# a very ineffecient way to calculate a factorial
from functools import lru_cache
def partition(k, lmax=None):
if lmax is None:
lmax = k
if k == 0:
yield []
for i in range(min(k, lmax), 0, -1):
for p in partition(k - i, i):
p.append(i)
yield p
@lru_cache(maxsize=48000)
def d(p):
if not p:
return 1
p = list(p)
if p[0] == 1:
res = d(tuple(p[1:]))
else:
p[0] -= 1
res = d(tuple(p))
p[0] += 1
for i in range(1, len(p)):
if p[i - 1] < p[i]:
p[i] -= 1
res += d(tuple(p))
p[i] += 1
return res
def Q(n, r, s):
if r > s:
r, s = s, r
if (s - r) % n != 0:
return 0
qq = (s - r) // n
sm = 0
for p in partition(r):
if len(p) <= n:
pp = tuple(p)
p2 = tuple(x + qq for x in p)
sm += d(pp) * d(p2)
return sm
print(Q(5,100,105))
с помощью CrazyElf сделать чтобы за 6 секунда руботала эта функция, теперь вот это обновленный код, что еще можно сделать чтобы эта функция работала быстрее?
from functools import lru_cache
import math
@lru_cache(maxsize=48000000)
def partitions(k, lmax=None, maxlen=None):
return list(partition(k,lmax,maxlen))
def partition(k, lmax=None, maxlen=None):
if lmax is None:
lmax = k
if maxlen is None:
maxlen = k
if maxlen < 0:
return
if k == 0:
yield []
for i in range(min(k, lmax), 0, -1):
for p in partitions(k - i, i, maxlen - 1):
yield [i] + p
@lru_cache(maxsize=48000000)
def d(p):
s = math.factorial(sum(p))
n = len(p)
for i, ei in enumerate(p):
for j, ej in enumerate(p[i + 1:]):
s *= ei - ej + j + 1
for i, ei in enumerate(p):
s //= math.factorial(ei + n - 1 - i)
return s
def Q(n, r, s):
if r > s:
r, s = s, r
if (s - r) % n != 0:
return 0
qq = (s - r) // n
sm = 0
if qq == 0:
for p in partition(r, maxlen=n):
pp = tuple(p)
sm += d(pp)**2
else:
for p in partition(r, maxlen=n):
pp = tuple(p)
p2 = tuple([x + qq for x in p + [0]*(n - len(p))])
sm += d(pp) * d(p2)
return sm
print(Q(5,100,105))