hdu 4966 GGS-DDU 最小树形图

来自九野~

给定n个技能，m个限制

下面是每个技能满级的级数

开始每个技能都是0级。

m个限制

(c,l1) (d,l2) cost

若c技能已经>=l1级，那么把点亮d技能 从0级一路点到l2级的花费是cost

。。他说的好有道理，我竟无言以对 _(:зゝ∠)_

最小树形图，用0做根，触发每个技能的0级花费是0

若已经点亮技能的x级，则点亮该技能的x-1级花费就是0

 

#include <stdio.h>
#include <string.h>
#include <iostream>
#include <algorithm>
#include <math.h>
using namespace std;
/*
* 最小树形图
* 复杂度O(NM)
* 点下标[0,n-1] 边下标[0,m-1]
* 有向边表示：u->v 花费为cost
* 返回最小树形图的边权和，-1表示不存在最小树形图
*/
const int INF = 100000000;
const int MAXN = 1010; //点数
const int MAXM = 1010000;//边数
#define ll int
struct Edge{
    int u,v;
    ll cost;
}edge[MAXM];        
int pre[MAXN],id[MAXN],visit[MAXN],edgenum;
void add(int u, int v, ll cost){
    Edge E = {u, v, cost}; edge[edgenum++] = E;
}

ll in[MAXN];
ll zhuliu(int root,int n,int m,Edge edge[])//树根(注意是有向树，树根不能任意) 点数 边数 edge
{
    int u,v;
    ll res=0;
    while(1)
    {
        for(int i = 0;i < n;i++)
            in[i] = INF;
        for(int i = 0;i < m;i++)
            if(edge[i].u != edge[i].v && edge[i].cost < in[edge[i].v])
            {
                pre[edge[i].v] = edge[i].u;
                in[edge[i].v] = edge[i].cost;
            }
            for(int i = 0;i < n;i++)
                if(i != root && in[i] == INF)
                    return -1;//不存在最小树形图
            int tn = 0;
            memset(id,-1,sizeof(id));
            memset(visit,-1,sizeof(visit));
            in[root] = 0;
            for(int i = 0;i < n;i++)
            {
                res += in[i];
                v = i;
                while( visit[v] != i && id[v] == -1 && v != root)
                {
                    visit[v] = i;
                    v = pre[v];
                }
                if( v != root && id[v] == -1 )
                {
                    for(int u = pre[v]; u != v ;u = pre[u])
                        id[u] = tn;
                    id[v] = tn++;
                }
            }
            if(tn == 0)break;//没有有向环
            for(int i = 0;i < n;i++)
                if(id[i] == -1)
                    id[i] = tn++;
            for(int i = 0;i < m;)
            {
                v = edge[i].v;
                edge[i].u = id[edge[i].u];
                edge[i].v = id[edge[i].v];
                if(edge[i].u != edge[i].v)
                    edge[i++].cost -= in[v];
                else
                    swap(edge[i],edge[--m]);
            }
            n = tn;
            root = id[root];
    }
    return res; //-1为不存在最小树形图
}
void init(){
    edgenum = 0;
}
#define N 55
int n, m, a[N], sum[N];
int Hash(int i, int j){
    return sum[i-1]+j;
}
int main(){
    int i, j, c, l1, d, l2, cost;
    while(scanf("%d %d",&n,&m), n+m){
        init();
        sum[0] = 0;
        for(i = 1; i <= n; i++)scanf("%d",&a[i]), a[i]++, sum[i] = sum[i-1]+a[i];
        for(i = 1; i <= n; i++)
            add(0, Hash(i,1), 0);
        for(i = 1; i <= n; i++)
            for(j = 2; j <= a[i]; j++)
                add(Hash(i,j), Hash(i,j-1), 0);
        while(m--) {
            scanf("%d %d %d %d %d",&c, &l1, &d, &l2, &cost);
            l1++; l2++;
            add(Hash(c,l1), Hash(d,l2), cost);
        }
        printf("%d\n", zhuliu(0, sum[n]+1, edgenum, edge));
    }
    return 0;
}