The real analytic structure of the Teichm\"uller space of circle diffeomorphisms with Zygmund continuous derivatives

Abstract

We apply the methods of simultaneous uniformization and composition operators on Besov spaces to the Teichm\"uller space TZ of circle diffeomorphisms with Zygmund continuous derivatives. As consequences, we obtain the following: (1) a new proof of the correspondence between quasiconformal self-homeomorphisms of the unit disk with complex dilatations of linear decay order and their quasisymmetric extensions to the unit circle with regularity in the Zygmund continuously differentiable class; (2) a real-analytic equivalence of TZ with the real Banach space of Zygmund continuous functions on the unit circle.

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