Sums and products in finite fields: an integral geometric viewpoint

TL;DR

This paper investigates the sum-product behavior in finite fields using geometric and harmonic analysis techniques, establishing conditions under which sums of squares cover the entire multiplicative group.

Contribution

It introduces a novel geometric approach to sum-product problems in finite fields, connecting integral geometry with additive combinatorics.

Findings

For large enough sets, sums of squares cover the multiplicative group.

Under weaker size conditions, sums of squares contain a positive proportion of the field.

Uses geometric and harmonic analysis methods to derive arithmetic results.

Abstract

We prove that if $A \subset {\Bbb F}_q$ is such that $$|A|>q^{{1/2}+\frac{1}{2d}},$$ then $${\Bbb F}_q^{*} \subset dA^2=A^2+...+A^2 d \text{times},$$ where $$A^2=\{a \cdot a': a,a' \in A\},$$ and where ${\Bbb F}_q^{*}$ denotes the multiplicative group of the finite field ${\Bbb F}_q$. In particular, we cover ${\Bbb F}_q^{*}$ by $A^2+A^2$ if $|A|>q^{{3/4}}$. Furthermore, we prove that if $$|A| \ge C_{size}^{\frac{1}{d}}q^{{1/2}+\frac{1}{2(2d-1)}},$$ then $$|dA^2| \ge q \cdot \frac{C^2_{size}}{C^2_{size}+1}.$$ Thus $dA^2$ contains a positive proportion of the elements of ${\Bbb F}_q$ under a considerably weaker size assumption.We use the geometry of ${\Bbb F}_q^d$, averages over hyper-planes and orthogonality properties of character sums. In particular, we see that using operators that are smoothing on $L^2$ in the Euclidean setting leads to non-trivial arithmetic consequences in the context of finite fields.