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	r"""
	Efficient functions for generating Appell sequences.

	An Appell sequence is a zero-indexed sequence of polynomials `p_i(x)`
	satisfying `p_{i+1}'(x)=(i+1)p_i(x)` for all `i`. This definition leads
	to the following iterative algorithm:

	.. math :: p_0(x) = c_0,\ p_i(x) = i \int_0^x p_{i-1}(t)\,dt + c_i

	The constant coefficients `c_i` are usually determined from the
	just-evaluated integral and `i`.

	Appell sequences satisfy the following identity from umbral calculus:

	.. math :: p_n(x+y) = \sum_{k=0}^n \binom{n}{k} p_k(x) y^{n-k}

	References
	==========

	.. [1] https://en.wikipedia.org/wiki/Appell_sequence
	.. [2] Peter Luschny, "An introduction to the Bernoulli function",
	https://arxiv.org/abs/2009.06743
	"""
	from sympy.polys.densearith import dup_mul_ground, dup_sub_ground, dup_quo_ground
	from sympy.polys.densetools import dup_eval, dup_integrate
	from sympy.polys.domains import ZZ, QQ
	from sympy.polys.polytools import named_poly
	from sympy.utilities import public

	def dup_bernoulli(n, K):
	"""Low-level implementation of Bernoulli polynomials."""
	if n < 1:
	return [K.one]
	p = [K.one, K(-1,2)]
	for i in range(2, n+1):
	p = dup_integrate(dup_mul_ground(p, K(i), K), 1, K)
	if i % 2 == 0:
	p = dup_sub_ground(p, dup_eval(p, K(1,2), K) * K(1<<(i-1), (1<<i)-1), K)
	return p

	@public
	def bernoulli_poly(n, x=None, polys=False):
	r"""Generates the Bernoulli polynomial `\operatorname{B}_n(x)`.

	`\operatorname{B}_n(x)` is the unique polynomial satisfying

	.. math :: \int_{x}^{x+1} \operatorname{B}_n(t) \,dt = x^n.

	Based on this, we have for nonnegative integer `s` and integer
	`a` and `b`

	.. math :: \sum_{k=a}^{b} k^s = \frac{\operatorname{B}_{s+1}(b+1) -
	\operatorname{B}_{s+1}(a)}{s+1}

	which is related to Jakob Bernoulli's original motivation for introducing
	the Bernoulli numbers, the values of these polynomials at `x = 1`.

	Examples
	========

	>>> from sympy import summation
	>>> from sympy.abc import x
	>>> from sympy.polys import bernoulli_poly
	>>> bernoulli_poly(5, x)
	x*5 - 5x*4/2 + 5x**3/3 - x/6

	>>> def psum(p, a, b):
	... return (bernoulli_poly(p+1,b+1) - bernoulli_poly(p+1,a)) / (p+1)
	>>> psum(4, -6, 27)
	3144337
	>>> summation(x**4, (x, -6, 27))
	3144337

	>>> psum(1, 1, x).factor()
	x*(x + 1)/2
	>>> psum(2, 1, x).factor()
	x(x + 1)(2*x + 1)/6
	>>> psum(3, 1, x).factor()
	x*2(x + 1)**2/4

	Parameters
	==========

	n : int
	Degree of the polynomial.
	x : optional
	polys : bool, optional
	If True, return a Poly, otherwise (default) return an expression.

	See Also
	========

	sympy.functions.combinatorial.numbers.bernoulli

	References
	==========

	.. [1] https://en.wikipedia.org/wiki/Bernoulli_polynomials
	"""
	return named_poly(n, dup_bernoulli, QQ, "Bernoulli polynomial", (x,), polys)

	def dup_bernoulli_c(n, K):
	"""Low-level implementation of central Bernoulli polynomials."""
	p = [K.one]
	for i in range(1, n+1):
	p = dup_integrate(dup_mul_ground(p, K(i), K), 1, K)
	if i % 2 == 0:
	p = dup_sub_ground(p, dup_eval(p, K.one, K) * K((1<<(i-1))-1, (1<<i)-1), K)
	return p

	@public
	def bernoulli_c_poly(n, x=None, polys=False):
	r"""Generates the central Bernoulli polynomial `\operatorname{B}_n^c(x)`.

	These are scaled and shifted versions of the plain Bernoulli polynomials,
	done in such a way that `\operatorname{B}_n^c(x)` is an even or odd function
	for even or odd `n` respectively:

	.. math :: \operatorname{B}_n^c(x) = 2^n \operatorname{B}_n
	\left(\frac{x+1}{2}\right)

	Parameters
	==========

	n : int
	Degree of the polynomial.
	x : optional
	polys : bool, optional
	If True, return a Poly, otherwise (default) return an expression.
	"""
	return named_poly(n, dup_bernoulli_c, QQ, "central Bernoulli polynomial", (x,), polys)

	def dup_genocchi(n, K):
	"""Low-level implementation of Genocchi polynomials."""
	if n < 1:
	return [K.zero]
	p = [-K.one]
	for i in range(2, n+1):
	p = dup_integrate(dup_mul_ground(p, K(i), K), 1, K)
	if i % 2 == 0:
	p = dup_sub_ground(p, dup_eval(p, K.one, K) // K(2), K)
	return p

	@public
	def genocchi_poly(n, x=None, polys=False):
	r"""Generates the Genocchi polynomial `\operatorname{G}_n(x)`.

