Leapin' Lizards |
| Time Limit: 2000/1000 MS (Java/Others) Memory Limit: 32768/32768 K (Java/Others) |
| Total Submission(s): 16 Accepted Submission(s): 7 |
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Problem Description
Your platoon of wandering lizards has entered a strange room in the labyrinth you are exploring. As you are looking around for hidden treasures, one of the rookies steps on an innocent-looking stone and the room's floor suddenly disappears! Each lizard in your platoon is left standing on a fragile-looking pillar, and a fire begins to rage below... Leave no lizard behind! Get as many lizards as possible out of the room, and report the number of casualties.
The pillars in the room are aligned as a grid, with each pillar one unit away from the pillars to its east, west, north and south. Pillars at the edge of the grid are one unit away from the edge of the room (safety). Not all pillars necessarily have a lizard. A lizard is able to leap onto any unoccupied pillar that is within d units of his current one. A lizard standing on a pillar within leaping distance of the edge of the room may always leap to safety... but there's a catch: each pillar becomes weakened after each jump, and will soon collapse and no longer be usable by other lizards. Leaping onto a pillar does not cause it to weaken or collapse; only leaping off of it causes it to weaken and eventually collapse. Only one lizard may be on a pillar at any given time. |
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Input
The input file will begin with a line containing a single integer representing the number of test cases, which is at most 25. Each test case will begin with a line containing a single positive integer n representing the number of rows in the map, followed by a single non-negative integer d representing the maximum leaping distance for the lizards. Two maps will follow, each as a map of characters with one row per line. The first map will contain a digit (0-3) in each position representing the number of jumps the pillar in that position will sustain before collapsing (0 means there is no pillar there). The second map will follow, with an 'L' for every position where a lizard is on the pillar and a '.' for every empty pillar. There will never be a lizard on a position where there is no pillar.Each input map is guaranteed to be a rectangle of size n x m, where 1 ≤ n ≤ 20 and 1 ≤ m ≤ 20. The leaping distance is
always 1 ≤ d ≤ 3. |
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Output
For each input case, print a single line containing the number of lizards that could not escape. The format should follow the samples provided below.
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Sample Input
4 3 1 1111 1111 1111 LLLL LLLL LLLL 3 2 00000 01110 00000 ..... .LLL. ..... 3 1 00000 01110 00000 ..... .LLL. ..... 5 2 00000000 02000000 00321100 02000000 00000000 ........ ........ ..LLLL.. ........ ........ |
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Sample Output
Case #1: 2 lizards were left behind. Case #2: no lizard was left behind. Case #3: 3 lizards were left behind. Case #4: 1 lizard was left behind. |
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Source
Mid-Central USA 2005
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题意:
有n行的数字地图和字符地图,一只青蛙每次最多跳k单位长度,数字地图中的数字表示改点可以经过的次数,字符地图中L表示几只青蛙的初始位置,问有多少只青蛙跳不出地图。
注意这里的距离是abs(行号之差)+abs(列号之差)
代码:
//源点S编号0,网格的每个格子分成两个点i和i+n*m(n和m为网格的行和列数,其实i编号点是 //表示蜥蜴进来,而i+n*m编号的点是表示蜥蜴出去).汇点t编号n*m*2+1.如果格子i上有蜥蜴, //那么从s到i有边(s,i,1).如果格子i能承受x次跳出,那么有边(i,i+n*m,x)如果从格子i能直 //接跳出网格边界,那么有边(i+n*m,t,inf)如果从格子i不能直接跳出网格,那么从i到离i距离 //<=d的网格j有边(i+n*m,j,inf). //最终我们求出的最大流就是能跳出网格的蜥蜴数.include<iostream> #include<cstdio> #include<cstring> #include<queue> #include<cmath> using namespace std; const int INF=0x7fffffff; const int MAXN=1000; const int MAXM=10000; int S,T,tot,head[MAXN+9],h[MAXN+9]; char mp[30][30]; int Abs(int x) { return x>=0?x:-x; } struct Edge { int to,next,w; }edge[MAXM+9]; void addedge(int x,int y,int z) { edge[tot].to=y; edge[tot].w=z; edge[tot].next=head[x]; head[x]=tot++; edge[tot].to=x; edge[tot].w=0; edge[tot].next=head[y]; head[y]=tot++; } void init(int x) { S=0;T=x; tot=0; memset(head,-1,sizeof(head)); } bool bfs() { queue<int>q; memset(h,-1,sizeof(h)); q.push(S); h[S]=0; while(!q.empty()){ int u=q.front();q.pop(); for(int i=head[u];i!=-1;i=edge[i].next){ int v=edge[i].to; if(edge[i].w&&h[v]<0){ q.push(v); h[v]=h[u]+1; } } } if(h[T]==-1) return 0; return 1; } int dfs(int u,int f) { if(u==T) return f; int x,used=0; for(int i=head[u];i!=-1;i=edge[i].next){ int v=edge[i].to; if(edge[i].w&&h[v]==h[u]+1){ x=f-used; x=dfs(v,min(x,edge[i].w)); edge[i].w-=x; edge[i^1].w+=x; used+=x; if(used==f) return f; } } if(!used) h[u]=-1; return used; } int dinic() { int ans=0; while(bfs()) ans+=dfs(S,INF); return ans; } int main() { int n,m,d; scanf("%d%d%d",&n,&m,&d); init(n*m*2+1); for(int i=0;i<n;i++) scanf("%s",mp[i]); for(int i=0;i<n;i++){ for(int j=0;j<m;j++){ if(mp[i][j]=='0') continue; addedge(i*m+j+1,i*m+j+1+n*m,mp[i][j]-'0'); if(i+1<=d||j+1<=d||n-i<=d||m-j<=d) addedge(i*m+j+1+n*m,T,INF); else{ for(int k=0;k<n;k++){ for(int h=0;h<m;h++){ if(mp[k][h]=='0') continue; if(i==k&&j==h) continue; if(Abs(i-k)+Abs(j-h)<=d) addedge(i*m+j+1+n*m,k*m+h+1,INF); } } } } } int sum=0; for(int i=0;i<n;i++){ scanf("%s",mp[i]); for(int j=0;j<m;j++){ if(mp[i][j]=='L'){ sum++; addedge(S,i*m+j+1,1); } } } printf("%d ",sum-dinic()); return 0; }