English

Partial Franel sums

Number Theory 2024-04-15 v2

Abstract

Analytical expressions are derived for the position of irreducible fractions in the Farey sequence FNF_N of order NN for a particular choice of NN. The asymptotic behaviour is derived obtaining a lower error bound than in previous results when these fractions are in the vicinity of 0/10/1, 1/21/2 or 1/11/1. Franel's famous formulation of Riemann's hypothesis uses the summation of distances between irreducible fractions and evenly spaced points in [0,1][0,1]. A partial Franel sum is defined here as a summation of these distances over a subset of fractions in FNF_N. The partial Franel sum in the range [0,i/N][0, i/N], with N=lcm(1,2,...,i)N={\rm lcm}(1,2,...,i) is shown here to grow as O(log(N)δB(logN))O(\log(N)\delta_B(\log N)), where δB(x)\delta_B(x) is a decreasing function. Other partial Franel sums are also explored.

Keywords

Cite

@article{arxiv.1802.07792,
  title  = {Partial Franel sums},
  author = {Rogelio Tomas},
  journal= {arXiv preprint arXiv:1802.07792},
  year   = {2024}
}

Comments

10 pages

R2 v1 2026-06-23T00:29:24.642Z