摘要:在上一節(jié)中����,在中用了鏈表和紅黑樹兩種方式解決沖突�,在中也是用紅黑樹存儲的����。其中節(jié)點顏色為黑色紅黑樹的左旋和右旋紅黑樹的插入和刪除,都有可能破壞其特性���,就不是一棵紅黑樹了����,所以要調(diào)整�。
在上一節(jié)中,HashMap在jdk 1.8中用了鏈表和紅黑樹兩種方式解決沖突�����,在TreeMap中也是用紅黑樹存儲的�。下面分析一下紅黑樹的結(jié)構(gòu)和基本操作。
一���、紅黑樹的特征和基本操作
上一節(jié)中已經(jīng)描述了紅黑樹的基本概念和特征����,下面直接通過一個例子分析紅黑樹的構(gòu)造和調(diào)整方法����。
1�、紅黑樹的數(shù)據(jù)結(jié)構(gòu)
紅黑樹是一棵二叉查找樹�,在二叉樹的基礎(chǔ)上增加了節(jié)點的顏色,下面是TreeMap中的紅黑樹定義:
private static final boolean RED = false;
private static final boolean BLACK = true;
static final class Entry implements Map.Entry {
K key;
V value;
Entry left;
Entry right;
Entry parent;
boolean color = BLACK;
/**
* 給定key���、value和父節(jié)點�,構(gòu)造一個新的���。其中節(jié)點顏色為黑色
*/
Entry(K key, V value, Entry parent) {
this.key = key;
this.value = value;
this.parent = parent;
}
}
2��、紅黑樹的左旋和右旋
紅黑樹的插入和刪除��,都有可能破壞其特性����,就不是一棵紅黑樹了���,所以要調(diào)整。調(diào)整的方法又兩種�����,一種是改變某個節(jié)點的顏色,另外一種是結(jié)構(gòu)調(diào)整�����,包括左旋和右旋�。
左旋:將X的節(jié)點的右兒子節(jié)點Y變?yōu)槠涓腹?jié)點,并且將Y的左子樹變?yōu)閄的右子樹�����,變換過程入下圖
右旋:將X的節(jié)點的左兒子節(jié)點Y變?yōu)槠涓腹?jié)點�����,并且將Y的右子樹變?yōu)閄的左子樹�,變換過程入下圖
3、插入節(jié)點后調(diào)整紅黑樹
當在紅黑樹中插入一個節(jié)點后�,可能會破壞紅黑樹的規(guī)則,首先再回顧一下紅黑數(shù)的特點:
節(jié)點是紅色或黑色����。
根節(jié)點是黑色。
每個葉子節(jié)點都是黑色的空節(jié)點(NIL節(jié)點)�。
每個紅色節(jié)點的兩個子節(jié)點都是黑色。(從每個葉子到根的所有路徑上不能有兩個連續(xù)的紅色節(jié)點)
從任一節(jié)點到其每個葉子的所有路徑都包含相同數(shù)目的黑色節(jié)點���。
從上面的條件可以看出�,a肯定是不會違背的。插入的節(jié)點不在根節(jié)點處�,所以b也不會違背。插入的節(jié)點時非空節(jié)點���,c也不會違背�����。最有可能違背的就是d和e����。而在我們插入節(jié)點時����,先將要插入的節(jié)點顏色設(shè)置為紅色,這樣也就不會違背e���。所以,插入后只需要調(diào)整不違背e就可以����。
插入后調(diào)整需要分三種情況來處理:
插入的是根節(jié)點:
處理方法是直接將根節(jié)點顏色設(shè)置為黑色
插入節(jié)點的父節(jié)點為黑色節(jié)點或父節(jié)點為根節(jié)點
不需要處理
插入節(jié)點的父節(jié)點時紅色節(jié)點
這種又分為三種情況
下面假設(shè)插入節(jié)點為x�,父節(jié)點為xp����,祖父節(jié)點為xpp,祖父節(jié)點的左兒子為xppl���,祖父節(jié)點的右兒子為xppr
S1:當前節(jié)點的父節(jié)點xp是紅色�,且當前節(jié)點的祖父節(jié)xpp點的另一個子節(jié)點(xppl或者xppr)也是紅色
處理邏輯:將父節(jié)點xp設(shè)為紅色�,祖父節(jié)點的兒子節(jié)點(xppl或者xppr)設(shè)為黑色,將祖父節(jié)點xpp設(shè)為紅色�,將祖父節(jié)點xpp設(shè)為當前節(jié)點,繼續(xù)處理���。
S2:當前節(jié)點的父節(jié)點xp是紅色�����,祖父節(jié)點的兒子節(jié)點(xppl或者xppr)是黑色�����,且當前節(jié)點x是其父節(jié)點xp的右孩子
處理邏輯:父節(jié)點xp作為當前節(jié)點x���, 以當前節(jié)點x為支點進行左旋�����。
S3:當前節(jié)點的父節(jié)點xp是紅色���,祖父節(jié)點的兒子節(jié)點(xppl或者xppr)是黑色,且當前節(jié)點是其父節(jié)點xp的左孩子
處理邏輯:將父節(jié)點xp設(shè)置為黑色���,祖父節(jié)點xpp設(shè)置為紅色�,以祖父節(jié)點xpp為支點進行右旋
4��、刪除節(jié)點后調(diào)整紅黑樹
