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This approach uses recursion to compare the left subtree and right subtree of the binary tree. For two trees to be mirror images, the following three conditions must be true:
Recursion is an elegant way to check this condition for each node in the tree.
Time Complexity: O(n), where n is the number of nodes in the binary tree, since we traverse every node once.
Space Complexity: O(h), where h is the height of the tree, due to the recursion call stack.
1public class TreeNode {
2 public int val;
3 public TreeNode left;
4 public TreeNode right;
5 public TreeNode(int x) { val = x; }
6}
7
8public class Solution {
9 public bool IsSymmetric(TreeNode root) {
10 return IsMirror(root, root);
11 }
12
13 private bool IsMirror(TreeNode t1, TreeNode t2) {
14 if (t1 == null && t2 == null) return true;
15 if (t1 == null || t2 == null) return false;
16 return (t1.val == t2.val) &&
17 IsMirror(t1.right, t2.left) &&
18 IsMirror(t1.left, t2.right);
19 }
20}This C# solution defines a Solution class with a public method IsSymmetric. The helper method IsMirror checks if two subtrees are mirrors using recursion.
This approach utilizes a queue data structure to iteratively compare nodes in the binary tree. It behaves like the recursive method mirroring trees, but it exchanges recursion for a loop that dequeues two nodes at a time.
Time Complexity: O(n), n being indicative of the number of nodes enumerated.
Space Complexity: O(n), underscored by the queue's need for storing nodes in tandem with iteration.
#include <queue>
using namespace std;
struct TreeNode {
int val;
TreeNode *left;
TreeNode *right;
TreeNode(int x) : val(x), left(NULL), right(NULL) {}
};
class Solution {
public:
bool isSymmetric(TreeNode* root) {
if (!root) return true;
queue<TreeNode*> q;
q.push(root);
q.push(root);
while (!q.empty()) {
TreeNode* t1 = q.front(); q.pop();
TreeNode* t2 = q.front(); q.pop();
if (!t1 && !t2) continue;
if (!t1 || !t2) return false;
if (t1->val != t2->val) return false;
q.push(t1->left);
q.push(t2->right);
q.push(t1->right);
q.push(t2->left);
}
return true;
}
};This C++ solution implements an iterative approach with a queue to interpret and verify the symmetry of a tree. Initial null checks precede looping through node pairs pulled from the queue, verifying their equivalence, and extending comparisons through children pushed onto the queue.