Marius Tărnăuceanu
Published 2019-03-23Version 1
Denote the sum of element orders in a finite group $G$ by $\psi(G)$ and let $C_n$ denote the cyclic group of order $n$. In this paper, we prove that if $|G|=n$ and $\psi(G)>\frac{13}{21}\,\psi(C_n)$, then $G$ is nilpotent. Moreover, we have $\psi(G)=\frac{13}{21}\,\psi(C_n)$ if and only if $n=6m$ with $(6,m)=1$ and $G\cong S_3\times C_m$. Two interesting consequences of this result are also presented.
A bijection from a finite group to the cyclic group with a divisible property on the element orders
On Two Conjectures about the Sum of Element Orders
On the widths of finite groups (I)
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