Given a binary tree, find the lowest common ancestor (LCA) of two given nodes in the tree.
According to the definition of LCA on Wikipedia: “The lowest common ancestor is defined between two nodes p and q as the lowest node in T that has both p and q as descendants (where we allow a node to be a descendant of itself).”
Given the following binary tree: root = [3,5,1,6,2,0,8,null,null,7,4]
Example 1:
Input: root = [3,5,1,6,2,0,8,null,null,7,4], p = 5, q = 1
Output: 3
Explanation: The LCA of nodes 5 and 1 is 3.
Example 2:
Input: root = [3,5,1,6,2,0,8,null,null,7,4], p = 5, q = 4
Output: 5
Explanation: The LCA of nodes 5 and 4 is 5, since a node can be a descendant of itself according to the LCA definition.
Note:
All of the nodes’ values will be unique.
p and q are different and both values will exist in the binary tree.
Solution in python:
# Definition for a binary tree node.
# class TreeNode:
# def __init__(self, x):
# self.val = x
# self.left = None
# self.right = None
class Solution:
def lowestCommonAncestor(self, root: 'TreeNode', p: 'TreeNode', q: 'TreeNode') -> 'TreeNode':
hashset = {}
def record(node):
if node.left:
hashset[node.left.val] = node
record(node.left)
if node.right:
hashset[node.right.val] = node
record(node.right)
record(root)
hashp = []
parent = p
while parent.val != root.val:
hashp.append(parent.val)
parent = hashset[parent.val]
hashp.append(root.val)
parent = q
while parent.val not in hashp:
parent = hashset[parent.val]
return parentComplexity analysis:
- Time complexity:
O(N) - Space complexity:
O(N)
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