Families in posets minimizing the number of comparable pairs

Abstract

Given a poset P we say a family F⊂eq P is centered if it is obtained by `taking sets as close to the middle layer as possible'. A poset P is said to have the centeredness property if for any M, among all families of size M in P, centered families contain the minimum number of comparable pairs. Kleitman showed that the Boolean lattice \0,1\n has the centeredness property. It was conjectured by Noel, Scott, and Sudakov, and by Balogh and Wagner, that the poset \0,1,…,k\n also has the centeredness property, provided n is sufficiently large compared to k. We show that this conjecture is false for all k≥ 2 and investigate the range of M for which it holds. Further, we improve a result of Noel, Scott, and Sudakov by showing that the poset of subspaces of Fqn has the centeredness property. Several open questions are also given.