310. Minimum Height Trees

310. Minimum Height Trees (Medium)

For an undirected graph with tree characteristics, we can choose any node as the root. The result graph is then a rooted tree. Among all possible rooted trees, those with minimum height are called minimum height trees (MHTs). Given such a graph, write a function to find all the MHTs and return a list of their root labels.

Format
The graph contains n nodes which are labeled from 0 to n - 1. You will be given the number n and a list of undirected edges (each edge is a pair of labels).

You can assume that no duplicate edges will appear in edges. Since all edges are undirected, [0, 1] is the same as [1, 0] and thus will not appear together in edges.

Example 1 :

Input: n = 4, edges = [[1, 0], [1, 2], [1, 3]]

        0
        |
        1
       / \
      2   3 

Output: [1]

Example 2 :

Input: n = 6, edges = [[0, 3], [1, 3], [2, 3], [4, 3], [5, 4]]

     0  1  2
      \ | /
        3
        |
        4
        |
        5 

Output: [3, 4]

Note:

• According to the definition of tree on Wikipedia: “a tree is an undirected graph in which any two vertices are connected by exactly one path. In other words, any connected graph without simple cycles is a tree.”
• The height of a rooted tree is the number of edges on the longest downward path between the root and a leaf.

Related Topics:
Breadth-first Search, Graph

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Solution 1.

Find the leaf nodes, trim them from the graph. Repeat this process until the graph only has 1 or 2 nodes left.

// OJ: https://leetcode.com/problems/minimum-height-trees
// Author: github.com/lzl124631x
// Time: O(V + E)
// Space: O(V + E)
class Solution {
public:
    vector<int> findMinHeightTrees(int n, vector<vector<int>>& E) {
        if (n == 1) return { 0 };
        vector<int> indegree(n), ans;
        vector<vector<int>> G(n);
        for (auto &e : E) {
            int u = e[0], v = e[1];
            indegree[u]++;
            indegree[v]++;
            G[u].push_back(v);
            G[v].push_back(u);
        }
        queue<int> q;
        for (int i = 0; i < n; ++i) {
            if (indegree[i] == 1) q.push(i);
        }
        while (n > 2) {
            int cnt = q.size();
            while (cnt--) {
                int u = q.front();
                q.pop();
                --n;
                for (int v : G[u]) {
                    if (--indegree[v] == 1) q.push(v);
                }
            }
        }
        while (q.size()) {
            ans.push_back(q.front());
            q.pop();
        }
        return ans;
    }
};