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Module Correspondences for Twisted Group Algebras |
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| Abstract: | Abstract Let G and A be finite groups such that (|G|, |A|) = 1. Let K be an algebraically closed field with Char K = 0. Denote by K α G the twisted group algebra of G over K with factor set α. In this paper we prove that if A acts homogeneously on K α G, then there exists an action of A on G, and there is a one-to-one correspondence between the set of A-invariant irreducible K α G-modules and the set of irreducible K α C G (A)-modules. |
| Keywords: | Finite group Coprime action Twisted group algebra Glauberman-Isaacs correspondence |