Hardy space of translated Dirichlet series

Abstract: We study the Hardy space of translated Dirichlet series H + . It consists on those Dirichlet series a n n −s such that for some (equivalently, every) 1 ≤ p < ∞, the translation a n n −(s+ 1 σ ) belongs to the Hardy space H p for every σ > 0. We prove that this set, endowed with the topology induced by the seminorms • 2,k k∈N (whereH 2 ), is a Fréchet space which is Schwartz and non nuclear. Moreover, the Dirichlet monomials {n −s } n∈N are an unconditional Schauder basis of H + . We also explore the connection… Show more