QwQ题目太长 这里就不复制了
这个题...算是个比较经典的平面图最小割变成对偶图的最短路了QwQ
首先考虑最小割应该怎么做。
有一个性质,就是每个点的海拔要么是1,要么是0
QwQ不过这个我不会证明啊
那么既然知道了这个性质,我们对于地图上的每个点,实际上就是划分成两个集合,一个是(1),一个是(0)
那么直接最小割就行了
// luogu-judger-enable-o2
#include<iostream>
#include<cstdio>
#include<algorithm>
#include<cstring>
#include<cmath>
#include<queue>
using namespace std;
inline int read()
{
int x=0,f=1;char ch=getchar();
while (!isdigit(ch)){if (ch=='-') f=-1;ch=getchar();}
while (isdigit(ch)){x=(x<<1)+(x<<3)+ch-'0';ch=getchar();}
return x*f;
}
const int maxn = 110*110;
const int maxm = 1e6+1e2;
const int inf = 1e9;
int point[maxn];
int nxt[maxm],to[maxm],val[maxm];
int cnt=1;
int h[maxn];
queue<int> q;
int n,m;
int s,t;
void addedge(int x,int y,int w)
{
nxt[++cnt]=point[x];
to[cnt]=y;
val[cnt]=w;
point[x]=cnt;
}
void insert(int x,int y,int w)
{
addedge(x,y,w);
addedge(y,x,0);
}
bool bfs(int s)
{
memset(h,-1,sizeof(h));
h[s]=0;
q.push(s);
while (!q.empty())
{
int x = q.front();
q.pop();
for (int i=point[x];i;i=nxt[i])
{
int p = to[i];
if (val[i]>0 && h[p]==-1)
{
h[p]=h[x]+1;
q.push(p);
}
}
}
if (h[t]==-1) return false;
else return true;
}
int dfs(int x,int low)
{
if (x==t || low==0) return low;
int totflow=0;
for (int i=point[x];i;i=nxt[i])
{
int p = to[i];
if (val[i]>0 && h[p]==h[x]+1)
{
int tmp = dfs(p,min(low,val[i]));
low-=tmp;
totflow+=tmp;
val[i]-=tmp;
val[i^1]+=tmp;
if (low==0) return totflow;
}
}
if (low>0) h[x]=-1;
return totflow;
}
int dinic()
{
int ans=0;
while (bfs(s))
{
ans=ans+dfs(s,inf);
}
return ans;
}
int main()
{
n=read();
n++;
s=1;
t=n*n;
for (int i=1;i<=n;i++)
{
//int now =(i-1)*n;
for (int j=1;j<n;j++)
{
int x = read();
//cout<<x<<endl;
insert((i-1)*n+j,(i-1)*n+j+1,x);
//cout<<(i-1)*n+j<<" "<<(i-1)*n+j+1<<endl;
}
}
for (int i=1;i<n;i++)
for (int j=1;j<=n;j++)
{
int x = read();
insert((i-1)*n+j,i*n+j,x);
}
for (int i=1;i<=n;i++)
{
for (int j=1;j<n;j++)
{
int x = read();
insert((i-1)*n+j+1,(i-1)*n+j,x);
}
}
for (int i=1;i<n;i++)
for (int j=1;j<=n;j++)
{
int x = read();
insert(i*n+j,(i-1)*n+j,x);
}
cout<<dinic()<<endl;
return 0;
}
不过这个最小割的复杂度是爆炸的,显然没法通过这个题,那么我们这时候就需要用到一个很关键的性质了
平面图最小割等于对偶图的最短路
那么什么是对偶图呢?
简单来说,就是把原图的每个封闭面,看成一个点,然后原图的每一种割,对应着新图(s到t)的一条路径
但是QwQ这里先留跟个坑,就是关于边的方向的问题....这里还不是很理解呢
转化成新图,建好图之后,直接从(S)开始跑最短路,(dis[t])就是答案
一般原图的st和新图的st成对角线的关系
#include<iostream>
#include<cstdio>
#include<algorithm>
#include<cstring>
#include<cmath>
#define pa pair<long long,long long>
#include<queue>
using namespace std;
inline long long read()
{
long long x=0,f=1;char ch=getchar();
while (!isdigit(ch)){if (ch=='-') f=-1;ch=getchar();}
while (isdigit(ch)){x=(x<<1)+(x<<3)+ch-'0';ch=getchar();}
return x*f;
}
const int maxn = 510;
const int N = maxn*maxn;
const int maxm = 2e6+1e2;
int a[maxn][maxn][maxn];
int point[N],nxt[maxm],to[maxm];
int cnt;
int vis[N];
int n,m;
long long dis[N],val[maxm];
priority_queue<pa,vector<pa>,greater<pa> > q;
int s,t;
void addedge(int x,int y,long long w){
nxt[++cnt]=point[x];
to[cnt]=y;
val[cnt]=w;
point[x]=cnt;
}
void splay(int s)
{
memset(vis,0,sizeof(vis));
memset(dis,127/3,sizeof(dis));
//cout<<dis[1]<<endl;
dis[s]=0;
q.push(make_pair(0,s));
while (!q.empty())
{
//cout<<1<<endl;
int x = q.top().second;
q.pop();
//cout<<x<<endl;
if (vis[x]) continue;
vis[x]=1;
for (int i=point[x];i;i=nxt[i])
{
int p = to[i];
if (dis[p]>dis[x]+val[i])
{
dis[p]=dis[x]+val[i];
//cout<<dis[p]<<" "<<p<<endl;
q.push(make_pair(dis[p],p));
//cout<<endl;
}
}
}
}
inline int getnum(int x,int y)
{
if (x==0 || y==n) return t;
if (x==n || y==0 ) return s;
return (x-1)*(n-1)+y;
}
int main()
{
n=read();
n++;
s=N-6;
t=s+1;
for (int i=1;i<=n;i++)
for (int j=1;j<n;j++)
{
long long x=read();
addedge(getnum(i,j),getnum(i-1,j),x);
//cout<<getnum(i,j)<<" "<<getnum(i-1,j)<<endl;
}
for (int i=1;i<n;i++)
for (int j=1;j<=n;j++)
{
long long x = read();
addedge(getnum(i,j-1),getnum(i,j),x);
//cout<<getnum(i,j-1)<<" "<<getnum(i,j)<<endl;
//cout<<x<<endl;
}
for (int i=1;i<=n;i++)
for (int j=1;j<n;j++)
{
long long x=read();
addedge(getnum(i-1,j),getnum(i,j),x);
}
for (int i=1;i<n;i++)
for (int j=1;j<=n;j++)
{
long long x = read();
addedge(getnum(i,j),getnum(i,j-1),x);
}
splay(s);
cout<<dis[t];
return 0;
}