On Symmetric Quasicircles

Abstract. A well-known characterization of quasicircles is the following: A Jordan curve J in the complex plane is a quasicircle if and only if it is the image of the unit circle under a quasisymmetric embedding. In this paper we try to characterize a subclass of quasicircles, namely, symmetric quasicircles, by introducing the concept of asymptotically symmetric embeddings. We show that a Jordan curve J in the complex plane is a symmetric quasicircle if and only if it is the image of the unit circle under an asymptotically symmetric embedding.

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Conformal invariants of QED domains

Shen¹

2004

Tohoku Math. J. (2)

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Given a Jordan domain Ω in the extended complex planeC, denote by M b (Ω), M(Ω) and R(Ω) the boundary quasiextremal distance constant, quasiextremal distance constant and quasiconformal reflection constant of Ω, respectively. It is known thatIn this paper, we will give some further relations among M b (Ω), M(Ω) and R(Ω) by introducing and studying some other closely related constants. Particularly, we will give a necessary and sufficient condition for M b (Ω) = R(Ω) + 1 and show that M(Ω) < R(Ω) + 1 for all asymptotically conformal extension domains other than disks. This gives an affirmative answer to a question asked by Yang, showing that the conjecture M(Ω) = R(Ω) + 1 by Garnett and Yang is not true for all asymptotically conformal extension domains other than disks. Our discussion relies heavily on the theory of extremal quasiconformal mappings, which in turn gives some interesting results in the extremal quasiconformal mapping theory as well.

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On Symmetric Quasicircles

Cited by 3 publications

References 14 publications

Decomposition of extremal length and a proof of Shen’s conjecture on QED constant and boundary dilatation

Decomposition of extremal length and a proof of Shen’s conjecture on QED constant and boundary dilatation

Asymptotically symmetric embeddings and symmetric quasicircles

Conformal invariants of QED domains

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