On the Uniform Distribution (mod 1) of the Farey Sequence, quadratic Farey and Riemann sums with a remark on local integrals of ζ(s)

Abstract

For 1-periodic functions f satisfying only a weak local regularity assumption of Dini's type at rational points of ]0,1[, we study the Farey sums Fn(f)= Σ∈ n f(), Fn,(f)= Σ∈ n 1^f(), 1/2 <1 , where n is the Farey series of order n 1. We obtain sharp estimates of Fn,(f), for all 0< 1. We prove similar results for the corresponding Riemann quadratic sums Sn,(f) \ =\ Σ1 k n1(k) \, f( k). These sums are related to local integrals of the Riemann zeta-function over bounded intervals I, which are considered in the last part of the paper.