zoukankan      html  css  js  c++  java
  • Working out

    Summer is coming! It's time for Iahub and Iahubina to work out, as they both want to look hot at the beach. The gym where they go is a matrix a with n lines and m columns. Let number a[i][j] represents the calories burned by performing workout at the cell of gym in the i-th line and the j-th column.

    Iahub starts with workout located at line 1 and column 1. He needs to finish with workout a[n][m]. After finishing workout a[i][j], he can go to workout a[i + 1][j] or a[i][j + 1]. Similarly, Iahubina starts with workout a[n][1] and she needs to finish with workout a[1][m]. After finishing workout from cell a[i][j], she goes to either a[i][j + 1] or a[i - 1][j].

    There is one additional condition for their training. They have to meet in exactly one cell of gym. At that cell, none of them will work out. They will talk about fast exponentiation (pretty odd small talk) and then both of them will move to the next workout.

    If a workout was done by either Iahub or Iahubina, it counts as total gain. Please plan a workout for Iahub and Iahubina such as total gain to be as big as possible. Note, that Iahub and Iahubina can perform workouts with different speed, so the number of cells that they use to reach meet cell may differs.

    Input

    The first line of the input contains two integers n and m (3 ≤ n, m ≤ 1000). Each of the next n lines contains m integers: j-th number from i-th line denotes element a[i][j] (0 ≤ a[i][j] ≤ 105).

    Output

    The output contains a single number — the maximum total gain possible.

    Example
    Input
    3 3
    100 100 100
    100 1 100
    100 100 100
    Output
    800
    Note

    Iahub will choose exercises a[1][1] → a[1][2] → a[2][2] → a[3][2] → a[3][3]. Iahubina will choose exercises a[3][1] → a[2][1] → a[2][2] → a[2][3] → a[1][3].

    求出四个角到每个点的最大消耗,枚举每个点求出最合适的。

    代码:

    #include <iostream>
    #include <cstdio>
    #include <cmath>
    #include <cstring>
    #include <algorithm>
    #include <map>
    #define Max 1001
    using namespace std;
    
    int mp[1001][1001];
    int dp1[1001][1001],dp2[1001][1001],dp3[1001][1001],dp4[1001][1001];
    int ma = 0;
    int main()
    {
        int n,m;
        cin>>n>>m;
        for(int i = 1;i <= n;i ++)for(int j = 1;j <= m;j ++)cin>>mp[i][j];
        for(int i = 1;i <= n;i ++)for(int j = 1;j <= m;j ++)dp1[i][j] = max(dp1[i-1][j],dp1[i][j-1])+mp[i][j];
        for(int i = n;i >= 1;i --)for(int j = m;j >= 1;j --)dp2[i][j] = max(dp2[i+1][j],dp2[i][j+1])+mp[i][j];
        for(int i = 1;i <= n;i ++)for(int j = m;j >= 1;j --)dp3[i][j] = max(dp3[i-1][j],dp3[i][j+1])+mp[i][j];
        for(int i = n;i >= 1;i --)for(int j = 1;j <= m;j ++)dp4[i][j] = max(dp4[i+1][j],dp4[i][j-1])+mp[i][j];
        for(int i = 1;i <= n;i ++)
        {
            for(int j = 1;j <= m;j ++)
                ma = max(ma,max(dp1[i][j-1]+dp2[i][j+1]+dp3[i+1][j]+dp4[i-1][j],dp1[i-1][j]+dp2[i+1][j]+dp3[i][j+1]+dp4[i][j-1]));
        }
        cout<<ma;
    }
  • 相关阅读:
    【FJOI2014】【偏导+数学】病毒防护带
    脏读、不可重复读 共享锁、悲观锁 和 事务五种隔离级别
    数据库锁机制
    Clgb动态代理
    乐观锁和悲观锁
    Jstl自定义标签
    orcale应用
    Ajax
    AOP
    Git 配置过程
  • 原文地址:https://www.cnblogs.com/8023spz/p/7966795.html
Copyright © 2011-2022 走看看