Some density results involving the average order of a finite group

Abstract

Let o(G) be the average of the element orders of a finite group G. A research topic concerning this quantity is understanding the relation between o(G) and o(H), where H is a subgroup of G. Let N be the class of finite nilpotent groups and let L(G) be the subgroup lattice of G. In this paper, we show that the set o(G)o(H) \ | \ G∈N, H∈ L(G) is dense in [0, ∞). Other density results are outlined throughout the paper.