I am trying to find all permutations from a list that are the same size or smaller than the list.

For example:

```
>>>allPermutations([a,b])
[[a,b], [b,a], [a], [b]]
```

This is the iterative code I currently have in python. I'm not sure how efficient it currently is.

```
import itertools
def getAllPossibleSubSchedules( seq ):
fullSet = set()
curSet = set()
curSet.add(tuple(seq))
for i in reversed(range(1, len(seq) + 1)):
permutations = set()
for curTuple in curSet:
permutationsList = list(itertools.permutations(curTuple, i))
for permutation in permutationsList:
permutations.add(permutation)
curSet = set()
for permutation in permutations:
curSet.add(permutation)
fullSet.add(permutation)
return fullSet
```

I'm pretty sure the algorithm will produce the **summation of n! from 1 -> n** permutations which grows pretty quickly. So far I have created a recursive way to do it that is incredibly slow because it does many repeated operations. I have been trying to do it through iteration but I can't figure out how to limit repeated operations. I am using python but psuedo-code would also help me a lot. Any help would be appreciated. Thanks in advance!

theycall an "NP-complete" problem. – Mariano Mar 6 '13 at 21:21