The Spherical Kakeya Problem in Finite Fields

Abstract

We study subsets of the n-dimensional vector space over the finite field Fq, for odd q, which contain either a sphere for each radius or a sphere for each first coordinate of the center. We call such sets radii spherical Kakeya sets and center spherical Kakeya sets, respectively. For n 4 we prove a general lower bound on the size of any set containing q-1 different spheres which applies to both kinds of spherical Kakeya sets. We provide constructions which meet the main terms of this lower bound. We also give a construction showing that we cannot get a lower bound of order of magnitude~qn if we take lower dimensional objects such as circles in Fq3 instead of spheres, showing that there are significant differences to the line Kakeya problem. Finally, we study the case of dimension n=1 which is different and equivalent to the study of sum and difference sets that cover Fq.