Intersecting families of extended balls in the Hamming spaces

Abstract

A family F of subsets of a set X is t-intersecting if Ai Aj ≥ t for every Ai, \; Aj ∈ F. We study intersecting families in the Hamming geometry. Given X=Fq3 a vector space over the finite field Fq, consider a family where each Ai is an extended ball, that is, Ai is the union of all balls centered in the scalar multiples of a vector. The geometric behavior of extended balls is discussed. As the main result, we investigate a ``large" arrangement of vectors whose extended balls are ``highly intersecting". Consider the following covering problem: a subset H of Fq3 is a short covering if the union of the all extended balls centered in the elements of H is the whole space. As an application of this work, minimal cardinality of a short covering is improved for some instances of q.