Type-I permanence
Abstract
We prove a number of results on the survival of the type-I property under extensions of locally compact groups: (a) that given a closed normal embedding of locally compact groups and a twisted action thereof on a (post)liminal -algebra the twisted crossed product is again (post)liminal and (b) a number of converses to the effect that under various conditions a normal, closed, cocompact subgroup is type-I as soon as is. This happens for instance if is discrete and is Lie, or if is finitely-generated discrete (with no further restrictions except cocompactness). Examples show that there is not much scope for dropping these conditions. In the same spirit, call a locally compact group type-I-preserving if all semidirect products are type-I as soon as is, and {\it linearly} type-I-preserving if the same conclusion holds for semidirect products arising from finite-dimensional -representations. We characterize the (linearly) type-I-preserving groups that are (1) discrete-by-compact-Lie, (2) nilpotent, or (3) solvable Lie.
Keywords
Cite
@article{arxiv.2112.10283,
title = {Type-I permanence},
author = {Alexandru Chirvasitu},
journal= {arXiv preprint arXiv:2112.10283},
year = {2022}
}
Comments
30 pages + references; major revision + added material; addresses a serious issue in one of the main results in the previous version