Maximal antichains of minimum size

Abstract

Let n≥slant 4 be a natural number, and let K be a set K⊂eq [n]:=1,2,...,n. We study the problem to find the smallest possible size of a maximal family A of subsets of [n] such that A contains only sets whose size is in K, and A⊂eq B for all A,B⊂eqA, i.e. A is an antichain. We present a general construction of such antichains for sets K containing 2, but not 1. If 3∈ K our construction asymptotically yields the smallest possible size of such a family, up to an o(n2) error. We conjecture our construction to be asymptotically optimal also for 3∈ K, and we prove a weaker bound for the case K=2,4. Our asymptotic results are straightforward applications of the graph removal lemma to an equivalent reformulation of the problem in extremal graph theory which is interesting in its own right.