Strongly quasisymmetirc homeomorphisms being compatible with Fuchsian groups

Abstract

In this paper we first introduced a domain called generalized Dirichlet fundamental domain F* for a Fuchsian group G whose generators contain parabolic elements. This allows us to show that a quasisymmetric homeomorphism h being compatible with a convergence Fuchsian group G of first kind is a strongly quasisymmetric homeomorphism if and only if it has a quasiconformal extension f to the upper half plane H onto itself such that the induced measure λμ=|μ|2/Im(z)dxdy by the Beltrami coefficient μ of f is a Carleson measure on the generalized Dirichlet fundamental domain F*. We also show that the above property also holds for Carleson-Denjoy domains.