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Suppose we need to write a function that gives the list of all the subsets of a set. The function and the doctest is given below. And we need to complete the whole definition of the function

def subsets(s):
   """Return a list of the subsets of s.

   >>> subsets({True, False})
   [{False, True}, {False}, {True}, set()]
   >>> counts = {x for x in range(10)} # A set comprehension
   >>> subs = subsets(counts)
   >>> len(subs)
   >>> counts in subs
   >>> len(counts)
   assert type(s) == set, str(s) + ' is not a set.'
   if not s:
       return [set()]
   element = s.pop() 
   rest = subsets(s)

It has to not use any built-in function

My approach is to add "element" into rest and return them all, but I am not really familiar how to use set, list in Python.

share|improve this question
Is this homework? – sdolan Nov 2 '11 at 23:42
What do you mean by set of all subsets? I picture this. Are you just looking for all the possible combinations of items? – Blender Nov 2 '11 at 23:43
Yes, that's what I meant but exclude the empty set – geraldgreen Nov 2 '11 at 23:45
Be careful using sets or dicts with doctests. The output order isn't guaranteed, so it is typically better to write something like: sorted(map(list, subsets(somepool))). That way the output is deterministic. – Raymond Hettinger Nov 2 '11 at 23:54

6 Answers 6

Look at the powerset() recipe in the itertools docs.

from itertools import chain, combinations

def powerset(iterable):
    "powerset([1,2,3]) --> () (1,) (2,) (3,) (1,2) (1,3) (2,3) (1,2,3)"
    s = list(iterable)
    return chain.from_iterable(combinations(s, r) for r in range(len(s)+1))

def subsets(s):
    return map(set, powerset(s))
share|improve this answer
That one's pretty inefficient, though. – ephemient Nov 2 '11 at 23:47
I did. It works but this is part of my homework. – geraldgreen Nov 2 '11 at 23:49
The powerset() recipe is the fastest on record. Formerly, the fastest was a bit flipping version by Eric Raymond. The only slow part is building all the individual sets, but that was part of the OP's requirement. – Raymond Hettinger Nov 3 '11 at 0:03
>>> s=set(range(10))
>>> L=list(s)
>>> subs = [{L[j] for j in range(len(L)) if 1<<j&i} for i in range(1,1<<len(L))]
>>> s in subs
>>> set() in subs
share|improve this answer
This is very close to the Eric Raymond version that was published in old versions of the itertools docs. His, of course, pre-dates list and set comprehensions. – Raymond Hettinger Nov 3 '11 at 0:41
>>> from itertools import combinations
>>> s=set(range(10))
>>> subs = [set(j) for i in range(len(s)) for j in combinations(s, i+1)]
>>> len(subs)
share|improve this answer

The usual implementation of powerset on list goes something like this:

def powerset(elements):
    if len(elements) > 0:
        head = elements[0]
        for tail in powerset(elements[1:]):
            yield [head] + tail
            yield tail
        yield []

Just needs a little bit of adaptation to deal with set.

share|improve this answer
I like this one. It is a classic. OTOH, it is dog slow with all the list concatenations, and recursive calls (each with a global look up). – Raymond Hettinger Nov 3 '11 at 0:40

Slightly more efficient (less copying around than in previous answers):

# Generate all subsets of the list v of length l.
def subsets(v, l):
  return _subsets(v, 0, l, [])

def _subsets(v, k, l, acc):
  if l == 0:
    return [acc]
    r = []
    for i in range(k, len(v)):
      # Take i-th position and continue with subsets of length l - 1:
      r.extend(_subsets(v, i + 1, l - 1, acc + [v[i]]))
    return r
share|improve this answer
>>> from itertools import combinations
>>> s=set([1,2,3])
>>> sum(map(lambda r: list(combinations(s, r)), range(1, len(s)+1)), [])
[(1,), (2,), (3,), (1, 2), (1, 3), (2, 3), (1, 2, 3)]

produces tuples, but it is close enough for you

share|improve this answer
sum with lists has quadratic performance, better to use a nested list comprehension – John La Rooy Nov 3 '11 at 0:02
can you give me some proves about that - article, benchmarks, anything... – Lucho Nov 3 '11 at 0:05
see the answers here… – John La Rooy Nov 3 '11 at 0:12
indeed, thanks a lot – Lucho Nov 3 '11 at 0:29

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