题意
大中锋的学院要组织学生参观博物馆,要求学生们在博物馆中排成一队进行参观。他的同学可以分为四类: 人最喜欢唱, 人最喜欢跳, 人最喜欢rap, 人最喜欢篮球。如果队列中 ,,, 位置上的同学依次为,最喜欢唱,最喜欢跳,最喜欢rap,最喜欢篮球,那么他们就会聚在一起讨论蔡徐坤。大中锋想知道有多少种排队的方法,不会有学生聚在一起讨论蔡徐坤。由于合法的队伍可能会有很多种,种类数对 取模。
题解
设 为至少有 组
设 为恰好有 组,答案即为
则
由二项式反演得
其中 为 自由排列的方案数
如果不考虑数量和限制,这就是多重集排列问题
先枚举每个变量取什么
发现这就是4个多项式卷积,用NTT加速就好了
/// @tags: EGF Binom
#include <algorithm>
#include <cstdio>
#include <iostream>
using namespace std;
namespace BlueQuantum {
typedef long long ll;
int const N = 1 << 16, P = 998244353, g = 3, ig = 332748118;
int n, m, a, b, c, d, cvt[N];
int A[N], B[N], C[N], D[N], fac[N], inv[N];
inline ll qpow(ll base, int exp) {
ll res = 1;
while (exp) {
if (exp & 1) res = res * base % P;
exp >>= 1;
base = base * base % P;
}
return res;
}
inline void NTT(int *const f, bool const typ, int const n) {
for (int i = 1; i < n; ++i)
if (i < cvt[i]) swap(f[i], f[cvt[i]]);
for (int i = 2; i <= n; i <<= 1) {
int mid = i >> 1, wn = qpow(typ ? g : ig, (P - 1) / i);
for (int j = 0; j < n; j += i) {
ll wk = 1;
for (int k = 0; k < mid; ++k, (wk *= wn) %= P) {
ll t = wk * f[j + k + mid] % P;
if ((f[j + k + mid] = f[j + k] - t) < 0) f[j + k + mid] += P;
if ((f[j + k] += t) >= P) f[j + k] -= P;
}
}
}
if (!typ) {
ll inv = qpow(n, P - 2);
for (int i = 0; i < n; ++i) f[i] = inv * f[i] % P;
}
}
inline ll calc(int n, int a, int b, int c, int d) {
if (n > a + b + c + d) return 0;
if (n < 0) return 0;
int maxl = 1;
while (maxl < ((a + b + c + d) << 1)) maxl <<= 1;
for (int i = 1; i < maxl; ++i) cvt[i] = cvt[i >> 1] >> 1 | (i & 1) * (maxl >> 1);
for (int i = 0; i < maxl; ++i) A[i] = (i <= a) ? inv[i] : 0;
for (int i = 0; i < maxl; ++i) B[i] = (i <= b) ? inv[i] : 0;
for (int i = 0; i < maxl; ++i) C[i] = (i <= c) ? inv[i] : 0;
for (int i = 0; i < maxl; ++i) D[i] = (i <= d) ? inv[i] : 0;
NTT(A, true, maxl), NTT(B, true, maxl), NTT(C, true, maxl), NTT(D, true, maxl);
for (int i = 0; i < maxl; ++i) A[i] = 1ll * A[i] * B[i] % P * C[i] % P * D[i] % P;
NTT(A, false, maxl);
return 1ll * fac[n] * A[n] % P;
}
inline ll binom(ll m, ll n) {
if (m < n) return 0;
return 1ll * fac[m] * inv[n] % P * inv[m - n] % P;
}
inline void init(int n) {
n *= 2;
fac[0] = 1;
for (int i = 1; i <= n; ++i) fac[i] = 1ll * fac[i - 1] * i % P;
inv[n] = qpow(fac[n], P - 2);
for (int i = n - 1; i >= 0; --i) inv[i] = 1ll * inv[i + 1] * (i + 1) % P;
}
int main() {
cin >> n >> a >> b >> c >> d;
int mn = min(a, min(b, min(c, d)));
init(n);
ll ans = 0;
bool one = true;
for (int i = 0; i <= min(mn, n / 4); ++i, one ^= 1) {
ll tmp = binom(n - 3 * i, i) * calc(n - 4 * i, a - i, b - i, c - i, d - i) % P;
ans = one ? (ans + tmp) % P : (ans + P - tmp) % P;
}
cout << ans;
return 0;
}
} // namespace BlueQuantum
int main() {
#ifndef ONLINE_JUDGE
#ifdef LOCAL
freopen("/tmp/CodeTmp/testdata.in", "r", stdin);
freopen("/tmp/CodeTmp/testdata.out", "w", stdout);
#else
freopen("P5339 [TJOI2019] 唱、跳、rap和篮球.in", "cvt", stdin);
freopen("P5339 [TJOI2019] 唱、跳、rap和篮球.out", "w", stdout);
#endif
#endif
ios::sync_with_stdio(false), cin.tie(NULL), cout.tie(NULL);
return BlueQuantum::main();
}