Ratan Lal, Vipul Kakkar
Published 2021-04-27Version 1
In this paper, we study the properties of the associated gyrogroup ${^\circ}G$ of a given group $G$ of nilpotency class $3$. We have proved that if $3$ does not divide the order of the group $G$, then the nilpotency class of the associated gyrogroup ${^\circ}G$ is same as that of the group $G$. We have also studied the problem of abelian inner mapping group in this context.
Comments: Comments are welcome
On the Complexity of Properties of Transformation Semigroups
Groups of the nilpotency class $3$ of order $p^4$ as additive groups of local nearrings
Virtual pro-$p$ properties of 3-manifold groups
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