| /* |
| * Copyright (C) 2010, 2011 Apple Inc. All rights reserved. |
| * |
| * Redistribution and use in source and binary forms, with or without |
| * modification, are permitted provided that the following conditions |
| * are met: |
| * |
| * 1. Redistributions of source code must retain the above copyright |
| * notice, this list of conditions and the following disclaimer. |
| * 2. Redistributions in binary form must reproduce the above copyright |
| * notice, this list of conditions and the following disclaimer in the |
| * documentation and/or other materials provided with the distribution. |
| * 3. Neither the name of Apple Computer, Inc. ("Apple") nor the names of |
| * its contributors may be used to endorse or promote products derived |
| * from this software without specific prior written permission. |
| * |
| * THIS SOFTWARE IS PROVIDED BY APPLE AND ITS CONTRIBUTORS "AS IS" AND ANY |
| * EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE IMPLIED |
| * WARRANTIES OF MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE ARE |
| * DISCLAIMED. IN NO EVENT SHALL APPLE OR ITS CONTRIBUTORS BE LIABLE FOR ANY |
| * DIRECT, INDIRECT, INCIDENTAL, SPECIAL, EXEMPLARY, OR CONSEQUENTIAL DAMAGES |
| * (INCLUDING, BUT NOT LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; |
| * LOSS OF USE, DATA, OR PROFITS; OR BUSINESS INTERRUPTION) HOWEVER CAUSED AND |
| * ON ANY THEORY OF LIABILITY, WHETHER IN CONTRACT, STRICT LIABILITY, OR TORT |
| * (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF THE USE OF |
| * THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE. |
| */ |
| |
| #ifndef RedBlackTree_h |
| #define RedBlackTree_h |
| |
| #include <wtf/Assertions.h> |
| #include <wtf/Noncopyable.h> |
| |
| namespace WTF { |
| |
| // This implements a red-black tree with the following properties: |
| // - The allocation of nodes in the tree is entirely up to the user. |
| // - If you are in possession of a pointer to a node, you can delete |
| // it from the tree. The tree will subsequently no longer have a |
| // reference to this node. |
| // - The key type must implement operator< and ==. |
| |
| template<class NodeType, typename KeyType> |
| class RedBlackTree { |
| WTF_MAKE_NONCOPYABLE(RedBlackTree); |
| private: |
| enum Color { |
| Red = 1, |
| Black |
| }; |
| |
| public: |
| class Node { |
| friend class RedBlackTree; |
| |
| public: |
| const NodeType* successor() const |
| { |
| const Node* x = this; |
| if (x->right()) |
| return treeMinimum(x->right()); |
| const NodeType* y = x->parent(); |
| while (y && x == y->right()) { |
| x = y; |
| y = y->parent(); |
| } |
| return y; |
| } |
| |
| const NodeType* predecessor() const |
| { |
| const Node* x = this; |
| if (x->left()) |
| return treeMaximum(x->left()); |
| const NodeType* y = x->parent(); |
| while (y && x == y->left()) { |
| x = y; |
| y = y->parent(); |
| } |
| return y; |
| } |
| |
| NodeType* successor() |
| { |
| return const_cast<NodeType*>(const_cast<const Node*>(this)->successor()); |
| } |
| |
| NodeType* predecessor() |
| { |
| return const_cast<NodeType*>(const_cast<const Node*>(this)->predecessor()); |
| } |
| |
| private: |
| void reset() |
| { |
| m_left = 0; |
| m_right = 0; |
| m_parentAndRed = 1; // initialize to red |
| } |
| |
| // NOTE: these methods should pack the parent and red into a single |
| // word. But doing so appears to reveal a bug in the compiler. |
