The second maximal groups with respect to the sum of element orders

Abstract

Denote by G a finite group and let (G) denote the sum of element orders in G. In 2009, H.Amiri, S.M.Jafarian Amiri and I.M.Isaacs proved that if |G|=n and G is non-cyclic, then (G)<(Cn), where Cn denotes the cyclic group of order n. In 2018 we proved that if G is non-cyclic group of order n, then (G)≤ 711(Cn) and equality holds if n=4k with (k,2)=1 and G=(C2× C2)× Ck. In this paper we proved that equality holds if and only if n and G are as indicated above. Moreover we proved the following generalization of this result: Theorem 4. Let q be a prime and let G be a non-cyclic group of order n, with q being the least prime divisor of n. Then (G)≤ ((q2-1)q+1)(q+1)q5+1(Cn), with equality if and only if n=q2k with (k,q)=1 and G=(Cq× Cq)× Ck. Notice that if q=2, then ((q2-1)q+1)(q+1)q5+1= 711.