# Unknown issue with recursive integer partition calculator in Python

I'm having some trouble with my recursive program to calculate the number of integer partitions of an integer.

Here's what I have written:

``````def p(k, n):
if k > n:
return 0
if k == 1:
return 1
else:
return (p(k+1, n) + p(k, n-k))

def partitions(n):
ans = 1
for k in range(1, n/2):
ans += p(k, n-k)
return ans
``````

This algorithm is implemented from Wikipedia's article Partition (number theory). Here's what my program outputs for the first few integers:

``````partitions(0) = 1
partitions(1) = 1
partitions(2) = 1
partitions(3) = 1
partitions(4) = 2
partitions(5) = 2
partitions(6) = 2
partitions(7) = 2
``````

I'm not sure why my program doesn't operate properly, since I thought I correctly implemented both recursion and the algorithm from Wikipedia. Could somebody help me understand what it's doing?

-

I see two problems:

This:

``````if k == 1:
``````

should be `if k == n:`, and this loop:

``````for k in range(1, n/2):
``````

should be `range(1, n/2+1)` -- or better, `range(1, n//2+1)` to be explicit about the fact we want integer division -- because `range` in Python doesn't include the upper bound. After fixing those, I get:

``````>>> [partitions(i) for i in range(1,10)]
[1, 2, 3, 5, 7, 11, 15, 22, 30]
``````

(which, you'll notice, only has 9 values. :^)

-
Thank you! A bunch of silly mistakes I guess... –  Kashish Hora Jul 23 '13 at 15:17

You have one of the base cases wrong:

``````if k == 1:
return 1
``````

should be

``````if k == n:
return 1
``````

``````for k in range(1, n / 2):
``````

should be

``````for k in range(1, n / 2 + 1):
``````

This is because the sum in the formula is inclusive of the upper bound, but in Python, the `range` does not include the upper bound. Then:

``````print [partitions(i) for i in range(1, 8)]
``````

gives

``````[1, 2, 3, 5, 7, 11, 15]
``````

matching the values given in the Wikipedia article.

-
And that's why you shouldn't code when sleep deprived. Thank you! –  Kashish Hora Jul 23 '13 at 15:16