Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

I need a number of unique random permutations of a list without replacement, efficiently. My current approach:

total_permutations = math.factorial(len(population))
permutation_indices = random.sample(xrange(total_permutations), k)
k_permutations = [get_nth_permutation(population, x) for x in permutation_indices]

where get_nth_permutation does exactly what it sounds like, efficiently (meaning O(N)). However, this only works for len(population) <= 20, simply because 21! is so mindblowingly long that xrange(math.factorial(21)) won't work:

OverflowError: Python int too large to convert to C long

Is there a better algorithm to sample k unique permutations without replacement in O(N)?

share|improve this question
Can't you simply call random.shuffle on range(len(population)) and check to see if you've seen it before? (With some checks to make sure it's possible, i.e. that you're not requesting 10 unique samples from [0,1].) – DSM Apr 19 '12 at 16:22
interesting. python3 does not have this limitation. even ` >>> range(math.factorial(10000)) ` returns within seconds. however,` >>> len(range(math.factorial(10000)))` yields: ` OverflowError: Python int too large to convert to C ssize_t ` – ch3ka Apr 19 '12 at 16:24
@ch3ka that's because in Python3 range returns a generator. However, when you try to coerce the generator from range into a list (to check it's length), you'll get an OverflowError. – Wilduck Apr 19 '12 at 16:34
@Wilduck of course. But the fact that py3s range() does something what py2s xrange() cannot in a real world problem just struck me a bit. – ch3ka Apr 19 '12 at 16:40
@DSM, as I read the question the requirement is to get selections from the range [0,21!] not [0,21]. – Mark Ransom Apr 19 '12 at 16:51
up vote 4 down vote accepted

Instead of using xrange simply keep generating random numbers until you have as many as you need. Using a set makes sure they're all unique.

permutation_indices = set()
while len(permutation_indices) < k:
share|improve this answer
I was about to write the same. There is no need to make a list of all possible permutations (or indices) when you already have get_nth_permutation – Jochen Ritzel Apr 19 '12 at 16:48
Works well for large n, but for small n (ie k not much smaller than total_permutations) this will perform poorly. Okay, but then again the above solution works for small n, so may I'll just do a split case. – Manuel Ebert Apr 19 '12 at 23:46

Up to a certain point, it's unnecessary to use get_nth_permutation to get permutations. Just shuffle the list!

>>> import random
>>> l = range(21)
>>> def random_permutations(l, n):
...     while n:
...         random.shuffle(l)
...         yield list(l)
...         n -= 1
>>> list(random_permutations(l, 5))
[[11, 19, 6, 10, 0, 3, 12, 7, 8, 16, 15, 5, 14, 9, 20, 2, 1, 13, 17, 18, 4], 
 [14, 8, 12, 3, 5, 20, 19, 13, 6, 18, 9, 16, 2, 10, 4, 1, 17, 15, 0, 7, 11], 
 [7, 20, 3, 8, 18, 17, 4, 11, 15, 6, 16, 1, 14, 0, 13, 5, 10, 9, 2, 19, 12], 
 [10, 14, 5, 17, 8, 15, 13, 0, 3, 16, 20, 18, 19, 11, 2, 9, 6, 12, 7, 4, 1], 
 [1, 13, 15, 18, 16, 6, 19, 8, 11, 12, 10, 20, 3, 4, 17, 0, 9, 5, 2, 7, 14]]

The odds are overwhelmingly against duplicates appearing in this list for len(l) > 15 and n < 100000, but if you need guarantees, or for lower values of len(l), just use a set to record and skip duplicates if that's a concern (though as you've observed in your comments, if n gets close to len(l)!, this will stall). Something like:

def random_permutations(l, n):    
    pset = set()
    while len(pset) < n:
    return pset

However, as len(l) gets longer and longer, random.shuffle becomes less reliable, because the number of possible permutations of the list increases beyond the period of the random number generator! So not all permutations of l can be generated that way. At that point, not only do you need to map get_nth_permutation over a sequence of random numbers, you also need a random number generator capable of producing every random number between 0 and len(l)! with relatively uniform distribution. That might require you to find a more robust source of randomness.

