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Performing Depth-First Search (DFS) is a common way to traverse a tree or graph. We'll start from node 0 and explore as far as possible along each branch before backtracking, avoiding restricted nodes and those already visited.
Time Complexity: O(n) because each node is visited once.
Space Complexity: O(n) for storing the adjacency list and visited nodes information.
1var reachableNodes = function(n, edges, restricted) {
2 const restrictedSet = new Set(restricted);
3 const adjList = Array.from({length: n}, () => []);
4 for (const [a, b] of edges) {
5 adjList[a].push(b);
6 adjList[b].push(a);
7 }
8
9 const dfs = (node, visited) => {
10 if (restrictedSet.has(node) || visited.has(node)) return 0;
11 visited.add(node);
12 let count = 1;
13 for (const neighbor of adjList[node]) {
14 count += dfs(neighbor, visited);
15 }
16 return count;
17 };
18
19 return dfs(0, new Set());
20};JavaScript implementation uses an adjacency list created from an array of arrays and utilizes Sets to handle visited and restricted nodes. The DFS function recursively computes reachable nodes.
Breadth-First Search (BFS) can also be used to traverse the tree level-by-level. Starting from node 0, visit all neighbors at the current depth before moving on to nodes at the next depth level, while skipping restricted nodes.
Time Complexity: O(n) because each node is processed once using BFS.
Space Complexity: O(n) for adjacency list and other arrays.
1using System.Collections.Generic;
public class Solution {
public int ReachableNodes(int n, int[][] edges, int[] restricted) {
var restrictedSet = new HashSet<int>(restricted);
var adjList = new Dictionary<int, List<int>>();
for (int i = 0; i < n; i++) adjList[i] = new List<int>();
foreach (var edge in edges) {
adjList[edge[0]].Add(edge[1]);
adjList[edge[1]].Add(edge[0]);
}
Queue<int> queue = new Queue<int>();
bool[] visited = new bool[n];
queue.Enqueue(0);
visited[0] = true;
int count = 0;
while (queue.Count > 0) {
int node = queue.Dequeue();
count++;
foreach (int neighbor in adjList[node]) {
if (!restrictedSet.Contains(neighbor) && !visited[neighbor]) {
visited[neighbor] = true;
queue.Enqueue(neighbor);
}
}
}
return count;
}
}This C# solution implements BFS using a Queue. Starting from node 0, each level of nodes is expanded by pushing non-restricted neighbors onto the queue and marking them as visited.