Fitting subgroup and nilpotent residual of fixed points
Abstract
Let q be a prime and A an elementary abelian group of order at least q3 acting by automorphisms on a finite q'-group G. It is proved that if |γ∞(CG(a))|≤ m for any a∈ A\#, then the order of γ∞(G) is m-bounded. If F(CG(a)) has index at most m in CG(a) for any a ∈ A\#, then the index of F2(G) is m-bounded.
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