| NodeType* parent() const |
| { |
| return reinterpret_cast<NodeType*>(m_parentAndRed & ~static_cast<uintptr_t>(1)); |
| } |
| |
| void setParent(NodeType* newParent) |
| { |
| m_parentAndRed = reinterpret_cast<uintptr_t>(newParent) | (m_parentAndRed & 1); |
| } |
| |
| NodeType* left() const |
| { |
| return m_left; |
| } |
| |
| void setLeft(NodeType* node) |
| { |
| m_left = node; |
| } |
| |
| NodeType* right() const |
| { |
| return m_right; |
| } |
| |
| void setRight(NodeType* node) |
| { |
| m_right = node; |
| } |
| |
| Color color() const |
| { |
| if (m_parentAndRed & 1) |
| return Red; |
| return Black; |
| } |
| |
| void setColor(Color value) |
| { |
| if (value == Red) |
| m_parentAndRed |= 1; |
| else |
| m_parentAndRed &= ~static_cast<uintptr_t>(1); |
| } |
| |
| NodeType* m_left; |
| NodeType* m_right; |
| uintptr_t m_parentAndRed; |
| }; |
| |
| RedBlackTree() |
| : m_root(0) |
| { |
| } |
| |
| void insert(NodeType* x) |
| { |
| x->reset(); |
| treeInsert(x); |
| x->setColor(Red); |
| |
| while (x != m_root && x->parent()->color() == Red) { |
| if (x->parent() == x->parent()->parent()->left()) { |
| NodeType* y = x->parent()->parent()->right(); |
| if (y && y->color() == Red) { |
| // Case 1 |
| x->parent()->setColor(Black); |
| y->setColor(Black); |
| x->parent()->parent()->setColor(Red); |
| x = x->parent()->parent(); |
| } else { |
| if (x == x->parent()->right()) { |
| // Case 2 |
| x = x->parent(); |
| leftRotate(x); |
| } |
| // Case 3 |
| x->parent()->setColor(Black); |
| x->parent()->parent()->setColor(Red); |
| rightRotate(x->parent()->parent()); |
| } |
| } else { |
| // Same as "then" clause with "right" and "left" exchanged. |
| NodeType* y = x->parent()->parent()->left(); |
| if (y && y->color() == Red) { |
| // Case 1 |
| x->parent()->setColor(Black); |
| y->setColor(Black); |
| x->parent()->parent()->setColor(Red); |
| x = x->parent()->parent(); |
| } else { |
| if (x == x->parent()->left()) { |
| // Case 2 |
| x = x->parent(); |
| rightRotate(x); |
| } |
| // Case 3 |
| x->parent()->setColor(Black); |
| x->parent()->parent()->setColor(Red); |
| leftRotate(x->parent()->parent()); |
| } |
| } |
| } |
| |
| m_root->setColor(Black); |
| } |
| |
| NodeType* remove(NodeType* z) |
| { |
| ASSERT(z); |
| ASSERT(z->parent() || z == m_root); |
| |
| // Y is the node to be unlinked from the tree. |
| NodeType* y; |
| if (!z->left() || !z->right()) |
| y = z; |
| else |
| y = z->successor(); |
| |
| // Y is guaranteed to be non-null at this point. |
| NodeType* x; |
| if (y->left()) |
| x = y->left(); |
| else |
| x = y->right(); |
| |
| // X is the child of y which might potentially replace y in |
| // the tree. X might be null at this point. |
| NodeType* xParent; |
| if (x) { |
| x->setParent(y->parent()); |
| xParent = x->parent(); |
| } else |
| xParent = y->parent(); |
| if (!y->parent()) |
| m_root = x; |
| else { |
| if (y == y->parent()->left()) |
| y->parent()->setLeft(x); |
| else |
| y->parent()->setRight(x); |
| } |
| |
| if (y != z) { |
| if (y->color() == Black) |
| removeFixup(x, xParent); |
| |
| y->setParent(z->parent()); |
| y->setColor(z->color()); |
| y->setLeft(z->left()); |
| y->setRight(z->right()); |
| |
| if (z->left()) |
| z->left()->setParent(y); |
| if (z->right()) |
| z->right()->setParent(y); |
| if (z->parent()) { |
| if (z->parent()->left() == z) |
| z->parent()->setLeft(y); |
| else |
