A note on the size of N-free families

Abstract

The N poset consists of four distinct sets W,X,Y,Z such that W⊂ X, Y⊂ X, and Y⊂ Z where W is not necessarily a subset of Z. A family F as a subposet of the n-dimensional Boolean lattice, Bn, is N-free if it does not contain N as a subposet. Let La(n, N) be the size of a largest N-free family in Bn. Katona and Tarj\'an proved that La(n,N)≥ n k+A(n,4,k+1), where k= n/2 and A(n, 4, k+1) is the size of a single-error-correcting code with constant weight k+1. In this note, we prove for n even and k=n/2, La(n, N) ≥ n k+A(n, 4, k), which improves the bound on La(n, N) in the second order term for some values of n and should be an improvement for an infinite family of values of n, depending on the behavior of the function A(n,4,·).