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I need code that takes a list (up to n=31) and returns all possible subsets of n=3 without any two elements repeating in the same subset twice (think of people who are teaming up in groups of 3 with new people every time):


and returns




but not:


because 1 and 7 have appeared together already (likewise, 3 and 9).

I would also like to do this for subsets of n=2. Thank you!!

share|improve this question
"All possible" is at odds with "have appeared together already". Why do we choose to include [1,4,7][2,3,8][3,6,9] and therefore exclude [1,5,7][2,4,8][3,6,9], rather than the other way around? – Karl Knechtel Nov 15 '11 at 10:48
What should it do when the total is not a multiple of the group size? Treat the extras as a smaller group? Rotate them out, but ignore what happens when they're not in a group? Or is that set of conditions not valid input? – Thomas K Nov 15 '11 at 13:25
Thanks for the comments. For now, let's assume N is a multiple of group size (N=30, n=3). – user1047103 Nov 15 '11 at 14:28
Thanks for the comments. @Thomas: For now, let's assume N=30, n=3. – user1047103 Nov 15 '11 at 14:29
@Karl: good point... this is not a point I thought about...but I am fine randomly choosing between the options. – user1047103 Nov 15 '11 at 14:31

Try this:

from itertools import permutations

lst = list(range(1, 10))

n = 3
triplets = list(permutations(lst, n))
triplets = [set(x) for x in triplets]

def array_unique(seq):  
    checked = [] 
    for x in seq:
        if x not in checked: 
    return checked

triplets = array_unique(triplets)

result = []
m = n * 3
for x in triplets:
    for y in triplets:
        for z in triplets:
            if len(x.union(y.union(z))) == m:
                result += [[x, y, z]]

def groups(sets, i):
    result = [sets[i]]

    for x in sets:
        flag = True
        for y in result:
            for r in x:
                for p in y:
                    if len(r.intersection(p)) >= 2:
                        flag = False
                if flag == False:
        if flag == True:

    return result

for i in range(len(result)):
    print('%d:' % (i + 1))
    for x in groups(result, i):

Output for n = 10:

share|improve this answer
Did you test it for N=15, n=3? – Fenikso Nov 15 '11 at 15:44
@Fenikso, it works damn slow. I had enough patience to figure out only one sulution: – tony Nov 15 '11 at 16:59
Should not it be 5 triplets? – Fenikso Nov 15 '11 at 18:47
@Fenikso, why 5? IIUC, OP means "all possible subsets of n=3" for any N. – tony Nov 15 '11 at 18:58
15 divided by 3 is 5. That is my understanding of the problem. – Fenikso Nov 16 '11 at 10:43

Here's what I came up with:

from itertools import permutations, combinations, ifilter, chain

people = [1,2,3,4,5,6,7,8,9]

#get all combinations of 3 sets of 3 people
combos_combos = combinations(combinations(people,3), 3)

#filter out sets that don't contain all 9 people
valid_sets = ifilter(lambda combo: 
                     len(set(chain.from_iterable(combo))) == 9,

#a set of people that have already been paired
already_together = set()
for sets in valid_sets:
    #get all (sorted) combinations of pairings in this set
    pairings = list(chain.from_iterable(combinations(combo, 2) for combo in sets))
    pairings = set(map(tuple, map(sorted, pairings)))

    #if all of the pairings have never been paired before, we have a new one
    if len(pairings.intersection(already_together)) == 0:
        print sets

This prints:

~$ time python 
((1, 2, 3), (4, 5, 6), (7, 8, 9))
((1, 4, 7), (2, 5, 8), (3, 6, 9))
((1, 5, 9), (2, 6, 7), (3, 4, 8))
((1, 6, 8), (2, 4, 9), (3, 5, 7))

real        0m0.182s
user        0m0.164s
sys         0m0.012s
share|improve this answer

Here's my attempt of a fairly general solution to your problem.

from itertools import combinations

n = 3
l = range(1, 10)

def f(l, n, used, top):
    if len(l) == n:
        if all(set(x) not in used for x in combinations(l, 2)):
            yield [l]
        for group in combinations(l, n):
            if any(set(x) in used for x in combinations(group, 2)):
            for rest in f([i for i in l if i not in group], n, used, False):
                config = [list(group)] + rest
                if top:
                    # Running at top level, this is a valid
                    # configuration.  Update used list.
                    for c in config:
                        used.extend(set(x) for x in combinations(c, 2))
                yield config

for i in f(l, n, [], True):
    print i

However, it is very slow for high values of n, too slow for n=31. I don't have time right now to try to improve the speed, but I might try later. Suggestions are welcome!

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