On sums of logarithmic averages of gcd-sum functions

Abstract

Let (k,j) be the greatest common divisor of the integers k and j. For any arithmetical function f, we establish several asymptotic formulas for weighted averages of gcd-sum functions with weight concerning logarithms, that is Σk≤ x1k Σj=1kf((k,j)) j. More precisely, we give asymptotic formulas for various multiplicative functions such as f=id, φ, id1+a and φ1+a with -1<a<0. We also establish some formulas of Dirichlet series having coefficients of the sum function Σj=1ksk(j) j where sk(j) is Anderson--Apostol sums.