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I would like to generate partitions for a set in a specific way: I need to filter out all partitions which are not of size N in the process of generating these partitions. The general solution is "Generate all “unique” subsets of a set (not a powerset)".

For the set S with the following subsets:

[a,b,c]
[a,b]
[c]
[d,e,f]
[d,f]
[e]

and the following 'unique' elements:

a, b, c, d, e, f

the result of the function/method running with the argument N = 2 should be:

[[a,b,c], [d,e,f]]

While the following partitions should be filtered out by the function/method:

[[a,b,c], [d,f], [e]]
[[a,b], [c], [d,e,f]]
[[a,b], [c], [d,f], [e]]

The underlying data structure is not important and could be arrays, sets or whatever.


Reason: I need to filter some partitions out before I have the full set of all partitions, because the function/method which generates all partitions is rather computationally intensive.


According to "Generating the Partitions of a Set", the number of possible partitions can be huge: 44152005855084346 for 23 elements. My data is 50-300 elements in the starting set, so I definitely need to filter out partitions that have size not equal to N before I save them anywhere.

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  • 1
    are you using Set objects, or arrays?
    – m_x
    Dec 27, 2011 at 16:03
  • Why does N=2 produce sets which have three elements? Are you using zero-based counting? Or is that the number of subsets in the resulting set?
    – Phrogz
    Dec 27, 2011 at 17:10
  • @Phrogz, N is the number of subsets in the resulting set.
    – skanatek
    Dec 27, 2011 at 18:20
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    If you are using arrays, you should write so in the question. In the question, you write as if they are sets, and that is making it confusing.
    – sawa
    Dec 27, 2011 at 19:13
  • Are you saying that S = [["a", "b", "c"], ["a", "b"], ["c"], ["d", "e", "f"], ["d", "f"], ["e"]]? Dec 28, 2011 at 9:29

1 Answer 1

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Once you have the partitions as given by Frederick Cheung that you linked, do:

partitions.select{|partition| partition.length == 2}
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  • thanks, but I can not use this obvious solution due to the fact that I need to filter the partitions out right in the process of their generation.
    – skanatek
    Dec 27, 2011 at 18:24

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