On superorthogonality
Classical Analysis and ODEs
2021-02-16 v2 Number Theory
Abstract
In this survey, we explore how superorthogonality amongst functions in a sequence results in direct or converse inequalities for an associated square function. We distinguish between three main types of superorthogonality, which we demonstrate arise in a wide array of settings in harmonic analysis and number theory. This perspective gives clean proofs of central results, and unifies topics including Khintchine's inequality, Walsh-Paley series, discrete operators, decoupling, counting solutions to systems of Diophantine equations, multicorrelation of trace functions, and the Burgess bound for short character sums.
Cite
@article{arxiv.2007.10249,
title = {On superorthogonality},
author = {Lillian B. Pierce},
journal= {arXiv preprint arXiv:2007.10249},
year = {2021}
}
Comments
61 pages. With an appendix by Emmanuel Kowalski. V2 corrects minor typos