1161. Maximum Level Sum of a Binary Tree
Problem Description
The problem provides us with the root of a binary tree and asks us to find the level with the maximum sum of node values. In a binary tree, each node has at most two children. The root of the tree is at level 1, its children are at level 2, and this pattern continues for subsequent levels. We need to determine the smallest level number x, which has the maximum sum compared to sums of nodes at other levels.
Flowchart Walkthrough
Let’s use the algorithm flowchart to determine the appropriate algorithm for solving Leetcode 1161. Maximum Level Sum of a Binary Tree. You can follow along using the Flowchart. Here’s how we can break it down step by step:
Is it a graph?
- Yes: A binary tree is a specific type of graph.
Is it a tree?
- Yes: Since the problem explicitly states it's a binary tree, it falls into the tree category.
After identifying that the problem involves a tree, the flowchart suggests using Depth-First Search (DFS) as the path terminates at the "DFS" node without further qualification needed for trees.
Conclusion: According to the flowchart, we should use Depth-First Search (DFS) to solve this problem as it directly concerns operations on a tree.
Intuition
To solve this problem, we can use breadth-first search (BFS), which is an algorithm that starts at the tree root and explores all nodes at the present depth level before moving on to nodes at the next depth level. This approach is suitable because it naturally processes nodes level by level. Here's how we can use BFS to solve the problem:
- Initialize a queue that will hold the nodes to be processed, and start with the root node.
- Initialize variables to keep track of the maximum sum (
mx
), the current level (i
), and the level with the maximum sum (ans
). - For each level, we process all nodes on that level to calculate the sum of values at the current level (
s
). - After processing all nodes at the current level, we compare the sum with
mx
. If the sum of the current level exceedsmx
, we updatemx
to this sum and record the current level number asans
since it's the smallest level with this new maximum sum so far. - Continue the process for all levels until all nodes have been processed.
- Return the level number
ans
, which corresponds to the smallest level with the maximal sum.
The provided solution implements this BFS approach efficiently.
Learn more about Tree, Depth-First Search, Breadth-First Search and Binary Tree patterns.
Solution Approach
The Reference Solution Approach applies the breadth-first search (BFS) pattern using a queue to traverse the binary tree level by level. Here is the walk-through of the implementation steps:
-
Start by initializing a queue
q
with the root node of the tree. This queue will store the nodes to be processed for each level. -
We track the maximum sum encountered so far with
mx
, set initially to negative infinity (-inf
), since we want to be able to compare it with sums that can be potentially zero or positive. -
The current level
i
is set to0
at the beginning. It will be incremented as we start processing each level to keep track of the level number. -
We enter a while loop that continues as long as there are nodes left in the queue
q
.-
Increment the level
i
by one as we are beginning to process a new level. -
Initialize a sum
s
for the current level which will be used to add up all node values at this level. -
Use a for loop to process each node at the current level. The range is determined by the number of elements in the queue at the start of the level (
len(q)
).-
Dequeue the front node of the queue and add its value to
s
. -
If the current node has a left child, enqueue the left child.
-
Similarly, if the current node has a right child, enqueue the right child.
-
-
-
After the for loop ends, all nodes at the current level have been processed. We now compare the sum
s
of the current level to the max summx
.- If
s
is greater thanmx
, we updatemx
tos
and record the current level asans
because it's currently the level with the highest sum.
- If
-
Once the queue is empty, meaning all levels have been processed, we exit the while loop.
-
Finally, return the variable
ans
, which holds the smallest level number with the greatest sum.
By using a queue alongside the BFS pattern, the solution ensures that the tree is traversed level by level, summing node values effectively and keeping track of the level with the greatest sum.
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Start EvaluatorExample Walkthrough
Let's consider a small binary tree as an example to illustrate the solution approach:
3 / \ 9 20 / \ 15 7
In this tree, the root node has a value of 3, the root's left child has a value of 9, and the root's right child has a value of 20 which further has two children with values 15 and 7.
Here is how the BFS algorithm would process this tree to find the level with the maximum sum:
-
We start by initializing the queue
q
with the root node (value 3). -
The maximum sum
mx
is initialized to negative infinity, and the current leveli
is set to 0. -
Enter the while loop to begin processing since the queue is not empty.
-
Increment
i
to 1 since we are now on level 1, and initialize the sums
to 0. -
Process all nodes at level 1:
- There is only one node, which is the root node with value 3.
- Add this value to
s
, so nows = 3
. - Enqueue its children (nodes with values 9 and 20) to the queue.
