English

Refactorisation of the Dirichlet convolution

Number Theory 2022-06-14 v1

Abstract

We present a new way to factor the dirichlet convolution for completely multiplicative functions whitch led us to constructing a ring that arise from the operations involved in the factorisation. We will conclude by some identities that was found during this work. An application of the results gives us a generalisation of the following Hardy formula: ζ(x)2=ζ(2x)m=1+2ω(m)mx\zeta(x)^{2} = \zeta(2x)\sum_{m=1}^{+\infty} \frac{2^{\omega(m)}}{m^{x}} which is: ζ(z)2=ζ(2x)m=1+1mx2ω(m)pm,pPω(m)cos(yln(pvp(m)))|\zeta(z)|^{2} = \zeta(2x)\sum_{m=1}^{+\infty}\frac{1}{m^{x}}2^{\omega(m)}\prod_{p | m , p \in \mathbb{P}}^{\omega(m)}\cos(y\ln(p^{v_{p}(m)})) with: zz a complex number with z=x+iyz = x+iy and (z)>1\Re(z) > 1 and x > 1 in Hardy's formula, ω(m)\omega(m) number of unique primes in mm, vp(mv_{p}(m power of the prime pp in mm.

Keywords

Cite

@article{arxiv.2206.05371,
  title  = {Refactorisation of the Dirichlet convolution},
  author = {Ansar El Hassani},
  journal= {arXiv preprint arXiv:2206.05371},
  year   = {2022}
}
R2 v1 2026-06-24T11:47:13.155Z