Cuspidal integrals for SL(3)∕Kϵ

Mogens Flensted-Jensen, Job J. Kuit*

*Corresponding author for this work
1 Citation (Scopus)

Abstract

We show that for the symmetric spaces SL(3,R)∕SO(1,2)e and SL(3,C)∕SU(1,2) the cuspidal integrals are absolutely convergent. We further determine the behavior of the corresponding Radon transforms and relate the kernels of the Radon transforms to the different series of representations occurring in the Plancherel decomposition of these spaces. Finally we show that for the symmetric space SL(3,H)∕Sp(1,2) the cuspidal integrals are not convergent for all Schwartz functions.

Original languageEnglish
JournalIndagationes Mathematicae
Volume29
Issue number5
Pages (from-to)1235-1258
Number of pages24
ISSN0019-3577
DOIs
Publication statusPublished - 2018

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