The Dirichlet-Bohr radius

Abstract

Denote by (n) the number of prime divisors of n ∈ N (counted with multiplicities). For x∈ N define the Dirichlet-Bohr radius L(x) to be the best r>0 such that for every finite Dirichlet polynomial Σn ≤ x an n-s we have Σn ≤ x |an| r(n) ≤ t∈ R |Σn ≤ x an n-it|\,. We prove that the asymptotically correct order of L(x) is ( x)1/4x-1/8 . Following Bohr's vision our proof links the estimation of L(x) with classical Bohr radii for holomorphic functions in several variables. Moreover, we suggest a general setting which allows to translate various results on Bohr radii in a systematic way into results on Dirichlet-Bohr radii, and vice versa.