Counting positive defect irreducible characters of a finite group
Date
1998
Authors
Barker, L.
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Source Title
New Zealand Journal of Mathematics
Print ISSN
1171-6096
Electronic ISSN
1179-4984
Publisher
University of Auckland, Department of Mathematics
Volume
27
Issue
Pages
167 - 176
Language
English
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Abstract
Let z+ (G) be the number of ordinary irreducible characters of a finite group G which have positive defect with respect to a prime p. We express z+(G) as the p- adic limit of a sequence of enumerative parameters of G and p. When p = 2, and under a suitable hypothesis on the Sylow 2- subgroups of G, we give two local characterisations of the parity of z+(G), one of them compatible with Alperin’s Weight Conjecture, the other apparently independent.