On the Dirichlet problem for degenerate Beltrami equations

Abstract

We show that every homeomorphic W1,1 loc solution f to a Beltrami equation ∂f=μ ∂ f in a domain D⊂ C is the so--called lower Q-homeomorphism with Q(z)=KTμ(z, z0) where KTμ(z, z0) is the tangent dilatation of f with respect to an arbitrary point z0∈ D and develop the theory of the boundary behavior of such solutions. Then, 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 Jordan domains in C and pseudoregular and multi-valued solutions in arbitrary finitely connected domains in C bounded by mutually disjoint Jordan curves.