Marius Tărnăuceanu
Published 2020-01-20Version 1
Let $G$ be a finite group and let $\psi(G)$ denote the sum of element orders of $G$. It is well-known that the maximum value of $\varphi$ on the set of groups of order $n$, where $n$ is a positive integer, will occur at the cyclic group $C_n$. For nilpotent groups, we prove a natural generalization of this result, obtained by replacing the element orders of $G$ with the element orders relative to a certain subgroup $H$ of $G$.
A bijection from a finite group to the cyclic group with a divisible property on the element orders
A criterion for nilpotency of a finite group by the sum of element orders
On finite groups whose derived subgroup has bounded rank
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