未完���,待續(xù)�����。��。�。
3����、構(gòu)造一棵紅黑樹
通過插入節(jié)點,構(gòu)造紅黑樹
現(xiàn)在給定節(jié)點8 5 3 9 12 1 4 2�����,依次插入紅黑樹中��,具體流程見下圖:
在紅黑樹中刪除節(jié)點
未完��,待續(xù)�����。�����。����。
二、HashMap中的紅黑樹相關(guān)源碼
static final class TreeNode extends LinkedHashMap.Entry {
TreeNode parent; // red-black tree links
TreeNode left;
TreeNode right;
//在節(jié)點刪除后����,需解除鏈接
TreeNode prev;
boolean red;
TreeNode(int hash, K key, V val, Node next) {
super(hash, key, val, next);
}
/**
* 返回根節(jié)點
*/
final TreeNode root() {
for (TreeNode r = this, p;;) {
if ((p = r.parent) == null)
return r;
r = p;
}
}
/**
* 確保根節(jié)點就是第一個節(jié)點
*/
static void moveRootToFront(Node[] tab, TreeNode root) {
int n;
if (root != null && tab != null && (n = tab.length) > 0) {
int index = (n - 1) & root.hash;
TreeNode first = (TreeNode)tab[index];
//如果根節(jié)點不是第一個節(jié)點,進行調(diào)整
if (root != first) {
Node rn;
tab[index] = root;
TreeNode rp = root.prev;
if ((rn = root.next) != null)
((TreeNode)rn).prev = rp;
if (rp != null)
rp.next = rn;
if (first != null)
first.prev = root;
root.next = first;
root.prev = null;
}
assert checkInvariants(root);
}
}
/**
* 根據(jù)hash值和key查詢節(jié)點
*/
final TreeNode find(int h, Object k, Class kc) {
TreeNode p = this;
do {
int ph, dir; K pk;
TreeNode pl = p.left, pr = p.right, q;
if ((ph = p.hash) > h)
p = pl;
else if (ph < h)
p = pr;
else if ((pk = p.key) == k || (k != null && k.equals(pk)))
return p;
else if (pl == null)
p = pr;
else if (pr == null)
p = pl;
else if ((kc != null ||
(kc = comparableClassFor(k)) != null) &&
(dir = compareComparables(kc, k, pk)) != 0)
p = (dir < 0) ? pl : pr;
else if ((q = pr.find(h, k, kc)) != null)
return q;
else
p = pl;
} while (p != null);
return null;
}
/**
* 根據(jù)hash值和key查詢節(jié)點
*/
final TreeNode getTreeNode(int h, Object k) {
return ((parent != null) ? root() : this).find(h, k, null);
}
/**
* 將鏈表轉(zhuǎn)換為紅黑樹
*/
final void treeify(Node[] tab) {
TreeNode root = null;
//從第一個節(jié)點開始
for (TreeNode x = this, next; x != null; x = next) {
next = (TreeNode)x.next;
x.left = x.right = null;
//如果root節(jié)點為null,x為根節(jié)點��,此節(jié)點為黑色���,父節(jié)點為null
if (root == null) {
x.parent = null;
x.red = false;
root = x;
}
else {
//x的key值
K k = x.key;
//x的hash值
int h = x.hash;
Class kc = null;
for (TreeNode p = root;;) {
int dir, ph;
K pk = p.key;
//左邊
if ((ph = p.hash) > h)
dir = -1;
//右邊
else if (ph < h)
