K, V, Nil, OUT, Flag) :- !,
|
|
delete_black_node(Nil,R,OUT,Flag).
|
|
del_min(black(L,K0,V0,R), K, V, Nil, NT, Flag) :-
|
|
del_min(L, K, V, Nil, NL, Flag0),
|
|
fixup_left(Flag0,black(NL,K0,V0,R),NT, Flag).
|
|
|
|
|
|
%% rb_del_max(+T, -Key, -Val, -TN)
|
|
%
|
|
% Delete the largest element from the tree T, returning the key
|
|
% Key, the value Val associated with the key and a new tree TN.
|
|
|
|
rb_del_max(t(Nil,T), K, Val, t(Nil,NT)) :-
|
|
del_max(T, K, Val, Nil, NT, _).
|
|
|
|
del_max(red(L,K,V,black('',_,_,_)), K, V, Nil, OUT, Flag) :- !,
|
|
delete_red_node(L,Nil,OUT,Flag).
|
|
del_max(red(L,K0,V0,R), K, V, Nil, NT, Flag) :-
|
|
del_max(R, K, V, Nil, NR, Flag0),
|
|
fixup_right(Flag0,red(L,K0,V0,NR),NT, Flag).
|
|
del_max(black(L,K,V,black('',_,_,_)), K, V, Nil, OUT, Flag) :- !,
|
|
delete_black_node(L,Nil,OUT,Flag).
|
|
del_max(black(L,K0,V0,R), K, V, Nil, NT, Flag) :-
|
|
del_max(R, K, V, Nil, NR, Flag0),
|
|
fixup_right(Flag0,black(L,K0,V0,NR), NT, Flag).
|
|
|
|
|
|
|
|
delete_red_node(L1,L2,L1,done) :- L1 == L2, !.
|
|
delete_red_node(black('',_,_,''),R,R,done) :- !.
|
|
delete_red_node(L,black('',_,_,''),L,done) :- !.
|
|
delete_red_node(L,R,OUT,Done) :-
|
|
delete_next(R,NK,NV,NR,Done0),
|
|
fixup_right(Done0,red(L,NK,NV,NR),OUT,Done).
|
|
|
|
|
|
delete_black_node(L1,L2,L1,not_done) :- L1 == L2, !.
|
|
delete_black_node(black('',_,_,''),red(L,K,V,R),black(L,K,V,R),done) :- !.
|
|
delete_black_node(black('',_,_,''),R,R,not_done) :- !.
|
|
delete_black_node(red(L,K,V,R),black('',_,_,''),black(L,K,V,R),done) :- !.
|
|
delete_black_node(L,black('',_,_,''),L,not_done) :- !.
|
|
delete_black_node(L,R,OUT,Done) :-
|
|
delete_next(R,NK,NV,NR,Done0),
|
|
fixup_right(Done0,black(L,NK,NV,NR),OUT,Done).
|
|
|
|
|
|
delete_next(red(black('',_,_,''),K,V,R),K,V,R,done) :- !.
|
|
delete_next(black(black('',_,_,''),K,V,red(L1,K1,V1,R1)),
|
|
K,V,black(L1,K1,V1,R1),done) :- !.
|
|
delete_next(black(black('',_,_,''),K,V,R),K,V,R,not_done) :- !.
|
|
delete_next(red(L,K,V,R),K0,V0,OUT,Done) :-
|
|
delete_next(L,K0,V0,NL,Done0),
|
|
fixup_left(Done0,red(NL,K,V,R),OUT,Done).
|
|
delete_next(black(L,K,V,R),K0,V0,OUT,Done) :-
|
|
delete_next(L,K0,V0,NL,Done0),
|
|
fixup_left(Done0,black(NL,K,V,R),OUT,Done).
|
|
|
|
|
|
fixup_left(done,T,T,done).
|
|
fixup_left(not_done,T,NT,Done) :-
|
|
fixup2(T,NT,Done).
|
|
|
|
|
|
%
|
|
% case 1: x moves down, so we have to try to fix it again.
