斯特林数
第二类斯特林数(Stirling Number)
为什么先介绍第二类斯特林数
虽然被称作「第二类」,第二类斯特林数却在斯特林的相关著作和具体数学中被首先描述,同时也比第一类斯特林数常用得多。
第二类斯特林数(斯特林子集数)
递推式
边界是
考虑用组合意义来证明。
我们插入一个新元素时,有两种方案:
- 将新元素单独放入一个子集,有
种方案; - 将新元素放入一个现有的非空子集,有
种方案。
根据加法原理,将两式相加即可得到递推式。
通项公式
使用容斥原理证明该公式。设将
显然
根据二项式反演
考虑
同一行第二类斯特林数的计算
「同一行」的第二类斯特林数指的是,有着不同的
根据上面给出的通项公式,卷积计算即可。该做法的时间复杂度为
下面的代码使用了名为 poly 的多项式类,仅供参考。
实现
#ifndef _FEISTDLIB_POLY_
#define _FEISTDLIB_POLY_
/*
* This file is part of the fstdlib project.
* Version: Build v0.0.2
* You can check for details at https://github.com/FNatsuka/fstdlib
*/
#include <algorithm>
#include <cmath>
#include <cstdio>
#include <vector>
namespace fstdlib {
typedef long long ll;
int mod = 998244353, grt = 3;
class poly {
private:
std::vector<int> data;
void out(void) {
for (int i = 0; i < (int)data.size(); ++i) printf("%d ", data[i]);
puts("");
}
public:
poly(std::size_t len = std::size_t(0)) { data = std::vector<int>(len); }
poly(const std::vector<int> &b) { data = b; }
poly(const poly &b) { data = b.data; }
void resize(std::size_t len, int val = 0) { data.resize(len, val); }
std::size_t size(void) const { return data.size(); }
void clear(void) { data.clear(); }
#if __cplusplus >= 201103L
void shrink_to_fit(void) { data.shrink_to_fit(); }
#endif
int &operator[](std::size_t b) { return data[b]; }
const int &operator[](std::size_t b) const { return data[b]; }
poly operator*(const poly &h) const;
poly operator*=(const poly &h);
poly operator*(const int &h) const;
poly operator*=(const int &h);
poly operator+(const poly &h) const;
poly operator+=(const poly &h);
poly operator-(const poly &h) const;
poly operator-=(const poly &h);
poly operator<<(const std::size_t &b) const;
poly operator<<=(const std::size_t &b);
poly operator>>(const std::size_t &b) const;
poly operator>>=(const std::size_t &b);
poly operator/(const int &h) const;
poly operator/=(const int &h);
poly operator==(const poly &h) const;
poly operator!=(const poly &h) const;
poly operator+(const int &h) const;
poly operator+=(const int &h);
poly inv(void) const;
poly inv(const int &h) const;
friend poly sqrt(const poly &h);
friend poly log(const poly &h);
friend poly exp(const poly &h);
};
int qpow(int a, int b, int p = mod) {
int res = 1;
while (b) {
if (b & 1) res = (ll)res * a % p;
a = (ll)a * a % p, b >>= 1;
}
return res;
}
std::vector<int> rev;
void dft_for_module(std::vector<int> &f, int n, int b) {
static std::vector<int> w;
w.resize(n);
for (int i = 0; i < n; ++i)
if (i < rev[i]) std::swap(f[i], f[rev[i]]);
for (int i = 2; i <= n; i <<= 1) {
w[0] = 1, w[1] = qpow(grt, (mod - 1) / i);
if (b == -1) w[1] = qpow(w[1], mod - 2);
for (int j = 2; j < i / 2; ++j) w[j] = (ll)w[j - 1] * w[1] % mod;
for (int j = 0; j < n; j += i)
for (int k = 0; k < i / 2; ++k) {
int p = f[j + k], q = (ll)f[j + k + i / 2] * w[k] % mod;
f[j + k] = (p + q) % mod, f[j + k + i / 2] = (p - q + mod) % mod;
}
}
}
poly poly::operator*(const poly &h) const {
int N = 1;
while (N < (int)(size() + h.size() - 1)) N <<= 1;
std::vector<int> f(this->data), g(h.data);
f.resize(N), g.resize(N);
rev.resize(N);
for (int i = 0; i < N; ++i)
rev[i] = (rev[i >> 1] >> 1) | (i & 1 ? N >> 1 : 0);