-
Now,
s
is compared tomx
. Sinces
(3) is greater thanmx
(-∞), updatemx
to 3 and mark the current levelans
as 1. -
Move to the next level (level 2):
- Increment
i
to 2. - The sum
s
is reset to 0. - There are two nodes at this level, with values 9 and 20. Process each by dequeuing and adding their values to
s
. s
is now9 + 20 = 29
.- Enqueue the children of these nodes (values 15 and 7) to the queue.
- Increment
-
Now,
s
(29) is compared tomx
(3).s
is larger so we updatemx
to 29 andans
to 2 because this level has the new maximum sum. -
Move to the next level (level 3):
- Increment
i
to 3. - The sum
s
is reset to 0. - There are two nodes at this level, with values 15 and 7. Process each by dequeuing and adding their values to
s
. s
is now15 + 7 = 22
.
- Increment
-
Now,
s
(22) is compared tomx
(29). Sinces
is less thanmx
, we do not updatemx
orans
. -
Since the queue is now empty, we have processed all levels.
-
Return
ans
, which is 2, as level 2 has the maximum sum of 29.
Using the BFS approach outlined above, we traversed the given binary tree level by level, efficiently calculating the sum of node values at each level and identifying the level with the maximum sum.
Solution Implementation
1from collections import deque
2from math import inf
3
4# Definition for a binary tree node.
5class TreeNode:
6 def __init__(self, val=0, left=None, right=None):
7 self.val = val
8 self.left = left
9 self.right = right
10
11class Solution:
12 def maxLevelSum(self, root: Optional[TreeNode]) -> int:
13 # Initialize the queue with the root node
14 queue = deque([root])
15 # Initialize max_sum to negative infinity to ensure any level's sum will be larger
16 max_sum = -inf
17 # Initialize level counter to 0
18 level = 0
19 # Initialize answer to store the level with the maximum sum
20 answer = 0
21
22 # Traverse the tree level by level using breadth-first search
23 while queue:
24 level += 1
25 current_sum = 0
26 # Process all the nodes at the current level
27 for _ in range(len(queue)):
28 # Pop the leftmost node from the queue
29 node = queue.popleft()
30 # Add the node's value to the current level's sum
31 current_sum += node.val
32 # If the node has a left child, add it to the queue
33 if node.left:
34 queue.append(node.left)
35 # If the node has a right child, add it to the queue
36 if node.right:
37 queue.append(node.right)
38 # Update max_sum and answer if the current level's sum is greater than max_sum
39 if max_sum < current_sum:
40 max_sum = current_sum
41 answer = level
42
43 # Return the level that had the maximum sum
44 return answer
45
1class Solution {
2 // Function to find the level of the binary tree with the maximum sum
3 public int maxLevelSum(TreeNode root) {
4 // Queue to store nodes of tree level-wise
5 Deque<TreeNode> queue = new ArrayDeque<>();
6 // Adding the root to the queue as the starting point
7 queue.offer(root);
8
9 // Variables to keep track of the maximum level sum and corresponding level
10 int maxSum = Integer.MIN_VALUE; // Initialized to minimum value
11 int level = 0; // Level counter
12 int maxLevel = 0; // Level with max sum
13
14 // Loop through each level of the tree
15 while (!queue.isEmpty()) {
16 level++; // Increment the level counter
17 int levelSum = 0; // Reset the level sum for the current level
18
19 // Calculate the sum of all nodes at the current level
20 for (int count = queue.size(); count > 0; count--) {
21 TreeNode node = queue.pollFirst(); // Get the next node from the queue
22 levelSum += node.val; // Add the node's value to the level sum
23
24 // Add child nodes to the queue for the next level
25 if (node.left != null) {
26 queue.offer(node.left);
27 }
28 if (node.right != null) {
29 queue.offer(node.right);
30 }
31 }
32
33 // Update max sum and corresponding level if the current level has a greater sum
34 if (maxSum < levelSum) {
35 maxSum = levelSum;
36 maxLevel = level;
37 }
38 }
39
40 // Return the level with the maximum sum
41 return maxLevel;
42 }
43}
44
45// Definition for a binary tree node.
46class TreeNode {
47 int val; // Node's value
48 TreeNode left; // Reference to the left child node
49 TreeNode right; // Reference to the right child node
50
51 // Constructors for TreeNode
52 TreeNode() {}
53 TreeNode(int val) { this.val = val; }
54 TreeNode(int val, TreeNode left, TreeNode right) {
55 this.val = val;
56 this.left = left;
57 this.right = right;
58 }
59}
60
1#include <queue>
2#include <climits> // Include necessary headers
3
4// Definition for a binary tree node.
