# generating all permutations of 2 ones and 3 zeroes with itertools

probably basic, but couldn't find it in any other question. I tried:

``````print ["".join(seq) for seq in itertools.permutations("00011")]
``````

but got lots of duplications, seems like itertools doesn't understand all zeroes and all ones are the same...

what am I missing?

EDIT:

oops. Thanks to Gareth I've found out this question is a dup of: permutations with unique values. Not closing it as I think my phrasing of the question is clearer.

-
This answer by ralu contains code for generating unique permutations in Python. –  Gareth Rees Feb 17 '12 at 11:03
This question is relevant, and the self-answer of the OP contains an efficient algorithm for generating all distinct permutations in python. –  Lauritz V. Thaulow Feb 17 '12 at 12:12

``````list(itertools.combinations(range(5), 2))
``````

returns a list of 10 positions where the two ones can be within the five-digits (others are zero):

``````[(0, 1),
(0, 2),
(0, 3),
(0, 4),
(1, 2),
(1, 3),
(1, 4),
(2, 3),
(2, 4),
(3, 4)]
``````

For your case with 2 ones and 13 zeros, use this:

``````list(itertools.combinations(range(5), 2))
``````

which returns a list of 105 positions. And it is much faster than your original solution.

Now the function:

``````def combiner(zeros=3, ones=2):
for indices in itertools.combinations(range(zeros+ones), ones):
item = ['0'] * (zeros+ones)
for index in indices:
item[index] = '1'
yield ''.join(item)

print list(combiner(3, 2))

['11000',
'01100',
'01010',
'01001',
'00101',
'00110',
'10001',
'10010',
'00011',
'10100']
``````

and this needs 14.4µs.

``````list(combiner(13, 2))
``````

returning 105 elements needs 134µs.

-
Very smart way to think about the problem. –  pfctdayelise Apr 8 '13 at 2:08
``````set("".join(seq) for seq in itertools.permutations("00011"))
``````
-
great! but when I try 2 ones and 13 zeroes (C(15,2)=105 options), it takes python forever to compute those 105 options... why is it so slow? –  ihadanny Feb 17 '12 at 10:54
That's because this strategy goes through all 15! = 1,307,674,368,000 permutations of the input. –  Gareth Rees Feb 17 '12 at 10:57
bah. anything more efficient? probably missing some combinatorial ability of itertools, this can't be right... –  ihadanny Feb 17 '12 at 10:59