However, once you have that, the solution is as simple as Mark Ransom's answer.

To understand why random.shuffle becomes unreliable for large len(l), consider the following. random.shuffle only needs to pick random numbers between 0 and len(l) - 1. But it picks those numbers based on its internal state, and it can take only a finite (and fixed) number of states. Likewise, the number of possible seed values you can pass to it is finite. This means that the set of unique sequences of numbers it can generate is also finite; call that set s. For len(l)! > len(s), some permutations can never be generated, because the sequences that correspond to those permutations aren't in s.

What are the exact lengths at which this becomes a problem? I'm not sure. But for what it's worth, the period of the mersenne twister, as implemented by random, is 2**19937-1. The shuffle docs reiterate my point in a general way; see also what Wikipedia has to say on the matter here.

share|improve this answer
Good caveat about the random number generator. I think there's a bug in random_permutations, the shuffled list is never added to the set. – Mark Ransom Apr 19 '12 at 17:29
@MarkRansom, you're right! That function was all wrong, but it's better now, I think. (Actually, looking at your answer, I inadvertently plagiarized it -- you will take that as a compliment, I hope.) – senderle Apr 19 '12 at 19:05
Thanks, quality answer. Why does random.shuffle get unreliable? I believe it's implemented as in-place Fisher-Yates shuffle, which only needs to pick random numbers between 0 and len(l)-1. – Manuel Ebert Apr 20 '12 at 12:00
@Nkosinathi, my response didn't fit into a comment box, so I incorporated it into my answer. – senderle Apr 20 '12 at 13:27
Wow, thanks for the explanation, I really appreciate it! – Manuel Ebert Apr 22 '12 at 18:12

I had one implementation of nth_permutation (not sure from where I got it) which I modified for your purpose. I believe this would be fast enough to suit your need

>>> def get_nth_permutation(population):
    total_permutations = math.factorial(len(population))

    while True:
        temp_population = population[:]
        n = random.randint(1,total_permutations)
        size = len(temp_population)
        def generate(s,n,population):
            for x in range(s-1,-1,-1):
                fact = math.factorial(x)
                d = n/fact
                n -= d * fact
                yield temp_population[d]
        next_perm = generate(size,n,population)
        yield [e for e in next_perm]

>>> nth_perm = get_nth_permutation(range(21))
>>> [next(nth_perm) for k in range(1,10)]
share|improve this answer
Thanks, good idea as such, but we're running in the same problem that we had with xrange, this time with random.randint: OverflowError: Python int too large to convert to C long – Manuel Ebert Apr 20 '12 at 11:43
@Nkosinathi: Strange as I just ran random.randint(1,math.factorial(10000)) and after few seconds it returned a number of length 35659. – Abhijit Apr 20 '12 at 11:55
Ah, I just noticed that I had random imported from numpy, nod from the standard modules. True, random.randint can deal with 10000! effortlessly, numpy.random.randint apparently can't. Good to know :) – Manuel Ebert Apr 22 '12 at 18:10

You could use itertools.islice instead of xrange():

CPython implementation detail: xrange() is intended to be simple and fast Implementations may impose restrictions to achieve this. The C implementation of Python restricts all arguments to native C longs (“short” Python integers), and also requires that the number of elements fit in a native C long. If a larger range is needed, an alternate version can be crafted using the itertools module: islice(count(start, step), (stop-start+step-1+2*(step<0))//step).

share|improve this answer

You seem to be searching for the Knuth Shuffle! Good luck!

share|improve this answer
post a comment to the OP question if you want to put simply a link. otherwise add some context, so that if the link goes dead/changes the answer will still be useful! ;) – luke14free Apr 19 '12 at 16:32
Shuffling a list of length 21! isn't going to be practical. – Mark Ransom Apr 19 '12 at 16:39
@MarkRansom, I don't think that's what he's suggesting. Shuffling a 21-item list will "select" one from among 21! permutations, which seems to be what the OP wants. – senderle Apr 19 '12 at 16:42
@senderle is right. However, I need k unique permutations, I don't see how Knuth shuffle can guarantee this. – Manuel Ebert Apr 20 '12 at 11:37

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.