Oscillations in weighted arithmetic sums

Abstract

We examine oscillations in a number of sums of arithmetic functions involving (n), the total number of prime factors of n, and ω(n), the number of distinct prime factors of n. In particular, we examine oscillations in Sα(x) = Σn≤ x (-1)n - (n)/nα and in Hα(x) = Σn≤ x (-1)ω(n)/nα for α∈[0,1], and in W(x)=Σn≤ x (-2)(n). We show for example that each of the inequalities S0(x)<0, S0(x)>3.3x, S1(x)>0, and S1(x)x<-3.3 is true infinitely often, disproving some hypotheses of Sun.