Author: Teo Lee-Peng
Publisher: Springer Publishing Company
ISSN: 0025-5874
Source: Mathematische Zeitschrift, Vol.256, Iss.3, 2007-07, pp. : 603-613
Disclaimer: Any content in publications that violate the sovereignty, the constitution or regulations of the PRC is not accepted or approved by CNPIEC.
Abstract
We study the Bers isomorphism between the Teichmüller space of the parabolic cyclic group and the universal Teichmüller curve. We prove that this is a group isomorphism and its derivative map gives a remarkable relation between Fourier coefficients of cusp forms and Fourier coefficients of vector fields on the unit circle. We generalize the Takhtajan–Zograf metric to the Teichmüller space of the parabolic cyclic group, and prove that up to a constant, it coincides with the pull back of the Velling–Kirillov metric defined on the universal Teichmüller curve via the Bers isomorphism.
Related content
Access to resources
Recommend
A universal separable metric space based on the triangular Sierpinski curve
Topology and its Applications, Vol. 120, Iss. 1, 2002-05 ,pp. :
The Thom isomorphism for nonorientable bundles
Journal of Mathematical Sciences, Vol. 136, Iss. 5, 2006-08 ,pp. :
The Girard-Reynolds isomorphism
By Wadler P.
Information and Computation, Vol. 186, Iss. 2, 2003-11 ,pp. :