Linear space properties of Hp spaces of Dirichlet series

Abstract

We study Hp spaces of Dirichlet series, called Hp, for the range 0<p< ∞. We begin by showing that two natural ways to define Hp coincide. We then proceed to study some linear space properties of Hp. More specifically, we study linear functionals generated by fractional primitives of the Riemann zeta function; our estimates rely on certain Hardy--Littlewood inequalities and display an interesting phenomenon, called contractive symmetry between Hp and H4/p, contrasting the usual Lp duality. We next deduce general coefficient estimates, based on an interplay between the multiplicative structure of Hp and certain new one variable bounds. Finally, we deduce general estimates for the norm of the partial sum operator Σn=1∞ an n-s Σn=1N an n-s on Hp with 0< p 1, supplementing a classical result of Helson for the range 1<p<∞. The results for the coefficient estimates and for the partial sum operator exhibit the traditional schism between the ranges 1 p ∞ and 0<p<1.