题目大意:主人公在玩游戏,他的存档系统坏了,只能从头开始游戏,不能从中途开始,问最少多长时间可以走过所有的流程。
思路:每一条边都要至少走一次,这是流量的下界,源点是游戏的开始,汇点是所有结局。裸的有下界有源汇的费用流。我也不知道为什么要那样建图。。
CODE:
#include <queue>
#include <cstdio>
#include <cstring>
#include <iostream>
#include <algorithm>
#define MAX 1000
#define MAXE 1000010
#define S 0
#define T (MAX - 1)
#define INF 0x3f3f3f3f
using namespace std;
struct MinCostMaxFlow{
int head[MAX],total;
int next[MAXE],aim[MAXE],flow[MAXE],cost[MAXE];
int f[MAX],from[MAX],p[MAX];
bool v[MAX];
MinCostMaxFlow():total(1) {}
void Add(int x,int y,int f,int c) {
next[++total] = head[x];
aim[total] = y;
flow[total] = f;
cost[total] = c;
head[x] = total;
}
void Insert(int x,int y,int f,int c) {
Add(x,y,f,c);
Add(y,x,0,-c);
}
bool SPFA() {
static queue<int> q;
while(!q.empty()) q.pop();
memset(f,0x3f,sizeof(f));
memset(v,false,sizeof(v));
f[S] = 0;
q.push(S);
while(!q.empty()) {
int x = q.front(); q.pop();
v[x] = false;
for(int i = head[x]; i; i = next[i])
if(flow[i] && f[aim[i]] > f[x] + cost[i]) {
f[aim[i]] = f[x] + cost[i];
if(!v[aim[i]])
v[aim[i]] = true,q.push(aim[i]);
from[aim[i]] = x;
p[aim[i]] = i;
}
}
return f[T] != INF;
}
int EdmondsKarp() {
int re = 0;
while(SPFA()) {
int max_flow = INF;
for(int i = T; i != S; i = from[i])
max_flow = min(max_flow,flow[p[i]]);
for(int i = T; i != S; i = from[i]) {
flow[p[i]] -= max_flow;
flow[p[i]^1] += max_flow;
}
re += f[T] * max_flow;
}
return re;
}
}solver;
int points;
int main()
{
cin >> points;
//solver.Insert(S,1,INF,0);
for(int cnt,i = 1; i <= points; ++i) {
scanf("%d",&cnt);
//if(!cnt) solver.Insert(i,T,INF,0);
solver.Insert(i,1,INF,0);
for(int x,len,j = 1; j <= cnt; ++j) {
scanf("%d%d",&x,&len);
solver.Insert(i,x,INF,len);
solver.Insert(S,x,1,len);
solver.Insert(i,T,1,0);
}
}
cout << solver.EdmondsKarp() << endl;
return 0;
}BZOJ 3876 AHOI 2014 支线剧情 有下界有源汇的费用流
原文地址:http://blog.csdn.net/jiangyuze831/article/details/43051059
