Diamond-free Families

Abstract

Given a finite poset P, we consider the largest size La(n,P) of a family of subsets of [n]:=\1,...,n\ that contains no subposet P. This problem has been studied intensively in recent years, and it is conjectured that π(P):= n→∞ La(n,P)/n choose n/2 exists for general posets P, and, moreover, it is an integer. For k2 let k denote the k-diamond poset \A< B1,...,Bk < C\. We study the average number of times a random full chain meets a P-free family, called the Lubell function, and use it for P=k to determine π(k) for infinitely many values k. A stubborn open problem is to show that π(2)=2; here we make progress by proving π(2) 2 3/11 (if it exists).