Cross-intersecting families of vectors

Abstract

Given a sequence of positive integers p = (p1, . . ., pn), let Sp denote the family of all sequences of positive integers x = (x1,...,xn) such that xi pi for all i. Two families of sequences (or vectors), A,B ⊂eq Sp, are said to be r-cross-intersecting if no matter how we select x ∈ A and y ∈ B, there are at least r distinct indices i such that xi = yi. We determine the maximum value of |A|·|B| over all pairs of r- cross-intersecting families and characterize the extremal pairs for r 1, provided that pi >r+1. The case pi r+1 is quite different. For this case, we have a conjecture, which we can verify under additional assumptions. Our results generalize and strengthen several previous results by Berge, Frankl, F\"uredi, Livingston, Moon, and Tokushige, and answers a question of Zhang.