LeetCode - Medium - 222-优快云博客

本文链接：https://blog.youkuaiyun.com/2401_84092903/article/details/138780428

Topic

Binary Search
Tree

Description

https://leetcode.com/problems/count-complete-tree-nodes/

Given the root of a complete binary tree, return the number of the nodes in the tree.

According to Wikipedia, every level, except possibly the last, is completely filled in a complete binary tree, and all nodes in the last level are as far left as possible. It can have between 1 and 2 h 2^h 2h nodes inclusive at the last level h.

Design an algorithm that runs in less than O(n) time complexity.

Example 1:

Input: root = [1,2,3,4,5,6]

Output: 6

Example 2:

Input: root = []

Output: 0

Example 3:

Input: root = [1]

Output: 1

Constraints:

The number of nodes in the tree is in the range [ 0 , 5 ∗ 1 0 4 ] [0, 5 * 10^4] [0,5∗104].
0 < = N o d e . v a l < = 5 ∗ 1 0 4 0 <= Node.val <= 5 * 10^4 0<=Node.val<=5∗104
The tree is guaranteed to be complete.

Analysis

一个完整的完全树的个数： 1 + 2 + 4 + 8 + . . . + 2 h − 1 1 + 2 + 4 + 8 +… + 2^{h-1} 1+2+4+8+…+2h−1

显然，加法式是以1为首项，公比为2，项个数为h 的等比数列的求和式。

代入求和公式得：

S h = a 1 ( 1 − q h ) 1 − q = 2 h − 1 S_h= \frac {a_1(1-q^h)} {1-q}=2^h-1 Sh=1−qa1(1−qh)=2h−1

换成编程语言S = 1 << h - 1

解题核心思想：根据节点的左右子树的高度比较得出谁是更可能是完整的完全树，谁就能直接用求和公式得出子树的个数，然后在另一个子树递归刚才的过程求个数，最后将递归结果累加得出结果。

方法一：

The height of a tree can be found by just going left. Let a single node tree have height 0. Find the height h of the whole tree. If the whole tree is empty, i.e., has height -1, there are 0 nodes.

Otherwise check whether the height of the right subtree is just one less than that of the whole tree, meaning left and right subtree have the same height.

If yes, then the last node on the last tree row is in the right subtree and the left subtree is a full tree of height h-1. So we take the 2^h-1 nodes of the left subtree plus the 1 root node plus recursively the number of nodes in the right subtree.

If no, then the last node on the last tree row is in the left subtree and the right subtree is a full tree of height h-2. So we take the 2^(h-1)-1 nodes of the right subtree plus the 1 root node plus recursively the number of nodes in the left subtree.

Since I halve the tree in every recursive step, I have O(log(n)) steps. Finding a height costs O(log(n)). So overall O(log(n)^2).

Link

方法二：个人对方法一作出稍微修改，增加可读性。

方法三：方法一的迭代版本。

方法四：看似暴力计算却暗含优化版。

That would be O(n). But… the actual solution has a gigantic optimization. It first walks all the way left and right to determine the height and whether it’s a full tree, meaning the last row is full. If so, then the answer is just 2^height-1. And since always at least one of the two recursive calls is such a full tree, at least one of the two calls immediately stops. Again we have runtime O(log(n)^2).