• cf1097D. Makoto and a Blackboard(期望dp)


    题意

    题目链接

    Sol

    首先考虑当(n = p^x),其中(p)是质数,显然它的因子只有(1, p, p^2, dots p^x)(最多logn个)

    那么可以直接dp, 设(f[i][j])表示经过了(i)轮,当前数是(p^j)的概率,转移的时候枚举这一轮的(p^j)转移一下

    然后我们可以把每个质因子分开算,最后乘起来就好了

    至于这样为什么是对的。(开始瞎扯),考虑最后的每个约数,它一定是一堆质因子的乘积,而每个质因子的概率我们是知道的,所以这样乘起来算是没问题的。

    其实本质上还是因为约数和/个数都是积性函数

    时间复杂度:(O(sqrt{n} + k log^2 n))

    #include<bits/stdc++.h> 
    #define Pair pair<int, int>
    #define MP(x, y) make_pair(x, y)
    #define fi first
    #define se second
    #define int long long 
    #define LL long long 
    #define Fin(x) {freopen(#x".in","r",stdin);}
    #define Fout(x) {freopen(#x".out","w",stdout);}
    using namespace std;
    const int MAXN = 1e6 + 10, mod = 1e9 + 7, INF = 1e9 + 10;
    const double eps = 1e-9;
    template <typename A, typename B> inline bool chmin(A &a, B b){if(a > b) {a = b; return 1;} return 0;}
    template <typename A, typename B> inline bool chmax(A &a, B b){if(a < b) {a = b; return 1;} return 0;}
    template <typename A, typename B> inline LL add(A x, B y) {if(x + y < 0) return x + y + mod; return x + y >= mod ? x + y - mod : x + y;}
    template <typename A, typename B> inline void add2(A &x, B y) {if(x + y < 0) x = x + y + mod; else x = (x + y >= mod ? x + y - mod : x + y);}
    template <typename A, typename B> inline LL mul(A x, B y) {return 1ll * x * y % mod;}
    template <typename A, typename B> inline void mul2(A &x, B y) {x = (1ll * x * y % mod + mod) % mod;}
    template <typename A> inline void debug(A a){cout << a << '
    ';}
    template <typename A> inline LL sqr(A x){return 1ll * x * x;}
    inline int read() {
        char c = getchar(); int x = 0, f = 1;
        while(c < '0' || c > '9') {if(c == '-') f = -1; c = getchar();}
        while(c >= '0' && c <= '9') x = x * 10 + c - '0', c = getchar();
        return x * f;
    }
    int N, K, top, inv[MAXN];
    Pair st[MAXN];
    int f[10001][1001];
    int fp(int a, int p) {
        int base = 1;
        while(p) {
            if(p & 1) base = mul(base, a);
            a = mul(a, a); p >>= 1;
        }
        return base;
    }
    int solve(int a, int b) {//a^b
        memset(f, 0, sizeof(f));
        f[0][b] = 1;
        for(int i = 1; i <= K; i++) 
            for(int j = 0; j <= b; j++) 
                for(int k = j; k <= b; k++) 
                    add2(f[i][j], mul(f[i - 1][k], inv[k + 1]));
        int res = 0;
        for(int i = 0; i <= b; i++) add2(res, mul(f[K][i], fp(a, i)));
        return res;
    }
    signed main() {
        for(int i = 1; i <= 666; i++) inv[i] = fp(i, mod - 2);
        cin >> N >> K;
        for(int i = 2; i * i <= N; i++) {
            if(!(N % i)) {
                st[++top] = MP(i, 0);
                while(!(N % i)) st[top].se++, N /= i;
            }
        }
        if(N) st[++top] = MP(N, 1);
        int ans = 1;
        for(int i = 1; i <= top; i++)
            ans = mul(ans, solve(st[i].fi, st[i].se));
        cout << ans;
        return 0;
    }
    /*
    2
    (()))
    (
    */
    
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  • 原文地址:https://www.cnblogs.com/zwfymqz/p/10224565.html
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