1305. All Elements in Two Binary Search Trees
Problem Description
In this problem, we are given two binary search trees, root1
and root2
. A binary search tree (BST) is a tree where each node has at most two children, known as the left child and the right child. In a BST, the left subtree of a node contains only nodes with keys less than the node's key, while the right subtree contains only nodes with keys greater than the node's key. Our task is to retrieve all the integers from both trees and return them as a list sorted in ascending order.
Flowchart Walkthrough
For analyzing LeetCode problem 1305, "All Elements in Two Binary Search Trees", let's use the flowchart for decision-making. Here's a step-by-step walkthrough based on the Flowchart:
Is it a graph?
- Yes: Although dealing with binary search trees (BSTs), we can consider each tree as a graph with nodes and edges where each node is a tree node connected to up to two child nodes.
Is it a tree?
- Yes: Definitely, since the problem explicitly involves two binary search trees.
Conclusion: As per the given flowchart, when dealing with tree structures, a Depth-First Search (DFS) is appropriate. DFS will aid in traversing each tree thoroughly to collect all elements, which can then be merged and sorted to find the required result.
Intuition
Given that we're dealing with binary search trees, we can take advantage of their inherent properties to solve this problem efficiently:
-
In-Order Traversal: A key insight is that performing an in-order traversal (Left, Node, Right) on a BST will visit the nodes in ascending order. Therefore, if we perform this traversal on both BSTs, we will get two sorted lists of values. In the given solution, the
dfs
function is a recursive function that conducts an in-order traversal and outputs the visited values into a list. -
Merging Sorted Lists: With two sorted lists from the BSTs, the next step is to merge these lists into one sorted list. This can be done efficiently by maintaining pointers at the front of each list and taking the smaller value from the front of either list at each step. The
merge
function in the given solution employs a two-pointer approach to combine the lists from the two BSTs into a single sorted list.
By breaking down the problem into two simpler subproblems—one focusing on tree traversal to obtain sorted elements and the other on merging sorted lists—we effectively construct a solution that leverages the characteristics of BSTs to achieve the desired result.
Learn more about Tree, Depth-First Search, Binary Search Tree, Binary Tree and Sorting patterns.
Solution Approach
The solution approach is divided into two main parts: performing in-order traversal on both trees to obtain sorted lists, and then merging these two sorted lists into one.
-
In-Order Traversal: The first step involves writing a
dfs
(Depth-First Search) function to perform an in-order traversal of a binary search tree. The function takes a node (initially the root of a BST) and a list as arguments. If the current node is null, it returns immediately, as it signifies the end of a branch. Otherwise, it recursively calls itself for the left child, appends the node's value to the list, and then recursively calls itself for the right child. This approach ensures that each tree's values are added to their respective lists (t1
andt2
) in ascending order. The traversal is defined by the following recursive algorithm:def dfs(root, t): if root is None: return dfs(root.left, t) t.append(root.val) dfs(root.right, t)
-
Merging Sorted Lists: After obtaining the sorted lists, the second part of the approach involves merging these two lists into one. The
merge
function introduces two pointers (i
andj
), starting at 0, pointing to the beginnings oft1
andt2
respectively. It compares the values att1[i]
andt2[j]
and appends the lesser value to theans
list, incrementing the corresponding pointer (i++
orj++
). If one list is exhausted before the other (one pointer reaches the end of its list), the remaining elements of the other list are appended toans
. This merging process yields a new sorted list resulting from combiningt1
andt2
. Here's the merging logic:def merge(t1, t2): ans = [] i = j = 0 while i < len(t1) and j < len(t2): if t1[i] <= t2[j]: ans.append(t1[i]) i += 1 else: ans.append(t2[j]) j += 1 while i < len(t1): ans.append(t1[i]) i += 1 while j < len(t2): ans.append(t2[j]) j += 1 return ans
The algorithm comes together in the getAllElements
method. It initializes two empty lists, t1
and t2
, and then calls dfs
on both root1
and root2
, filling t1
and t2
with each tree's elements. Afterward, it calls merge
on these lists to produce a single sorted list containing all the elements from both BSTs, which is finally returned.
