Self-dual modules in characteristic two and normal subgroups
Abstract
We prove Clifford theoretic results on the representations of finite groups which only hold in characteristic . Let be a finite group, let be a normal subgroup of and let be an irreducible -Brauer character of which is self-dual. We prove that there is a unique self-dual irreducible Brauer character of such that occurs with odd multiplicity in the restriction of to . Moreover this multiplicity is . Conversely if is an irreducible -Brauer character of which is self-dual but not of quadratic type, the restriction of to is a sum of distinct self-dual irreducible Brauer character of , none of which have quadratic type. Let be a real -block of . We show that there is a unique real -block of covering which is weakly regular.
Cite
@article{arxiv.2007.02636,
title = {Self-dual modules in characteristic two and normal subgroups},
author = {Rod Gow and John Murray},
journal= {arXiv preprint arXiv:2007.02636},
year = {2020}
}
Comments
19 pages, example added