On Superorthogonality
Publication
, Journal Article
Pierce, LB
Published in: Journal of Geometric Analysis
July 1, 2021
In this survey, we explore how superorthogonality amongst functions in a sequence f1, f2, f3, … 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.
Duke Scholars
Published In
Journal of Geometric Analysis
DOI
ISSN
1050-6926
Publication Date
July 1, 2021
Volume
31
Issue
7
Start / End Page
7096 / 7183
Related Subject Headings
- General Mathematics
- 4904 Pure mathematics
- 4901 Applied mathematics
- 0101 Pure Mathematics
Citation
APA
Chicago
ICMJE
MLA
NLM
Pierce, L. B. (2021). On Superorthogonality. Journal of Geometric Analysis, 31(7), 7096–7183. https://doi.org/10.1007/s12220-021-00606-3
Pierce, L. B. “On Superorthogonality.” Journal of Geometric Analysis 31, no. 7 (July 1, 2021): 7096–7183. https://doi.org/10.1007/s12220-021-00606-3.
Pierce LB. On Superorthogonality. Journal of Geometric Analysis. 2021 Jul 1;31(7):7096–183.
Pierce, L. B. “On Superorthogonality.” Journal of Geometric Analysis, vol. 31, no. 7, July 2021, pp. 7096–183. Scopus, doi:10.1007/s12220-021-00606-3.
Pierce LB. On Superorthogonality. Journal of Geometric Analysis. 2021 Jul 1;31(7):7096–7183.
Published In
Journal of Geometric Analysis
DOI
ISSN
1050-6926
Publication Date
July 1, 2021
Volume
31
Issue
7
Start / End Page
7096 / 7183
Related Subject Headings
- General Mathematics
- 4904 Pure mathematics
- 4901 Applied mathematics
- 0101 Pure Mathematics