By systematically dividing the problem into manageable subproblems, applying appropriate data structures (lists) and algorithms (DFS for tree traversal, merging for combining lists), the solution efficiently merges the elements from two BSTs into a sorted order.
Ready to land your dream job?
Unlock your dream job with a 2-minute evaluator for a personalized learning plan!
Start EvaluatorExample Walkthrough
Let's illustrate the solution approach using a small example. Consider the following two binary search trees:
Tree 1 Tree 2 3 2 / \ / \ 1 4 1 7
- In-Order Traversal:
First, we perform an in-order traversal on Tree 1:
- Visit left subtree: 1
- Visit root: 3
- Visit right subtree: 4
The sorted list t1
for Tree 1 is thus [1, 3, 4]
.
Next, we perform the same traversal on Tree 2:
- Visit left subtree: 1
- Visit root: 2
- Visit right subtree: 7
The sorted list t2
for Tree 2 is [1, 2, 7]
.
- Merging Sorted Lists:
Now we have two sorted lists, t1 = [1, 3, 4]
and t2 = [1, 2, 7]
. We merge them into one list as follows:
- Initialize
ans = []
,i = 0
,j = 0
- Compare
t1[i]
andt2[j]
:1 <= 1
, appendt1[i]
toans
, incrementi
. Nowans = [1]
. - Compare new
t1[i]
andt2[j]
:3 > 1
, appendt2[j]
toans
, incrementj
. Nowans = [1, 1]
. - Compare new
t1[i]
andt2[j]
:3 > 2
, appendt2[j]
toans
, incrementj
. Nowans = [1, 1, 2]
. - Compare new
t1[i]
andt2[j]
:3 <= 7
, appendt1[i]
toans
, incrementi
. Nowans = [1, 1, 2, 3]
. - Compare new
t1[i]
andt2[j]
:4 <= 7
, appendt1[i]
toans
, incrementi
. Nowans = [1, 1, 2, 3, 4]
. i
has reached the end oft1
, so we append the remaining elements oft2
([7]
) toans
. Nowans = [1, 1, 2, 3, 4, 7]
.
The merged sorted list ans
is [1, 1, 2, 3, 4, 7]
, and that will be our final output. The solution approach leverages efficient in-order traversal to generate sorted lists from each tree, followed by a streamlined merge process, thus solving the problem effectively.
Solution Implementation
1# Definition for a binary tree node.
2class TreeNode:
3 def __init__(self, val=0, left=None, right=None):
4 self.val = val
5 self.left = left
6 self.right = right
7
8class Solution:
9 def getAllElements(self, root1: TreeNode, root2: TreeNode) -> List[int]:
10 # Helper function to perform in-order traversal of the binary tree
11 # and store the elements in a list.
12 def in_order_traversal(root: TreeNode, elements: List[int]):
13 if root is None:
14 return
15 in_order_traversal(root.left, elements)
16 elements.append(root.val)
17 in_order_traversal(root.right, elements)
18
19 # Helper function to merge two sorted lists into a single sorted list.
20 def merge_lists(sorted_list1: List[int], sorted_list2: List[int]) -> List[int]:
21 merged_list = []
22 i, j = 0, 0
23 # Interleave elements from both lists in a sorted manner.
24 while i < len(sorted_list1) and j < len(sorted_list2):
25 if sorted_list1[i] <= sorted_list2[j]:
26 merged_list.append(sorted_list1[i])
27 i += 1
28 else:
29 merged_list.append(sorted_list2[j])
30 j += 1
31 # Append any remaining elements from the first list
32 while i < len(sorted_list1):
33 merged_list.append(sorted_list1[i])
34 i += 1
35 # Append any remaining elements from the second list
36 while j < len(sorted_list2):
37 merged_list.append(sorted_list2[j])
38 j += 1
39 return merged_list
40
41 # Initialize lists to store the elements from each tree.
42 tree1_elements, tree2_elements = [], []
43 # Perform in-order traversal on both trees to get sorted elements.
44 in_order_traversal(root1, tree1_elements)
45 in_order_traversal(root2, tree2_elements)
46 # Merge the sorted lists and return the result.
47 return merge_lists(tree1_elements, tree2_elements)
48
1class Solution {
2 // This method returns a list of all elements from two binary tree roots.
