Three Value Ranges for Symmetric Self-mappings

Abstract

Let D be the unit disc and z0∈ D. We determine the value range \f(z0)\,|\, f∈ R≥\, where R≥ is the set of holomorphic functions f: D D with f(0)=0 and f'(0)≥0 that have only real coefficients in their power series expansion around 0, and the smaller set \f(z0)\,|\, f∈ R≥, f is typically real\. Furthermore, we describe a third value range \ f(z0) \,|\, f ∈ I\, where I consists of all univalent self-mappings of the upper half-plane H with hydrodynamical normalization which are symmetric with respect to the imaginary axis.