| z->parent()->setRight(y); |
| } else { |
| ASSERT(m_root == z); |
| m_root = y; |
| } |
| } else if (y->color() == Black) |
| removeFixup(x, xParent); |
| |
| return z; |
| } |
| |
| NodeType* remove(const KeyType& key) |
| { |
| NodeType* result = findExact(key); |
| if (!result) |
| return 0; |
| return remove(result); |
| } |
| |
| NodeType* findExact(const KeyType& key) const |
| { |
| for (NodeType* current = m_root; current;) { |
| if (current->key() == key) |
| return current; |
| if (key < current->key()) |
| current = current->left(); |
| else |
| current = current->right(); |
| } |
| return 0; |
| } |
| |
| NodeType* findLeastGreaterThanOrEqual(const KeyType& key) const |
| { |
| NodeType* best = 0; |
| for (NodeType* current = m_root; current;) { |
| if (current->key() == key) |
| return current; |
| if (current->key() < key) |
| current = current->right(); |
| else { |
| best = current; |
| current = current->left(); |
| } |
| } |
| return best; |
| } |
| |
| NodeType* findGreatestLessThanOrEqual(const KeyType& key) const |
| { |
| NodeType* best = 0; |
| for (NodeType* current = m_root; current;) { |
| if (current->key() == key) |
| return current; |
| if (current->key() > key) |
| current = current->left(); |
| else { |
| best = current; |
| current = current->right(); |
| } |
| } |
| return best; |
| } |
| |
| NodeType* first() const |
| { |
| if (!m_root) |
| return 0; |
| return treeMinimum(m_root); |
| } |
| |
| NodeType* last() const |
| { |
| if (!m_root) |
| return 0; |
| return treeMaximum(m_root); |
| } |
| |
| // This is an O(n) operation. |
| size_t size() |
| { |
| size_t result = 0; |
| for (NodeType* current = first(); current; current = current->successor()) |
| result++; |
| return result; |
| } |
| |
| // This is an O(1) operation. |
| bool isEmpty() |
| { |
| return !m_root; |
| } |
| |
| private: |
| // Finds the minimum element in the sub-tree rooted at the given |
| // node. |
| static NodeType* treeMinimum(NodeType* x) |
| { |
| while (x->left()) |
| x = x->left(); |
| return x; |
| } |
| |
| static NodeType* treeMaximum(NodeType* x) |
| { |
| while (x->right()) |
| x = x->right(); |
| return x; |
| } |
| |
| static const NodeType* treeMinimum(const NodeType* x) |
| { |
| while (x->left()) |
| x = x->left(); |
| return x; |
| } |
| |
| static const NodeType* treeMaximum(const NodeType* x) |
| { |
| while (x->right()) |
| x = x->right(); |
| return x; |
| } |
| |
| void treeInsert(NodeType* z) |
| { |
| ASSERT(!z->left()); |
| ASSERT(!z->right()); |
| ASSERT(!z->parent()); |
| ASSERT(z->color() == Red); |
| |
| NodeType* y = 0; |
| NodeType* x = m_root; |
| while (x) { |
| y = x; |
| if (z->key() < x->key()) |
| x = x->left(); |
| else |
| x = x->right(); |
| } |
| z->setParent(y); |
| if (!y) |
| m_root = z; |
| else { |
| if (z->key() < y->key()) |
| y->setLeft(z); |
| else |
| y->setRight(z); |
| } |
| } |
| |
| //---------------------------------------------------------------------- |
| // Red-Black tree operations |
| // |
| |
| // Left-rotates the subtree rooted at x. |
| // Returns the new root of the subtree (x's right child). |
| NodeType* leftRotate(NodeType* x) |
| { |
| // Set y. |
| NodeType* y = x->right(); |
| |
| // Turn y's left subtree into x's right subtree. |
| x->setRight(y->left()); |
| if (y->left()) |
| y->left()->setParent(x); |
| |
| // Link x's parent to y. |
| y->setParent(x->parent()); |
| if (!x->parent()) |
