Saturation of k-chains in the Boolean lattice

Abstract

Given a set X, a collection F ⊂ P(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 probability. Gerbner et al. proved that the smallest saturated k-Sperner system contains at least 2k/2-1 elements, and later, Morrison, Noel, and Scott showed that the smallest such set contains no more than 20.976723k elements. We improve both the upper and lower bounds, showing that the size of the smallest saturated k-Sperner system lies between k2k/2 and 20.961471k.