Universally starlike and Pick functions
Classical Analysis and ODEs
2018-04-12 v1
Abstract
Denote by the set of all non-constant Pick functions whose logarithmic derivatives also belong to the Pick class. Let be the family of functions , where and is holomorphic on . Important examples of functions in are the classical polylogarithms for . In this paper we prove that every is universally starlike, i.e., maps every circular domain in containing the origin one-to-one onto a starlike domain. Furthermore, we show that every non-constant function belongs to the Hardy space on the upper half-plane for some constant , unless is proportional to some function with and . Finally we derive a necessary and sufficient condition on a real-valued function for which there exists such that for almost all .
Keywords
Cite
@article{arxiv.1804.03931,
title = {Universally starlike and Pick functions},
author = {Andrew Bakan and Stephan Ruscheweyh and Luis Salinas},
journal= {arXiv preprint arXiv:1804.03931},
year = {2018}
}
Comments
40 pages