A new sum-product estimate in prime fields

Abstract

In this paper we obtain a new sum-product estimate in prime fields. In particular, we show that if A⊂eq Fp satisfies |A| p64/117 then \|A A|, |AA|\ |A|39/32. Our argument builds on and improves some recent results of Shakan and Shkredov which use the eigenvalue method to reduce to estimating a fourth moment energy and the additive energy E+(P) of some subset P⊂eq A+A. Our main novelty comes from reducing the estimation of E+(P) to a point-plane incidence bound of Rudnev rather than a point line incidence bound of Stevens and de Zeeuw as done by Shakan and Shkredov.