Riesz summability of Dirichlet series generating holomorphic functions of finite order

Abstract

Given a frequency λ, we study the Riesz summability of λ-Dirichlet series Σn=1∞ an e-λn s generating holomorphic functions of finite order. We present a new separation condition on the frequency λ ensuring that, for any k ≥ 0, each λ-Dirichlet series that is somewhere Riesz summable of some order and admits a holomorphic extension f to the right half-plane C0 satisfying f(s) = O(|s|k) as |s| ∞ on C0, is in fact Riesz summable of order k on C0. This extends Bohr's theorem, which corresponds to the case k = 0. Our work improves a recent result of Defant and Schoolmann, who showed the above property under Landau's condition (LC). Along the way, we also establish novel bounds on the coefficients of such λ-Dirichlet series and, under a mild condition on the frequency λ, show that they are optimal.