Paley Graphs and S\'ark\"ozy's Theorem In Function Fields

Abstract

S\'ark\"ozy's theorem states that dense sets of integers must contain two elements whose difference is a kth power. Following the polynomial method breakthrough of Croot, Lev, and Pach, Green proved a strong quantitative version of this result for Fq[T]. In this paper we provide a lower bound for S\'ark\"ozy's theorem in function fields by adapting Ruzsa's construction for the analogous problem in Z. We construct a set A of polynomials of degree <n such that A does not contain a kth power difference with |A|=qn-n/2k. Additionally, we prove a handful of results concerning the independence number of generalized Paley Graphs, including a generalization of a claim of Ruzsa, which helps with understanding the limit of the method.