dir = 1;
//通過仲裁方法判斷
else if ((kc == null &&
(kc = comparableClassFor(k)) == null) ||
(dir = compareComparables(kc, k, pk)) == 0)
dir = tieBreakOrder(k, pk);
TreeNode xp = p;
//dir <=0 左子樹搜索�,并且判斷左兒子是否為空�����,表示是否到葉子節(jié)點
if ((p = (dir <= 0) ? p.left : p.right) == null) {
x.parent = xp;
if (dir <= 0)
xp.left = x;
else
xp.right = x;
//插入元素���,判斷是否平衡����,并且調(diào)整
root = balanceInsertion(root, x);
break;
}
}
}
}
//確保根節(jié)點就是第一個節(jié)點
moveRootToFront(tab, root);
}
/**
* 紅黑樹轉(zhuǎn)換為鏈表
*/
final Node untreeify(HashMap map) {
Node hd = null, tl = null;
for (Node q = this; q != null; q = q.next) {
Node p = map.replacementNode(q, null);
if (tl == null)
hd = p;
else
tl.next = p;
tl = p;
}
return hd;
}
/**
* 插入一個節(jié)點
*/
final TreeNode putTreeVal(HashMap map, Node[] tab,
int h, K k, V v) {
Class kc = null;
boolean searched = false;
TreeNode root = (parent != null) ? root() : this;
//從根據(jù)點開始�����,和當前搜索節(jié)點的hash比較
for (TreeNode p = root;;) {
int dir, ph; K pk;
if ((ph = p.hash) > h)
dir = -1;
else if (ph < h)
dir = 1;
//hash和key都一致
else if ((pk = p.key) == k || (k != null && k.equals(pk)))
return p;
else if ((kc == null &&
(kc = comparableClassFor(k)) == null) ||
(dir = compareComparables(kc, k, pk)) == 0) {
if (!searched) {
TreeNode q, ch;
searched = true;
if (((ch = p.left) != null &&
(q = ch.find(h, k, kc)) != null) ||
((ch = p.right) != null &&
(q = ch.find(h, k, kc)) != null))
return q;
}
dir = tieBreakOrder(k, pk);
}
TreeNode xp = p;
if ((p = (dir <= 0) ? p.left : p.right) == null) {
Node xpn = xp.next;
//新建節(jié)點
TreeNode x = map.newTreeNode(h, k, v, xpn);
if (dir <= 0)
xp.left = x;
else
xp.right = x;
xp.next = x;
x.parent = x.prev = xp;
if (xpn != null)
((TreeNode)xpn).prev = x;
//插入元素����,判斷是否平衡,并且調(diào)整��。確保根節(jié)點就是第一個節(jié)點
moveRootToFront(tab, balanceInsertion(root, x));
return null;
}
}
}
/**
* Removes the given node, that must be present before this call.
* This is messier than typical red-black deletion code because we
* cannot swap the contents of an interior node with a leaf
* successor that is pinned by "next" pointers that are accessible
* independently during traversal. So instead we swap the tree
* linkages. If the current tree appears to have too few nodes,
* the bin is converted back to a plain bin. (The test triggers
* somewhere between 2 and 6 nodes, depending on tree structure).
