Almost sure-sign convergence of Hardy-type Dirichlet series

Daniel Carando; Andreas Defant; Pablo Sevilla-Peris

arXiv:1412.5030·math.FA·December 17, 2014

Almost sure-sign convergence of Hardy-type Dirichlet series

Daniel Carando, Andreas Defant, Pablo Sevilla-Peris

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TL;DR

This paper investigates the almost sure sign convergence of Hardy-type Dirichlet series within Banach spaces, extending Hartman's classical result from 1939 to a more general and modern setting.

Contribution

It generalizes Hartman's 1939 result to Hardy-type Dirichlet series with Banach space values, providing a broader understanding of sign convergence.

Findings

01

Established the width of the maximal strip for a.s.-sign convergence in the Banach space setting.

02

Extended classical results to a more general class of Dirichlet series.

03

Provided new insights into the structure of Hardy-type Dirichlet series.

Abstract

Hartman proved in 1939 that the width of the largest possible strip in the complex plane, on which a Dirichlet series $\sum_{n} a_{n} n^{- s}$ is uniformly a.s.-sign convergent (i.e., $\sum_{n} ε_{n} a_{n} n^{- s}$ converges uniformly for almost all sequences of signs $ε_{n} = \pm 1$ ) but does not convergent absolutely, equals $1/2$ . We study this result from a more modern point of view within the framework of so called Hardy-type Dirichlet series with values in a Banach space.

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Taxonomy

TopicsHolomorphic and Operator Theory · Advanced Banach Space Theory · Advanced Harmonic Analysis Research