Orthogonality questions in the Hardy space related to ζ-zeros

Abstract

A Hardy space approach to the Nyman-Beurling and B\'aez-Duarte criterion for the Riemann Hypothesis (RH) was introduced recently in [18] and further developed in [13]. It states that the RH holds if and only if a particular sequence of functions (hk)k≥ 2 is complete in the Hardy space H2. This article is concerned with orthogonality questions related to the family (hk)k≥ 2. The first goal is to analyze the orthogonal complement of N=span(hk)k≥ 2 in H2. Unbounded Toeplitz operators on Hp spaces and de Branges-Rovnyak spaces play a central role and our results show that the size and dimension of N reveal information on the zeros of the Riemann ζ-function. The second goal is to show that (hk)k≥ 2 possesses a complete biorthogonal sequence in H2. We also discuss a folklore conjecture about the number of ζ-zeros if the RH fails.