Note on the pinned distance problem over finite fields

Abstract

Let Fq be a finite field with odd q elements. In this article, we prove that if E ⊂eq Fqd, d 2, and |E| q, then there exists a set Y ⊂eq Fqd with |Y| qd$ such that for all y∈ Y, the number of distances between the point y and the set E is similar to the size of the finite field Fq. As a corollary, we obtain that for each set E⊂eq Fqd with |E| q, there exists a set Y⊂eq Fqd with |Y| qd so that any set E \y\ with y∈ Y determines a positive proportion of all possible distances. An averaging argument and the pigeonhole principle play a crucial role in proving our results.