|
|
% case 1 -> 2,3,4 -> done
|
|
%
|
|
fixup2(black(black(Al,KA,VA,Be),KB,VB,red(black(Ga,KC,VC,De),KD,VD,black(Ep,KE,VE,Fi))),
|
|
black(T1,KD,VD,black(Ep,KE,VE,Fi)),done) :- !,
|
|
fixup2(red(black(Al,KA,VA,Be),KB,VB,black(Ga,KC,VC,De)),
|
|
T1,
|
|
_).
|
|
%
|
|
% case 2: x moves up, change one to red
|
|
%
|
|
fixup2(red(black(Al,KA,VA,Be),KB,VB,black(black(Ga,KC,VC,De),KD,VD,black(Ep,KE,VE,Fi))),
|
|
black(black(Al,KA,VA,Be),KB,VB,red(black(Ga,KC,VC,De),KD,VD,black(Ep,KE,VE,Fi))),done) :- !.
|
|
fixup2(black(black(Al,KA,VA,Be),KB,VB,black(black(Ga,KC,VC,De),KD,VD,black(Ep,KE,VE,Fi))),
|
|
black(black(Al,KA,VA,Be),KB,VB,red(black(Ga,KC,VC,De),KD,VD,black(Ep,KE,VE,Fi))),not_done) :- !.
|
|
%
|
|
% case 3: x stays put, shift left and do a 4
|
|
%
|
|
fixup2(red(black(Al,KA,VA,Be),KB,VB,black(red(Ga,KC,VC,De),KD,VD,black(Ep,KE,VE,Fi))),
|
|
red(black(black(Al,KA,VA,Be),KB,VB,Ga),KC,VC,black(De,KD,VD,black(Ep,KE,VE,Fi))),
|
|
done) :- !.
|
|
fixup2(black(black(Al,KA,VA,Be),KB,VB,black(red(Ga,KC,VC,De),KD,VD,black(Ep,KE,VE,Fi))),
|
|
black(black(black(Al,KA,VA,Be),KB,VB,Ga),KC,VC,black(De,KD,VD,black(Ep,KE,VE,Fi))),
|
|
done) :- !.
|
|
%
|
|
% case 4: rotate left, get rid of red
|
|
%
|
|
fixup2(red(black(Al,KA,VA,Be),KB,VB,black(C,KD,VD,red(Ep,KE,VE,Fi))),
|
|
red(black(black(Al,KA,VA,Be),KB,VB,C),KD,VD,black(Ep,KE,VE,Fi)),
|
|
done).
|
|
fixup2(black(black(Al,KA,VA,Be),KB,VB,black(C,KD,VD,red(Ep,KE,VE,Fi))),
|
|
black(black(black(Al,KA,VA,Be),KB,VB,C),KD,VD,black(Ep,KE,VE,Fi)),
|
|
done).
|
|
|
|
|
|
fixup_right(done,T,T,done).
|
|
fixup_right(not_done,T,NT,Done) :-
|
|
fixup3(T,NT,Done).
|
|
|
|
|
|
|
|
%
|
|
% case 1: x moves down, so we have to try to fix it again.
|
|
% case 1 -> 2,3,4 -> done
|
|
%
|
|
fixup3(black(red(black(Fi,KE,VE,Ep),KD,VD,black(De,KC,VC,Ga)),KB,VB,black(Be,KA,VA,Al)),
|
|
black(black(Fi,KE,VE,Ep),KD,VD,T1),done) :- !,
|
|
fixup3(red(black(De,KC,VC,Ga),KB,VB,black(Be,KA,VA,Al)),T1,_).
|
|
|
|
%
|
|
% case 2: x moves up, change one to red
|
|
%
|
|
fixup3(red(black(black(Fi,KE,VE,Ep),KD,VD,black(De,KC,VC,Ga)),KB,VB,black(Be,KA,VA,Al)),
|
|
black(red(black(Fi,KE,VE,Ep),KD,VD,black(De,KC,VC,Ga)),KB,VB,black(Be,KA,VA,Al)),
|
|
done) :- !.
|
|
fixup3(black(black(black(Fi,KE,VE,Ep),KD,VD,black(De,KC,VC,Ga)),KB,VB,black(Be,KA,VA,Al)),
|
|
black(red(black(Fi,KE,VE,Ep),KD,VD,black(De,KC,VC,Ga)),KB,VB,black(Be,KA,VA,Al)),
|
|
not_done):- !.
