①概念
二叉搜索树又称二叉排序树,它或者是一棵空树**,或者是具有以下性质的二叉树:
若它的左子树不为空,则左子树上所有节点的值都小于根节点的值
若它的右子树不为空,则右子树上所有节点的值都大于根节点的值
它的左右子树也分别为二叉搜索树
②操作-查找
二叉搜索树的查找类似于二分法查找
public Node search(int key) {
Node cur = root;
while (cur != null) {
if(cur.val == key) {
return cur;
}else if(cur.val < key) {
cur = cur.right;
}else {
cur = cur.left;
}
}
return null;
}③操作-插入
public boolean insert(int key) {
Node node = new Node(key);
if(root == null) {
root = node;
return true;
}
Node cur = root;
Node parent = null;
while(cur != null) {
if(cur.val == key) {
return false;
}else if(cur.val < key) {
parent = cur;
cur = cur.right;
}else {
parent = cur;
cur = cur.left;
}
}
//parent
if(parent.val > key) {
parent.left = node;
}else {
parent.right = node;
}
return true;
}④操作-删除
删除操作较为复杂,但理解了其原理还是比较容易
设待删除结点为 cur, 待删除结点的双亲结点为 parent
1. cur.left == null
1. cur 是 root,则 root = cur.right
2. cur 不是 root,cur 是 parent.left,则 parent.left = cur.right
3. cur 不是 root,cur 是 parent.right,则 parent.right = cur.right
2. cur.right == null
1. cur 是 root,则 root = cur.left
2. cur 不是 root,cur 是 parent.left,则 parent.left = cur.left
3. cur 不是 root,cur 是 parent.right,则 parent.right = cur.left
第二种情况和第一种情况相同,只是方向相反,这里不再画图
3. cur.left != null && cur.right != null
需要使用替换法进行删除,即在它的右子树中寻找中序下的第一个结点(关键码最小),用它的值填补到被删除节点中,再来处理该结点的删除问题
当我们在左右子树都不为空的情况下进行删除,删除该节点会破坏树的结构,因此用替罪羊的方法来解决,实际删除的过程还是上面的两种情况,这里还是用到了搜索二叉树的性质
public void remove(Node parent,Node cur) {
if(cur.left == null) {
if(cur == root) {
root = cur.right;
}else if(cur == parent.left) {
parent.left = cur.right;
}else {
parent.right = cur.right;
}
}else if(cur.right == null) {
if(cur == root) {
root = cur.left;
}else if(cur == parent.left) {
parent.left = cur.left;
}else {
parent.right = cur.left;
}
}else {
Node targetParent = cur;
Node target = cur.right;
while (target.left != null) {
targetParent = target;
target = target.left;
}
cur.val = target.val;
if(target == targetParent.left) {
targetParent.left = target.right;
}else {
targetParent.right = target.right;
}
}
}
public void removeKey(int key) {
if(root == null) {
return;
}
Node cur = root;
Node parent = null;
while (cur != null) {
if(cur.val == key) {
remove(parent,cur);
return;
}else if(cur.val < key){
parent = cur;
cur = cur.right;
}else {
parent = cur;
cur = cur.left;
}
}
}⑤性能分析
插入和删除操作都必须先查找,查找效率代表了二叉搜索树中各个操作的性能。
对有n个结点的二叉搜索树,若每个元素查找的概率相等,则二叉搜索树平均查找长度是结点在二叉搜索树的深度 的函数,即结点越深,则比较次数越多。
但对于同一个关键码集合,如果各关键码插入的次序不同,可能得到不同结构的二叉搜索树:
最优情况下,二叉搜索树为完全二叉树,其平均比较次数为:
最差情况下,二叉搜索树退化为单支树,其平均比较次数为:
⑥完整代码
public class TextDemo {
public static class Node {
public int val;
public Node left;
public Node right;
public Node (int val) {
this.val = val;
}
}
public Node root;
/**
* 查找
* @param key
*/
public Node search(int key) {
Node cur = root;
while (cur != null) {
if(cur.val == key) {
return cur;
}else if(cur.val < key) {
cur = cur.right;
}else {
cur = cur.left;
}
}
return null;
}
/**
*
* @param key
* @return
*/
public boolean insert(int key) {
Node node = new Node(key);
if(root == null) {
root = node;
return true;
}
Node cur = root;
Node parent = null;
while(cur != null) {
if(cur.val == key) {
return false;
}else if(cur.val < key) {
parent = cur;
cur = cur.right;
}else {
parent = cur;
cur = cur.left;
}
}
//parent
if(parent.val > key) {
parent.left = node;
}else {
parent.right = node;
}
return true;
}
public void remove(Node parent,Node cur) {
if(cur.left == null) {
if(cur == root) {
root = cur.right;
}else if(cur == parent.left) {
parent.left = cur.right;
}else {
parent.right = cur.right;
}
}else if(cur.right == null) {
if(cur == root) {
root = cur.left;
}else if(cur == parent.left) {
parent.left = cur.left;
}else {
parent.right = cur.left;
}
}else {
Node targetParent = cur;
Node target = cur.right;
while (target.left != null) {
targetParent = target;
target = target.left;
}
cur.val = target.val;
if(target == targetParent.left) {
targetParent.left = target.right;
}else {
targetParent.right = target.right;
}
}
}
public void removeKey(int key) {
if(root == null) {
return;
}
Node cur = root;
Node parent = null;
while (cur != null) {
if(cur.val == key) {
remove(parent,cur);
return;
}else if(cur.val < key){
parent = cur;
cur = cur.right;
}else {
parent = cur;
cur = cur.left;
}
}
}
}以上就是Java二叉搜索树的增、插、删和创建示例详解的详细内容,更多请关注php中文网其它相关文章!
