On a divisibility property involving the sum of element orders

Abstract

A finite group G is called -divisible if (H)|(G) for any subgroup H of G, where (H) and (G) are the sum of element orders of H and G, respectively. In this paper, we extend a result provided in [10], by classifying the finite groups whose all subgroups are -divisible. Since the existence of -divisible groups is related to the class of square-free order groups, we also study the sum of element orders and the -divisibility property of ZM-groups. In the end, we introduce the concept of -normal divisible group, i.e. a group for which the -divisibility property is satisfied by all its normal subgroups. Using simple and quasisimple groups, we are able to construct infinitely many -normal divisible groups which are neither simple nor nilpotent.