Quasiconformal Jordan domains

Abstract

We extend the classical Carath\'eodory extension theorem to quasiconformal Jordan domains ( Y, dY ). We say that a metric space ( Y, dY ) is a quasiconformal Jordan domain if the completion Y of ( Y, dY ) has finite Hausdorff 2-measure, the boundary ∂ Y = Y Y is homeomorphic to S1, and there exists a homeomorphism φ D → ( Y, dY ) that is quasiconformal in the geometric sense. We show that φ has a continuous, monotone, and surjective extension D → Y . This result is best possible in this generality. In addition, we find a necessary and sufficient condition for to be a quasiconformal homeomorphism. We provide sufficient conditions for the restriction of to S1 being a quasisymmetry and to ∂ Y being bi-Lipschitz equivalent to a quasicircle in the plane.