Trace Class Groups
Journal of Lie theory, Tome 26 (2016) no. 1, pp. 269-291
A representation $\pi$ of a locally compact group $G$ is called {\it trace class}, if for every test function $f$ the induced operator $\pi(f)$ is a trace class operator. The group $G$ is called {\it trace class}, if every $\pi\in\widehat G$ is trace class. In this paper we give a survey of what is known about trace class groups and ask for a simple criterion to decide whether a given group is trace class. We show that trace class groups are type I and give a criterion for semi-direct products to be trace class and show that a representation $\pi$ is trace class if and only if $\pi\otimes\pi'$ can be realized in the space of distributions.
Classification :
22D10, 11F72, 22D30, 43A65
Mots-clés : Trace class operator, type I group, unitary representation
Mots-clés : Trace class operator, type I group, unitary representation
@article{JLT_2016_26_1_JLT_2016_26_1_a13,
author = {A. Deitmar and G. van Dijk},
title = {Trace {Class} {Groups}},
journal = {Journal of Lie theory},
pages = {269--291},
year = {2016},
volume = {26},
number = {1},
url = {http://geodesic.mathdoc.fr/item/JLT_2016_26_1_JLT_2016_26_1_a13/}
}
A. Deitmar; G. van Dijk. Trace Class Groups. Journal of Lie theory, Tome 26 (2016) no. 1, pp. 269-291. http://geodesic.mathdoc.fr/item/JLT_2016_26_1_JLT_2016_26_1_a13/