*/
final void removeTreeNode(HashMap map, Node[] tab,
boolean movable) {
int n;
if (tab == null || (n = tab.length) == 0)
return;
int index = (n - 1) & hash;
TreeNode first = (TreeNode)tab[index], root = first, rl;
TreeNode succ = (TreeNode)next, pred = prev;
if (pred == null)
tab[index] = first = succ;
else
pred.next = succ;
if (succ != null)
succ.prev = pred;
if (first == null)
return;
if (root.parent != null)
root = root.root();
if (root == null || root.right == null ||
(rl = root.left) == null || rl.left == null) {
tab[index] = first.untreeify(map); // too small
return;
}
TreeNode p = this, pl = left, pr = right, replacement;
if (pl != null && pr != null) {
TreeNode s = pr, sl;
while ((sl = s.left) != null) // find successor
s = sl;
boolean c = s.red; s.red = p.red; p.red = c; // swap colors
TreeNode sr = s.right;
TreeNode pp = p.parent;
if (s == pr) { // p was s"s direct parent
p.parent = s;
s.right = p;
}
else {
TreeNode sp = s.parent;
if ((p.parent = sp) != null) {
if (s == sp.left)
sp.left = p;
else
sp.right = p;
}
if ((s.right = pr) != null)
pr.parent = s;
}
p.left = null;
if ((p.right = sr) != null)
sr.parent = p;
if ((s.left = pl) != null)
pl.parent = s;
if ((s.parent = pp) == null)
root = s;
else if (p == pp.left)
pp.left = s;
else
pp.right = s;
if (sr != null)
replacement = sr;
else
replacement = p;
}
else if (pl != null)
replacement = pl;
else if (pr != null)
replacement = pr;
else
replacement = p;
if (replacement != p) {
TreeNode pp = replacement.parent = p.parent;
if (pp == null)
root = replacement;
else if (p == pp.left)
pp.left = replacement;
else
pp.right = replacement;
p.left = p.right = p.parent = null;
}
TreeNode r = p.red ? root : balanceDeletion(root, replacement);
if (replacement == p) { // detach
TreeNode pp = p.parent;
p.parent = null;
if (pp != null) {
if (p == pp.left)
pp.left = null;
else if (p == pp.right)
pp.right = null;
}
}
if (movable)
moveRootToFront(tab, r);
}
/* ------------------------------------------------------------ */
// Red-black tree methods, all adapted from CLR
//左旋
static TreeNode rotateLeft(TreeNode root,
TreeNode p) {
TreeNode r, pp, rl;
//以p為左旋支點,且p不為空��,右兒子不為空
if (p != null && (r = p.right) != null) {
//將p的右兒子r的左兒子rl變?yōu)閜的右兒子
if ((rl = p.right = r.left) != null)
rl.parent = p;
//處理p�、l和p父節(jié)點的關(guān)系
if ((pp = r.parent = p.parent) == null)
(root = r).red = false;
else if (pp.left == p)
pp.left = r;
else
pp.right = r;
//處理p和r的關(guān)系
r.left = p;
p.parent = r;
}
return root;
}
//右旋
static TreeNode rotateRight(TreeNode root,
TreeNode p) {
TreeNode l, pp, lr;
//p:右旋支點��,不為空���,p的左兒子l不為空
if (p != null && (l = p.left) != null) {
//將左兒子的右子樹變?yōu)閜的左子樹
if ((lr = p.left = l.right) != null)
lr.parent = p;
//p的父節(jié)點變?yōu)閘的父節(jié)點
if ((pp = l.parent = p.parent) == null)
(root = l).red = false;
//如果p為右兒子�����,則p的父節(jié)點的右兒子變?yōu)閘,否則左兒子變?yōu)閘
else if (pp.right == p)
pp.right = l;
else
pp.left = l;
//p變?yōu)閘的右兒子
l.right = p;
p.parent = l;
}
return root;
}
static TreeNode balanceInsertion(TreeNode root,
TreeNode x) {
//插入節(jié)點初始化為紅色
x.red = true;
//xp:父節(jié)點���,xpp:祖父節(jié)點, xppl:祖父節(jié)點的左兒子�,xppr:祖父節(jié)點的右兒子
//循環(huán)遍歷
for (TreeNode xp, xpp, xppl, xppr;;) {