dft_for_module(f, N, 1), dft_for_module(g, N, 1);
for (int i = 0; i < N; ++i) f[i] = (ll)f[i] * g[i] % mod;
dft_for_module(f, N, -1), f.resize(size() + h.size() - 1);
for (int i = 0, inv = qpow(N, mod - 2); i < (int)f.size(); ++i)
f[i] = (ll)f[i] * inv % mod;
return f;
}
poly poly::operator*=(const poly &h) { return *this = *this * h; }
poly poly::operator*(const int &h) const {
std::vector<int> f(this->data);
for (int i = 0; i < (int)f.size(); ++i) f[i] = (ll)f[i] * h % mod;
return f;
}
poly poly::operator*=(const int &h) {
for (int i = 0; i < (int)size(); ++i) data[i] = (ll)data[i] * h % mod;
return *this;
}
poly poly::operator+(const poly &h) const {
std::vector<int> f(this->data);
if (f.size() < h.size()) f.resize(h.size());
for (int i = 0; i < (int)h.size(); ++i) f[i] = (f[i] + h[i]) % mod;
return f;
}
poly poly::operator+=(const poly &h) {
std::vector<int> &f = this->data;
if (f.size() < h.size()) f.resize(h.size());
for (int i = 0; i < (int)h.size(); ++i) f[i] = (f[i] + h[i]) % mod;
return f;
}
poly poly::operator-(const poly &h) const {
std::vector<int> f(this->data);
if (f.size() < h.size()) f.resize(h.size());
for (int i = 0; i < (int)h.size(); ++i) f[i] = (f[i] - h[i] + mod) % mod;
return f;
}
poly poly::operator-=(const poly &h) {
std::vector<int> &f = this->data;
if (f.size() < h.size()) f.resize(h.size());
for (int i = 0; i < (int)h.size(); ++i) f[i] = (f[i] - h[i] + mod) % mod;
return f;
}
poly poly::operator<<(const std::size_t &b) const {
std::vector<int> f(size() + b);
for (int i = 0; i < (int)size(); ++i) f[i + b] = data[i];
return f;
}
poly poly::operator<<=(const std::size_t &b) { return *this = (*this) << b; }
poly poly::operator>>(const std::size_t &b) const {
std::vector<int> f(size() - b);
for (int i = 0; i < (int)f.size(); ++i) f[i] = data[i + b];
return f;
}
poly poly::operator>>=(const std::size_t &b) { return *this = (*this) >> b; }
poly poly::operator/(const int &h) const {
std::vector<int> f(this->data);
int inv = qpow(h, mod - 2);
for (int i = 0; i < (int)f.size(); ++i) f[i] = (ll)f[i] * inv % mod;
return f;
}
poly poly::operator/=(const int &h) {
int inv = qpow(h, mod - 2);
for (int i = 0; i < (int)data.size(); ++i) data[i] = (ll)data[i] * inv % mod;
return *this;
}
poly poly::inv(void) const {
int N = 1;
while (N < (int)(size() + size() - 1)) N <<= 1;
std::vector<int> f(N), g(N), d(this->data);
d.resize(N), f[0] = qpow(d[0], mod - 2);
for (int w = 2; w < N; w <<= 1) {
for (int i = 0; i < w; ++i) g[i] = d[i];
rev.resize(w << 1);
for (int i = 0; i < w * 2; ++i)
rev[i] = (rev[i >> 1] >> 1) | (i & 1 ? w : 0);
dft_for_module(f, w << 1, 1), dft_for_module(g, w << 1, 1);
for (int i = 0; i < w * 2; ++i)
f[i] = (ll)f[i] * (2 + mod - (ll)f[i] * g[i] % mod) % mod;
dft_for_module(f, w << 1, -1);
for (int i = 0, inv = qpow(w << 1, mod - 2); i < w; ++i)
f[i] = (ll)f[i] * inv % mod;
for (int i = w; i < w * 2; ++i) f[i] = 0;
}
f.resize(size());
return f;
}
poly poly::operator==(const poly &h) const {
if (size() != h.size()) return 0;
for (int i = 0; i < (int)size(); ++i)
if (data[i] != h[i]) return 0;
return 1;
}
poly poly::operator!=(const poly &h) const {
