Sandeep Singh, Deepak Gumber
Published 2015-01-29Version 1
Let $G$ be a finitely generated group and let $C^*$ denote the group of all central automorphisms of $G$ fixing the center of $G$ elementwise. Azhdari and Malayeri [J. Algebra Appl., {\bf 6}(2011), 1283-1290] gave necessary and sufficient conditions on $G$ such that $C^* \simeq \mathrm{Inn}(G)$. We prove a technical lemma and, as a consequence, obtain a short and easy proof of this result of Azhdari and Malayeri. Subsequently, we also obtain short proofs of some other existing and some new related results.
On the structure of a poly-$\mathbb{Z}$ group
On linearity of automorphism groups of algebras and groups
Conjugacy growth of finitely generated groups
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