Addendum to "A generalization of a result on the sum of element orders of a finite group" [arXiv:2001.07275]
Abstract
Let G be a group of order n and H be a subgroup of order m of G. Denote by H(G) the sum of element orders relative to H of G. It is known that if G is nilpotent, then H(G)≤Hm(G), where Hm is the unique subgroup of order m of Cn. In this note, we show that this inequality does not hold for infinitely many finite solvable groups.
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