Vector sum-intersection theorems

Abstract

We introduce the following generalization of set intersection via characteristic vectors: for n,q,s, t 1 a family F⊂eq \0,1,…,q\n of vectors is said to be s-sum t-intersecting if for any distinct x,y∈ F there exist at least t coordinates, where the entries of x and y sum up to at least s, i.e.\ |\i:xi+yi s\| t. The original set intersection corresponds to the case q=1,s=2. We address analogs of several variants of classical results in this setting: the Erdos--Ko--Rado theorem and the theorem of Bollob\'as on intersecting set pairs.