	`\operatorname{G}_n(x)` is twice the difference between the plain and
	central Bernoulli polynomials, so has degree `n-1`:

	.. math :: \operatorname{G}_n(x) = 2 (\operatorname{B}_n(x) -
	\operatorname{B}_n^c(x))

	The factor of 2 in the definition endows `\operatorname{G}_n(x)` with
	integer coefficients.

	Parameters
	==========

	n : int
	Degree of the polynomial plus one.
	x : optional
	polys : bool, optional
	If True, return a Poly, otherwise (default) return an expression.

	See Also
	========

	sympy.functions.combinatorial.numbers.genocchi
	"""
	return named_poly(n, dup_genocchi, ZZ, "Genocchi polynomial", (x,), polys)

	def dup_euler(n, K):
	"""Low-level implementation of Euler polynomials."""
	return dup_quo_ground(dup_genocchi(n+1, ZZ), K(-n-1), K)

	@public
	def euler_poly(n, x=None, polys=False):
	r"""Generates the Euler polynomial `\operatorname{E}_n(x)`.

	These are scaled and reindexed versions of the Genocchi polynomials:

	.. math :: \operatorname{E}_n(x) = -\frac{\operatorname{G}_{n+1}(x)}{n+1}

	Parameters
	==========

	n : int
	Degree of the polynomial.
	x : optional
	polys : bool, optional
	If True, return a Poly, otherwise (default) return an expression.

	See Also
	========

	sympy.functions.combinatorial.numbers.euler
	"""
	return named_poly(n, dup_euler, QQ, "Euler polynomial", (x,), polys)

	def dup_andre(n, K):
	"""Low-level implementation of Andre polynomials."""
	p = [K.one]
	for i in range(1, n+1):
	p = dup_integrate(dup_mul_ground(p, K(i), K), 1, K)
	if i % 2 == 0:
	p = dup_sub_ground(p, dup_eval(p, K.one, K), K)
	return p

	@public
	def andre_poly(n, x=None, polys=False):
	r"""Generates the Andre polynomial `\mathcal{A}_n(x)`.

	This is the Appell sequence where the constant coefficients form the sequence
	of Euler numbers ``euler(n)``. As such they have integer coefficients
	and parities matching the parity of `n`.

	Luschny calls these the Swiss-knife polynomials because their values
	at 0 and 1 can be simply transformed into both the Bernoulli and Euler
	numbers. Here they are called the Andre polynomials because
	`\|\mathcal{A}_n(n\bmod 2)\|` for `n \ge 0` generates what Luschny calls
	the Andre numbers, A000111 in the OEIS.

	Examples
	========

	>>> from sympy import bernoulli, euler, genocchi
	>>> from sympy.abc import x
	>>> from sympy.polys import andre_poly
	>>> andre_poly(9, x)
	x*9 - 36x*7 + 630x*5 - 5124x*3 + 12465x

	>>> [andre_poly(n, 0) for n in range(11)]
	[1, 0, -1, 0, 5, 0, -61, 0, 1385, 0, -50521]
	>>> [euler(n) for n in range(11)]
	[1, 0, -1, 0, 5, 0, -61, 0, 1385, 0, -50521]
	>>> [andre_poly(n-1, 1) * n / (4n - 2n) for n in range(1, 11)]
	[1/2, 1/6, 0, -1/30, 0, 1/42, 0, -1/30, 0, 5/66]
	>>> [bernoulli(n) for n in range(1, 11)]
	[1/2, 1/6, 0, -1/30, 0, 1/42, 0, -1/30, 0, 5/66]
	>>> [-andre_poly(n-1, -1) * n / (-2)**(n-1) for n in range(1, 11)]
	[-1, -1, 0, 1, 0, -3, 0, 17, 0, -155]
	>>> [genocchi(n) for n in range(1, 11)]
	[-1, -1, 0, 1, 0, -3, 0, 17, 0, -155]

	>>> [abs(andre_poly(n, n%2)) for n in range(11)]
	[1, 1, 1, 2, 5, 16, 61, 272, 1385, 7936, 50521]

	Parameters
	==========

	n : int
	Degree of the polynomial.
	x : optional
	polys : bool, optional
	If True, return a Poly, otherwise (default) return an expression.

	See Also
	========

	sympy.functions.combinatorial.numbers.andre

	References
	==========

	.. [1] Peter Luschny, "An introduction to the Bernoulli function",
	https://arxiv.org/abs/2009.06743
	"""
	return named_poly(n, dup_andre, ZZ, "Andre polynomial", (x,), polys)