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	"""
	Utility functions for integer math.

	TODO: rename, cleanup, perhaps move the gmpy wrapper code
	here from settings.py

	"""

	import math
	from bisect import bisect

	from .backend import xrange
	from .backend import BACKEND, gmpy, sage, sage_utils, MPZ, MPZ_ONE, MPZ_ZERO

	small_trailing = [0] * 256
	for j in range(1,8):
	small_trailing[1<<j::1<<(j+1)] = [j] * (1<<(7-j))

	def giant_steps(start, target, n=2):
	"""
	Return a list of integers ~=

	[start, n*start, ..., target/n^2, target/n, target]

	but conservatively rounded so that the quotient between two
	successive elements is actually slightly less than n.

	With n = 2, this describes suitable precision steps for a
	quadratically convergent algorithm such as Newton's method;
	with n = 3 steps for cubic convergence (Halley's method), etc.

	>>> giant_steps(50,1000)
	[66, 128, 253, 502, 1000]
	>>> giant_steps(50,1000,4)
	[65, 252, 1000]

	"""
	L = [target]
	while L[-1] > start*n:
	L = L + [L[-1]//n + 2]
	return L[::-1]

	def rshift(x, n):
	"""For an integer x, calculate x >> n with the fastest (floor)
	rounding. Unlike the plain Python expression (x >> n), n is
	allowed to be negative, in which case a left shift is performed."""
	if n >= 0: return x >> n
	else: return x << (-n)

	def lshift(x, n):
	"""For an integer x, calculate x << n. Unlike the plain Python
	expression (x << n), n is allowed to be negative, in which case a
	right shift with default (floor) rounding is performed."""
	if n >= 0: return x << n
	else: return x >> (-n)

	if BACKEND == 'sage':
	import operator
	rshift = operator.rshift
	lshift = operator.lshift

	def python_trailing(n):
	"""Count the number of trailing zero bits in abs(n)."""
	if not n:
	return 0
	low_byte = n & 0xff
	if low_byte:
	return small_trailing[low_byte]
	t = 8
	n >>= 8
	while not n & 0xff:
	n >>= 8
	t += 8
	return t + small_trailing[n & 0xff]

	if BACKEND == 'gmpy':
	if gmpy.version() >= '2':
	def gmpy_trailing(n):
	"""Count the number of trailing zero bits in abs(n) using gmpy."""
	if n: return MPZ(n).bit_scan1()
	else: return 0
	else:
	def gmpy_trailing(n):
	"""Count the number of trailing zero bits in abs(n) using gmpy."""
	if n: return MPZ(n).scan1()
	else: return 0

	# Small powers of 2
	powers = [1<<_ for _ in range(300)]

	def python_bitcount(n):
	"""Calculate bit size of the nonnegative integer n."""
	bc = bisect(powers, n)
	if bc != 300:
	return bc
	bc = int(math.log(n, 2)) - 4
	return bc + bctable[n>>bc]

	def gmpy_bitcount(n):
	"""Calculate bit size of the nonnegative integer n."""
	if n: return MPZ(n).numdigits(2)
	else: return 0

	#def sage_bitcount(n):
	# if n: return MPZ(n).nbits()
	# else: return 0

	def sage_trailing(n):
	return MPZ(n).trailing_zero_bits()

	if BACKEND == 'gmpy':
	bitcount = gmpy_bitcount
	trailing = gmpy_trailing
	elif BACKEND == 'sage':
	sage_bitcount = sage_utils.bitcount
	bitcount = sage_bitcount
	trailing = sage_trailing
	else:
	bitcount = python_bitcount
	trailing = python_trailing

	if BACKEND == 'gmpy' and 'bit_length' in dir(gmpy):
	bitcount = gmpy.bit_length

	# Used to avoid slow function calls as far as possible
	trailtable = [trailing(n) for n in range(256)]
	bctable = [bitcount(n) for n in range(1024)]

	# TODO: speed up for bases 2, 4, 8, 16, ...

	def bin_to_radix(x, xbits, base, bdigits):
	"""Changes radix of a fixed-point number; i.e., converts
	x * 2*xbits to floor(x 10**bdigits)."""
	return x * (MPZ(base)**bdigits) >> xbits

	stddigits = '0123456789abcdefghijklmnopqrstuvwxyz'

	def small_numeral(n, base=10, digits=stddigits):
	"""Return the string numeral of a positive integer in an arbitrary
	base. Most efficient for small input."""
	if base == 10:
	return str(n)
	digs = []
	while n:
	n, digit = divmod(n, base)
	digs.append(digits[digit])
	return "".join(digs[::-1])

	def numeral_python(n, base=10, size=0, digits=stddigits):
	"""Represent the integer n as a string of digits in the given base.
	Recursive division is used to make this function about 3x faster
	than Python's str() for converting integers to decimal strings.

