Universally starlike and Pick functions

Abstract

Denote by P the set of all non-constant Pick functions f whose logarithmic derivatives f\, /f also belong to the Pick class. Let U() be the family of functions z· f(z), where f ∈P and f is holomorphic on :=C [1, +∞). Important examples of functions in U() are the classical polylogarithms Liα(z) := Σk=1∞ zk / kα for α ≥ 0. In this paper we prove that every ∈ U() 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 f ∈ P belongs to the Hardy space Hp on the upper half-plane for some constant p=p(f) > 1, unless f is proportional to some function (a-z)-θ with a ∈ R and 0 < θ ≤ 1. Finally we derive a necessary and sufficient condition on a real-valued function v for which there exists f ∈ P such that v (x) = 0 Im f (x + i ) for almost all x ∈ R.