题目描述
实现一个函数,检查二叉树是否平衡。在这个问题中,平衡树的定义如下:任意一个节点,其两棵子树的高度差不超过 1。
示例 1:
给定二叉树 [3,9,20,null,null,15,7]
示例 2:
给定二叉树 [1,2,2,3,3,null,null,4,4]
解法
方法一:递归(后序遍历)
我们设计一个函数 $dfs(root)$,它的作用是返回以 $root$ 为根节点的树的高度,如果以 $root$ 为根节点的树是平衡树,则返回树的高度,否则返回 $-1$。
函数 $dfs(root)$ 的执行逻辑如下:
如果 $root$ 为空,则返回 $0$;
否则,我们递归调用 $dfs(root.left)$ 和 $dfs(root.right)$,并判断 $dfs(root.left)$ 和 $dfs(root.right)$ 的返回值是否为 $-1$,如果不为 $-1$,则判断 $abs(dfs(root.left) - dfs(root.right)) \leq 1$ 是否成立,如果成立,则返回 $max(dfs(root.left), dfs(root.right)) + 1$,否则返回 $-1$。
在主函数中,我们只需要调用 $dfs(root)$,并判断其返回值是否为 $-1$,如果不为 $-1$,则返回 true,否则返回 false。
时间复杂度 $O(n)$,空间复杂度 $O(n)$。其中 $n$ 是二叉树的节点个数。
Python3 Java C++ Go TypeScript Swift
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19 # Definition for a binary tree node.
# class TreeNode:
# def __init__(self, x):
# self.val = x
# self.left = None
# self.right = None
class Solution :
def isBalanced ( self , root : TreeNode ) -> bool :
def dfs ( root : TreeNode ):
if root is None :
return 0
l , r = dfs ( root . left ), dfs ( root . right )
if l == - 1 or r == - 1 or abs ( l - r ) > 1 :
return - 1
return max ( l , r ) + 1
return dfs ( root ) >= 0
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26 /**
* Definition for a binary tree node.
* public class TreeNode {
* int val;
* TreeNode left;
* TreeNode right;
* TreeNode(int x) { val = x; }
* }
*/
class Solution {
public boolean isBalanced ( TreeNode root ) {
return dfs ( root ) >= 0 ;
}
private int dfs ( TreeNode root ) {
if ( root == null ) {
return 0 ;
}
int l = dfs ( root . left );
int r = dfs ( root . right );
if ( l < 0 || r < 0 || Math . abs ( l - r ) > 1 ) {
return - 1 ;
}
return Math . max ( l , r ) + 1 ;
}
}
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26 /**
* Definition for a binary tree node.
* struct TreeNode {
* int val;
* TreeNode *left;
* TreeNode *right;
* TreeNode(int x) : val(x), left(NULL), right(NULL) {}
* };
*/
class Solution {
public :
bool isBalanced ( TreeNode * root ) {
function < int ( TreeNode * ) > dfs = [ & ]( TreeNode * root ) {
if ( ! root ) {
return 0 ;
}
int l = dfs ( root -> left );
int r = dfs ( root -> right );
if ( l == -1 || r == -1 || abs ( l - r ) > 1 ) {
return -1 ;
}
return max ( l , r ) + 1 ;
};
return dfs ( root ) >= 0 ;
}
};
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29 /**
* Definition for a binary tree node.
* type TreeNode struct {
* Val int
* Left *TreeNode
* Right *TreeNode
* }
*/
func isBalanced ( root * TreeNode ) bool {
var dfs func ( * TreeNode ) int
dfs = func ( root * TreeNode ) int {
if root == nil {
return 0
}
l , r := dfs ( root . Left ), dfs ( root . Right )
if l == - 1 || r == - 1 || abs ( l - r ) > 1 {
return - 1
}
return max ( l , r ) + 1
}
return dfs ( root ) >= 0
}
func abs ( x int ) int {
if x < 0 {
return - x
}
return x
}
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28 /**
* Definition for a binary tree node.
* class TreeNode {
* val: number
* left: TreeNode | null
* right: TreeNode | null
* constructor(val?: number, left?: TreeNode | null, right?: TreeNode | null) {
* this.val = (val===undefined ? 0 : val)
* this.left = (left===undefined ? null : left)
* this.right = (right===undefined ? null : right)
* }
* }
*/
function isBalanced ( root : TreeNode | null ) : boolean {
const dfs = ( root : TreeNode | null ) : number => {
if ( ! root ) {
return 0 ;
}
const l = dfs ( root . left );
const r = dfs ( root . right );
if ( l === - 1 || r === - 1 || Math . abs ( l - r ) > 1 ) {
return - 1 ;
}
return Math . max ( l , r ) + 1 ;
};
return dfs ( root ) >= 0 ;
}
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31 /* class TreeNode {
* var val: Int
* var left: TreeNode?
* var right: TreeNode?
*
* init(_ val: Int) {
* self.val = val
* self.left = nil
* self.right = nil
* }
* }
*/
class Solution {
func isBalanced ( _ root : TreeNode ?) -> Bool {
return dfs ( root ) >= 0
}
private func dfs ( _ root : TreeNode ?) -> Int {
guard let root = root else {
return 0
}
let leftHeight = dfs ( root . left )
let rightHeight = dfs ( root . right )
if leftHeight < 0 || rightHeight < 0 || abs ( leftHeight - rightHeight ) > 1 {
return - 1
}
return max ( leftHeight , rightHeight ) + 1
}
}
