Sperner theorems for unrelated copies of some partially ordered sets in a powerset lattice and minimum generating sets of powers of distributive lattices

Abstract

For a finite poset (partially ordered set) U and a natural number n, let Sp(U,n) denote the largest number of pairwise unrelated copies of U in the powerset lattice (AKA subset lattice) of an n-element set. If U is the singleton poset, then Sp(U,n) was determined by E. Sperner in 1928; this result is well known in extremal combinatorics. Later, exactly or asymptotically, Sperner's theorem was extended to other posets by A. P. Dove, J. R. Griggs, G. O. H. Katona, D Nagy, J. Stahl, and W. T. Jr. Trotter. We determine Sp(U,n) for all finite posets with 0 and 1, and we give reasonable estimates for the ``V-shaped'' 3-element poset and the 4-element poset with 0 and three maximal elements. For a lattice L, let Gmin(L) denote the minimum size of generating sets of L. We prove that if U is the poset of the join-irreducible elements of a finite distributive lattice D, then the function k Gmin(Dk) is the left adjoint of the function n Sp(U,n). This allows us to determine Gmin(Dk) in many cases. E.g., for a 5-element distributive lattice D, Gmin(D2023)=18 if D is a chain and Gmin(D2023)=15 otherwise. It follows that large direct powers of small distributive lattices are appropriate for our 2021 cryptographic authentication protocol.