[GAP Forum] Atoms of a boolean algebra of sets
Johannes Hahn
johannes.hahn at uni-jena.de
Mon Feb 25 23:01:15 GMT 2019
Dear forum,
Let’s say a have a list of subsets of a fixed finite set $\Omega$. Is there a nice and easy way to find the atoms of the Boolean algebra generated by these sets? Of course, I could implement this by hand, but it seems to me that something like this probably already exists and I simply had bad luck finding it.
A related question: Let’s say I have a list of partitions of $\Omega$ (i.e. a set of pairwise disjoint subsets that cover all of $\Omega$). Is there a nice and easy way to find the common refinement of all these partitions?
Best wishes
Johannes Hahn.
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