	The 'size' parameters specifies the number of digits in n; this
	number is only used to determine splitting points and need not be
	exact."""
	if n <= 0:
	if not n:
	return "0"
	return "-" + numeral(-n, base, size, digits)
	# Fast enough to do directly
	if size < 250:
	return small_numeral(n, base, digits)
	# Divide in half
	half = (size // 2) + (size & 1)
	A, B = divmod(n, base**half)
	ad = numeral(A, base, half, digits)
	bd = numeral(B, base, half, digits).rjust(half, "0")
	return ad + bd

	def numeral_gmpy(n, base=10, size=0, digits=stddigits):
	"""Represent the integer n as a string of digits in the given base.
	Recursive division is used to make this function about 3x faster
	than Python's str() for converting integers to decimal strings.

	The 'size' parameters specifies the number of digits in n; this
	number is only used to determine splitting points and need not be
	exact."""
	if n < 0:
	return "-" + numeral(-n, base, size, digits)
	# gmpy.digits() may cause a segmentation fault when trying to convert
	# extremely large values to a string. The size limit may need to be
	# adjusted on some platforms, but 1500000 works on Windows and Linux.
	if size < 1500000:
	return gmpy.digits(n, base)
	# Divide in half
	half = (size // 2) + (size & 1)
	A, B = divmod(n, MPZ(base)**half)
	ad = numeral(A, base, half, digits)
	bd = numeral(B, base, half, digits).rjust(half, "0")
	return ad + bd

	if BACKEND == "gmpy":
	numeral = numeral_gmpy
	else:
	numeral = numeral_python

	_1_800 = 1<<800
	_1_600 = 1<<600
	_1_400 = 1<<400
	_1_200 = 1<<200
	_1_100 = 1<<100
	_1_50 = 1<<50

	def isqrt_small_python(x):
	"""
	Correctly (floor) rounded integer square root, using
	division. Fast up to ~200 digits.
	"""
	if not x:
	return x
	if x < _1_800:
	# Exact with IEEE double precision arithmetic
	if x < _1_50:
	return int(x**0.5)
	# Initial estimate can be any integer >= the true root; round up
	r = int(x*0.5 1.00000000000001) + 1
	else:
	bc = bitcount(x)
	n = bc//2
	r = int((x>>(2n-100))*0.5+2)<<(n-50) # +2 is to round up
	# The following iteration now precisely computes floor(sqrt(x))
	# See e.g. Crandall & Pomerance, "Prime Numbers: A Computational
	# Perspective"
	while 1:
	y = (r+x//r)>>1
	if y >= r:
	return r
	r = y

	def isqrt_fast_python(x):
	"""
	Fast approximate integer square root, computed using division-free
	Newton iteration for large x. For random integers the result is almost
	always correct (floor(sqrt(x))), but is 1 ulp too small with a roughly
	0.1% probability. If x is very close to an exact square, the answer is
	1 ulp wrong with high probability.

	With 0 guard bits, the largest error over a set of 10^5 random
	inputs of size 1-10^5 bits was 3 ulp. The use of 10 guard bits
	almost certainly guarantees a max 1 ulp error.
	"""
	# Use direct division-based iteration if sqrt(x) < 2^400
	# Assume floating-point square root accurate to within 1 ulp, then:
	# 0 Newton iterations good to 52 bits
	# 1 Newton iterations good to 104 bits
	# 2 Newton iterations good to 208 bits
	# 3 Newton iterations good to 416 bits
	if x < _1_800:
	y = int(x**0.5)
	if x >= _1_100:
	y = (y + x//y) >> 1
	if x >= _1_200:
	y = (y + x//y) >> 1
	if x >= _1_400:
	y = (y + x//y) >> 1
	return y
	bc = bitcount(x)
	guard_bits = 10
	x <<= 2*guard_bits
	bc += 2*guard_bits
	bc += (bc&1)
	hbc = bc//2
	startprec = min(50, hbc)
	# Newton iteration for 1/sqrt(x), with floating-point starting value
	r = int(2.0*(2startprec) * (x >> (bc-2startprec)) * -0.5)
	pp = startprec
	for p in giant_steps(startprec, hbc):
	# r2, scaled from real size 2(-bc) to 2**p
	r2 = (rr) >> (2pp - p)
	# xr2, scaled from real size ~1.0 to 2*p
	xr2 = ((x >> (bc-p)) * r2) >> p
	# New value of r, scaled from real size 2(-bc/2) to 2p
	r = (r * ((3<<p) - xr2)) >> (pp+1)
	pp = p
	# (1/sqrt(x))*x = sqrt(x)
	return (r*(x>>hbc)) >> (p+guard_bits)