if (size() != h.size()) return 1;
for (int i = 0; i < (int)size(); ++i)
if (data[i] != h[i]) return 1;
return 0;
}
poly poly::operator+(const int &h) const {
poly f(this->data);
f[0] = (f[0] + h) % mod;
return f;
}
poly poly::operator+=(const int &h) { return *this = (*this) + h; }
poly poly::inv(const int &h) const {
poly f(*this);
f.resize(h);
return f.inv();
}
int modsqrt(int h, int p = mod) { return 1; }
poly sqrt(const poly &h) {
int N = 1;
while (N < (int)(h.size() + h.size() - 1)) N <<= 1;
poly f(N), g(N), d(h);
d.resize(N), f[0] = modsqrt(d[0]);
for (int w = 2; w < N; w <<= 1) {
g.resize(w);
for (int i = 0; i < w; ++i) g[i] = d[i];
f = (f + f.inv(w) * g) / 2;
f.resize(w);
}
f.resize(h.size());
return f;
}
poly log(const poly &h) {
poly f(h);
for (int i = 1; i < (int)f.size(); ++i) f[i - 1] = (ll)f[i] * i % mod;
f[f.size() - 1] = 0, f = f * h.inv(), f.resize(h.size());
for (int i = (int)f.size() - 1; i > 0; --i)
f[i] = (ll)f[i - 1] * qpow(i, mod - 2) % mod;
f[0] = 0;
return f;
}
poly exp(const poly &h) {
int N = 1;
while (N < (int)(h.size() + h.size() - 1)) N <<= 1;
poly f(N), g(N), d(h);
f[0] = 1, d.resize(N);
for (int w = 2; w < N; w <<= 1) {
f.resize(w), g.resize(w);
for (int i = 0; i < w; ++i) g[i] = d[i];
f = f * (g + 1 - log(f));
f.resize(w);
}
f.resize(h.size());
return f;
}
struct comp {
long double x, y;
comp(long double _x = 0, long double _y = 0) : x(_x), y(_y) {}
comp operator*(const comp &b) const {
return comp(x * b.x - y * b.y, x * b.y + y * b.x);
}
comp operator+(const comp &b) const { return comp(x + b.x, y + b.y); }
comp operator-(const comp &b) const { return comp(x - b.x, y - b.y); }
comp conj(void) { return comp(x, -y); }
};
const int EPS = 1e-9;
template <typename FLOAT_T>
FLOAT_T fabs(const FLOAT_T &x) {
return x > 0 ? x : -x;
}
template <typename FLOAT_T>
FLOAT_T sin(const FLOAT_T &x, const long double &EPS = fstdlib::EPS) {
FLOAT_T res = 0, delt = x;
int d = 0;
while (fabs(delt) > EPS) {
res += delt, ++d;
delt *= -x * x / ((2 * d) * (2 * d + 1));
}
return res;
}
template <typename FLOAT_T>
FLOAT_T cos(const FLOAT_T &x, const long double &EPS = fstdlib::EPS) {
FLOAT_T res = 0, delt = 1;
int d = 0;
while (fabs(delt) > EPS) {
res += delt, ++d;
delt *= -x * x / ((2 * d) * (2 * d - 1));
}
return res;
}
const long double PI = std::acos((long double)(-1));
void dft_for_complex(std::vector<comp> &f, int n, int b) {
static std::vector<comp> w;
w.resize(n);
for (int i = 0; i < n; ++i)
if (i < rev[i]) std::swap(f[i], f[rev[i]]);
for (int i = 2; i <= n; i <<= 1) {
w[0] = comp(1, 0), w[1] = comp(cos(2 * PI / i), b * sin(2 * PI / i));
for (int j = 2; j < i / 2; ++j) w[j] = w[j - 1] * w[1];
for (int j = 0; j < n; j += i)
for (int k = 0; k < i / 2; ++k) {
comp p = f[j + k], q = f[j + k + i / 2] * w[k];
f[j + k] = p + q, f[j + k + i / 2] = p - q;
}
}
}
class arbitrary_module_poly {
private:
std::vector<int> data;
int construct_element(int D, ll x, ll y, ll z) const {
x %= mod, y %= mod, z %= mod;
return ((ll)D * D * x % mod + (ll)D * y % mod + z) % mod;
}
public:
int mod;
arbitrary_module_poly(std::size_t len = std::size_t(0),
int module_value = 1e9 + 7) {
mod = module_value;
