Physics – High Energy Physics – High Energy Physics - Theory
Scientific paper
1999-06-09
J.Math.Phys. 41 (2000) 461-467
Physics
High Energy Physics
High Energy Physics - Theory
19 pages, latex
Scientific paper
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.
Bal Subrata
Basu Debabrata
Shajesh K. V.
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