Packing Posets in the Boolean Lattice
Abstract
We are interested in maximizing the number of pairwise unrelated copies of a poset P in the family of all subsets of [n]. We prove that for any P the maximum number of unrelated copies of P is asymptotic to a constant times the largest binomial coefficient. Moreover, the constant has the form 1c(P), where c(P) is the size of the smallest convex closure over all embeddings of P into the Boolean lattice.
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