There are N students in a class. Some of them are friends, while some are not. Their friendship is transitive in nature. For example, if A is a direct friend of B, and B is a direct friend of C, then A is an indirect friend of C. And we defined a friend circle is a group of students who are direct or indirect friends.
Given a N*N matrix M representing the friend relationship between students in the class. If M[i][j] = 1, then the ith and jth students are direct friends with each other, otherwise not. And you have to output the total number of friend circles among all the students.
Example 1:
Input: [[1,1,0], [1,1,0], [0,0,1]] Output: 2 Explanation:The 0th and 1st students are direct friends, so they are in a friend circle.
The 2nd student himself is in a friend circle. So return 2.
Example 2:
Input: [[1,1,0], [1,1,1], [0,1,1]] Output: 1 Explanation:The 0th and 1st students are direct friends, the 1st and 2nd students are direct friends,
so the 0th and 2nd students are indirect friends. All of them are in the same friend circle, so return 1.
Note:
- N is in range [1,200].
- M[i][i] = 1 for all students.
- If M[i][j] = 1, then M[j][i] = 1
class Solution { public int findCircleNum(int[][] M) { int n = M.length; int[] anc = new int[n]; for(int i = 0; i < n; i++) anc[i] = i; boolean[][] used = new boolean[n][n]; for(int i = 0; i < n; i++) { for(int j = 0; j < n; j++) { if(i != j && M[i][j] == 1) { if(!used[i][j]) { used[i][j] = true; used[j][i] = true; union(i, j, anc); } } } } Set<Integer> set = new HashSet(); for(int i = 0; i < n; i++) { set.add(find(anc, i)); } return set.size(); } public int find(int[] anc, int x) { if(x != anc[x]) anc[x] = find(anc, anc[x]); return anc[x]; } public void union(int x, int y, int[] anc) { int a = find(anc, x); int b = find(anc, y); anc[a] = b; } }
用union find,如果两个人是朋友就把两个人union了,这样也能保证两个人的indirect朋友也是朋友,最后计算有多少个parent
used数组跳过了i,j中重复的一次