Hardy spaces of vector-valued Dirichlet series

TL;DR

This paper introduces and analyzes two types of Hardy spaces for vector-valued Dirichlet series, characterizing their properties and relations, especially in relation to the Radon-Nikodým property of the Banach space.

Contribution

It defines two new Hardy space frameworks for vector-valued Dirichlet series and characterizes their equivalence under the Radon-Nikodým property, extending classical results.

Findings

Coincidence of Hardy spaces when X has the Radon-Nikodým property

Vector-valued version of Brother's Riesz Theorem in infinite dimensions

Conditions for $\\mathcal{H}_1(X^*)$ to be a dual space

Abstract

Given a Banach space $X$ and $1 \leq p \leq \infty$, it is well known that the two Hardy spaces $H_p(\mathbb{T},X)$ ($\mathbb{T}$ the torus) and $H_p(\mathbb{D},X)$ ($\mathbb{D}$ the disk) have to be distinguished carefully. This motivates us to define and study two different types of Hardy spaces $\mathcal{H}_p(X)$ and $\mathcal{H}^+_p(X)$ of Dirichlet series $\sum_n a_n n^{-s}$ 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\'{y}m 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 $\mathcal{H}_1(X^{\ast})$ is a dual space.