Improved estimates for polynomial Roth type theorems in finite fields
Number Theory
2017-10-03 v3
Abstract
We prove that, under certain conditions on the function pair and , bilinear average along curve satisfies certain decay estimate. As a consequence, Roth type theorems hold in the setting of finite fields. In particular, if with are linearly independent polynomials, then for any with , there are triplets . This extends a recent result of Bourgain and Chang who initiated this type of problems, and strengthens the bound in a result of Peluse, who generalized Bourgain and Chang's work. The proof uses discrete Fourier analysis and algebraic geometry.
Cite
@article{arxiv.1709.00080,
title = {Improved estimates for polynomial Roth type theorems in finite fields},
author = {Dong Dong and Xiaochun Li and Will Sawin},
journal= {arXiv preprint arXiv:1709.00080},
year = {2017}
}
Comments
The assumption "having distinct leading terms" is removed in the results and Peluse is acknowledged