A singular variant of the Falconer distance problem

Abstract

In this paper we study the following variant of the Falconer distance problem. Let E be a compact subset of Rd, d 1, and define (E)=\|x-y|2+|x-z|2: x,y,z ∈ E,\, y≠ z \. We shall prove using a variety of methods that if the Hausdorff dimension of E is greater than d2+14, then the Lebesgue measure of (E) is positive. This problem can be viewed as a singular variant of the classical Falconer distance problem because considering the diagonal (x,x) in the definition of (E) poses interesting complications stemming from the fact that the set \(x,x): x ∈ E\⊂eq R2d is much smaller than the sets for which the Falconer type results are typically established. We also prove a finite field variant of the Euclidean results for (E) and indicate both the similarities and the differences between the two settings.