# Introduction

While trying to do some cathegorization on nodes in a graph (which will be rendered differenty), I find myself confronted with the following problem:

# The Problem

Given a superset of elements S = {0, 1, ... M} and a number n of non-disjoint subsets T_i thereof, with 0 <= i < n, what is the best algorithm to find out the partition of the set S called P?

P = S is the union of all disjoint partitions P_j of the original superset S, with 0 <= j < M, such that for all elements x in P_j, every x has the same list of "parents" among the "original" sets T_i.

# Example

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

T_1 = [1, 4]
T_2 = [2, 3]
T_3 = [1, 3, 4]


So all P_js would be:

P_1 = [1, 4] # all elements x have the same list of "parents": T_1, T_3
P_2 = [2] # all elements x have the same list of "parents": T_2
P_3 = [3] # all elements x have the same list of "parents": T_2, T_3
P_4 = [5, 6, 8, 9] #  all elements x have the same list of "parents": S (so they're not in any of the P_j


# Questions

1. What are good functions/classes in the python packages to compute all P_js and the list of their "parents", ideally restricted to numpy and scipy? Perhaps there's already a function which does just that
2. What is the best algorithm to find those partitions P_js and for each one, the list of "parents"? Let's note T_0 = S

I think the brute force approach would be to generate all 2-combinations of T sets and split them in at most 3 disjoint sets, which would be added back to the pool of T sets and then repeat the process until all resulting Ts are disjoint, and thus we've arrived at our answer - the set of P sets. A little problematic could be caching all the "parents" on the way there.

I suspect a dynamic programming approach could be used to optimize the algorithm.

Note: I would have loved to write the math parts in latex (via MathJax), but unfortunately this is not activated :-(

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The following may paint your imagination towards an answer to your question: geekviewpoint.com/java/bitwise/power_set. In your case you are already starting with the superset. But the logic there should help. –  kasavbere Dec 22 '12 at 18:10
@kasavbere I already have that painting, but I don't want the powerset. The subsets are already given. It's basically a cathegorization problem. –  Flavius Dec 22 '12 at 18:12
0 < i < n gives only n-1 sets. –  WolframH Dec 22 '12 at 22:47
@WolframH Thanks, fixed. –  Flavius Dec 22 '12 at 22:50
P4 should not contain 7. –  WolframH Dec 22 '12 at 23:04

The following should be linear time (in the number of the elements in the Ts).

from collections import defaultdict

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

T_1 = [1, 4]
T_2 = [2, 3]
T_3 = [1, 3, 4]

Ts = [S, T_1, T_2, T_3]

parents = defaultdict(int)
for i, T in enumerate(Ts):
for elem in T:
parents[elem] += 2 ** i

children = defaultdict(list)
for elem, p in parents.items():
children[p].append(elem)

print(list(children.values()))


Result:

[[5, 6, 8, 9], [1, 4], [2], [3]]

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The question is also to find out which parents every such partition has... –  Flavius Dec 23 '12 at 0:24
@Flavius, his solution does that. The keys of the children dict are the binary-encoded set of "parents". You could actually do it (elegantly, but perhaps not optimally efficiently) by using sets instead of integers. –  rici Dec 23 '12 at 1:13
@Flavius (and WolframH): ideone.com/645Qaw –  rici Dec 23 '12 at 1:25
The way I'd do this is to construct an M × n boolean array In where In(i, j) = Si ∈ Tj. You can construct that in O(Σj|Tj|), provided you can map an element of S onto its integer index in O(1), by scanning all of the sets T and marking the corresponding bit in In.
You can then read the "signature" of each element i directly from In by concatenating row i into a binary number of n bits. The signature is precisely the equivalence relationship of the partition you are seeking.