DLX模型问题

问题：sevenzero liked Warcraft very much, but he haven't practiced it for several years after being addicted to algorithms. Now, though he is playing with computer, he nearly losed and only his hero Pit Lord left. sevenzero is angry, he decided to cheat to turn defeat into victory. So he entered "whosyourdaddy", that let Pit Lord kill any hostile unit he damages immediately. As all Warcrafters know, Pit Lord masters a skill called Cleaving Attack and he can damage neighbour units of the unit he attacks. Pit Lord can choice a position to attack to avoid killing partial neighbour units sevenzero don't want to kill. Because sevenzero wants to win as soon as possible, he needs to know the minimum attack times to eliminate all the enemys.
 
Input
There are several cases. For each case, first line contains two integer N (2 ≤ N ≤ 55) and M (0 ≤ M ≤ N*N),and N is the number of hostile units. Hostile units are numbered from 1 to N. For the subsequent M lines, each line contains two integers A and B, that means A and B are neighbor. Each unit has no more than 4 neighbor units. The input is terminated by EOF.
 
Output
One line shows the minimum attack times for each case.
 

Sample Input
5 4
1 2
1 3
2 4
4 5
6 4
1 2
1 3
1 4
4 5

Sample Output
2
3

 

回答：题意大概是英雄可以放一个技能，使得一个点和与其相邻的点受到伤害，问最少攻击几个点能够让所有的点都受到至少一次伤害。

#include<cstdio>
#include<cstring>
#include<climits>
#define N 60
#define M 3600
using namespace std;
struct
{
    int col,row;
} node[M];
int l[M],r[M],d[M],u[M],h[M],res[N],cntcol[N];
int dcnt=-1,minn;
int n,m;
bool visit[N],mark[N][N];
int H()
{
    int count=0;
    bool hash[N];
    memset(hash,false,sizeof(hash));
    for(int i=r[0]; i!=0; i=r[i])
    {
        if(hash[i]) continue;
        //hash[i]=true;
        count++;
        for(int j=d[i]; j!=i; j=d[j])
            for(int k=r[j]; k!=j; k=r[k])
                hash[node[k].col]=true;
    }
    return count;
}
void addnode(int &x)
{
    ++x;
    r[x]=l[x]=u[x]=d[x]=x;
}
void insert_row(int rowx,int x)
{
    r[l[rowx]]=x;
    l[x]=l[rowx];
    r[x]=rowx;
    l[rowx]=x;
}
void insert_col(int colx,int x)
{
    d[u[colx]]=x;
    u[x]=u[colx];
    d[x]=colx;
    u[colx]=x;
}
void dlx_init(int cols)
{
    memset(h,-1,sizeof(h));
    memset(cntcol,0,sizeof(cntcol));
    dcnt=-1;
    addnode(dcnt);
    for(int i=1; i<=cols; ++i)
    {
        addnode(dcnt);
        insert_row(0,dcnt);
    }
}
void insert_node(int x,int y)
{
    //printf("insert %d %d\n",x,y);
    cntcol[y]++;
    addnode(dcnt);
    node[dcnt].row=x;
    node[dcnt].col=y;
    insert_col(y,dcnt);
    if(h[x]==-1) h[x]=dcnt;
    else insert_row(h[x],dcnt);
}
void remove(int c)
{
    for(int i=d[c]; i!=c; i=d[i])
    {
        l[r[i]]=l[i];
        r[l[i]]=r[i];
    }
}
void resume(int c)
{
    for(int i=u[c]; i!=c; i=u[i])
    {
        l[r[i]]=i;
        r[l[i]]=i;
    }
}
void DLX(int deep)
{
    if(deep+H()>=minn) return;
    if(r[0]==0)
    {
        if(minn>deep) minn=deep;
        return;
    }
    int min=INT_MAX,tempc;
    for(int i=r[0]; i!=0; i=r[i])
        if(cntcol[i]<min)
        {
            min=cntcol[i];
            tempc=i;
        }
    for(int i=d[tempc]; i!=tempc; i=d[i])
    {
        if(visit[node[i].row]) continue;
        res[deep]=node[i].row;
        remove(i);
        for(int j=r[i]; j!=i; j=r[j]) remove(j);
        DLX(deep+1);
        for(int j=l[i]; j!=i; j=l[j]) resume(j);
        resume(i);
    }
    return;
}
int main()
{
    int k;
    int a,b;
    for(; ~scanf("%d%d",&n,&m);)
    {
        memset(mark,false,sizeof(mark));
        dlx_init(n);//初始化
        for(; m--;)
        {
            scanf("%d%d",&a,&b);
            mark[a][b]=mark[b][a]=true;
        }
        for(int i=1; i<=n; ++i)
            for(int j=1; j<=n; ++j)
                if(mark[i][j]||i==j)
                    insert_node(i,j);
        minn=INT_MAX;
        DLX(0);
        printf("%d\n",minn);
    }
    return 0;
}