|
|
%
|
|
% case 3: x stays put, shift left and do a 4
|
|
%
|
|
fixup3(red(black(black(Fi,KE,VE,Ep),KD,VD,red(De,KC,VC,Ga)),KB,VB,black(Be,KA,VA,Al)),
|
|
red(black(black(Fi,KE,VE,Ep),KD,VD,De),KC,VC,black(Ga,KB,VB,black(Be,KA,VA,Al))),
|
|
done) :- !.
|
|
fixup3(black(black(black(Fi,KE,VE,Ep),KD,VD,red(De,KC,VC,Ga)),KB,VB,black(Be,KA,VA,Al)),
|
|
black(black(black(Fi,KE,VE,Ep),KD,VD,De),KC,VC,black(Ga,KB,VB,black(Be,KA,VA,Al))),
|
|
done) :- !.
|
|
%
|
|
% case 4: rotate right, get rid of red
|
|
%
|
|
fixup3(red(black(red(Fi,KE,VE,Ep),KD,VD,C),KB,VB,black(Be,KA,VA,Al)),
|
|
red(black(Fi,KE,VE,Ep),KD,VD,black(C,KB,VB,black(Be,KA,VA,Al))),
|
|
done).
|
|
fixup3(black(black(red(Fi,KE,VE,Ep),KD,VD,C),KB,VB,black(Be,KA,VA,Al)),
|
|
black(black(Fi,KE,VE,Ep),KD,VD,black(C,KB,VB,black(Be,KA,VA,Al))),
|
|
done).
|
|
|
|
|
|
%
|
|
% whole list
|
|
%
|
|
|
|
%% rb_visit(+T, -Pairs)
|
|
%
|
|
% Pairs is an infix visit of tree T, where each element of Pairs
|
|
% is of the form K-Val.
|
|
|
|
rb_visit(t(_,T),Lf) :-
|
|
visit(T,[],Lf).
|
|
|
|
rb_visit(t(_,T),L0,Lf) :-
|
|
visit(T,L0,Lf).
|
|
|
|
visit(black('',_,_,_),L,L) :- !.
|
|
visit(red(L,K,V,R),L0,Lf) :-
|
|
visit(L,[K-V|L1],Lf),
|
|
visit(R,L0,L1).
|
|
visit(black(L,K,V,R),L0,Lf) :-
|
|
visit(L,[K-V|L1],Lf),
|
|
visit(R,L0,L1).
|
|
|
|
:- meta_predicate rb_map(?,:,?). % this is not strictly required
|
|
:- meta_predicate map(?,:,?,?). % this is required.
|
|
|
|
%% rb_map(+T, :Goal) is semidet.
|
|
%
|
|
% True if call(Goal, Value) is true for all nodes in T.
|
|
|
|
rb_map(t(Nil,Tree),Goal,t(Nil,NewTree)) :-
|
|
map(Tree,Goal,NewTree,Nil).
|
|
|
|
|
|
map(black('',_,_,''),_,Nil,Nil) :- !.
|
|
map(red(L,K,V,R),Goal,red(NL,K,NV,NR),Nil) :-
|
|
call(Goal,V,NV), !,
|
|
map(L,Goal,NL,Nil),
|
|
map(R,Goal,NR,Nil).
|
|
map(black(L,K,V,R),Goal,black(NL,K,NV,NR),Nil) :-
|
|
call(Goal,V,NV), !,
|
|
map(L,Goal,NL,Nil),
|
|
map(R,Goal,NR,Nil).
|
|
|
|
:- meta_predicate rb_map(?,:). % this is not strictly required
|
|
:- meta_predicate map(?,:). % this is required.
|
|
|
|
%% rb_map(+T, :G, -TN) is semidet.
|
|
%
|
|
% For all nodes Key in the tree T, if the value associated with
|
|
% key Key is Val0 in tree T, and if call(G,Val0,ValF) holds, then
|
|
% the value associated with Key in TN is ValF. Fails if
|
|
% call(G,Val0,ValF) is not satisfiable for all Var0.
