hdu5452 Minimum Cut(最近公共祖先LCA+差分前缀和)
Given a simple unweighted graph
G (an undirected graph containing no loops nor multiple edges) with
n nodes and
m edges. Let
T be a spanning tree of
G .
We say that a cut in G respects T if it cuts just one edges of T .
Since love needs good faith and hypocrisy return for only grief, you should find the minimum cut of graph G respecting the given spanning tree T .
We say that a cut in G respects T if it cuts just one edges of T .
Since love needs good faith and hypocrisy return for only grief, you should find the minimum cut of graph G respecting the given spanning tree T .
Input
The input contains several test cases.
The first line of the input is a single integer t (1≤t≤5) which is the number of test cases.
Then t test cases follow.
Each test case contains several lines.
The first line contains two integers n (2≤n≤20000) and m (n−1≤m≤200000) .
The following n−1 lines describe the spanning tree T and each of them contains two integers u and v corresponding to an edge.
Next m−n+1 lines describe the undirected graph G and each of them contains two integers u and v corresponding to an edge which is not in the spanning tree T .
The first line of the input is a single integer t (1≤t≤5) which is the number of test cases.
Then t test cases follow.
Each test case contains several lines.
The first line contains two integers n (2≤n≤20000) and m (n−1≤m≤200000) .
The following n−1 lines describe the spanning tree T and each of them contains two integers u and v corresponding to an edge.
Next m−n+1 lines describe the undirected graph G and each of them contains two integers u and v corresponding to an edge which is not in the spanning tree T .
Output
For each test case, you should output the minimum cut of graph
G respecting the given spanning tree
T .
Sample Input
1 4 5 1 2 2 3 3 4 1 3 1 4
Sample Output
Case #1: 2
http://acm.hdu.edu.cn/showproblem.php?pid=5452
给定一个图的一棵生成树然后给出一些其他的边,没有重边和自环,问在取且仅取一条树边的前提下,图的最小割边的数量是多少?
割边的定义是去掉这几条边可以使连通图不连通。
感觉理解是很重要的,不管是题意还是做法。
对于每条不是树上的边<a, b>, a节点加1, b节点加1,LCA(a, b)减 2,对每颗子树求和。
首先,生成树肯定是一颗经过图中所有点的树。那么,要使图中某两点断连,去掉的边必然包括生成树中的一条或几条边。而题目要求是去且去掉一条,所以可以枚举去掉哪一条树边。
明确w[p]的定义:使p和fa[p]断开所最少需要去掉的非树边的边数。所以没有w[0]。
LCA(a, b)减 2是因为当前枚举的这条去掉的边是不能对LCA(a, b)以及它的父父父…节点造成影响的,在通过dfs函数将子节点值累加到父节点时,+1+1-2,可以消去了。
这个dfs写得真心不错,把原来要用树链剖分还是树形dp的部分直接简化了。
#include<iostream>
#include<algorithm>
#include<string>
#include<map>//int dx[4]={0,0,-1,1};int dy[4]={-1,1,0,0};
#include<set>//int gcd(int a,int b){return b?gcd(b,a%b):a;}
#include<vector>
#include<cmath>
#include<queue>
#include<string.h>
#include<stdlib.h>
#include<cstdio>
#define mod 1e9+7
#define ll long long
using namespace std;
vector<int> g[20005],t[20005];
int fa[20005],vis[20005],w[20005],minn;
int find(int x) {
return x==fa[x] ? x : (fa[x] = find(fa[x]));
}
void lca(int u,int p){
for(int i=0;i<t[u].size();++i){
int v=t[u][i];
if(v!=p){
lca(v,u);
fa[v]=u;
}
}
vis[u]=1;
for(int i=0;i<g[u].size();++i){
int v=g[u][i];
if(vis[v]==1){
w[u]++;w[v]++;
w[find(v)]-=2; //为什么find(u)是错的?
}
}
}
void dfs(int u,int p){
for(int i=0;i<t[u].size();++i){
int v=t[u][i];
if(v!=p){
dfs(v,u);
w[u]+=w[v];
}
}
if(u!=0)
minn=min(minn,w[u]);
}
int main(){
int tt,cnt=0;
scanf("%d",&tt);
while(tt--){
minn=100000000;
int n,m,a,b;
scanf("%d%d", &n, &m);
memset(w,0,sizeof(w));
memset(vis,0,sizeof(vis));
for(int i=0;i<n;++i)
g[i].clear(),t[i].clear();
for(int i=0;i<n;++i)
fa[i]=i;
for(int i=0;i<n-1;++i){
scanf("%d%d", &a, &b);
a--;b--;
t[a].push_back(b);
t[b].push_back(a);
}
for(int i=n-1;i<m;++i){
scanf("%d%d", &a, &b);
a--;b--;
g[a].push_back(b);
g[b].push_back(a);
}
lca(0,-1);
dfs(0,-1);
printf("Case #%d: %d\n",++cnt,minn+1);
}
return 0;
}