Restriction of complementary series representations of O(1,N) to symmetric subgroups

Jan Möllers, Yoshiki Oshima

Research output: Working paper/Preprint Working paperResearch

111 Downloads (Pure)

Abstract

We find the complete branching law for the restriction of complementary series representations of O(1, n+1) to the symmetric subgroup O(1,m+1)× O(n − m), 0 m < n. The decomposition consists of a continuous part and a discrete part which is trivial for some parameters. The continuous part is given by a direct integral of principal series representations whereas the discrete part consists of finitely many complementary series representations. The explicit Plancherel formula is computed on the Fourier transformed side of the non-compact realization of the complementary series by using the spectral decomposition of a certain hypergeometric type ordinary differential operator. The main tool connecting this differential operator with the representations are second order Bessel operators which describe the Lie algebra action in this realization.
Original languageEnglish
PublisherDepartment of Mathematics, Aarhus University
Number of pages38
Publication statusPublished - 2012
SeriesPreprints
Number7
ISSN1397-4076

Fingerprint

Dive into the research topics of 'Restriction of complementary series representations of O(1,N) to symmetric subgroups'. Together they form a unique fingerprint.

Cite this