---
res:
bibo_abstract:
- For negatively curved symmetric spaces it is known that the poles of the scattering
matrices defined via the standard intertwining operators for the spherical principal
representations of the isometry group are either given as poles of the intertwining
operators or as quantum resonances, i.e. poles of the meromorphically continued
resolvents of the Laplace-Beltrami operator. We extend this result to classical
locally symmetric spaces of negative curvature with convex-cocompact fundamental
group using results of Bunke and Olbrich. The method of proof forces us to exclude
the spectral parameters corresponding to singular Poisson transforms.@eng
bibo_authorlist:
- foaf_Person:
foaf_givenName: Joachim
foaf_name: Hilgert, Joachim
foaf_surname: Hilgert
foaf_workInfoHomepage: http://www.librecat.org/personId=220
- foaf_Person:
foaf_givenName: Benjamin
foaf_name: Delarue, Benjamin
foaf_surname: Delarue
foaf_workInfoHomepage: http://www.librecat.org/personId=70575
dct_date: 2024^xs_gYear
dct_language: eng
dct_title: Quantum resonances and scattering poles of classical rank one locally
symmetric spaces@
...