Bob is a strategy game programming specialist. In his new city building game the gaming environment is as follows: a city is built up by areas, in which there are streets, trees, factories and buildings. There is still some space in the area that is unoccupied. The strategic task of his game is to win as much rent money from these free spaces. To win rent money you must erect buildings, that can only be rectangular, as long and wide as you can. Bob is trying to find a way to build the biggest possible building in each area. But he comes across some problems ? he is not allowed to destroy already existing buildings, trees, factories and streets in the area he is building in.
Each area has its width and length. The area is divided into a grid of equal square units. The rent paid for each unit on which you‘re building stands is 3$.
Your task is to help Bob solve this problem. The whole city is divided into K areas. Each one of the areas is rectangular and has a different grid size with its own length M and width N. The existing occupied units are marked with the symbol R. The unoccupied units are marked with the symbol F.
R ? reserved unitIn the end of each area description there is a separating line.
F ? free unit
2 5 6 R F F F F F F F F F F F R R R F F F F F F F F F F F F F F F 5 5 R R R R R R R R R R R R R R R R R R R R R R R R R
45 0
最容易想到的算法便是:枚举左上角坐标和长、宽,然后判断这个矩形是否全为空地。这样做需要枚举O(m2n2)个矩形,判断需要O(mn)时间,总时间复杂度为O(m3n3),实在是太高了。本题虽然是矩形,但仍然可以用扫描法:从上到下扫描。
我们把每个格子向上延伸的连续空格看成一条悬线,并且用up(i,j)、left(i,j)、right(i,j)表示格子(i,j)的悬线长度以及该悬线向左、向右运动的“运动极限”,如图1-30所示。列3的悬线长度为3,向左向右各能运动一列,因此左右的运动极限分别为列2和列4。
这样,每个格子(i,j)对应着一个以第i行为下边界、高度为up(i,j),左右边界分别为left(i,j)和right(i,j)的矩形。不难发现,所有这些矩形中面积最大的就是题目所求(想一想,为什么)。这样,我们只需思考如何快速计算出上述3种信息即可。
当第i行第j列不是空格时,3个数组的值均为0,否则up(i,j)=up(i-1,j)+1。那么,left和right呢?深入思考后,可以发现:
left(i,j) = max{left(i-1,j), lo+1}
其中lo是第i行中,第j列左边的最近障碍格的列编号。如果从左到右计算left(i,j),则很容易维护lo。right也可以同理计算,但需要从右往左计算,因为要维护第j列右边最近的障碍格的列编号ro。为了节约空间,下面的程序用up[j],left[j]和right[j]来保存当前扫描行上的信息。
【代码】
/********************************* * 日期:2014-5-19 * 作者:SJF0115 * 题号: 1330 - City Game * 地址:http://uva.onlinejudge.org/index.php?option=com_onlinejudge&Itemid=8&page=show_problem&problem=4076 * 来源:UVA * 结果:Accepted **********************************/ #include <iostream> #include <stdio.h> #include <algorithm> #include <string.h> using namespace std; #define N 1001 int matrix[N][N]; int Up[N][N],Left[N][N],Right[N][N]; int main(){ int T,m,n,i,j; //freopen("C:\\Users\\wt\\Desktop\\acm.txt","r",stdin); scanf("%d",&T); while(T--){ scanf("%d%d",&m,&n); //输入 for(i = 0;i < m;i++){ for(j = 0;j < n;j++){ char c = getchar(); while(c!=‘R‘ && c!=‘F‘){ c=getchar(); } matrix[i][j]= (c == ‘F‘ ? 0:1); }//for }//for int ans = 0; for(i = 0;i < m;i++){ //从左到右扫描,维护Left //障碍列号 int lcol = -1,rcol = n; for(j = 0;j < n;j++){ //障碍 if(matrix[i][j] == 1){ Up[i][j] = Left[i][j] = 0; lcol = j; } else{ if(i == 0){ Up[i][j] = 1; Left[i][j] = lcol + 1; } else{ Up[i][j] = Up[i-1][j] + 1; Left[i][j] = max(Left[i-1][j],lcol + 1); }//if }//if }//for //从右到左扫描,维护Right并更新答案 for(j = n-1;j >= 0;j--){ //障碍 if(matrix[i][j] == 1){ Right[i][j] = n; rcol = j; } else{ if(i == 0){ Right[i][j] = rcol - 1; } else{ Right[i][j] = min(Right[i-1][j],rcol - 1); }//if //更新最大矩阵面积 ans = max(ans,Up[i][j]*(Right[i][j] - Left[i][j] + 1)); //cout<<"ans:"<<ans<<" Up:"<<Up[i][j]<<" Right:"<<Right[i][j]<<" Left:"<<Left[i][j]<<endl; }//if }//for } cout<<ans*3<<endl; }//while return 0; }
UVA之1330 - City Game,布布扣,bubuko.com
原文:http://blog.csdn.net/sunnyyoona/article/details/26278201