Given a binary tree, return the sum of values of its deepest leaves.
Find the largest depth first, then sum up each node at the largest depth
We can solve this using a recursive DFS approach where we first find the maximum depth of the tree. Then, sum up each node at that maximum depth. This can also be done iteratively using a Stack data structure instead of a recursive approach.
class Solution {
int maxDepth;
HashMap<Integer, List<TreeNode>> map;
public int deepestLeavesSum(TreeNode root) {
if (root == null) return 0;
// We'll keep track of the maximum depth of the tree
maxDepth = 0;
// and a map of nodes at each depth
map = new HashMap<>();
dfs(root, 0);
// return the sum of the nodes at the max depth
List<TreeNode> list = map.get(maxDepth);
int sum = 0;
for (TreeNode n : list) sum += n.val;
return sum;
}
public void dfs(TreeNode node, int depth) {
if (node == null) return;
// add the current node to the map at the given depth
List<TreeNode> list = map.getOrDefault(depth, new ArrayList<>());
list.add(node);
map.put(depth, list);
maxDepth = Math.max(maxDepth, depth);
// continue for each child
dfs(node.left, depth + 1);
dfs(node.right, depth + 1);
}
}Runtime: O(N) where N = number of nodes in the tree
Space: O(N) since we store each node within a HashMap and use recursion to perform DFS
Instead of using extra memory to store each node by its depth, we can iterate in a way that we reach each node at a given depthat the same time. This is an inherent quality of a BFS since you can think of the traversal as a depth by depth traversal of the tree.
public int deepestLeavesSum(TreeNode root) {
if (root != null) q.add(root);
Queue<TreeNode> q = new LinkedList<>();
// We'll sum up the nodes at each depth and the last sum will be at the max depth
int sum = 0;
// represents the number of TreeNodes at the current depth
int curr = 1;
// represents the number of TreeNodes at the next depth
int next = 0;
while (!q.isEmpty()) {
TreeNode n = q.poll();
if (n.left != null) {
q.add(n.left);
next++;
}
if (n.right != null) {
q.add(n.right);
next++;
}
curr--;
sum += n.val;
// If there are no more nodes in the current depth,
// then we have completed a depth and can reset our counters
if (curr == 0) {
curr = next;
next = 0;
if (!q.isEmpty()) {
sum = 0;
}
}
}
return count;
}Runtime: O(N) since we iterate through each depth of the tree
Space: O(max(width)) the peak capacity of the queue is determined by the level with the largest width