|
|
|
|
rb_map(t(_,Tree),Goal) :-
|
|
map(Tree,Goal).
|
|
|
|
|
|
map(black('',_,_,''),_) :- !.
|
|
map(red(L,_,V,R),Goal) :-
|
|
call(Goal,V), !,
|
|
map(L,Goal),
|
|
map(R,Goal).
|
|
map(black(L,_,V,R),Goal) :-
|
|
call(Goal,V), !,
|
|
map(L,Goal),
|
|
map(R,Goal).
|
|
|
|
%% rb_clone(+T, -NT, -Pairs)
|
|
%
|
|
% "Clone" the red-back tree into a new tree with the same keys as
|
|
% the original but with all values set to unbound values. Nodes is
|
|
% a list containing all new nodes as pairs K-V.
|
|
|
|
rb_clone(t(Nil,T),t(Nil,NT),Ns) :-
|
|
clone(T,Nil,NT,Ns,[]).
|
|
|
|
clone(black('',_,_,''),Nil,Nil,Ns,Ns) :- !.
|
|
clone(red(L,K,_,R),Nil,red(NL,K,NV,NR),NsF,Ns0) :-
|
|
clone(L,Nil,NL,NsF,[K-NV|Ns1]),
|
|
clone(R,Nil,NR,Ns1,Ns0).
|
|
clone(black(L,K,_,R),Nil,black(NL,K,NV,NR),NsF,Ns0) :-
|
|
clone(L,Nil,NL,NsF,[K-NV|Ns1]),
|
|
clone(R,Nil,NR,Ns1,Ns0).
|
|
|
|
rb_clone(t(Nil,T),ONs,t(Nil,NT),Ns) :-
|
|
clone(T,Nil,ONs,[],NT,Ns,[]).
|
|
|
|
clone(black('',_,_,''),Nil,ONs,ONs,Nil,Ns,Ns) :- !.
|
|
clone(red(L,K,V,R),Nil,ONsF,ONs0,red(NL,K,NV,NR),NsF,Ns0) :-
|
|
clone(L,Nil,ONsF,[K-V|ONs1],NL,NsF,[K-NV|Ns1]),
|
|
clone(R,Nil,ONs1,ONs0,NR,Ns1,Ns0).
|
|
clone(black(L,K,V,R),Nil,ONsF,ONs0,black(NL,K,NV,NR),NsF,Ns0) :-
|
|
clone(L,Nil,ONsF,[K-V|ONs1],NL,NsF,[K-NV|Ns1]),
|
|
clone(R,Nil,ONs1,ONs0,NR,Ns1,Ns0).
|
|
|
|
%% rb_partial_map(+T, +Keys, :G, -TN)
|
|
%
|
|
% For all nodes Key in Keys, if the value associated with key Key
|
|
% is Val0 in tree T, and if call(G,Val0,ValF) holds, then the
|
|
% value associated with Key in TN is ValF. Fails if or if
|
|
% call(G,Val0,ValF) is not satisfiable for all Var0. Assumes keys
|
|
% are not repeated.
|
|
|
|
rb_partial_map(t(Nil,T0), Map, Goal, t(Nil,TF)) :-
|
|
partial_map(T0, Map, [], Nil, Goal, TF).
|
|
|
|
rb_partial_map(t(Nil,T0), Map, Map0, Goal, t(Nil,TF)) :-
|
|
partial_map(T0, Map, Map0, Nil, Goal, TF).
|
|
|
|
partial_map(T,[],[],_,_,T) :- !.
|
|
partial_map(black('',_,_,_),Map,Map,Nil,_,Nil) :- !.
|
|
partial_map(red(L,K,V,R),Map,MapF,Nil,Goal,red(NL,K,NV,NR)) :-
|
|
partial_map(L,Map,MapI,Nil,Goal,NL),
|
|
(
|
|
MapI == [] ->
|
|
NR = R, NV = V, MapF = []
|
|
;
|
|
MapI = [K1|MapR],
|
|
(
|
|
K == K1
|
|
->
|
|
( call(Goal,V,NV) -> true ; NV = V ),
|
|
MapN = MapR
|
|
;
|
|
NV = V,
|
|
MapN = MapI
|
|
),
|
|
partial_map(R,MapN,MapF,Nil,Goal,NR)
|
|
).