data = std::vector<int>(len);
}
arbitrary_module_poly(const std::vector<int> &b, int module_value = 1e9 + 7) {
mod = module_value;
data = b;
}
arbitrary_module_poly(const arbitrary_module_poly &b) {
mod = b.mod;
data = b.data;
}
void resize(std::size_t len, const int &val = 0) { data.resize(len, val); }
std::size_t size(void) const { return data.size(); }
void clear(void) { data.clear(); }
#if __cplusplus >= 201103L
void shrink_to_fit(void) { data.shrink_to_fit(); }
#endif
int &operator[](std::size_t b) { return data[b]; }
const int &operator[](std::size_t b) const { return data[b]; }
arbitrary_module_poly operator*(const arbitrary_module_poly &h) const;
arbitrary_module_poly operator*=(const arbitrary_module_poly &h);
arbitrary_module_poly operator*(const int &h) const;
arbitrary_module_poly operator*=(const int &h);
arbitrary_module_poly operator+(const arbitrary_module_poly &h) const;
arbitrary_module_poly operator+=(const arbitrary_module_poly &h);
arbitrary_module_poly operator-(const arbitrary_module_poly &h) const;
arbitrary_module_poly operator-=(const arbitrary_module_poly &h);
arbitrary_module_poly operator<<(const std::size_t &b) const;
arbitrary_module_poly operator<<=(const std::size_t &b);
arbitrary_module_poly operator>>(const std::size_t &b) const;
arbitrary_module_poly operator>>=(const std::size_t &b);
arbitrary_module_poly operator/(const int &h) const;
arbitrary_module_poly operator/=(const int &h);
arbitrary_module_poly operator==(const arbitrary_module_poly &h) const;
arbitrary_module_poly operator!=(const arbitrary_module_poly &h) const;
arbitrary_module_poly inv(void) const;
arbitrary_module_poly inv(const int &h) const;
friend arbitrary_module_poly sqrt(const arbitrary_module_poly &h);
friend arbitrary_module_poly log(const arbitrary_module_poly &h);
};
arbitrary_module_poly arbitrary_module_poly::operator*(
const arbitrary_module_poly &h) const {
int N = 1;
while (N < (int)(size() + h.size() - 1)) N <<= 1;
std::vector<comp> f(N), g(N), p(N), q(N);
const int D = std::sqrt(mod);
for (int i = 0; i < (int)size(); ++i)
f[i].x = data[i] / D, f[i].y = data[i] % D;
for (int i = 0; i < (int)h.size(); ++i) g[i].x = h[i] / D, g[i].y = h[i] % D;
rev.resize(N);
for (int i = 0; i < N; ++i)
rev[i] = (rev[i >> 1] >> 1) | (i & 1 ? N >> 1 : 0);
dft_for_complex(f, N, 1), dft_for_complex(g, N, 1);
for (int i = 0; i < N; ++i) {
p[i] = (f[i] + f[(N - i) % N].conj()) * comp(0.50, 0) * g[i];
q[i] = (f[i] - f[(N - i) % N].conj()) * comp(0, -0.5) * g[i];
}
dft_for_complex(p, N, -1), dft_for_complex(q, N, -1);
std::vector<int> r(size() + h.size() - 1);
for (int i = 0; i < (int)r.size(); ++i)
r[i] = construct_element(D, p[i].x / N + 0.5, (p[i].y + q[i].x) / N + 0.5,
q[i].y / N + 0.5);
return arbitrary_module_poly(r, mod);
}
arbitrary_module_poly arbitrary_module_poly::operator*=(
const arbitrary_module_poly &h) {
return *this = *this * h;
}
arbitrary_module_poly arbitrary_module_poly::operator*(const int &h) const {
std::vector<int> f(this->data);
for (int i = 0; i < (int)f.size(); ++i) f[i] = (ll)f[i] * h % mod;
return arbitrary_module_poly(f, mod);
}
