Analytic Characterization of t-Quasicircles and Conformal Mappings onto t-Quasidisks

Abstract

In this paper, we introduce a new class of mappings, termed (,t)-quasisymmetric mappings, which generalizes the classical concept of quasisymmetric mappings. Using this broader class of mappings, we provide an analytic characterization of t-quasicircles. This result can be viewed as a t-quasisymmetric analogue of a classical theorem by Tukia and V\"ais\"al\"a TV. Furthermore, we study conformal mappings from the unit disk D onto t-quasidisks and show that their boundary values are "almost`` (,t2)-quasisymmetric. This result extends the Quasicircle Theorem to the case of t-quasicircles.

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