Fake Galois Actions
Abstract
We prove that for all non-abelian finite simple groups S, there exists a fake mth Galois action on IBr(X) with respect to X X Aut(X), where X is the universal covering group of S and m is any non-negative integer coprime to the order of X. This is one of the two inductive conditions needed to prove an -modular analogue of the Glauberman-Isaacs correspondence.
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