![luoguP3750 [六省联考2017]分手是祝愿 概率期望DP + 贪心](https://image.shishitao.com:8440/aHR0cHM6Ly9iYnNtYXguaWthZmFuLmNvbS9zdGF0aWMvTDNCeWIzaDVMMmgwZEhCekwybHRZV2RsY3pJd01UZ3VZMjVpYkc5bmN5NWpiMjB2WW14dlp5OHhNekkyTkRNekx6SXdNVGd3T0M4eE16STJORE16TFRJd01UZ3dPREl4TVRZeE1UUXdOalk0TFRJNE1qSTFOak01TWk1d2JtYz0uanBn.jpg?w=700&webp=1 "luoguP3750 [六省联考2017]分手是祝愿 概率期望DP + 贪心")
![luoguP3750 [六省联考2017]分手是祝愿 概率期望DP + 贪心](https://image.shishitao.com:8440/aHR0cHM6Ly9iYnNtYXguaWthZmFuLmNvbS9zdGF0aWMvTDNCeWIzaDVMMmgwZEhCekwybHRZV2RsY3pJd01UZ3VZMjVpYkc5bmN5NWpiMjB2WW14dlp5OHhNekkyTkRNekx6SXdNVGd3T0M4eE16STJORE16TFRJd01UZ3dPREl4TVRZeE1UVXpPRFkyTFRFMk5qUTJNamt6TVRZdWNHNW4uanBn.jpg?w=700&webp=1 "luoguP3750 [六省联考2017]分手是祝愿 概率期望DP + 贪心")
...........真的神状态了,没办法去想的状态...................
考试的时候选择$50$分贪心+$15$分状压吧,别的点就放弃算了........
令$f[i]$表示从最小步数为$i$时走到最小步数为$i - 1$的状态的期望步数
(所以题目中的$k$实际上是个提示...........................)
那么当$i > k$时,有$f[i] = \frac{i}{n} + \frac{n - i}{n} * (1 + f[i] + f[i + 1])$
移项后转移就是递推式了
当$i \leqslant k$时,有$f[i] = f[i + 1] + 1$
怎么求解初始状态的最小步数呢?
可以发现,我们一定是从$n$慢慢点到$1$最优
那么,$1$个点会不会被点就跟它的倍数有多少个$1$有关
倒叙枚举$i$,再枚举$i$的倍数看看就好了.....
复杂度$O(n \log n)$
#include <cstdio>
#include <cstring>
#include <iostream>
using namespace std; extern inline char gc() {
static char RR[], *S = RR + , *T = RR + ;
if(S == T) fread(RR, , , stdin), S = RR;
return *S ++;
}
inline int read() {
int p = , w = ; char c = gc();
while(c > '' || c < '') { if(c == '-') w = -; c = gc(); }
while(c >= '' && c <= '') p = p * + c - '', c = gc();
return p * w;
} #define ri register int
#define sid 200500 const int mod = ;
int n, k, nj = , mis, ans;
int inv[sid], f[sid], v[sid]; int main() {
n = read(); k = read();
for(ri i = ; i <= n; i ++) v[i] = read(); for(ri i = n; i >= ; i --)
for(ri j = i + i; j <= n; j += i) v[i] ^= v[j];
for(ri i = ; i <= n; i ++) mis += v[i]; inv[] = ;
for(ri i = ; i <= n; i ++)
inv[i] = 1ll * (mod - mod / i) * inv[mod % i] % mod;
for(ri i = ; i <= n; i ++) nj = 1ll * nj * i % mod; for(ri i = n; i > k; i --)
f[i] = (n + 1ll * (n - i) * f[i + ] % mod) * inv[i] % mod;
for(ri i = k; i; i --) f[i] = ; for(ri i = ; i <= mis; i ++) (ans += f[i]) %= mod;
printf("%d\n", 1ll * ans * nj % mod);
return ;
}