$$\mathcal{Q}_{K}$$ -Teichmüller Spaces

Hasi Wulan and Kehe Zhu
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Hasi Wulan: Shantou University, Department of Mathematics
Kehe Zhu: State University of New York, Albany, Department of Mathematics and Statistics

Chapter Chapter 8 in Mobius Invariant QK Spaces, 2017, pp 189-217 from Springer

Abstract: Abstract The theory of Teichmüller spaces is a classical topic in the complex analysis of Riemann surfaces. In the case of the unit disk, Teichmüller spaces have their origins in geometric function theory. In particular, the Bloch space and the space BMOA play important roles in the theory of Teichmüller spaces. The purpose of this chapter is to generalize some of the geometric function theory of Teichmüller spaces to the context of 𝒬 K $$\mathcal{Q}_{K}$$ spaces.

Date: 2017
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DOI: 10.1007/978-3-319-58287-0_8

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