Simple endotrivial modules for linear, unitary and exceptional groups
Abstract
Motivated by a recent result of Robinson showing that simple endotrivial modules essentially come from quasi-simple groups we classify such modules for finite special linear and unitary groups as well as for exceptional groups of Lie type. Our main tool is a lifting result for endotrivial modules obtained in a previous paper which allows us to apply character theoretic methods. As one application we prove that the -rank of quasi-simple groups possessing a faithful simple endotrivial module is at most 2. As a second application we complete the proof that principal blocks of finite simple groups cannot have Loewy length 4, thus answering a question of Koshitani, K\"ulshammer and Sambale. Our results also imply a vanishing result for irreducible characters of special linear and unitary groups.
Cite
@article{arxiv.1501.00400,
title = {Simple endotrivial modules for linear, unitary and exceptional groups},
author = {Caroline Lassueur and Gunter Malle},
journal= {arXiv preprint arXiv:1501.00400},
year = {2015}
}
Comments
29 pages