Centralizers of coprime automorphisms of finite groups
Abstract
Let A be an elementary abelian group of order pk with k≥ 3 acting on a finite p'-group G. The following results are proved. If γk-2(CG(a)) is nilpotent of class at most c for any a∈ A#, then γk-2(G) is nilpotent and has \c,k,p\-bounded nilpotency class. If, for some integer d such that 2d+2≤ k, the dth derived group of CG(a) is nilpotent of class at most c for any a∈ A#, then the dth derived group G(d) is nilpotent and has \c,k,p\-bounded nilpotency class. Earlier this was known only in the case where k≤ 4.
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