Journal of Geometry and Symmetry in Physics

Relations Between Laplace Spectra and Geometric Quantization of Reimannian Symmetric Spaces

Dimitar Grantcharov and Gueo Grantcharov

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Abstract

We consider a modified Kostant-Souriau geometric quantization scheme due to Czyz and Hess for Hamiltonian systems on the cotangent bundles of compact rank-one Riemannian symmetric spaces (CROSS). It is used, together with a symplectic reduction process, to relate its energy spectrum to the spectrum of the Laplace-Beltrami operator. Moreover, the corresponding eigenspaces have real dimension equal to the complex dimension of the space of the holomorphic sections of the quantum bundle which is obtained after the quantization. The relation between the two constructions was first noticed by Mladenov and Tsanov for the case of the spheres. In addition to the CROSS case, we announce preliminary results related to the case of compact Riemannian symmetric spaces of higher rank.

Article information

Source
J. Geom. Symmetry Phys., Volume 51 (2019), 9-28.

Dates
First available in Project Euclid: 26 April 2019

Permanent link to this document
https://projecteuclid.org/euclid.jgsp/1556244026

Digital Object Identifier
doi:10.7546/jgsp-51-2019-9-28

Mathematical Reviews number (MathSciNet)
MR0

Zentralblatt MATH identifier
0

Citation

Grantcharov, Dimitar; Grantcharov, Gueo. Relations Between Laplace Spectra and Geometric Quantization of Reimannian Symmetric Spaces. J. Geom. Symmetry Phys. 51 (2019), 9--28. doi:10.7546/jgsp-51-2019-9-28. https://projecteuclid.org/euclid.jgsp/1556244026


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