Muckenhoupt weights and Lindel\"of theorem for harmonic mappings

Abstract

We extend the result of Lavrentiev which asserts that the harmonic measure and the arc-length measure are A∞ equivalent in a chord-arc Jordan domain. By using this result we extend the classical result of Lindel\"of to the class of quasiconformal (q.c.) harmonic mappings by proving the following assertion. Assume that f is a quasiconformal harmonic mapping of the unit disk U onto a Jordan domain. Then the function A(z)=(∂(f(z))/z) where z=rei, is well-defined and smooth in U*=\z: 0<|z|<1\ and has a continuous extension to the boundary of the unit disk if and only if the image domain has C1 boundary.