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I'm trying to generate all n-item combinations of a list of numbers while maintaining numerical order. So for example, if the list were


The ordered combinations of length 3 would be:


To be clear, I have to maintain numerical order, so [1,4,2] would not be a desired outcome.

Is there a function that does this, or a fast algorithm that would get it done? The actual list is 111 and I will be choosing 100 items. Thanks.

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You used the word combination, but you described permutation (permutations retain order). Can you clarify? –  user590028 Sep 3 '14 at 18:12
Permutation means that order matters, but it doesn't retain numerical order, so it will also produce [2,4,1] from the list above, which is not what I need. –  TomR Sep 3 '14 at 18:24

1 Answer 1

up vote 3 down vote accepted

Are you just looking for all the combinations of a given list of length n? If so you can just use combinations from itertools. Either way you'll probably want to go with itertools.

from itertools import combinations

numbers = [1,2,3,4]
for item in combinations(numbers, 3):
    print sorted(item)
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I'm not sure if he wants permutation or combination? If it turns out OP wanted combinations, I'll remove my post. –  user590028 Sep 3 '14 at 18:11
@user590028 Yeah, I originally thought permutations but when I saw the expected output it pointed towards combinations. However I think what he wants is combinations while preserving the order that they appear in the list. For example you can have [1,3,4] but not [3,1,4]. –  user3960432 Sep 3 '14 at 18:13
Thimble is correct. I want combinations while preserving order, which is why neither the pure combination or permutation functions from itertools do what I need. –  TomR Sep 3 '14 at 18:23
@TomR that depends on how you would define order. In your example you show [2,3,4] being before [1,2,4]. Normal conventions would have that being at the bottom. You would need to define what order you want. Combinations automatically ordered them starting with the first index and moving forward. –  user3960432 Sep 3 '14 at 18:30
Thimble had the right answer (so I removed my permutations answer). All he needed todo was sort the result. I've edited his answer to reflect your needs –  user590028 Sep 3 '14 at 18:36

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