The Erdos-Falconer distance problem between arbitrary sets and k-coordinatable sets in finite fields

Abstract

In this paper, we study the cardinality of the distance set (A, B) determined by two subsets A and B of the d-dimensional vector space over a finite field Fq. Assuming that A or B lies in a k-coordinate plane up to translations and rotations, we prove that if |A||B| > 2qd, then |(A, B)| > q/2, where |(A, B)| denotes the number of distinct distances between elements of A and B. In particular, we show that our result recovers the sharp (d+1)/2 threshold for the Erdos-Falconer distance problem in odd dimensions, where distances are determined by a single set. As an application, we also obtain an improved result on the Box distance problem posed by Borges, Iosevich, and Ou, in the case where 2 is a square in Fq.