arbitrary_module_poly arbitrary_module_poly::operator*=(const int &h) {
for (int i = 0; i < (int)size(); ++i) data[i] = (ll)data[i] * h % mod;
return *this;
}
arbitrary_module_poly arbitrary_module_poly::operator+(
const arbitrary_module_poly &h) const {
std::vector<int> f(this->data);
if (f.size() < h.size()) f.resize(h.size());
for (int i = 0; i < (int)h.size(); ++i) f[i] = (f[i] + h[i]) % mod;
return arbitrary_module_poly(f, mod);
}
arbitrary_module_poly arbitrary_module_poly::operator+=(
const arbitrary_module_poly &h) {
if (size() < h.size()) resize(h.size());
for (int i = 0; i < (int)h.size(); ++i) data[i] = (data[i] + h[i]) % mod;
return *this;
}
arbitrary_module_poly arbitrary_module_poly::operator-(
const arbitrary_module_poly &h) const {
std::vector<int> f(this->data);
if (f.size() < h.size()) f.resize(h.size());
for (int i = 0; i < (int)h.size(); ++i) f[i] = (f[i] + mod - h[i]) % mod;
return arbitrary_module_poly(f, mod);
}
arbitrary_module_poly arbitrary_module_poly::operator-=(
const arbitrary_module_poly &h) {
if (size() < h.size()) resize(h.size());
for (int i = 0; i < (int)h.size(); ++i)
data[i] = (data[i] + mod - h[i]) % mod;
return *this;
}
arbitrary_module_poly arbitrary_module_poly::operator<<(
const std::size_t &b) const {
std::vector<int> f(size() + b);
for (int i = 0; i < (int)size(); ++i) f[i + b] = data[i];
return arbitrary_module_poly(f, mod);
}
arbitrary_module_poly arbitrary_module_poly::operator<<=(const std::size_t &b) {
return *this = (*this) << b;
}
arbitrary_module_poly arbitrary_module_poly::operator>>(
const std::size_t &b) const {
std::vector<int> f(size() - b);
for (int i = 0; i < (int)f.size(); ++i) f[i] = data[i + b];
return arbitrary_module_poly(f, mod);
}
arbitrary_module_poly arbitrary_module_poly::operator>>=(const std::size_t &b) {
return *this = (*this) >> b;
}
arbitrary_module_poly arbitrary_module_poly::inv(void) const {
int N = 1;
while (N < (int)(size() + size() - 1)) N <<= 1;
arbitrary_module_poly f(1, mod), g(N, mod), h(*this), f2(1, mod);
f[0] = qpow(data[0], mod - 2, mod), h.resize(N), f2[0] = 2;
for (int w = 2; w < N; w <<= 1) {
g.resize(w);
for (int i = 0; i < w; ++i) g[i] = h[i];
f = f * (f * g - f2) * (mod - 1);
f.resize(w);
}
f.resize(size());
return f;
}
arbitrary_module_poly arbitrary_module_poly::inv(const int &h) const {
arbitrary_module_poly f(*this);
f.resize(h);
return f.inv();
}
arbitrary_module_poly arbitrary_module_poly::operator/(const int &h) const {
int inv = qpow(h, mod - 2, mod);
std::vector<int> f(this->data);
for (int i = 0; i < (int)f.size(); ++i) f[i] = (ll)f[i] * inv % mod;
return arbitrary_module_poly(f, mod);
}
arbitrary_module_poly arbitrary_module_poly::operator/=(const int &h) {
int inv = qpow(h, mod - 2, mod);
for (int i = 0; i < (int)size(); ++i) data[i] = (ll)data[i] * inv % mod;
return *this;
}
arbitrary_module_poly arbitrary_module_poly::operator==(
const arbitrary_module_poly &h) const {
if (size() != h.size() || mod != h.mod) return 0;
for (int i = 0; i < (int)size(); ++i)
if (data[i] != h[i]) return 0;
return 1;
}
arbitrary_module_poly arbitrary_module_poly::operator!=(
const arbitrary_module_poly &h) const {
