Harmonic quasiconformal mappings between C1 smooth Jordan domains

Abstract

We prove the following result. If f is a harmonic quasiconformal mapping between two Jordan domains D and having C1 boundaries, then the function f is globally H\"older continuous for every α<1 but it is not Lipschitz in general. This extends and improves a classical theorem of S. Warschawski for conformal mappings.