3 public List<Integer> getAllElements(TreeNode root1, TreeNode root2) {
4 List<Integer> tree1Elements = new ArrayList<>();
5 List<Integer> tree2Elements = new ArrayList<>();
6 // Perform in-order traversal to get elements in non-descending order.
7 inorderTraversal(root1, tree1Elements);
8 inorderTraversal(root2, tree2Elements);
9 // Merge two sorted lists into one sorted list.
10 return mergeSortedLists(tree1Elements, tree2Elements);
11 }
12
13 // Helper method to perform a DFS in-order traversal.
14 private void inorderTraversal(TreeNode root, List<Integer> elements) {
15 if (root == null) {
16 return;
17 }
18 inorderTraversal(root.left, elements); // Visit left subtree
19 elements.add(root.val); // Visit current node
20 inorderTraversal(root.right, elements); // Visit right subtree
21 }
22
23 // Helper method to merge two sorted lists.
24 private List<Integer> mergeSortedLists(List<Integer> list1, List<Integer> list2) {
25 List<Integer> mergedList = new ArrayList<>();
26 int i = 0, j = 0;
27 // Merge elements while there are elements in both lists.
28 while (i < list1.size() && j < list2.size()) {
29 if (list1.get(i) <= list2.get(j)) {
30 mergedList.add(list1.get(i++)); // Add from list1 and increment i
31 } else {
32 mergedList.add(list2.get(j++)); // Add from list2 and increment j
33 }
34 }
35 // Add any remaining elements in list1 to the merged list.
36 while (i < list1.size()) {
37 mergedList.add(list1.get(i++));
38 }
39 // Add any remaining elements in list2 to the merged list.
40 while (j < list2.size()) {
41 mergedList.add(list2.get(j++));
42 }
43 return mergedList;
44 }
45}
46
1#include <vector>
2
3// Definition for a binary tree node.
4struct TreeNode {
5 int val;
6 TreeNode *left;
7 TreeNode *right;
8 TreeNode() : val(0), left(nullptr), right(nullptr) {}
9 TreeNode(int x) : val(x), left(nullptr), right(nullptr) {}
10 TreeNode(int x, TreeNode *left, TreeNode *right) : val(x), left(left), right(right) {}
11};
12
13class Solution {
14public:
15 // Retrieves all elements from both trees and returns them in a sorted vector.
16 vector<int> getAllElements(TreeNode* root1, TreeNode* root2) {
17 vector<int> elementsTree1;
18 vector<int> elementsTree2;
19
20 // Traverse both trees and collect their values
21 depthFirstSearch(root1, elementsTree1);
22 depthFirstSearch(root2, elementsTree2);
23
24 // Merge the collected values into a single sorted vector
25 return merge(elementsTree1, elementsTree2);
26 }
27
28 // Helper function to perform in-order depth-first search on the tree
29 // and collect values in a vector.
30 void depthFirstSearch(TreeNode* root, vector<int>& elements) {
31 if (!root) return;
32 depthFirstSearch(root->left, elements); // Visit left subtree
33 elements.push_back(root->val); // Visit node
34 depthFirstSearch(root->right, elements); // Visit right subtree
35 }
36
37 // Helper function to merge two sorted vectors into one sorted vector.
38 vector<int> merge(const vector<int>& tree1Elements, const vector<int>& tree2Elements) {
39 vector<int> mergedElements;
40 int i = 0, j = 0;
41
42 // Merge the two vectors until one is fully traversed.
43 while (i < tree1Elements.size() && j < tree2Elements.size()) {
44 if (tree1Elements[i] <= tree2Elements[j]) {
45 mergedElements.push_back(tree1Elements[i++]);
46 } else {
47 mergedElements.push_back(tree2Elements[j++]);
48 }
49 }
50
51 // Add the remaining elements from the first vector if any.
52 while (i < tree1Elements.size()) {
53 mergedElements.push_back(tree1Elements[i++]);
54 }
55
56 // Add the remaining elements from the second vector if any.
57 while (j < tree2Elements.size()) {
58 mergedElements.push_back(tree2Elements[j++]);
59 }
60
61 return mergedElements;
62 }
63};
64
1function getAllElements(root1: TreeNode | null, root2: TreeNode | null): number[] {
2 // Initialize the result array which will contain all the elements in sorted order.