if (size() != h.size() || mod != h.mod) return 1;
for (int i = 0; i < (int)size(); ++i)
if (data[i] != h[i]) return 1;
return 0;
}
arbitrary_module_poly sqrt(const arbitrary_module_poly &h) {
int N = 1;
while (N < (int)(h.size() + h.size() - 1)) N <<= 1;
arbitrary_module_poly f(1, mod), g(N, mod), d(h);
f[0] = modsqrt(h[0], mod), d.resize(N);
for (int w = 2; w < N; w <<= 1) {
g.resize(w);
for (int i = 0; i < w; ++i) g[i] = d[i];
f = (f + f.inv(w) * g) / 2;
f.resize(w);
}
f.resize(h.size());
return f;
}
arbitrary_module_poly log(const arbitrary_module_poly &h) {
arbitrary_module_poly f(h);
for (int i = 1; i < (int)f.size(); ++i) f[i - 1] = (ll)f[i] * i % f.mod;
f[f.size() - 1] = 0, f = f * h.inv(), f.resize(h.size());
for (int i = (int)f.size() - 1; i > 0; --i)
f[i] = (ll)f[i - 1] * qpow(i, f.mod - 2, f.mod) % f.mod;
f[0] = 0;
return f;
}
typedef arbitrary_module_poly m_poly;
} // namespace fstdlib
#endif
实现
int main() {
scanf("%d", &n);
fact[0] = 1;
for (int i = 1; i <= n; ++i) fact[i] = (ll)fact[i - 1] * i % mod;
exgcd(fact[n], mod, ifact[n], ifact[0]),
ifact[n] = (ifact[n] % mod + mod) % mod;
for (int i = n - 1; i >= 0; --i) ifact[i] = (ll)ifact[i + 1] * (i + 1) % mod;
poly f(n + 1), g(n + 1);
for (int i = 0; i <= n; ++i)
g[i] = (i & 1 ? mod - 1ll : 1ll) * ifact[i] % mod,
f[i] = (ll)qpow(i, n) * ifact[i] % mod;
f *= g, f.resize(n + 1);
for (int i = 0; i <= n; ++i) printf("%d ", f[i]);
return 0;
}
同一列第二类斯特林数的计算
「同一列」的第二类斯特林数指的是,有着不同的
利用指数型生成函数计算。
一个盒子装
另外,
这里涉及到很多「有标号」「无标号」的内容,注意辨析。
实现
int main() {
scanf("%d%d", &n, &k);
poly f(n + 1);
fact[0] = 1;
for (int i = 1; i <= n; ++i) fact[i] = (ll)fact[i - 1] * i % mod;
for (int i = 1; i <= n; ++i) f[i] = qpow(fact[i], mod - 2);
f = exp(log(f >> 1) * k) << k, f.resize(n + 1);
int inv = qpow(fact[k], mod - 2);
for (int i = 0; i <= n; ++i)
printf("%lld ", (ll)f[i] * fact[i] % mod * inv % mod);
return 0;
}
第一类斯特林数(Stirling Number)
第一类斯特林数(斯特林轮换数)
一个轮换就是一个首尾相接的环形排列。我们可以写出一个轮换
递推式
边界是
该递推式的证明可以考虑其组合意义。
我们插入一个新元素时,有两种方案:
- 将该新元素置于一个单独的轮换中,共有
种方案; - 将该元素插入到任何一个现有的轮换中,共有
种方案。
根据加法原理,将两式相加即可得到递推式。
通项公式
第一类斯特林数没有实用的通项公式。
同一行第一类斯特林数的计算
类似第二类斯特林数,我们构造同行第一类斯特林数的生成函数,即
根据递推公式,不难写出
于是
这其实是
同一列第一类斯特林数的计算
仿照第二类斯特林数的计算,我们可以用指数型生成函数解决该问题。注意,由于递推公式和行有关,我们不能利用递推公式计算同列的第一类斯特林数。
显然,单个轮换的指数型生成函数为
它的
实现
int main() {
scanf("%d%d", &n, &k);
fact[0] = 1;
for (int i = 1; i <= n; ++i) fact[i] = (ll)fact[i - 1] * i % mod;
ifact[n] = qpow(fact[n], mod - 2);
for (int i = n - 1; i >= 0; --i) ifact[i] = (ll)ifact[i + 1] * (i + 1) % mod;
poly f(n + 1);
for (int i = 1; i <= n; ++i) f[i] = (ll)fact[i - 1] * ifact[i] % mod;
f = exp(log(f >> 1) * k) << k, f.resize(n + 1);
for (int i = 0; i <= n; ++i)
printf("%lld ", (ll)f[i] * fact[i] % mod * ifact[k] % mod);
return 0;
}
应用
上升幂与普通幂的相互转化
我们记上升阶乘幂
则可以利用下面的恒等式将上升幂转化为普通幂:
如果将普通幂转化为上升幂,则有下面的恒等式:
下降幂与普通幂的相互转化
我们记下降阶乘幂
则可以利用下面的恒等式将普通幂转化为下降幂:
如果将下降幂转化为普通幂,则有下面的恒等式:
多项式下降阶乘幂表示与多项式点值表示的关系
在这里,多项式的下降阶乘幂表示就是用
的形式表示一个多项式,而点值表示就是用
来表示一个多项式。
显然,下降阶乘幂
即
这是一个卷积形式的式子,我们可以在
习题
参考资料与注释
- Stirling Number of the First Kind - Wolfram MathWorld
- Stirling Number of the Second Kind - Wolfram MathWorld
最后更新: March 26, 2024
创建日期: August 3, 2018
创建日期: August 3, 2018