http://poj.org/problem?id=3592
题意:给出一个n*m的矩阵,左上角代表起始点,每个格子都有一定价值的金矿,其中‘#’代表岩石不可达,‘*’代表时空门可以到达指定格子,求出可以获得的最大价值。
思路:时空门的存在可能会使得图中出现环,所以先对强连通分量进行缩点,然后对于缩点后的连通分量建立有向无环图,spfa求到起始点的最长路。
#include <stdio.h>
#include <iostream>
#include <string.h>
#include <queue>
#include <stack>
using namespace std;
const int N=;
const int INF=-<<;
struct node
{
int u,v,w;
int next;
} edge1[N*],edge2[N*];//edge1[]存的是原始图的边,edge2[]存的是缩点后的边
int low[N],dfn[N],sccno[N];//sccno[i]表示点i所属于的连通分量的编号
int dis[N],head1[N],head2[N],val[N];//val[]存储每个连通分量的价值
int n,m,scc_cnt,cnt,dfs_clock;
bool vis[N];
stack<int>S; void init()
{
cnt = ;
scc_cnt = ;
dfs_clock = ;
memset(val,,sizeof(val));
memset(low,,sizeof(low));
memset(dfn,,sizeof(dfn));
memset(sccno,,sizeof(sccno));
memset(head1,-,sizeof(head1));
memset(head2,-,sizeof(head2)); }
void add(int u,int v,int w,node *edge,int *head)
{
edge[cnt].u = u;
edge[cnt].v = v;
edge[cnt].w = w;
edge[cnt].next = head[u];
head[u] = cnt++;
}
void Tarjan(int u)//求强连通分量
{
low[u]=dfn[u]=++dfs_clock;
S.push(u);
for (int i = head1[u]; i!=-; i=edge1[i].next)
{
int v = edge1[i].v;
if (!dfn[v])
{
Tarjan(v);
low[u]=min(low[u],low[v]);
}
else if (!sccno[v])
{
low[u]=min(low[u],dfn[v]);
}
}
if (low[u]==dfn[u])
{
++scc_cnt;
while()
{
int v = S.top();
S.pop();
sccno[v] = scc_cnt;
if (v==u)
break;
}
}
}
void spfa(int s)//求缩点后的最长路
{
for (int i = ; i <= n*m; i++)
{
dis[i]=INF;
vis[i]=false;
}
dis[s] = ;
queue<int>q;
q.push(s);
vis[s] = true;
while(!q.empty())
{
int u = q.front();
q.pop();
vis[u]=false;
for (int i = head2[u]; i!=-; i=edge2[i].next)
{
int v = edge2[i].v;
int w = edge2[i].w;
if (dis[v] < dis[u]+w)
{
dis[v] = dis[u]+w;
if (!vis[v])
{
q.push(v);
vis[v]=true;
}
} }
}
}
int main()
{
int t;
char map[][];
scanf("%d",&t);
while(t--)
{
scanf("%d%d",&n,&m);
init();
for(int i = ; i < n; i++)
{
scanf("%s",map[i]);
}
for (int i = ; i < n; i++)
{
for (int j = ; j < m; j++)
{
if (map[i][j]!='#')
{
if(i) add((i-)*m+j,i*m+j,,edge1,head1);
if(j) add(i*m+j-,i*m+j,,edge1,head1);
if (map[i][j]=='*')
{
int x,y;
scanf("%d%d",&x,&y);
if(map[x][y]!='#')
add(i*m+j,x*m+y,,edge1,head1);
}
}
}
}
for (int i = ; i < n; i++)
{
if (!dfn[i])
Tarjan(i);
}
for (int i = ; i < n; i++)
{
for (int j = ; j < m; j++)
{
if(map[i][j]!='*'&&map[i][j]!='#')
{
int num = sccno[i*m+j];
val[num]+=map[i][j]-'';//记录每个连通分量的价值
}
}
}
for (int u = ; u < n*m; u++)
{
for (int j = head1[u]; j!=-; j=edge1[j].next)
{
int v = edge1[j].v;
if(sccno[u]!=sccno[v])
{
add(sccno[u],sccno[v],val[sccno[v]],edge2,head2);
}//对缩点后的连通分量建立有向图
}
}
spfa(sccno[]);//求出每个点到起始点的价值
int max=-;
for (int i = ; i <= scc_cnt; i++)
{
if (max < dis[i])
max = dis[i];//求出到原点的最大价值
}
int ans = max+val[sccno[]];//总最大价值=到原点的最大价值+原点的价值
printf("%d\n",ans);
}
return ;
}