	def sqrtrem_python(x):
	"""Correctly rounded integer (floor) square root with remainder."""
	# to check cutoff:
	# plot(lambda x: timing(isqrt, 2**int(x)), [0,2000])
	if x < _1_600:
	y = isqrt_small_python(x)
	return y, x - y*y
	y = isqrt_fast_python(x) + 1
	rem = x - y*y
	# Correct remainder
	while rem < 0:
	y -= 1
	rem += (1+2*y)
	else:
	if rem:
	while rem > 2*(1+y):
	y += 1
	rem -= (1+2*y)
	return y, rem

	def isqrt_python(x):
	"""Integer square root with correct (floor) rounding."""
	return sqrtrem_python(x)[0]

	def sqrt_fixed(x, prec):
	return isqrt_fast(x<<prec)

	sqrt_fixed2 = sqrt_fixed

	if BACKEND == 'gmpy':
	if gmpy.version() >= '2':
	isqrt_small = isqrt_fast = isqrt = gmpy.isqrt
	sqrtrem = gmpy.isqrt_rem
	else:
	isqrt_small = isqrt_fast = isqrt = gmpy.sqrt
	sqrtrem = gmpy.sqrtrem
	elif BACKEND == 'sage':
	isqrt_small = isqrt_fast = isqrt = \
	getattr(sage_utils, "isqrt", lambda n: MPZ(n).isqrt())
	sqrtrem = lambda n: MPZ(n).sqrtrem()
	else:
	isqrt_small = isqrt_small_python
	isqrt_fast = isqrt_fast_python
	isqrt = isqrt_python
	sqrtrem = sqrtrem_python


	def ifib(n, _cache={}):
	"""Computes the nth Fibonacci number as an integer, for
	integer n."""
	if n < 0:
	return (-1)*(-n+1) ifib(-n)
	if n in _cache:
	return _cache[n]
	m = n
	# Use Dijkstra's logarithmic algorithm
	# The following implementation is basically equivalent to
	# http://en.literateprograms.org/Fibonacci_numbers_(Scheme)
	a, b, p, q = MPZ_ONE, MPZ_ZERO, MPZ_ZERO, MPZ_ONE
	while n:
	if n & 1:
	aq = a*q
	a, b = bq+aq+ap, b*p+aq
	n -= 1
	else:
	qq = q*q
	p, q = pp+qq, qq+2p*q
	n >>= 1
	if m < 250:
	_cache[m] = b
	return b

	MAX_FACTORIAL_CACHE = 1000

	def ifac(n, memo={0:1, 1:1}):
	"""Return n factorial (for integers n >= 0 only)."""
	f = memo.get(n)
	if f:
	return f
	k = len(memo)
	p = memo[k-1]
	MAX = MAX_FACTORIAL_CACHE
	while k <= n:
	p *= k
	if k <= MAX:
	memo[k] = p
	k += 1
	return p

	def ifac2(n, memo_pair=[{0:1}, {1:1}]):
	"""Return n!! (double factorial), integers n >= 0 only."""
	memo = memo_pair[n&1]
	f = memo.get(n)
	if f:
	return f
	k = max(memo)
	p = memo[k]
	MAX = MAX_FACTORIAL_CACHE
	while k < n:
	k += 2
	p *= k
	if k <= MAX:
	memo[k] = p
	return p

	if BACKEND == 'gmpy':
	ifac = gmpy.fac
	elif BACKEND == 'sage':
	ifac = lambda n: int(sage.factorial(n))
	ifib = sage.fibonacci

	def list_primes(n):
	n = n + 1
	sieve = list(xrange(n))
	sieve[:2] = [0, 0]
	for i in xrange(2, int(n**0.5)+1):
	if sieve[i]:
	for j in xrange(i**2, n, i):
	sieve[j] = 0
	return [p for p in sieve if p]

	if BACKEND == 'sage':
	# Note: it is VERY important for performance that we convert
	# the list to Python ints.
	def list_primes(n):
	return [int(_) for _ in sage.primes(n+1)]

	small_odd_primes = (3,5,7,11,13,17,19,23,29,31,37,41,43,47)
	small_odd_primes_set = set(small_odd_primes)

	def isprime(n):
	"""
	Determines whether n is a prime number. A probabilistic test is
	performed if n is very large. No special trick is used for detecting
	perfect powers.

