Boundary convergence and path divergence sets for bounded analytic functions in the disk
Abstract
Let be a bounded analytic function. A set which contains the point in its boundary is called a convergence set for at if converges to some value as with . is called a path divergence set for at if diverges along every path which lies in and approaches . In this article, we show that for a path through the unit disk from to , if fails to converge along , then either the region above or the region below is a path divergence set for . On the other hand, if and are two such paths, and converges along both and , then the region between and is a convergence set for . This latter fact is immediate when and do not intersect except at their end-points, but becomes non-trivial when and are highly intersecting. We conclude the paper with an examination of the convergence sets for the function at .
Cite
@article{arxiv.1609.06235,
title = {Boundary convergence and path divergence sets for bounded analytic functions in the disk},
author = {Trevor Richards},
journal= {arXiv preprint arXiv:1609.06235},
year = {2019}
}
Comments
6 pages, 1 figure