# Expanding Polynomials and Pairs of Polynomials in Characteristic 0

**Authors:** Yifan Jing, Souktik Roy, Chieu-Minh Tran

arXiv: 1904.01715 · 2019-10-15

## TL;DR

This paper investigates pairs of polynomials with small symmetric expansion over various fields, revealing structural similarities and extending sum-product phenomena results to characteristic zero and large characteristic fields.

## Contribution

It introduces a unified approach using semi-algebraic geometry and model theory to analyze polynomial pairs, extending Elekes-Rónyai type results to broader field settings.

## Key findings

- Structural similarity of polynomial pairs over real and complex fields
- Generalization of Elekes-Rónyai results to arbitrary characteristic zero fields
- A new bound of 5/4 for the sum-product problem in large characteristic finite fields

## Abstract

We begin a generalized study of sum-product type phenomenon in different fields by considering pairs $P(x,y)$ and $Q(x,y)$ of two variable polynomials that simultaneously exhibit small symmetric expansion. Our first result is that such $P(x,y)$ and $Q(x,y)$ over $\mathbb{R}$ and $\mathbb{C}$ have very similar structure, obtained by employing semi-algebraic geometry/o-minimality. Then using model-theoretic transfer and basic Galois theory we deduce results for fields of characteristic $0$ and characteristic $p$ when $p$ is large.   We obtain as corollaries a generalization of Elekes-R\'onyai type structural results to arbitrary characteristic 0 fields, and a strengthening of these classic results in a symmetric case of natural interest. We note a related bound of $5/4$ in the exponent for the sum-product problem in finite fields of large characteristic, although a lower bound for this characteristic cannot be computed from our methods.

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Source: https://tomesphere.com/paper/1904.01715