Hilbert points in Hardy spaces
Abstract
A Hilbert point in , for and , is a nontrivial function in such that whenever is in and orthogonal to in the usual sense. When , is a Hilbert point in if and only if is a nonzero multiple of an inner function. An inner function on is a Hilbert point in any of the spaces , but there are other Hilbert points as well when . We investigate the case of -homogeneous polynomials in depth and obtain as a byproduct a new proof of the sharp Khintchin inequality for Steinhaus variables in the range . We also study briefly the dynamics of a certain nonlinear projection operator that characterizes Hilbert points as its fixed points. We exhibit an example of a function that is a Hilbert point in for , but not for any other ; this is verified rigorously for but only numerically for .
Cite
@article{arxiv.2106.07532,
title = {Hilbert points in Hardy spaces},
author = {Ole Fredrik Brevig and Joaquim Ortega-Cerdà and Kristian Seip},
journal= {arXiv preprint arXiv:2106.07532},
year = {2023}
}
Comments
This paper has been accepted for publication in Algebra and Analysis