Sums of averages of gcd-sum functions II

Abstract

Let (k,j) denote the greatest common divisor of the integers k and j, and let r be any fixed positive integer. Define Mr(x; f) := Σk≤ x1kr+1Σj=1kjrf((j,k)) for any large real number x≥ 5, where f is any arithmetical function. Let φ, and denote the Euler totient and the Dedekind function, respectively. In this paper, we refine asymptotic expansions of Mr(x; id), Mr(x;φ) and Mr(x;). Furthermore, under the Riemann Hypothesis and the simplicity of zeros of the Riemann zeta-function, we establish the asymptotic formula of Mr(x; id) for any large positive number x>5 satisfying x=[x]+12.