Dynamical Diophantine Approximation Exponents in Characteristic $p$
Abstract
Let be a non-isotrivial rational function in one-variable with coefficients in and assume that is not a post-critical point for . Then we prove that the diophantine approximation exponent of elements of are eventually bounded above by . To do this, we mix diophantine techniques in characteristic with the adelic equidistribution of small points in Berkovich space. As an application, we deduce a form of Silverman's celebrated limit theorem in this setting. Namely, if we take any wandering point and write for some coprime polynomials , then we prove that whenever and are both not post-critical points for . In characteristic , the Thue-Siegel-Dyson-Roth theorem is false, and so our proof requires different techniques than those used by Silverman.
Cite
@article{arxiv.2209.09182,
title = {Dynamical Diophantine Approximation Exponents in Characteristic $p$},
author = {Wade Hindes},
journal= {arXiv preprint arXiv:2209.09182},
year = {2022}
}