A graph related to the sum of element orders of a finite group

Abstract

A finite group is called -divisible iff (H)|(G) for any subgroup H of a finite group G. Here, (G) is the sum of element orders of G. For now, the only known examples of such groups are the cyclic ones of square-free order. The existence of non-abelian -divisible groups still constitutes an open question. The aim of this paper is to make a connection between the -divisibility property and graph theory. Hence, for a finite group G, we introduce a simple undirected graph called the -divisibility graph of G. We denote it by G. Its vertices are the non-trivial subgroups of G, while two distinct vertices H and K are adjacent iff H⊂ K and (H)|(K) or K⊂ H and (K)|(H). We prove that G is -divisible iff G has a universal (dominating) vertex. Also, we study various properties of G, when G is a finite cyclic group. The choice of restricting our study to this specific class of groups is motivated in the paper.