A point-sphere incidence bound in odd dimensions and applications

Abstract

In this paper, we prove a new point-sphere incidence bound in vector spaces over finite fields. More precisely, let P be a set of points and S be a set of spheres in Fqd. Suppose that |P|, |S| N, we prove that the number of incidences between P and S satisfies \[I(P, S) N2q-1+qd-12N,\] under some conditions on d, q, and radii. This improves the known upper bound N2q-1+qd2N in the literature. As an application, we show that for A⊂ Fq with q1/2 |A| qd2+12d2, one has \[ |A+A|,~ |dA2| |A|dqd-12.\] This improves earlier results on this sum-product type problem over arbitrary finite fields.