Description
【CF1197D】Yet Another Subarray Problem
给定一个序列和m,k,求出一个子序列使得$\sum\limits_{i=l}^{r}{a_i}-k\times \lceil \frac{r-l+1}{m}\rceil$最大
特别地,一个长度为0的子序列的答案为0
Solution
dp
一段区间的区间和我们可以通过前缀和实现查询
定义$f[i][j]$表示以i为右端点的子序列,左端点$l$满足$(i-l+1)\mod m=j$时的最大值
那么关于状态转移,我们可以考虑在 $i-m$的位置上分段,然后从前一段转移过来还是只保留当前这一段即可
最后取一个最大值即可
Code
#include <bits/stdc++.h> namespace shl { typedef long long ll; int n, m, k; ll a[300010], f[300010][12], sum[300010]; inline ll read() { ll ret = 0, op = 1; char c = getchar(); while (!isdigit(c)) { if (c == '-') op = -1; c = getchar(); } while (isdigit(c)) { ret = (ret << 3) + (ret << 1) + c - '0'; c = getchar(); } return ret * op; } using std :: max; int main() { n = read(); m = read(); k = read(); for (register int i = 1; i <= n; ++i) { a[i] = read(); sum[i] = sum[i - 1] + a[i]; } ll ans = 0; for (register int i = 1; i <= n; ++i) { if (i - m >= 0) f[i][0] = max(f[i][0], f[i - m][0] + sum[i] - sum[i - m] - k); for (register int j = 1; j < m; ++j) { if (i - j >= 0) f[i][j] = max(f[i][j], sum[i] - sum[i - j] - k); if (i - m >= 0) f[i][j] = max(f[i][j], f[i - m][j] + sum[i] - sum[i - m] - k); } for (register int j = 0; j < m; ++j) ans = max(ans, f[i][j]); } std :: cout << ans; return 0; } }; int main() { shl :: main(); return 0; }