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.
Follow up:
What if the BST is modified (insert/delete operations) often and you need to find the kth smallest frequently? How would you optimize the kthSmallest routine?
Hint:
- Try to utilize the property of a BST.
- What if you could modify the BST node's structure?
- The optimal runtime complexity is O(height of BST).
solution:
Inorder traverse, get kth element from that result. complexity is O(n)
public class Solution {List<Integer> path = new ArrayList<>();public int kthSmallest(TreeNode root, int k) {inorder(root);return path.get(k-1);}public void inorder(TreeNode root) {if(root != null){inorder(root.left);path.add(root.val);inorder(root.right);}}
}