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#include <bits/stdc++.h>
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using namespace std;
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const int N = 1010; // 图的最大点数量
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/**
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共提供两组数据,样例1为不连通用例,样例2为连通用例
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样例1:不连通,5号结点为独立的
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5 4
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1 2
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2 3
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3 4
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1 4
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样例2:连通,不存在独立结点
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5 4
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1 2
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2 3
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3 4
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1 5
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检测各种算法是否能准确获取结果
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*/
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int n; // n个人
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int m; // m个亲戚
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int x, y; // 输入两个人之间的关系
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int p[N]; // 并查集数组
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// 要深入理解这个递归并压缩的过程
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int find(int x) {
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if (p[x] != x) // 如果x不是族长,递归找父亲,副产品就是找回的结果更新掉自己的家族信息。
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p[x] = find(p[x]); // 非常经典的更新,路径压缩大法!
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// 返回族长是谁
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return p[x];
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}
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int cnt;
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int main() {
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// n个人员,m个关系
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cin >> n >> m;
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// 并查集初始化
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for (int i = 1; i <= n; i++) p[i] = i; // 自己是自己的老大
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// 录入m种关系,使用并查集来判断图的连通性
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for (int i = 1; i <= m; i++) {
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cin >> x >> y;
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// 加入并查集
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int px = find(x), py = find(y);
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if (px != py) p[px] = py;
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}
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// 图已经搭好了,接下来看它们根节点是否相同,如只有一个相同的根节点,则说明是一个连通图
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for (int i = 1; i <= n; i++)
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if (p[i] == i) cnt++;
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if (cnt == 1)
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printf("Yes\n");
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else
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printf("No \n");
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return 0;
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}
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