Codeforces Round #479 (Div. 3)——E. Cyclic Components【并查集判环】

You are given an undirected graph consisting of $n$ vertices and $m$ edges. Your task is to find the number of connected components which are cycles.

Here are some definitions of graph theory.

An undirected graph consists of two sets: set of nodes (called vertices) and set of edges. Each edge connects a pair of vertices. All edges are bidirectional (i.e. if a vertex $a$ is connected with a vertex $b$ , a vertex $b$ is also connected with a vertex $a$ ). An edge can't connect vertex with itself, there is at most one edge between a pair of vertices.

Two vertices $u$ and $v$ belong to the same connected component if and only if there is at least one path along edges connecting $u$ and $v$ .

A connected component is a cycle if and only if its vertices can be reordered in such a way that:

the first vertex is connected with the second vertex by an edge,
the second vertex is connected with the third vertex by an edge,
...
the last vertex is connected with the first vertex by an edge,
all the described edges of a cycle are distinct.

A cycle doesn't contain any other edges except described above. By definition any cycle contains three or more vertices.

$\text{[math]}$ There are

6

connected components,

2

of them are cycles:

[7, 10, 16]

and

[5, 11, 9, 15]

Input

The first line contains two integer numbers $n$ and $m$ ( $1 \leq n \leq 2 \cdot 10^{5}$ , $0 \leq m \leq 2 \cdot 10^{5}$ ) — number of vertices and edges.

The following $m$ lines contains edges: edge $i$ is given as a pair of vertices $v_{i}$ , $u_{i}$ ( $1 \leq v_{i}, u_{i} \leq n$ , $u_{i} \neq v_{i}$ ). There is no multiple edges in the given graph, i.e. for each pair ( $v_{i}, u_{i}$ ) there no other pairs ( $v_{i}, u_{i}$ ) and ( $u_{i}, v_{i}$ ) in the list of edges.

Output

Print one integer — the number of connected components which are also cycles.

Note

In the first example only component $[3, 4, 5]$ is also a cycle.

The illustration above corresponds to the second example.

题目分析：就是让你判断有几个元素在一起可以组成一个单环（每个环里的每个元素的度数都为2），用并查集判环就行。

并查集判环：如果元素属于同一个根节点则可以成环。

#include<cstdio>
#include<iostream>
#include<algorithm>
#include<cstring>
using namespace std;
int pre[100010];
void init(int n){
	for(int i=0;i<=n;i++){
		pre[i]=i;
	}
} 
int find(int x){
	if(pre[x]==x) return x;
	else{
		pre[x]=find(pre[x]);
		return pre[x];
	}
}
int join(int x,int y){
	int fx=find(x),fy=find(y);
	if(fx!=fy){
		pre[fx]=fy;
		return 0;//如果两边的根节点相同则说明可以成环 
	}
	else return 1;
}
int du[1000010]; 
int main(){
	int n,m;
	while(~scanf("%d%d",&n,&m)){
		memset(du,0,sizeof(du)); 
		init(n);
		//int ans=0;
		int a[100010],b[100010];
		for(int i=1;i<=m;i++){
			scanf("%d %d",&a[i],&b[i]);
			du[a[i]]++;//记录每一条边的度数 
			du[b[i]]++; 
		}
		//如果只成一个单环则环内每一点的度数都为2 
		int cnt=0;
		for(int i=1;i<=m;i++){
			if(du[a[i]]==2&&du[b[i]]==2&&join(a[i],b[i])){
				cnt++;
			}
		}
		printf("%d\n",cnt); 
	}
	return 0;
}

Codeforces Round #479 (Div. 3)——E. Cyclic Components【并查集判环】

猜你喜欢