Cross-intersecting non-empty uniform subfamilies of hereditary families

Abstract

A set A t-intersects a set B if A and B have at least t common elements. A set of sets is called a family. Two families A and B are cross-t-intersecting if each set in A t-intersects each set in B. A family H is hereditary if for each set A in H, all the subsets of A are in H. The rth level of H, denoted by H(r), is the family of r-element sets in H. A set B in H is a base of H if for each set A in H, B is not a proper subset of A. Let μ(H) denote the size of a smallest base of H. We show that for any integers t, r, and s with 1 ≤ t ≤ r ≤ s, there exists an integer c(r,s,t) such that the following holds for any hereditary family H with μ(H) ≥ c(r,s,t). If A is a non-empty subfamily of H(r), B is a non-empty subfamily of H(s), A and B are cross-t-intersecting, and |A| + |B| is maximum under the given conditions, then for some set I in H with t ≤ |I| ≤ r, either A = \A ∈ H(r) I ⊂eq A\ and B = \B ∈ H(s) |B I| ≥ t\, or r = s, t < |I|, A = \A ∈ H(r) |A I| ≥ t\, and B = \B ∈ H(s) I ⊂eq B\. This was conjectured by the author for t=1 and generalizes well-known results for the case where H is a power set.