On Saturated k-Sperner Systems

Abstract

Given a set X, a collection F⊂eqP(X) is said to be k-Sperner if it does not contain a chain of length k+1 under set inclusion and it is saturated if it is maximal with respect to this property. Gerbner et al. conjectured that, if |X| is sufficiently large with respect to k, then the minimum size of a saturated k-Sperner system F⊂eqP(X) is 2k-1. We disprove this conjecture by showing that there exists >0 such that for every k and |X| ≥ n0(k) there exists a saturated k-Sperner system F⊂eqP(X) with cardinality at most 2(1-)k. A collection F⊂eq P(X) is said to be an oversaturated k-Sperner system if, for every S∈P(X), F\S\ contains more chains of length k+1 than F. Gerbner et al. proved that, if |X|≥ k, then the smallest such collection contains between 2k/2-1 and O(kk2k) elements. We show that if |X|≥ k2+k, then the lower bound is best possible, up to a polynomial factor.