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I have a problem that I would like to see a solution for in java. I do not know how to code it, I would like to see an algorithm for it that works. Unfortunately in the past I have been asked to provide code whenever I ask for questions, which I saddly cannot provide, for I have no idea how to code a solution to the problem.

The question I have is the following:

Consider the set [n]={1,2,3....n} and a positive integer k. Now consider the set F of families of subsets of [n] exist such that:

`There are exactly k elements in F Subsets can appear more than once Each subset has an odd number of elements Two intersecting subsets A and B satisfy A⊆B or B⊆A Every element of [n] belongs to at least one of the subsets.`

We call two families A and B of F isomorphic if there is a bijection σ of [n] such that every subset s of [n] appears with the same multiplicity in A as σ(s) in B.

How many different isomorphism types does F have?