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Question
- leetcode: Maximum Depth of Binary Tree | LeetCode OJ
- lintcode: (97) Maximum Depth of Binary Tree
Problem Statement
Given a binary tree, find its maximum depth.
The maximum depth is the number of nodes along the longest path from the root
node down to the farthest leaf node.
Example
Given a binary tree as follow:
1/ \2 3/ \4 5
The maximum depth is 3.
题解 - 递归
树遍历的题最方便的写法自然是递归,不过递归调用的层数过多可能会导致栈空间溢出,因此需要适当考虑递归调用的层数。我们首先来看看使用递归如何解这道题,要求二叉树的最大深度,直观上来讲使用深度优先搜索判断左右子树的深度孰大孰小即可,从根节点往下一层树的深度即自增1,遇到NULL时即返回0。
由于对每个节点都会使用一次maxDepth,故时间复杂度为 O(n), 树的深度最大为 n, 最小为 \log_2 n, 故空间复杂度介于 O(\log n) 和 O(n) 之间。
C++
/*** Definition of TreeNode:* class TreeNode {* public:* int val;* TreeNode *left, *right;* TreeNode(int val) {* this->val = val;* this->left = this->right = NULL;* }* }*/class Solution {public:/*** @param root: The root of binary tree.* @return: An integer*/int maxDepth(TreeNode *root) {if (NULL == root) {return 0;}int left_depth = maxDepth(root->left);int right_depth = maxDepth(root->right);return max(left_depth, right_depth) + 1;}};
Java
/*** Definition of TreeNode:* public class TreeNode {* public int val;* public TreeNode left, right;* public TreeNode(int val) {* this.val = val;* this.left = this.right = null;* }* }*/public class Solution {/*** @param root: The root of binary tree.* @return: An integer.*/public int maxDepth(TreeNode root) {// write your code hereif (root == null) {return 0;}return Math.max(maxDepth(root.left), maxDepth(root.right)) + 1;}}
题解 - 迭代(显式栈)
使用递归可能会导致栈空间溢出,这里使用显式栈空间(使用堆内存)来代替之前的隐式栈空间。从上节递归版的代码(先处理左子树,后处理右子树,最后返回其中的较大值)来看,是可以使用类似后序遍历的迭代思想去实现的。
首先使用后序遍历的模板,在每次迭代循环结束处比较栈当前的大小和当前最大值max_depth进行比较。
C++
/*** Definition of TreeNode:* class TreeNode {* public:* int val;* TreeNode *left, *right;* TreeNode(int val) {* this->val = val;* this->left = this->right = NULL;* }* }*/class Solution {public:/*** @param root: The root of binary tree.* @return: An integer*/int maxDepth(TreeNode *root) {if (NULL == root) {return 0;}TreeNode *curr = NULL, *prev = NULL;stack<TreeNode *> s;s.push(root);int max_depth = 0;while(!s.empty()) {curr = s.top();if (!prev || prev->left == curr || prev->right == curr) {if (curr->left) {s.push(curr->left);} else if (curr->right){s.push(curr->right);}} else if (curr->left == prev) {if (curr->right) {s.push(curr->right);}} else {s.pop();}prev = curr;if (s.size() > max_depth) {max_depth = s.size();}}return max_depth;}};
题解3 - 迭代(队列)
在使用了递归/后序遍历求解树最大深度之后,我们还可以直接从问题出发进行分析,树的最大深度即为广度优先搜索中的层数,故可以直接使用广度优先搜索求出最大深度。
C++
/*** Definition of TreeNode:* class TreeNode {* public:* int val;* TreeNode *left, *right;* TreeNode(int val) {* this->val = val;* this->left = this->right = NULL;* }* }*/class Solution {public:/*** @param root: The root of binary tree.* @return: An integer*/int maxDepth(TreeNode *root) {if (NULL == root) {return 0;}queue<TreeNode *> q;q.push(root);int max_depth = 0;while(!q.empty()) {int size = q.size();for (int i = 0; i != size; ++i) {TreeNode *node = q.front();q.pop();if (node->left) {q.push(node->left);}if (node->right) {q.push(node->right);}}++max_depth;}return max_depth;}};
Java
/*** Definition of TreeNode:* public class TreeNode {* public int val;* public TreeNode left, right;* public TreeNode(int val) {* this.val = val;* this.left = this.right = null;* }* }*/public class Solution {/*** @param root: The root of binary tree.* @return: An integer.*/public int maxDepth(TreeNode root) {if (root == null) {return 0;}int depth = 0;Queue<TreeNode> q = new LinkedList<TreeNode>();q.offer(root);while (!q.isEmpty()) {depth++;int qLen = q.size();for (int i = 0; i < qLen; i++) {TreeNode node = q.poll();if (node.left != null) q.offer(node.left);if (node.right != null) q.offer(node.right);}}return depth;}}
源码分析
广度优先中队列的使用中,qLen 需要在for 循环遍历之前获得,因为它是一个变量。
复杂度分析
最坏情况下空间复杂度为 O(n), 遍历每一个节点,时间复杂度为 O(n),
