HDU 3987 && DINIC

很容易发现是网络流的题目，但最少边怎么求呢？初时想不到，但画图后忽然发现可以这样：

求一次网络流最小割后，把满流的边置1，不满流的置INF。再求一次最大流即可。

为什么呢？

是否会存在一些边当前不满流，但有可能是最少边数最少割的边呢？否。因为按照DINIC的求法，每次都是增广容量最少的路，若当前不满流，则必定不是最小割的边，所以只需在满流的边，即可组成最小割的边寻找最少边就可以了。

#include <iostream>
#include <cstring>
#include <cstdio>
#include <algorithm>
using namespace std;

const int INF=0x3f3f3f3f;
const int MAXN=1050;
const int MAXM=400000;

struct Node{
    int from,to,next;
    int cap;
}edge[MAXM];
int tol;

int dep[MAXN];
int head[MAXN];

int n,m;
void init(){
    tol=0;
    memset(head,-1,sizeof(head));
}
void addedge(int u,int v,int w){
    edge[tol].from=u;
    edge[tol].to=v; edge[tol].cap=w;  edge[tol].next=head[u];
    head[u]=tol++;
    edge[tol].from=v;
    edge[tol].to=u;
    edge[tol].cap=0;
    edge[tol].next=head[v];
    head[v]=tol++;
}

int BFS(int start,int end){
    int que[MAXN];
    int front,rear; front=rear=0;
    memset(dep,-1,sizeof(dep));
    que[rear++]=start;
    dep[start]=0;
    while(front!=rear)    {
        int u=que[front++];
        if(front==MAXN)front=0;
        for(int i= head[u];i!=-1; i=edge[i].next){
            int v=edge[i].to;
            if(edge[i].cap>0&& dep[v]==-1){
                dep[v]=dep[u]+1;
                que[rear++]=v;
                if(rear>=MAXN) rear=0;
                if(v==end)return 1;
            }
        }
    }
    return 0;
}
int dinic(int start,int end){
    int res=0;
    int top;
    int stack[MAXN];
    int cur[MAXN];
    while(BFS(start,end)){
        memcpy(cur,head, sizeof(head));
        int u=start;
        top=0;
        while(1){
            if(u==end){
                int min=INF;
                int loc;
               for(int i=0;i<top;i++)
                  if(min>edge [stack[i]].cap) {
                      min=edge [stack[i]].cap;
                      loc=i;
                  }
                for(int i=0;i<top;i++){
                    edge[stack[i]].cap-=min;
                    edge[stack[i]^1].cap+=min;
                }
                res+=min;         
                top=loc;               
                u=edge[stack[top]].from;
            }
            for(int i=cur[u]; i!=-1; cur[u]=i=edge[i].next)
              if(edge[i].cap!=0 && dep[u]+1==dep[edge[i].to])
                 break;
            if(cur[u] !=-1){
                stack [top++]= cur[u];
                u=edge[cur[u]].to;
            }
            else{
                if(top==0) break;
                dep[u]=-1;
                u= edge[stack [--top] ].from;
            }
        }
    }
    return res;
}

int main(){
    int T,cas=0;
    int u,v,w,d;
    scanf("%d",&T);
    while(T--){
        init();
        cas++;
        scanf("%d%d",&n,&m);
        for(int i=0;i<m;i++){
            scanf("%d%d%d%d",&u,&v,&w,&d);
            if(d){
                addedge(v,u,w);
            }
            addedge(u,v,w);
        }
        dinic(0,n-1);
        for(int i=0;i<tol;i+=2){
            if(edge[i].cap==0){
                edge[i].cap=1; edge[i^1].cap=0;
            }
            else {
                edge[i].cap=INF;
                edge[i^1].cap=0;
            }
        }
        int ans=dinic(0,n-1);
        printf("Case %d: ",cas);
        printf("%d
",ans);
    }
    return 0;
}

DINIC的模板

const int INF=0x3f3f3f3f;
const int MAXN=1050;
const int MAXM=400000;

struct Node{
    int from,to,next;
    int cap;
}edge[MAXM];
int tol;

int dep[MAXN];
int head[MAXN];

int n,m;
void init(){
    tol=0;
    memset(head,-1,sizeof(head));
}
void addedge(int u,int v,int w){
    edge[tol].from=u;
    edge[tol].to=v; edge[tol].cap=w;  edge[tol].next=head[u];
    head[u]=tol++;
    edge[tol].from=v;
    edge[tol].to=u;
    edge[tol].cap=0;
    edge[tol].next=head[v];
    head[v]=tol++;
}

int BFS(int start,int end){
    int que[MAXN];
    int front,rear; front=rear=0;
    memset(dep,-1,sizeof(dep));
    que[rear++]=start;
    dep[start]=0;
    while(front!=rear)    {
        int u=que[front++];
        if(front==MAXN)front=0;
        for(int i= head[u];i!=-1; i=edge[i].next){
            int v=edge[i].to;
            if(edge[i].cap>0&& dep[v]==-1){
                dep[v]=dep[u]+1;
                que[rear++]=v;
                if(rear>=MAXN) rear=0;
                if(v==end)return 1;
            }
        }
    }
    return 0;
}
int dinic(int start,int end){
    int res=0;
    int top;
    int stack[MAXN];
    int cur[MAXN];
    while(BFS(start,end)){
        memcpy(cur,head, sizeof(head));
        int u=start;
        top=0;
        while(1){
            if(u==end){
                int min=INF;
                int loc;
               for(int i=0;i<top;i++)
                  if(min>edge [stack[i]].cap) {
                      min=edge [stack[i]].cap;
                      loc=i;
                  }
                for(int i=0;i<top;i++){
                    edge[stack[i]].cap-=min;
                    edge[stack[i]^1].cap+=min;
                }
                res+=min;         
                top=loc;               
                u=edge[stack[top]].from;
            }
            for(int i=cur[u]; i!=-1; cur[u]=i=edge[i].next)
              if(edge[i].cap!=0 && dep[u]+1==dep[edge[i].to])
                 break;
            if(cur[u] !=-1){
                stack [top++]= cur[u];
                u=edge[cur[u]].to;
            }
            else{
                if(top==0) break;
                dep[u]=-1;
                u= edge[stack [--top] ].from;
            }
        }
    }
    return res;
}