The influence of the prime omega function on the product of element orders in finite groups

Abstract

Let G be a finite group and define (G) = Πx ∈ G o(x), where o(x) denotes the order of the element x ∈ G. Let be the prime omega function giving the number of (not necessarily distinct) prime factors of a natural number. In this paper, we consider the function (G):= ((G)). We show that, under certain conditions, this function exhibits behavior analogous to the derivative in calculus. We establish the following results: (Product rule) If A and B are finite groups, where gcd(|A|,|B|)=1, then (A× B) = (A) · |B|+(B) · |A|. \\ (Quotient rule) If P is a central cyclic normal Sylow p-subgroup of a finite group G, then (GP) = (G)·|P|-(P)· |G||P|2. \\ Moreover, we show that if C is a cyclic group and G is a non-cyclic group of the same order, then (G) ≤ (C). Finally, we show that if G is a group of order |L2(p)|, then (G) ≥slant (L2(p)), where p ∈ \5, 11, 13\ .