A sharp threshold for a random version of Sperner's Theorem
Abstract
The Boolean lattice P(n) consists of all subsets of [n] = \1,…, n\ partially ordered under the containment relation. Sperner's Theorem states that the largest antichain of the Boolean lattice is given by a middle layer: the collection of all sets of size n/2, or also, if n is odd, the collection of all sets of size n/2. Given p, choose each subset of [n] with probability p independently. We show that for every constant p>3/4, the largest antichain among these subsets is also given by a middle layer, with probability tending to 1 as n tends to infinity. This 3/4 is best possible, and we also characterize the largest antichains for every constant p>1/2. Our proof is based on some new variations of Sapozhenko's graph container method.
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