codeforces1013E

Hills

题目大意

从n个数选取k个数，如果选第i个数，必须 $h [i - 1] < h [i] > h [i + 1]$ ,每花费1可以将对应的h减小1，问你选取k个数的最小花费。输出k= $1, 2, 3, \dots (n + 1) / 2$ 的这些情况。

数据范围

$1 \leq n \leq 5000, 1 \leq h_{i} \leq 100000$

解题思路

$d p [i] [j] [k]$ 代表前i个数选j个状态为k的最小花费，k取0和1， $d p [i] [j] [0]$ 代表前i个数选j个最后一个数是前i个的最小花费， $d p [i] [j] [1]$ 代表前i个数选j个最后一个数是i的最小花费。

那么 $d p [i] [j] [0] = m i n (d p [i - 1] [j] [0], d p [i - 1] [j] [1] + m a x (0, h [i] - h [i - 1] + 1))$

同样 $d p [i] [j] [1] = m i n (d p [i - 2] [j - 1] [0] + m a x (0, h [i - 1] - h [i] + 1, d p [i - 2] [j - 1] [1] + m a x (0, h [i - 1] - m i n (h [i - 2], h [i]))))$

AC代码

#include<cstdio>
#include<cstring>
#include<cmath>
#include<cstdlib>
#include<algorithm>
using namespace std;
const int INF = 1e9;
const int maxn = 5000;
int dp[maxn + 5][maxn / 2 + 5][2];
//dp[i][j][0]代表前i个选j个且以i之前的为最后一个的最小花费；
//dp[i][j][1]代表前i个选j个且以i为最后一个的最小花费；
int h[maxn + 5];
int n;
int main() {
    scanf("%d", &n);
    for(int i = 1; i <= n; i++)scanf("%d", &h[i]);
    int m = (n + 1) / 2;
    for(int i = 0; i <= n; i++) {
        for(int j = 0; j <= m; j++)
            dp[i][j][0] = dp[i][j][1] = INF;
            dp[i][0][0] = 0;
    }
    dp[1][1][1] = 0;
    for(int i = 2; i <= n; i++)
        for(int j = 1; j <= m; j++) {
            dp[i][j][0] = min(dp[i - 1][j][0], dp[i - 1][j][1] + max(0, h[i] - h[i - 1] + 1));
            dp[i][j][1] = min(dp[i - 2][j - 1][1] + max(0, h[i - 1] - min(h[i - 2], h[i]) + 1), dp[i - 2][j - 1][0] + max(0, h[i - 1] - h[i] + 1));
        }
    for(int i = 1; i <= m; i++)printf("%d ", min(dp[n][i][0], dp[n][i][1]));
    return 0;
}