English

Universally starlike and Pick functions

Classical Analysis and ODEs 2018-04-12 v1

Abstract

Denote by Plog\mathcal{P}_{\log} the set of all non-constant Pick functions ff whose logarithmic derivatives f/ff^{\, \prime}/f also belong to the Pick class. Let U(Λ)\mathcal{U}(\Lambda) be the family of functions zf(z)z\cdot f(z), where fPlogf \in\mathcal{P}_{\log} and ff is holomorphic on Λ:=C[1,+)\Lambda:=\mathbb{C}\setminus [1, +\infty). Important examples of functions in U(Λ)\mathcal{U}(\Lambda) are the classical polylogarithms Liα(z)Li_\alpha(z) :=:= k=1zk/kα\sum_{k=1}^{\infty} z^k / k^\alpha for α0\alpha \geq 0. In this paper we prove that every φU(Λ)\varphi \in \mathcal{U}(\Lambda) is universally starlike, i.e., φ\varphi maps every circular domain in Λ\Lambda containing the origin one-to-one onto a starlike domain. Furthermore, we show that every non-constant function fPlogf \in \mathcal{P}_{\log} belongs to the Hardy space HpH_p on the upper half-plane for some constant p=p(f)>1p=p(f) > 1, unless ff is proportional to some function (az)θ(a-z)^{-\theta} with aRa \in \mathbb{R} and 0<θ10 < \theta \leq 1. Finally we derive a necessary and sufficient condition on a real-valued function vv for which there exists fPlogf \in \mathcal{P}_{\log} such that v(x)=limε0Imf(x+iε)v (x) = \lim_{\varepsilon \to 0} \mathrm{Im} f (x + i \varepsilon) for almost all xRx \in \mathbb{R}.

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

R2 v1 2026-06-23T01:20:21.901Z