A criterion for nilpotency of a finite group by the sum of element orders
Abstract
Denote the sum of element orders in a finite group G by (G) and let Cn denote the cyclic group of order n. In this paper, we prove that if |G|=n and (G)>1321\,(Cn), then G is nilpotent. Moreover, we have (G)=1321\,(Cn) if and only if n=6m with (6,m)=1 and G S3× Cm. Two interesting consequences of this result are also presented.
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