Hardy spaces of vector-valued Dirichlet series

Abstract

Given a Banach space X and 1 ≤ p ≤ ∞, it is well known that the two Hardy spaces Hp(T,X) (T the torus) and Hp(D,X) (D the disk) have to be distinguished carefully. This motivates us to define and study two different types of Hardy spaces Hp(X) and H+p(X) of Dirichlet series Σn an n-s with coefficients in X. We characterize them in terms of summing operators as well as holomorphic functions in infinitely many variables, and prove that they coincide whenever X has the analytic Radon-Nikod\'ym Property. Consequences are, among others, a vector-valued version of the Brother's Riesz Theorem in the infinite-dimensional torus, and an answer to the question when H1(X) is a dual space.