题意
Sol
想不到想不到。。
首先在不考虑每个人的真是成绩的情况下,设(f[i][j])表示考虑了前(i)个人,有(j)个人被碾压的方案数
转移方程:$$f[i][j] = sum_{k = j}^n f[i -1][k] C_{k}^{k - j} C_{N - k}^{r[i] - 1 - (k - j)} * g(i)$$
大概解释一下,枚举的(k)表示之前碾压了多少,首先我们凑出(j)个人继续碾压,也就是说会有(k - j)个人该课的分数比(B)爷高,那么这(k)个人我们已经考虑完了
接下来需要从剩下的(N-k)个人中,选出(r[i] - 1 - (k - j))个人,保证他们的分数比B爷高
后面的(g(i))表示的是吧(1 sim U_i)的分数,分给(N)个人后,有(R_i)个人比B爷高的方案数
这个计算的时候可以直接枚举B爷的分数
(g(k) = sum_{i = 1}^{U_k} i^{N - R[i]} * (U_k - i) ^{R[i] - 1})
后面的次数小于等于(N-1),然后直接插值一下就行了
// luogu-judger-enable-o2
#include<bits/stdc++.h>
using namespace std;
const int MAXN = 103, mod = 1e9 + 7;
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 add(int x, int y) {
if(x + y < 0) return x + y + mod;
return x + y >= mod ? x + y - mod : x + y;
}
int mul(int x, int y) {
return 1ll * x * y % mod;
}
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 N, M, K, f[MAXN][MAXN], C[MAXN][MAXN], U[MAXN], R[MAXN], g[MAXN];
int get(int U, int R) {
memset(g, 0, sizeof(g));
for(int i = 1; i <= MAXN - 1; i++)
for(int k = 1; k <= i; k++)
g[i] = add(g[i], mul(fp(k, N - R), fp(i - k, R - 1)));
int ans = 0;
for(int i = 1; i <= MAXN - 1; i++) {
int up = 1, down = 1;
for(int j = 1; j <= MAXN - 1; j++) {
if(i == j) continue;
up = mul(up, add(U, -j));
down = mul(down, add(i, -j));
}
ans = add(ans, mul(g[i], mul(up, fp(down, mod - 2))));
}
return ans;
}
int main() {
//freopen("a.in", "r", stdin);
N = read(); M = read(); K = read();
for(int i = 0; i <= N; i++) {
C[i][0] = C[i][i] = 1;
for(int j = 1; j < i; j++) C[i][j] = add(C[i - 1][j - 1], C[i - 1][j]);
}
for(int i = 1; i <= M; i++) U[i] = read();
for(int i = 1; i <= M; i++) R[i] = read();
f[0][N - 1] = 1;
for(int i = 1; i <= M; i++) {
int t = get(U[i], R[i]);
for(int j = K; j <= N; j++) {
for(int k = j; k <= N - 1; k++)
if(k - j <= R[i] - 1) f[i][j] = add(f[i][j], mul(mul(f[i - 1][k], C[k][k - j]), C[N - 1 - k][R[i] - 1 - (k - j)]));
f[i][j] = mul(f[i][j], t);
}
}
printf("%d", f[M][K]);
return 0;
}
/*
100 3 50
500 500 456
13 46 45
*/