	>>> sum(list_primes(100000))
	454396537
	>>> sum(n*isprime(n) for n in range(100000))
	454396537

	"""
	n = int(n)
	if not n & 1:
	return n == 2
	if n < 50:
	return n in small_odd_primes_set
	for p in small_odd_primes:
	if not n % p:
	return False
	m = n-1
	s = trailing(m)
	d = m >> s
	def test(a):
	x = pow(a,d,n)
	if x == 1 or x == m:
	return True
	for r in xrange(1,s):
	x = x**2 % n
	if x == m:
	return True
	return False
	# See http://primes.utm.edu/prove/prove2_3.html
	if n < 1373653:
	witnesses = [2,3]
	elif n < 341550071728321:
	witnesses = [2,3,5,7,11,13,17]
	else:
	witnesses = small_odd_primes
	for a in witnesses:
	if not test(a):
	return False
	return True

	def moebius(n):
	"""
	Evaluates the Moebius function which is `mu(n) = (-1)^k` if `n`
	is a product of `k` distinct primes and `mu(n) = 0` otherwise.

	TODO: speed up using factorization
	"""
	n = abs(int(n))
	if n < 2:
	return n
	factors = []
	for p in xrange(2, n+1):
	if not (n % p):
	if not (n % p**2):
	return 0
	if not sum(p % f for f in factors):
	factors.append(p)
	return (-1)**len(factors)

	def gcd(*args):
	a = 0
	for b in args:
	if a:
	while b:
	a, b = b, a % b
	else:
	a = b
	return a


	# Comment by Juan Arias de Reyna:
	#
	# I learn this method to compute EulerE[2n] from van de Lune.
	#
	# We apply the formula EulerE[2n] = (-1)^n 2**(-2n) sum_{j=0}^n a(2n,2j+1)
	#
	# where the numbers a(n,j) vanish for j > n+1 or j <= -1 and satisfies
	#
	# a(0,-1) = a(0,0) = 0; a(0,1)= 1; a(0,2) = a(0,3) = 0
	#
	# a(n,j) = a(n-1,j) when n+j is even
	# a(n,j) = (j-1) a(n-1,j-1) + (j+1) a(n-1,j+1) when n+j is odd
	#
	#
	# But we can use only one array unidimensional a(j) since to compute
	# a(n,j) we only need to know a(n-1,k) where k and j are of different parity
	# and we have not to conserve the used values.
	#
	# We cached up the values of Euler numbers to sufficiently high order.
	#
	# Important Observation: If we pretend to use the numbers
	# EulerE[1], EulerE[2], ... , EulerE[n]
	# it is convenient to compute first EulerE[n], since the algorithm
	# computes first all
	# the previous ones, and keeps them in the CACHE

	MAX_EULER_CACHE = 500

	def eulernum(m, _cache={0:MPZ_ONE}):
	r"""
	Computes the Euler numbers `E(n)`, which can be defined as
	coefficients of the Taylor expansion of `1/cosh x`:

	.. math ::

	\frac{1}{\cosh x} = \sum_{n=0}^\infty \frac{E_n}{n!} x^n

	Example::

	>>> [int(eulernum(n)) for n in range(11)]
	[1, 0, -1, 0, 5, 0, -61, 0, 1385, 0, -50521]
	>>> [int(eulernum(n)) for n in range(11)] # test cache
	[1, 0, -1, 0, 5, 0, -61, 0, 1385, 0, -50521]

	"""
	# for odd m > 1, the Euler numbers are zero
	if m & 1:
	return MPZ_ZERO
	f = _cache.get(m)
	if f:
	return f
	MAX = MAX_EULER_CACHE
	n = m
	a = [MPZ(_) for _ in [0,0,1,0,0,0]]
	for n in range(1, m+1):
	for j in range(n+1, -1, -2):
	a[j+1] = (j-1)a[j] + (j+1)a[j+2]
	a.append(0)
	suma = 0
	for k in range(n+1, -1, -2):
	suma += a[k+1]
	if n <= MAX:
	_cache[n] = ((-1)*(n//2))(suma // 2**n)
	if n == m:
	return ((-1)*(n//2))suma // 2**n

	def stirling1(n, k):
	"""
	Stirling number of the first kind.
	"""
	if n < 0 or k < 0:
	raise ValueError
	if k >= n:
	return MPZ(n == k)
	if k < 1:
	return MPZ_ZERO
	L = [MPZ_ZERO] * (k+1)
	L[1] = MPZ_ONE
	for m in xrange(2, n+1):
	for j in xrange(min(k, m), 0, -1):
	L[j] = (m-1) * L[j] + L[j-1]
	return (-1)*(n+k) L[k]

	def stirling2(n, k):
	"""
	Stirling number of the second kind.
	"""
	if n < 0 or k < 0:
	raise ValueError
	if k >= n:
	return MPZ(n == k)
	if k <= 1:
	return MPZ(k == 1)
	s = MPZ_ZERO
	t = MPZ_ONE
	for j in xrange(k+1):
	if (k + j) & 1:
	s -= t * MPZ(j)**n
	else:
	s += t * MPZ(j)**n
	t = t * (k - j) // (j + 1)
	return s // ifac(k)