Pinned distance sets, Wolff's exponent in finite fields and improved sum-product estimates

Abstract

An analog of the Falconer distance problem in vector spaces over finite fields asks for the threshold α>0 such that |(E)| q whenever |E| qα, where E ⊂ Fqd, the d-dimensional vector space over a finite field with q elements (not necessarily prime). Here (E)=\(x1-y1)2+...+(xd-yd)2: x,y ∈ E\. The second listed author and Misha Rudnev established the threshold d+12, and the authors of this paper, Doowon Koh and Misha Rudnev proved that this exponent is sharp in even dimensions. In this paper we improve the threshold to d22d-1 under the additional assumption that E has product structure. In particular, we obtain the exponent 4/3, consistent with the corresponding exponent in Euclidean space obtained by Wolff.