# Combinatorics in Python

I have a sort of a one level tree structure as:

Where p are parent nodes, c are child nodes and b are hypothetical branches.

I want to find all combinations of branches under the constraint that only one parent can branch to only one child node, and two branches can not share parent and/or child.

E.g. if `combo` is the set of combinations:

``````combo[0] = [b[0], b[3]]
combo[1] = [b[0], b[4]]
combo[2] = [b[1], b[4]]
combo[3] = [b[2], b[3]]
``````

I think that's all of them. =)

How can this be achived automaticly in Python for arbitrary trees of this structures i.e. the number of p:s, c:s and b:s are arbitrary.

EDIT:

It is not a tree but rather a bipartite directed acyclic graph

• Your image suggests that there are branches available from every parent to every child. Do you assume this? Nov 4, 2010 at 10:37
• Do you already have a data structure to represent this? Nov 4, 2010 at 10:39
• @dhill - Does it? Parent node p1 does not branch to child c0. Nov 4, 2010 at 10:40
• Also, this is not a tree, but rather a bipartite DAG. Nov 4, 2010 at 10:41
• @Space_C0wb0y - A what now? Please paste a Wikipedia reference or similar. ;) As for data structure, consider b as an object with variables p and c, like `b[0].p = 0`. Nov 4, 2010 at 10:45

Here's one way to do it. There are lot's of micro-optimizations that could be made but their efficacy would depend on the sizes involved.

``````import collections as co
import itertools as it

def unique(list_):
return len(set(list_)) == len(list_)

def get_combos(branches):
by_parent = co.defaultdict(list)

for branch in branches:
by_parent[branch.p].append(branch)

combos = it.product(*by_parent.values())

return it.ifilter(lambda x: unique([b.c for b in x]), combos)
``````

I'm pretty sure that this is at least hitting optimal complexity as I don't see a way to avoid looking at every combination that is unique by parent.

• I think you meant to have the arg to get_combos be branches, otherwise for branch in branches will throw an exception. Nov 4, 2010 at 12:11
• @Philip Good looking out. Fixed. Nov 4, 2010 at 12:13
• Thanks a lot, great solution! Nov 4, 2010 at 15:21
• what is `branches` meant to be? what python type? what contents? Sep 2, 2015 at 2:58
• ^ i now see that this is addressed in the comments. still, it'd be nice to have it stated in the answer. Sep 2, 2015 at 3:11

Look at itertools combinatoric generators:

• product()
• permutations()
• combinations()
• combinations_with_replacement()

Looks like you can write an iterator to achieve what you want.