Refactorisation of the Dirichlet convolution

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)Σm=1+∞ 2ω(m)mx which is: |ζ(z)|2 = ζ(2x)Σm=1+∞1mx2ω(m)Πp | m , p ∈ Pω(m)(y(pvp(m))) with: z a complex number with z = x+iy and (z) > 1 and x > 1 in Hardy's formula, ω(m) number of unique primes in m, vp(m power of the prime p in m.