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Let S(w) be a set of words. I want to generate all the possible n-combination of subsets s so that the union of those subsets are always equal to S(w).

So you have a set (a, b, c, d, e) and you wan't all the 3-combinations:

((a, b, c), (d), (e))

((a, b), (c, d), (e))

((a), (b, c, d), (e))

((a), (b, c), (d, e))

etc ...

For each combination you have 3 set and the union of those set is the original set. No empty set, no missing element.

There must be a way to do that using itertools.combination + collection.Counter but I can't even start somewhere... Can someone help ?

Luke

EDIT: I would need to capture all the possible combination, including:

((a, e), (b, d) (c))

etc ...

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1  
Here it says you can use a length r to specify you want r sized combinations. –  squiguy Aug 9 '13 at 20:16
    
Yes but it gives a combination of single elements. I need the combination of sets that would include all my elements. –  Luke Skywalker Aug 9 '13 at 21:06
    
Just to clarify: in Roman Pekar's solution, the last result is (('e', 'd', 'c'), ('b',), ('a',)) and the second to last is (('e', 'd', 'c'), ('a',), ('b',)). Is that what you wanted? If it is, maybe you should change the title to "permutations" instead of "combinations". –  Paulo Almeida Aug 9 '13 at 21:47
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1 Answer

up vote 3 down vote accepted

something like this?

from itertools import combinations, permutations
t = ('a', 'b', 'c', 'd', 'e')
slicer = [x for x in combinations(range(1, len(t)), 2)]
result = [(x[0:i], x[i:j], x[j:]) for i, j in slicer for x in permutations(t, len(t))]

general solution, for any n and any tuple length:

from itertools import combinations, permutations
t = ("a", "b", "c")
n = 2
slicer = [x for x in combinations(range(1, len(t)), n - 1)]
slicer = [(0,) + x + (len(t),) for x in slicer]
perm = list(permutations(t, len(t)))
result = [tuple(p[s[i]:s[i + 1]] for i in range(len(s) - 1)) for s in slicer for p in perm]

[
   (('a',), ('b', 'c')),
   (('a',), ('c', 'b')),
   (('b',), ('a', 'c')),
   (('b',), ('c', 'a')),
   (('c',), ('a', 'b')),
   (('c',), ('b', 'a')),
   (('a', 'b'), ('c',)),
   (('a', 'c'), ('b',)),
   (('b', 'a'), ('c',)),
   (('b', 'c'), ('a',)),
   (('c', 'a'), ('b',)),
   (('c', 'b'), ('a',))
]
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Good one but it is not enougth. What I would need is a set slicer (not a list slicer), so the slicer is not influenced by order. I have edited my question to make this clearer. –  Luke Skywalker Aug 9 '13 at 21:04
    
so you need a sliced permutations - check updated answer –  Roman Pekar Aug 9 '13 at 21:09
    
What I could do though is combine you answer with squiguy's. Generate all the different combinations and apply your slicer... –  Luke Skywalker Aug 9 '13 at 21:12
    
you need permutations - check updated answer –  Roman Pekar Aug 9 '13 at 21:14
    
That's it ! Thanks :) –  Luke Skywalker Aug 9 '13 at 21:16
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