On radii of spheres determined by subsets of Euclidean space

Abstract

In this paper we consider the problem of how large the Hausdorff dimension of E⊂d needs to be in order to ensure that the radii set of (d-1)-dimensional spheres determined by E has positive Lebesgue measure. We also study the question of how often can a neighborhood of a given radius repeat. We obtain two results. First, by applying a general mechanism developed in mul for studying Falconer-type problems, we prove that a neighborhood of a given radius cannot repeat more often than the statistical bound if (E)>d-1+1d; In 2, the dimensional threshold is sharp. Second, by proving an intersection theorem, we prove for a.e a∈d, the radii set of (d-1)-spheres with center a determined by E must have positive Lebesgue measure if (E)>d-1, which is a sharp bound for this problem.