Hardy spaces of general Dirichlet series - a survey

Abstract

The main purpose of this article is to survey on some key elements of a recent Hp-theory of general Dirichlet series Σ an e-λns, which was mainly inspired by the work of Bayart and Helson on ordinary Dirichlet series Σ an n-s. In view of an ingenious identification of Bohr, the Hp-theory of ordinary Dirichlet series can be seen as a sub-theory of Fourier analysis on the infinite dimensional torus T∞. Extending these ideas, the Hp-theory of λ-Dirichlet series is build as a sub-theory of Fourier analysis on what we call λ-Dirichlet groups. A number of problems is added.