Sums and products in finite fields: an integral geometric viewpoint

Abstract

We prove that if A ⊂ Fq is such that |A|>q1/2+12d, then Fq* ⊂ dA2=A2+...+A2 d times, where A2=\a · a': a,a' ∈ A\, and where Fq* denotes the multiplicative group of the finite field Fq. In particular, we cover Fq* by A2+A2 if |A|>q3/4. Furthermore, we prove that if |A| Csize1dq1/2+12(2d-1), then |dA2| q · C2sizeC2size+1. Thus dA2 contains a positive proportion of the elements of Fq under a considerably weaker size assumption.We use the geometry of Fqd, averages over hyper-planes and orthogonality properties of character sums. In particular, we see that using operators that are smoothing on L2 in the Euclidean setting leads to non-trivial arithmetic consequences in the context of finite fields.