3 const result: number[] = [];
4
5 // Use two stacks to perform inorder traversal on both trees simultaneously.
6 const stacks: [TreeNode[], TreeNode[]] = [[], []];
7
8 // Continue the traversal as long as there are nodes to be processed in either stack or trees.
9 while (root1 !== null || stacks[0].length > 0 || root2 !== null || stacks[1].length > 0) {
10 // Inorder traversal on the first tree.
11 while (root1 !== null) {
12 stacks[0].push(root1);
13 root1 = root1.left; // Move to the left child.
14 }
15
16 // Inorder traversal on the second tree.
17 while (root2 !== null && (stacks[0].length === 0 || root2.val < stacks[0][stacks[0].length - 1].val)) {
18 stacks[1].push(root2);
19 root2 = root2.left; // Move to the left child.
20 }
21
22 // Determine which tree's node value to take (the smaller one), and move to the right subtree.
23 if (stacks[0].length === 0 ||
24 (stacks[1].length > 0 && stacks[0][stacks[0].length - 1].val > stacks[1][stacks[1].length - 1].val)) {
25 const { val, right } = stacks[1].pop()!;
26 result.push(val); // Add the value of the node to the result array.
27 root2 = right; // Update root2 to the right child.
28 } else {
29 const { val, right } = stacks[0].pop()!;
30 result.push(val); // Add the value of the node to the result array.
31 root1 = right; // Update root1 to the right child.
32 }
33 }
34
35 // Return the result array containing all the elements from both trees in a sorted order.
36 return result;
37}
38
Time and Space Complexity
The above code consists of two major parts: the Depth-First Search (DFS) for in-order traversal and the Merge step to combine two sorted arrays. Let's analyze each part separately.
DFS In-order Traversal
The DFS function dfs()
is called for each of the two binary trees. It traverses all nodes exactly once in a recursive in-order fashion (left, node, right).
- Time Complexity for each tree: It's
O(n)
forroot1
andO(m)
forroot2
, wheren
andm
represent the number of nodes inroot1
androot2
, respectively. - Space Complexity for each tree: Due to the recursion stack, the space complexity is
O(h1)
forroot1
andO(h2)
forroot2
, whereh1
andh2
are the heights of the trees.
Merge Function
The merge()
function merges two sorted arrays t1
and t2
.
- Time Complexity: As each element from both lists is considered exactly once, the time complexity of this operation is
O(n + m)
. - Space Complexity: We're creating a new list
ans
to store the merged arrays, so the space complexity isO(n + m)
as we are storing alln + m
elements.
Overall Complexity
The total time complexity of getAllElements()
is the sum of the complexities of both parts, dominated by the O(n + m)
complexity of the merge step.
- Time Complexity:
O(n + m)
- To be precise, it can be broken down to
O(n) + O(m) + O(n + m)
, which simplifies toO(n + m)
.
- To be precise, it can be broken down to
The total space complexity is given by the space used to store the traversal results and the merge results, together with the recursion stack space.
- Space Complexity:
O(n + m) + max(O(h1), O(h2))
- Here,
O(n + m)
is for the space needed fort1
,t2
, andans
, andmax(O(h1), O(h2))
accounts for the recursive call stack space which will be at most the height of the taller tree at any instance.
- Here,
Learn more about how to find time and space complexity quickly using problem constraints.
A heap is a ...?
Recommended Readings
Everything About Trees A tree is a type of graph data structure composed of nodes and edges Its main properties are It is acyclic doesn't contain any cycles There exists a path from the root to any node Has N 1 edges where N is the number of nodes in the tree and
https algomonster s3 us east 2 amazonaws com cover_photos dfs svg Depth First Search Prereqs Recursion Review problems recursion_intro Trees problems tree_intro With a solid understanding of recursion under our belts we are now ready to tackle one of the most useful techniques in coding interviews Depth First Search DFS
Binary Search Tree Intro Definition A Binary Search Tree or BST is a rooted binary tree with the value of each internal node being greater than all the values in the respective node's left subtree and less than the ones in its right subtree An empty tree is a BST since it satisfies the
Want a Structured Path to Master System Design Too? Don’t Miss This!