Incidences between points and generalized spheres over finite fields and related problems

Abstract

Let Fq be a finite field of q elements where q is a large odd prime power and Q =a1 x1c1+...+adxdcd∈ Fq[x1,...,xd], where 2 ci N, (ci,q)=1, and ai∈ Fq for all 1 i d. A Q-sphere is a set of the form x∈ Fqd | Q(x-b)=r, where b∈ Fqd, r∈ Fq. We prove bounds on the number of incidences between a point set P and a Q-sphere set S, denoted by I(P,S), as the following. | I(P,S)-|P||S|q| qd/2|P||S|. We prove this estimate by studying the spectra of directed graphs. We also give a version of this estimate over finite rings Zq where q is an odd integer. As a consequence of the above bounds, we give an estimate for the pinned distance problem. In Sections 4 and 5, we prove a bound on the number of incidences between a random point set and a random Q-sphere set in Fqd. We also study the finite field analogues of some combinatorial geometry problems, namely, the number of generalized isosceles triangles, and the existence of a large subset without repeated generalized distances.