Zero-free regions of the Riemann zeta function and approximation in weighted Dirichlet spaces

Abstract

We study zero-free regions of the Riemann zeta function ζ related to an approximation problem in the weighted Dirichlet space D-2 which is known to be equivalent to the Riemann Hypothesis since the work of B\'aez-Duarte. We prove, indeed, that analogous approximation problems for the standard weighted Dirichlet spaces Dα when α ∈ (-3,-2) give conditions so that the half-plane \s ∈ C: (s) > -α+12\ is also zero-free for ζ. Moreover, we extend such results to a large family of weighted spaces of analytic functions pα. As a particular instance, in the limit case p=1 and α=-2, we provide a new equivalent formulation of the Prime Number Theorem.