//插入的節(jié)點為根節(jié)點,節(jié)點顏色轉(zhuǎn)換為黑色
if ((xp = x.parent) == null) {
x.red = false;
return x;
}
//當前節(jié)點的父為黑色節(jié)點或者父節(jié)點為根節(jié)點�,直接返回
else if (!xp.red || (xpp = xp.parent) == null)
return root;
//祖父節(jié)點的左兒子是父節(jié)點
if (xp == (xppl = xpp.left)) {
//S1:當前節(jié)點的父節(jié)點xp是紅色,且當前節(jié)點的祖父節(jié)xpp點的另一個子節(jié)點(xppl或者xppr)也是紅色
if ((xppr = xpp.right) != null && xppr.red) {
xppr.red = false;
xp.red = false;
xpp.red = true;
x = xpp;
}
else {
//S2:當前節(jié)點的父節(jié)點xp是紅色����,祖父節(jié)點的兒子節(jié)點(xppl或者xppr)是黑色,且當前節(jié)點x是其父節(jié)點xp的右孩子
if (x == xp.right) {
root = rotateLeft(root, x = xp);
xpp = (xp = x.parent) == null ? null : xp.parent;
}
//S3:當前節(jié)點的父節(jié)點xp是紅色�,祖父節(jié)點的兒子節(jié)點(xppl或者xppr)是黑色�����,且當前節(jié)點是其父節(jié)點xp的左孩子
if (xp != null) {
xp.red = false;
if (xpp != null) {
xpp.red = true;
root = rotateRight(root, xpp);
}
}
}
}
else {
//S1:當前節(jié)點的父節(jié)點xp是紅色�,且當前節(jié)點的祖父節(jié)xpp點的另一個子節(jié)點(xppl或者xppr)也是紅色
if (xppl != null && xppl.red) {
xppl.red = false;
xp.red = false;
xpp.red = true;
x = xpp;
}
else {
//S2:當前節(jié)點的父節(jié)點xp是紅色�����,祖父節(jié)點的兒子節(jié)點(xppl或者xppr)是黑色�����,且當前節(jié)點x是其父節(jié)點xp的右孩子
if (x == xp.left) {
root = rotateRight(root, x = xp);
xpp = (xp = x.parent) == null ? null : xp.parent;
}
//S3:當前節(jié)點的父節(jié)點xp是紅色�����,祖父節(jié)點的兒子節(jié)點(xppl或者xppr)是黑色�����,且當前節(jié)點是其父節(jié)點xp的左孩子
if (xp != null) {
xp.red = false;
if (xpp != null) {
xpp.red = true;
root = rotateLeft(root, xpp);
}
}
}
}
}
}
static TreeNode balanceDeletion(TreeNode root,
TreeNode x) {
for (TreeNode xp, xpl, xpr;;) {
if (x == null || x == root)
return root;
else if ((xp = x.parent) == null) {
x.red = false;
return x;
}
else if (x.red) {
x.red = false;
return root;
}
else if ((xpl = xp.left) == x) {
if ((xpr = xp.right) != null && xpr.red) {
xpr.red = false;
xp.red = true;
root = rotateLeft(root, xp);
xpr = (xp = x.parent) == null ? null : xp.right;
}
if (xpr == null)
x = xp;
else {
TreeNode sl = xpr.left, sr = xpr.right;
if ((sr == null || !sr.red) &&
(sl == null || !sl.red)) {
xpr.red = true;
x = xp;
}
else {
if (sr == null || !sr.red) {
if (sl != null)
sl.red = false;
xpr.red = true;
root = rotateRight(root, xpr);
xpr = (xp = x.parent) == null ?
null : xp.right;
}
if (xpr != null) {
xpr.red = (xp == null) ? false : xp.red;
if ((sr = xpr.right) != null)
sr.red = false;
}
if (xp != null) {
xp.red = false;
root = rotateLeft(root, xp);
}
x = root;
}
}
}
else { // symmetric
if (xpl != null && xpl.red) {
xpl.red = false;
xp.red = true;
root = rotateRight(root, xp);
xpl = (xp = x.parent) == null ? null : xp.left;
}
if (xpl == null)
x = xp;
else {
TreeNode sl = xpl.left, sr = xpl.right;
if ((sl == null || !sl.red) &&
(sr == null || !sr.red)) {
xpl.red = true;
x = xp;
}
else {
if (sl == null || !sl.red) {
if (sr != null)
sr.red = false;
xpl.red = true;
root = rotateLeft(root, xpl);
xpl = (xp = x.parent) == null ?
null : xp.left;
}
if (xpl != null) {
xpl.red = (xp == null) ? false : xp.red;
if ((sl = xpl.left) != null)
sl.red = false;
}
if (xp != null) {
xp.red = false;
root = rotateRight(root, xp);
}
x = root;
}
}
}
}
}
}
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