Eaton, Charles W. (2008) Perfect generalized characters inducing the Alperin-McKay conjecture. Journal of Algebra, 320 (6). pp. 2301-2327. ISSN 0021-8693
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Abstract
It is well known that the perfect isometries predicted in Broue's conjecture do not always exist when the defect groups are non-abelian, even when the blocks have equivalent Brauer categories. We consider perfect generalized characters which induce bijections between the sets of irreducible characters of height zero of a block and of its Brauer correspondent in the normalizer of a defect group. In this way the perfect isometries predicted in Broue's conjecture for blocks with abelian defect groups are generalized. Whilst such generalized characters do not exist in general, we show that they do exist when the defect groups are non-abelian trivial intersection subgroups of order $p^3$, as well as for $^2B_2(q)$ for $q$ a power of two and $PSU_3(q)$ for all $q$. Further, we show that these blocks satisfy a generalized version of an isotypy.
| Item Type: | Article |
|---|---|
| Subjects: | MSC 2010, the AMS's Mathematics Subject Classification > 20 Group theory and generalizations |
| Depositing User: | Dr Charles Eaton |
| Date Deposited: | 10 Oct 2009 |
| Last Modified: | 20 Oct 2017 14:12 |
| URI: | https://eprints.maths.manchester.ac.uk/id/eprint/1327 |
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