On Equality of Certain Automorphism Groups

Abstract

Let G = H× A be a group, where H is a purely non-abelian subgroup of G and A is a non-trivial abelian factor of G. Then, for n ≥ 2, we show that there exists an isomorphism φ : AutZ(G)γn(G)(G) → AutZ(H)γn(H)(H) such that φ(Autcn-1(G))=Autcn-1(H). Also, for a finite non-abelian p-group G satisfying a certain natural hypothesis, we give some necessary and sufficient conditions for Autcent(G) = Autcn-1(G). Furthermore, for a finite non-abelian p-group G we study the equality of Autcent(G) with AutZ(G)γn(G)(G).