On effective mean-values of arithmetic functions

Abstract

Let r,\,f be multiplicative functions with r≥slant 0, f is complex valued, |f|≤slant r, and r satisfies some standard growth hypotheses. Let x be large, and assume that, for some real number τ, the quantities r(p)-\f(p)/piτ\ are small in various appropriate average senses over the set of prime numbers not exceeding x. We derive from recent effective mean-value estimates an effective comparison theorem between the mean-values of f and of r on the set of integers ≤slant x. We also provide effective estimates for certain weighted moments of additive functions and for sifted mean-values of non-negative multiplicative functions.