On the sizes of t-intersecting k-chain-free families

Abstract

A set system F is t-intersecting, if the size of the intersection of every pair of its elements has size at least t. A set system F is k-Sperner, if it does not contain a chain of length k+1. Our main result is the following: Suppose that k and t are fixed positive integers, where n+t is even with t n and n is large enough. If F⊂eq 2[n] is a t-intersecting k-Sperner family, then |F| has size at most the size of the sum of k layers, of sizes (n+t)/2,…, (n+t)/2+k-1. This bound is best possible. The case when n+t is odd remains open.