Harmonic maps between annuli on Riemann surfaces

Abstract

Let =h(|z|2) be a metric in a Riemann surface , where h is a positive real function. Let Hr1=\w=f(z)\ be the family of univalent harmonic mapping of the Euclidean annulus A(r1,1):=\z:r1< |z| <1\ onto a proper annulus A of the Riemann surface , which is subject of some geometric restrictions. It is shown that if A is fixed, then \r1: Hr1≠ \<1. This generalizes the similar results from Euclidean case. The cases of Riemann and of hyperbolic harmonic mappings are treated in detail. Using the fact that the Gauss map of a surface with constant mean curvature (CMC) is a Riemann harmonic mapping, an application to the CMC surfaces is given (see Corollary cor). In addition some new examples of hyperbolic and Riemann radial harmonic diffeomorphisms are given, which have inspired some new J. C. C. Nitsche type conjectures for the class of these mappings.