On certain sums of arithmetic functions involving the gcd and lcm of two positive integers

Abstract

We obtain asymptotic formulas with remainder terms for the hyperbolic summations Σmn x f((m,n)) and Σmn x f([m,n]), where f belongs to certain classes of arithmetic functions, (m,n) and [m,n] denoting the gcd and lcm of the integers m,n. In particular, we investigate the functions f(n)=τ(n), n, ω(n) and (n). We also define a common generalization of the latter three functions, and prove a corresponding result.