We describe the autotopism group Atp(G) of any abelian group G as being a semidirect product of its automorphism group Aut(G) and G^2. We then provide the subgroup structure of Atp(G) when G is a finite cyclic group.
The Baer-invariant of a Semidirect Product
On the cohomology of the holomorph of a finite cyclic group
Inertial endomorphisms of an abelian group
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