Remarks on the Selberg--Delange method

Abstract

Let be a complex number and let f be a multiplicative arithmetic function whose Dirichlet series takes the form ζ(s) G(s), where G is associated to a multiplicative function g. The classical Selberg-Delange method furnishes asymptotic estimates for averages of f under assumptions of either analytic continuation for G, or absolute convergence of a finite number of derivatives of G(s) at s=1. We consider different set of hypotheses, not directly comparable to the previous ones, and investigate how they can yield sharp asymptotic estimates for the averages of~f.