|
|
partial_map(black(L,K,V,R),Map,MapF,Nil,Goal,black(NL,K,NV,NR)) :-
|
|
partial_map(L,Map,MapI,Nil,Goal,NL),
|
|
(
|
|
MapI == [] ->
|
|
NR = R, NV = V, MapF = []
|
|
;
|
|
MapI = [K1|MapR],
|
|
(
|
|
K == K1
|
|
->
|
|
( call(Goal,V,NV) -> true ; NV = V ),
|
|
MapN = MapR
|
|
;
|
|
NV = V,
|
|
MapN = MapI
|
|
),
|
|
partial_map(R,MapN,MapF,Nil,Goal,NR)
|
|
).
|
|
|
|
|
|
%
|
|
% whole keys
|
|
%
|
|
%% rb_keys(+T, -Keys)
|
|
%
|
|
% Keys is unified with an ordered list of all keys in the
|
|
% Red-Black tree T.
|
|
|
|
rb_keys(t(_,T),Lf) :-
|
|
keys(T,[],Lf).
|
|
|
|
rb_keys(t(_,T),L0,Lf) :-
|
|
keys(T,L0,Lf).
|
|
|
|
keys(black('',_,_,''),L,L) :- !.
|
|
keys(red(L,K,_,R),L0,Lf) :-
|
|
keys(L,[K|L1],Lf),
|
|
keys(R,L0,L1).
|
|
keys(black(L,K,_,R),L0,Lf) :-
|
|
keys(L,[K|L1],Lf),
|
|
keys(R,L0,L1).
|
|
|
|
|
|
%% list_to_rbtree(+L, -T) is det.
|
|
%
|
|
% T is the red-black tree corresponding to the mapping in list L.
|
|
|
|
list_to_rbtree(List, T) :-
|
|
sort(List,Sorted),
|
|
ord_list_to_rbtree(Sorted, T).
|
|
|
|
%% ord_list_to_rbtree(+L, -T) is det.
|
|
%
|
|
% T is the red-black tree corresponding to the mapping in ordered
|
|
% list L.
|
|
|
|
ord_list_to_rbtree([], t(Nil,Nil)) :- !,
|
|
Nil = black('', _, _, '').
|
|
ord_list_to_rbtree([K-V], t(Nil,black(Nil,K,V,Nil))) :- !,
|
|
Nil = black('', _, _, '').
|
|
ord_list_to_rbtree(List, t(Nil,Tree)) :-
|
|
Nil = black('', _, _, ''),
|
|
Ar =.. [seq|List],
|
|
functor(Ar,_,L),
|
|
Height is integer(log(L)/log(2)),
|
|
construct_rbtree(1, L, Ar, Height, Nil, Tree).
|
|
|
|
construct_rbtree(L, M, _, _, Nil, Nil) :- M < L, !.
|
|
construct_rbtree(L, L, Ar, Depth, Nil, Node) :- !,
|
|
arg(L, Ar, K-Val),
|
|
build_node(Depth, Nil, K, Val, Nil, Node).
|
|
construct_rbtree(I0, Max, Ar, Depth, Nil, Node) :-
|
|
I is (I0+Max)//2,
|
|
arg(I, Ar, K-Val),
|
|
build_node(Depth, Left, K, Val, Right, Node),
|
|
I1 is I-1,
|
|
NewDepth is Depth-1,
|
|
construct_rbtree(I0, I1, Ar, NewDepth, Nil, Left),
|
|
I2 is I+1,
|
|
construct_rbtree(I2, Max, Ar, NewDepth, Nil, Right).
|
|
|
|
build_node( 0, Left, K, Val, Right, red(Left, K, Val, Right)) :- !.
|
|
build_node( _, Left, K, Val, Right, black(Left, K, Val, Right)).
|
|
|
|
|
|
%% rb_size(+T, -Size) is det.
|
|
%
|
|
% Size is the number of elements in T.
|
|
|
|
rb_size(t(_,T),Size) :-
|
|
size(T,0,Size).
