Criteria for solubility and nilpotency of finite groups with automorphisms
Abstract
Let G be a finite group admitting a coprime automorphism α. Let JG(α) denote the set of all commutators [x,α], where x belongs to an α-invariant Sylow subgroup of G. We show that [G,α] is soluble or nilpotent if and only if any subgroup generated by a pair of elements of coprime orders from the set JG(α) is soluble or nilpotent, respectively.
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