Given a binary search tree, write a function kthSmallest to find the kth
smallest element in it.
Note:
You may assume k is always valid, 1 ≤ k ≤ BST's total elements.
/**
* 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:
int kthSmallest(TreeNode* root, int k) {
stack<TreeNode*> nodeStack;
TreeNode* tmp=root;
int kthMin = 0;
int kthValue;
while ((!nodeStack.empty() || tmp!=NULL) && kthMin!=k)
{
while (tmp != NULL)
{
nodeStack.push(tmp);
tmp = tmp->left;
}
tmp = nodeStack.top();
nodeStack.pop();
kthMin++;//对中序遍历稍加修改
kthValue = tmp->val;
tmp = tmp->right;
}
return kthValue;
}
};另外,看了一下网友的解答,非常巧妙。他是先统计左子树上节点个数,如果节点个数小于k,则在右子树上找第k-n-1小的数,如果刚为k则就是当前节点,如果大于k,则继续在左子树上找第k小的数。不过,每次递归都要统计一次节点个数,会不会导致复杂度增加?
int kthSmallest(TreeNode* root, int k) {
if (!root) return 0;
if (k==0) return root->val;
int n=count_size(root->left);
if (k==n+1) return root->val;
if (n>=k){
return kthSmallest(root->left, k);
}
if (n<k){
return kthSmallest(root->right, k-n-1);
}
}
int count_size(TreeNode* root){
if (!root) return 0;
return 1+count_size(root->left)+count_size(root->right);
}