|
|
|
|
size(black('',_,_,_),Sz,Sz) :- !.
|
|
size(red(L,_,_,R),Sz0,Szf) :-
|
|
Sz1 is Sz0+1,
|
|
size(L,Sz1,Sz2),
|
|
size(R,Sz2,Szf).
|
|
size(black(L,_,_,R),Sz0,Szf) :-
|
|
Sz1 is Sz0+1,
|
|
size(L,Sz1,Sz2),
|
|
size(R,Sz2,Szf).
|
|
|
|
%% is_rbtree(?Term) is semidet.
|
|
%
|
|
% True if Term is a valide Red-Black tree.
|
|
%
|
|
% @tbd Catch variables.
|
|
|
|
is_rbtree(X) :-
|
|
var(X), !, fail.
|
|
is_rbtree(t(Nil,Nil)) :- !.
|
|
is_rbtree(t(_,T)) :-
|
|
catch(rbtree1(T), msg(_,_), fail).
|
|
|
|
is_rbtree(X,_) :-
|
|
var(X), !, fail.
|
|
is_rbtree(T,Goal) :-
|
|
catch(rbtree1(T), msg(S,Args), (once(Goal),format(S,Args))).
|
|
|
|
%
|
|
% This code checks if a tree is ordered and a rbtree
|
|
%
|
|
%
|
|
rbtree(t(_,black('',_,_,''))) :- !.
|
|
rbtree(t(_,T)) :-
|
|
catch(rbtree1(T),msg(S,Args),format(S,Args)).
|
|
|
|
rbtree1(black(L,K,_,R)) :-
|
|
find_path_blacks(L, 0, Bls),
|
|
check_rbtree(L,-inf,K,Bls),
|
|
check_rbtree(R,K,+inf,Bls).
|
|
rbtree1(red(_,_,_,_)) :-
|
|
throw(msg("root should be black",[])).
|
|
|
|
|
|
find_path_blacks(black('',_,_,''), Bls, Bls) :- !.
|
|
find_path_blacks(black(L,_,_,_), Bls0, Bls) :-
|
|
Bls1 is Bls0+1,
|
|
find_path_blacks(L, Bls1, Bls).
|
|
find_path_blacks(red(L,_,_,_), Bls0, Bls) :-
|
|
find_path_blacks(L, Bls0, Bls).
|
|
|
|
check_rbtree(black('',_,_,''),Min,Max,Bls0) :- !,
|
|
check_height(Bls0,Min,Max).
|
|
check_rbtree(red(L,K,_,R),Min,Max,Bls) :-
|
|
check_val(K,Min,Max),
|
|
check_red_child(L),
|
|
check_red_child(R),
|
|
check_rbtree(L,Min,K,Bls),
|
|
check_rbtree(R,K,Max,Bls).
|
|
check_rbtree(black(L,K,_,R),Min,Max,Bls0) :-
|
|
check_val(K,Min,Max),
|
|
Bls is Bls0-1,
|
|
check_rbtree(L,Min,K,Bls),
|
|
check_rbtree(R,K,Max,Bls).
|
|
|
|
check_height(0,_,_) :- !.
|
|
check_height(Bls0,Min,Max) :-
|
|
throw(msg("Unbalance ~d between ~w and ~w~n",[Bls0,Min,Max])).
|
|
|
|
check_val(K, Min, Max) :- ( K @> Min ; Min == -inf), (K @< Max ; Max == +inf), !.
|
|
check_val(K, Min, Max) :-
|
|
throw(msg("not ordered: ~w not between ~w and ~w~n",[K,Min,Max])).
|
|
|
|
check_red_child(black(_,_,_,_)).
|
|
check_red_child(red(_,K,_,_)) :-
|
|
throw(msg("must be red: ~w~n",[K])).
|
|
|
|
|
|
%count(1,16,X), format("deleting ~d~n",[X]), new(1,a,T0), insert(T0,2,b,T1), insert(T1,3,c,T2), insert(T2,4,c,T3), insert(T3,5,c,T4), insert(T4,6,c,T5), insert(T5,7,c,T6), insert(T6,8,c,T7), insert(T7,9,c,T8), insert(T8,10,c,T9),insert(T9,11,c,T10), insert(T10,12,c,T11),insert(T11,13,c,T12),insert(T12,14,c,T13),insert(T13,15,c,T14), insert(T14,16,c,T15),delete(T15,X,T16),pretty_print(T16),rbtree(T16),fail.
