Q2-free families in the Boolean lattice

Abstract

For a family F of subsets of [n]=\1, 2, ..., n ordered by inclusion, and a partially ordered set P, we say that F is P-free if it does not contain a subposet isomorphic to P. Let ex(n, P) be the largest size of a P-free family of subsets of [n]. Let Q2 be the poset with distinct elements a, b, c, d, a<b, c<d; i.e., the 2-dimensional Boolean lattice. We show that 2N -o(N) ≤ ex(n, Q2)≤ 2.283261N +o(N), where N = n n/2 . We also prove that the largest Q2-free family of subsets of [n] having at most three different sizes has at most 2.20711N members.