The saturation spectrum for antichains of subsets

Abstract

Extending a classical theorem of Sperner, we characterize the integers m such that there exists a maximal antichain of size m in the Boolean lattice Bn, that is, the power set of [n]:=\1,2,…,n\, ordered by inclusion. As an important ingredient in the proof, we initiate the study of an extension of the Kruskal-Katona theorem which is of independent interest. For given positive integers t and k, we ask which integers s have the property that there exists a family F of k-sets with F=t such that the shadow of F has size s, where the shadow of F is the collection of (k-1)-sets that are contained in at least one member of F. We provide a complete answer for t≤slant k+1. Moreover, we prove that the largest integer which is not the shadow size of any family of k-sets is 2k3/2+[4]8k5/4+O(k).

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