A cross-intersection theorem for subsets of a set

Abstract

Two families A and B of sets are said to be cross-intersecting if each member of A intersects each member of B. For any two integers n and k with 0 ≤ k ≤ n, let [n] ≤ k denote the family of all subsets of \1, …, n\ of size at most k. We show that if A ⊂eq [m] ≤ r, B ⊂eq [n] ≤ s, and A and B are cross-intersecting, then \[|A||B| ≤ Σi=0r m-1 i-1 Σj=0s n-1 j-1,\] and equality holds if A = \A ∈ [m] ≤ r 1 ∈ A\ and B = \B ∈ [n] ≤ s 1 ∈ B\. Also, we generalise this to any number of such cross-intersecting families.