Ring homeomorphisms and prime ends

Abstract

We show that every homeomorphic W1,1 loc solution f of a Beltrami equation ∂f=μ\,∂ f in a domain D⊂eq C is the so--called ring Q-homeomorphism with Q(z)=KTμ(z, z0) where KTμ(z, z0) is the tangent (angular) dilatation quotient of the equation with respect to an arbitrary point z0∈ D. In this connection, we develop the theory of the boundary behavior of the ring Q-homeomorphisms with respect to prime ends. On this basis, we show that, for wide classes of degenerate Beltrami equations ∂f=μ\,∂ f, there exist regular solutions of the Dirichlet problem in arbitrary simply connected domains in C and pseudoregular and multivalent solutions in arbitrary finitely connected domains in C with boundary datum that are continuous with respect to the topology of prime ends.