| m_root = y; |
| else { |
| if (x == x->parent()->left()) |
| x->parent()->setLeft(y); |
| else |
| x->parent()->setRight(y); |
| } |
| |
| // Put x on y's left. |
| y->setLeft(x); |
| x->setParent(y); |
| |
| return y; |
| } |
| |
| // Right-rotates the subtree rooted at y. |
| // Returns the new root of the subtree (y's left child). |
| NodeType* rightRotate(NodeType* y) |
| { |
| // Set x. |
| NodeType* x = y->left(); |
| |
| // Turn x's right subtree into y's left subtree. |
| y->setLeft(x->right()); |
| if (x->right()) |
| x->right()->setParent(y); |
| |
| // Link y's parent to x. |
| x->setParent(y->parent()); |
| if (!y->parent()) |
| m_root = x; |
| else { |
| if (y == y->parent()->left()) |
| y->parent()->setLeft(x); |
| else |
| y->parent()->setRight(x); |
| } |
| |
| // Put y on x's right. |
| x->setRight(y); |
| y->setParent(x); |
| |
| return x; |
| } |
| |
| // Restores the red-black property to the tree after splicing out |
| // a node. Note that x may be null, which is why xParent must be |
| // supplied. |
| void removeFixup(NodeType* x, NodeType* xParent) |
| { |
| while (x != m_root && (!x || x->color() == Black)) { |
| if (x == xParent->left()) { |
| // Note: the text points out that w can not be null. |
| // The reason is not obvious from simply looking at |
| // the code; it comes about from the properties of the |
| // red-black tree. |
| NodeType* w = xParent->right(); |
| ASSERT(w); // x's sibling should not be null. |
| if (w->color() == Red) { |
| // Case 1 |
| w->setColor(Black); |
| xParent->setColor(Red); |
| leftRotate(xParent); |
| w = xParent->right(); |
| } |
| if ((!w->left() || w->left()->color() == Black) |
| && (!w->right() || w->right()->color() == Black)) { |
| // Case 2 |
| w->setColor(Red); |
| x = xParent; |
| xParent = x->parent(); |
| } else { |
| if (!w->right() || w->right()->color() == Black) { |
| // Case 3 |
| w->left()->setColor(Black); |
| w->setColor(Red); |
| rightRotate(w); |
| w = xParent->right(); |
| } |
| // Case 4 |
| w->setColor(xParent->color()); |
| xParent->setColor(Black); |
| if (w->right()) |
| w->right()->setColor(Black); |
| leftRotate(xParent); |
| x = m_root; |
| xParent = x->parent(); |
| } |
| } else { |
| // Same as "then" clause with "right" and "left" |
| // exchanged. |
| |
| // Note: the text points out that w can not be null. |
| // The reason is not obvious from simply looking at |
| // the code; it comes about from the properties of the |
| // red-black tree. |
| NodeType* w = xParent->left(); |
| ASSERT(w); // x's sibling should not be null. |
| if (w->color() == Red) { |
| // Case 1 |
| w->setColor(Black); |
| xParent->setColor(Red); |
| rightRotate(xParent); |
| w = xParent->left(); |
| } |
| if ((!w->right() || w->right()->color() == Black) |
| && (!w->left() || w->left()->color() == Black)) { |
| // Case 2 |
| w->setColor(Red); |
| x = xParent; |
| xParent = x->parent(); |
| } else { |
| if (!w->left() || w->left()->color() == Black) { |
| // Case 3 |
| w->right()->setColor(Black); |
| w->setColor(Red); |
| leftRotate(w); |
| w = xParent->left(); |
| } |
| // Case 4 |
| w->setColor(xParent->color()); |
| xParent->setColor(Black); |
| if (w->left()) |
| w->left()->setColor(Black); |
| rightRotate(xParent); |
| x = m_root; |
| xParent = x->parent(); |
| } |
| } |
| } |
| if (x) |
| x->setColor(Black); |
| } |
| |
| NodeType* m_root; |
| }; |
| |
| } |
| |
| #endif |
| |