|
|
|
|
% count(1,16,X0), X is -X0, format("deleting ~d~n",[X]), new(-1,a,T0), insert(T0,-2,b,T1), insert(T1,-3,c,T2), insert(T2,-4,c,T3), insert(T3,-5,c,T4), insert(T4,-6,c,T5), insert(T5,-7,c,T6), insert(T6,-8,c,T7), insert(T7,-9,c,T8), insert(T8,-10,c,T9),insert(T9,-11,c,T10), insert(T10,-12,c,T11),insert(T11,-13,c,T12),insert(T12,-14,c,T13),insert(T13,-15,c,T14), insert(T14,-16,c,T15),delete(T15,X,T16),pretty_print(T16),rbtree(T16),fail.
|
|
|
|
count(I,_,I).
|
|
count(I,M,L) :-
|
|
I < M, I1 is I+1, count(I1,M,L).
|
|
|
|
test_pos :-
|
|
rb_new(1,a,T0),
|
|
N = 10000,
|
|
build_ptree(2,N,T0,T),
|
|
% pretty_print(T),
|
|
rbtree(T),
|
|
clean_tree(1,N,T,_),
|
|
bclean_tree(N,1,T,_),
|
|
count(1,N,X), ( rb_delete(T,X,TF) -> true ; abort ),
|
|
% pretty_print(TF),
|
|
rbtree(TF),
|
|
% format("done ~d~n",[X]),
|
|
fail.
|
|
test_pos.
|
|
|
|
build_ptree(X,X,T0,TF) :- !,
|
|
rb_insert(T0,X,X,TF).
|
|
build_ptree(X1,X,T0,TF) :-
|
|
rb_insert(T0,X1,X1,TI),
|
|
X2 is X1+1,
|
|
build_ptree(X2,X,TI,TF).
|
|
|
|
|
|
clean_tree(X,X,T0,TF) :- !,
|
|
rb_delete(T0,X,TF),
|
|
( rbtree(TF) -> true ; abort).
|
|
clean_tree(X1,X,T0,TF) :-
|
|
rb_delete(T0,X1,TI),
|
|
X2 is X1+1,
|
|
( rbtree(TI) -> true ; abort),
|
|
clean_tree(X2,X,TI,TF).
|
|
|
|
bclean_tree(X,X,T0,TF) :- !,
|
|
format("cleaning ~d~n", [X]),
|
|
rb_delete(T0,X,TF),
|
|
( rbtree(TF) -> true ; abort).
|
|
bclean_tree(X1,X,T0,TF) :-
|
|
format("cleaning ~d~n", [X1]),
|
|
rb_delete(T0,X1,TI),
|
|
X2 is X1-1,
|
|
( rbtree(TI) -> true ; abort),
|
|
bclean_tree(X2,X,TI,TF).
|
|
|
|
|
|
|
|
test_neg :-
|
|
Size = 10000,
|
|
rb_new(-1,a,T0),
|
|
build_ntree(2,Size,T0,T),
|
|
% pretty_print(T),
|
|
rbtree(T),
|
|
MSize is -Size,
|
|
clean_tree(MSize,-1,T,_),
|
|
bclean_tree(-1,MSize,T,_),
|
|
count(1,Size,X), NX is -X, ( rb_delete(T,NX,TF) -> true ; abort ),
|
|
% pretty_print(TF),
|
|
rbtree(TF),
|
|
% format("done ~d~n",[X]),
|
|
fail.
|
|
test_neg.
|
|
|
|
build_ntree(X,X,T0,TF) :- !,
|
|
X1 is -X,
|
|
rb_insert(T0,X1,X1,TF).
|
|
build_ntree(X1,X,T0,TF) :-
|
|
NX1 is -X1,
|
|
rb_insert(T0,NX1,NX1,TI),
|
|
X2 is X1+1,
|
|
build_ntree(X2,X,TI,TF).
|
|
|
|
|
|
|