Finite groups with a large normalized sum of element orders

Abstract

For a finite group G, let ψ(G) be the sum of the orders of its elements, and define the corresponding normalized sum as ψ'(G) := ψ(G)/ψ(C|G|), where C|G| is the cyclic group of the same order as G. Inspired by analogous criteria for the classes of soluble, supersoluble, and nilpotent groups, our main result establishes that if ψ'(G)>ψ'(D8) = 1943, then G belongs to the well-understood class of groups with a modular subgroup lattice, whose structure theory allows us to readily identify all groups satisfying this bound. Moreover, the equality case is fully settled. Finally, our arguments lead to a complete description of all groups satisfying ψ'(G)> ψ'(A4) = 3177, thereby fully determining the groups covered by the supersolubility criterion of Baniasad Azad and Khosravi [Canad. Math. Bull. 65 (2022), 30--38], and thus providing a more complete answer to a corresponding conjecture of Tǎrnǎuceanu.