The Character of the Exceptional Series of Representations of SU(1,1)

The character of the exceptional series of representations of SU(1,1) is determined by using Bargmann's realization of the representation in the Hilbert space \(H_\sigma\) of functions defined on the unit circle. The construction of the integral kernel of the group ring turns out to be especial...

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Bibliographic Details
Published in:arXiv.org 1999-06
Main Authors: Basu, Debabrata, Bal, Subrata, Shajesh, K V
Format: Article
Language:English
Subjects:
Hilbert space
Integrals
Kernels
Momentum
Quantum theory
Representations
Rings (mathematics)
Online Access:Get full text
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Summary:The character of the exceptional series of representations of SU(1,1) is determined by using Bargmann's realization of the representation in the Hilbert space \(H_\sigma\) of functions defined on the unit circle. The construction of the integral kernel of the group ring turns out to be especially involved because of the non-local metric appearing in the scalar product with respect to which the representations are unitary. Since the non-local metric disappears in the `momentum space' \(i.e.\) in the space of the Fourier coefficients the integral kernel is constructed in the momentum space, which is transformed back to yield the integral kernel of the group ring in \(H_\sigma\). The rest of the procedure is parallel to that for the principal series treated in a previous paper. The main advantage of this method is that the entire analysis can be carried out within the canonical framework of Bargmann.
ISSN:2331-8422
DOI:10.48550/arxiv.9906066