On Carleson Measures of Beltrami Coefficients Being Compatible with Infinitely Generated Fuchsian Groups Related to Denjoy Domian

Abstract

Let be a Carleson-Denjoy domain and G be its covering group. Let μ be a Beltrami coefficient on the unit disk which is compatible with the group G. In this paper we show that if |μ|21-|z|2dxdy satisfies the Carleson condition on the infinite boundary of the Dirichlet fundamental domain of G, then |μ|21-|z|2dxdy is a Carleson measure on the unit disk. We also show that the above property does not hold for Denjoy domain.