Abstract:
In the first part of the paper we describe the complex geometry of the universal Teichmüller space $\mathcal T$, which may be realized as an open subset in the complex Banach space of holomorphic quadratic differentials in the unit disc. The quotient $\mathcal S$ of the diffeomorphism group of the circle modulo Möbius transformations may be treated as a smooth part of $\mathcal T$. In the second part we consider the quantization of universal Teichmüller space $\mathcal T$. We explain first how to quantize the smooth part $\mathcal S$ by embedding it into a Hilbert–Schmidt Siegel disc. This quantization method, however, does not apply to the whole universal Teichmüller space $\mathcal T$, for its quantization we use an approach, due to Connes.
Citation:
Armen G. Sergeev, “The Group of Quasisymmetric Homeomorphisms of the Circle and Quantization of the Universal Teichmüller Space”, SIGMA, 5 (2009), 015, 20 pp.
\Bibitem{Ser09}
\by Armen G.~Sergeev
\paper The Group of Quasisymmetric Homeomorphisms of the Circle and Quantization of the Universal Teichm\"uller Space
\jour SIGMA
\yr 2009
\vol 5
\papernumber 015
\totalpages 20
\mathnet{http://mi.mathnet.ru/sigma361}
\crossref{https://doi.org/10.3842/SIGMA.2009.015}
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