On multiplicative functions which are small on average and zero free regions for the Riemann zeta function

Abstract

In this short note we prove the following result: If a completely multiplicative function f:N[-1,1] is small on average in the sense that Σn≤ xf(n) x1-δ, for some δ>0, and if the Dirichlet series of f, say F(s), is such that F(1)=0, then we obtain that for any ε>0, Σp≤ x(1+f(p)) p x1-δ+ε. Moreover, a necessary condition for the existence of such f is that the Riemann zeta function ζ(s) has no zeros in the half plane Re(s)>1-δ.