5struct TreeNode {
6 int val;
7 TreeNode *left;
8 TreeNode *right;
9
10 // Constructors
11 TreeNode() : val(0), left(nullptr), right(nullptr) {}
12 TreeNode(int x) : val(x), left(nullptr), right(nullptr) {}
13 TreeNode(int x, TreeNode *left, TreeNode *right) : val(x), left(left), right(right) {}
14};
15
16class Solution {
17public:
18 // Function to find the level that has the maximum sum in a binary tree.
19 int maxLevelSum(TreeNode* root) {
20 // Using a queue to perform level order traversal
21 std::queue<TreeNode*> nodeQueue{ {root} };
22
23 int maxSum = INT_MIN; // Initialize maxSum to the smallest possible integer
24 int resultLevel = 0; // The level with the max sum
25 int currentLevel = 0; // Current level during level order traversal
26
27 // Continue while there are nodes in the queue
28 while (!nodeQueue.empty()) {
29 ++currentLevel; // Increment level counter
30 int levelSum = 0; // Sum of nodes at the current level
31
32 // Process all nodes of the current level
33 for (int remaining = nodeQueue.size(); remaining > 0; --remaining) {
34 TreeNode* currentNode = nodeQueue.front(); // Get the next node
35 nodeQueue.pop(); // Remove the node from the queue
36 levelSum += currentNode->val; // Update the level's sum
37
38 // Add child nodes to the queue for the next level
39 if (currentNode->left) nodeQueue.push(currentNode->left);
40 if (currentNode->right) nodeQueue.push(currentNode->right);
41 }
42
43 // Update the max sum and result level
44 if (maxSum < levelSum) {
45 maxSum = levelSum;
46 resultLevel = currentLevel;
47 }
48 }
49
50 // Return the level with the max sum
51 return resultLevel;
52 }
53};
54
1// Definition for a binary tree node.
2interface TreeNode {
3 val: number;
4 left: TreeNode | null;
5 right: TreeNode | null;
6}
7
8/**
9 * Calculates the maximum level sum of a binary tree.
10 * @param {TreeNode | null} root - The root node of the binary tree.
11 * @returns {number} The level (1-indexed) with the maximum sum.
12 */
13function maxLevelSum(root: TreeNode | null): number {
14 // Queue to hold nodes to visit using breadth-first search
15 const queue: (TreeNode | null)[] = [root];
16 // Variable to store the level with the maximum sum
17 let maximumLevel = 1;
18 // Variable to keep track of the current maximum sum
19 let maximumSum = Number.NEGATIVE_INFINITY;
20 // Height starts at 1, as levels are 1-indexed
21 let height = 1;
22
23 // Loop until the queue is empty
24 while (queue.length !== 0) {
25 // Get the number of nodes in the current level
26 let levelSize = queue.length;
27 // Initialize sum for the current level
28 let levelSum = 0;
29
30 // Process all nodes for the current level
31 for (let i = 0; i < levelSize; i++) {
32 // Remove the first node from the queue
33 const node = queue.shift();
34 if (node) {
35 // Add the node's value to the level sum
36 levelSum += node.val;
37 // If the left child exists, add it to the queue
38 if (node.left) queue.push(node.left);
39 // If the right child exists, add it to the queue
40 if (node.right) queue.push(node.right);
41 }
42 }
43
44 // Check if the current level has the maximum sum so far
45 if (levelSum > maximumSum) {
46 // Update the maximum sum and the corresponding level
47 maximumSum = levelSum;
48 maximumLevel = height;
49 }
50 // Move to the next level
51 height++;
52 }
53
54 // Return the level that has the maximum sum
55 return maximumLevel;
56}
57
Time and Space Complexity
The given code block is designed to find the level of a binary tree that has the maximum sum of values of its nodes.
Time complexity
The time complexity of the code can be determined by analyzing the operations performed for each node in the tree:
- The
while
loop will run once for each level of the tree. - Inside this loop, a
for
loop iterates through all nodes at the current level. Since each node is visited exactly once during the BFS traversal, all the nodes in the tree will be accounted for.
Thus, if there are N
nodes in the tree, the code has a time complexity of O(N)
as each node is processed once.
Space complexity
The space complexity is dependent on the storage used throughout the algorithm:
- The queue
q
holds the nodes at the current level being processed. In the worst case, this is equal to the maximum width of the tree, which occurs at the level with the most nodes. - The maximum number of nodes at any level of a binary tree could be up to
N/2
(in a complete binary tree).
Therefore, the space complexity is O(N)
in the worst case, because of the queue.
Learn more about how to find time and space complexity quickly using problem constraints.
In a binary min heap, the minimum element can be found in:
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