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WebService之CXF注解之三(Service接口实现类)
Leo has a grid with N rows and M columns. All cells are painted with either black or white initially.
Two cells A and B are called connected if they share an edge and they are in the same color, or there exists a cellC connected to both A and B.
Leo wants to paint the grid with the same color. He can make it done in multiple steps. At each step Leo can choose a cell and flip the color (from black to white or from white to black) of all cells connected to it. Leo wants to know the minimum number of steps he needs to make all cells in the same color.
Input
There are multiple test cases. The first line of input contains an integer T indicating the number of test cases. For each test case:
The first line contains two integers N and M (1 <= N, M <= 40). Then N lines follow. Each line contains a string withN characters. Each character is either ‘X‘ (black) or ‘O‘ (white) indicates the initial color of the cells.
Output
For each test case, output the minimum steps needed to make all cells in the same color.
Sample Input
2 2 2 OX OX 3 3 XOX OXO XOX
Sample Output
1 2
Hint
For the second sample, one optimal solution is:
Step 1. flip (2, 2)
XOX OOO XOX
Step 2. flip (1, 2)
XXX XXX XXX
题意:
给你一个染色的 N×M 的格子,你每次可以选择一个连通块,将其颜色取反。问最后将整个格子变为同色的最小步数。
思路:
其实就是一个最短路,将连通块缩点然后不同种的连通块之间连边,那么将整个格子变为同色的最小步数就等于一个点到地图上最远点的距离了。
代码:
#include <iostream>
#include <cstdio>
#include <cstring>
#include <algorithm>
#include <cmath>
#include <string>
#include <map>
#include <stack>
#include <vector>
#include <set>
#include <queue>
#pragma comment (linker,"/STACK:1024000000,1024000000")
#define maxn 45
#define MAXN 2700005
#define OO (1<<31)-1
#define mod 1000000009
#define INF 0x3f3f3f3f
#define pi acos(-1.0)
#define eps 1e-6
typedef long long ll;
using namespace std;
int n,m,ans,cnt,lev;
char mp[maxn][maxn];
int num[maxn][maxn];
int dx[]={0,0,-1,1};
int dy[]={-1,1,0,0};
bool vis[maxn][maxn],app[1605][1605];
int p[1700];
struct Node
{
int v;
int next;
}edge[MAXN];
void addedge(int u,int v)
{
cnt++;
edge[cnt].v=v;
edge[cnt].next=p[u];
p[u]=cnt;
}
bool isok(int x,int y)
{
if(x<1||x>n||y<1||y>m) return false ;
return true ;
}
void dfs(int x,int y)
{
num[x][y]=lev;
int nx,ny,i;
for(i=0;i<4;i++)
{
nx=x+dx[i]; ny=y+dy[i];
if(isok(nx,ny)&&!vis[nx][ny]&&mp[nx][ny]==mp[x][y])
{
vis[nx][ny]=1;
dfs(nx,ny);
}
}
}
void presolve()
{
memset(p,0,sizeof(p));
int i,j,k,t,nx,ny;
lev=0;
memset(vis,0,sizeof(vis));
for(i=1;i<=n;i++)
{
for(j=1;j<=m;j++)
{
if(!vis[i][j])
{
lev++;
vis[i][j]=1;
dfs(i,j);
}
}
}
cnt=0;
memset(app,0,sizeof(app));
for(i=1;i<=n;i++)
{
for(j=1;j<=m;j++)
{
for(k=0;k<4;k++)
{
nx=i+dx[k]; ny=j+dy[k];
if(isok(nx,ny)&&num[nx][ny]!=num[i][j]&&!app[num[nx][ny]][num[i][j]])
{
app[num[nx][ny]][num[i][j]]=1;
addedge(num[nx][ny],num[i][j]);
}
}
}
}
}
struct fuck
{
int dis;
int num;
}t,f;
bool VVV[2700];
queue<fuck> Q;
int bfs(int now)
{
memset(VVV,0,sizeof(VVV));
t.dis=0;
t.num=now;
VVV[now]=1;
while(!Q.empty()) Q.pop();
Q.push(t);
int maxs=0;
while(!Q.empty())
{
t=Q.front();Q.pop();
if(t.dis>ans) return INF;
for(int i=p[t.num];i!=0;i=edge[i].next)
{
int to=edge[i].v;
if(!VVV[to])
{
VVV[to]=1;
f.num=to;
f.dis=t.dis+1;
maxs=max(maxs,f.dis);
Q.push(f);
}
}
}
return maxs;
}
int main()
{
int i,j,t,u,v,w;
scanf("%d",&t);
while(t--)
{
scanf("%d%d",&n,&m);
for(i=1;i<=n;i++)
{
scanf("%s",mp[i]+1);
}
presolve();
ans=INF;
for(int i=1;i<=lev;i++)
{
ans=min(ans,bfs(i));
}
printf("%d\n",ans);
}
return 0;
}