leetcode 310: Minimum Height Trees

For a 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:

Given n = 4, edges = [[1, 0], [1, 2], [1, 3]]

return [1]

Example 2:

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

return [3, 4]

Note:

(1) 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.”

(2) The height of a rooted tree is the number of edges on the longest downward path between the root and a leaf.

思路：

（最初想法：以任意一个点为根节点，然后广度优先遍历图，找到最小深度，时间复杂度O(N*(N+E))，结果超时）

后参考http://www.cnblogs.com/grandyang/p/5000291.html

从叶节点开始，一层一层深入到中心，最后剩余的节点（小于两个）即为结果集；

注意只有一个点的情况；

 1 class Solution {
 2 public:
 3     vector<int> findMinHeightTrees(int n, vector<pair<int, int>>& edges) {
 4         vector<vector<int>> g(n,vector<int>());
 5         vector<int> d(n,0);
 6         int len = edges.size();
 7         for(int i=0;i<len;i++)
 8         {
 9             int a = edges[i].first;
10             int b = edges[i].second;
11             g[a].push_back(b);
12             g[b].push_back(a);
13             d[a]++;
14             d[b]++;
15         }
16         queue<int> q;
17         for(int i=0;i<n;i++)
18         {
19             if(d[i]==1)
20                 q.push(i);
21         }
22         while(n>2)
23         {
24             int len2 = q.size();
25             for(int i=0;i<len2;i++)
26             {
27                  n--;
28                  int t = q.front();
29                  q.pop();
30                  for(int j=0;j<g[t].size();j++)
31                  {
32                      d[g[t][j]]--;
33                      if(d[g[t][j]]==1)
34                         q.push(g[t][j]);
35                  }
36             }
37         }
38         vector<int> ans;
39         while(!q.empty())
40         {
41             ans.push_back(q.front());
42             q.pop();
43         }
44         if(ans.size()==0)
45             ans.push_back(0);
46         return ans;
47     }
48 };

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