New sum-product type estimates over finite fields

Abstract

Let F be a field with positive odd characteristic p. We prove a variety of new sum-product type estimates over F. They are derived from the theorem that the number of incidences between m points and n planes in the projective three-space PG(3,F), with m≥ n=O(p2), is O( mn + km ), where k denotes the maximum number of collinear planes. The main result is a significant improvement of the state-of-the-art sum-product inequality over fields with positive characteristic, namely that equationmres |A A|+|A· A| = (|A|1+15), equation for any A such that |A|<p58.