Skip to the main content

Glasnik matematički, Vol. 57 No. 2, 2022.

Original scientific paper

https://doi.org/10.3336/gm.57.2.10

A note on maximal Fourier restriction for spheres in all dimensions

Marco Vitturi orcid id orcid.org/0000-0003-3351-6620 ; School of Mathematical Sciences, University College Cork, Western Gateway Building, Western Road, Cork, Ireland

Full text: english pdf 114 Kb

page 313-319

downloads: 155

cite

Download JATS file

Abstract

We prove a maximal Fourier restriction theorem for hypersurfaces in \(\mathbb{R}^{d}\) for any dimension \(d\geq 3\) in a restricted range of exponents given by the Tomas-Stein theorem (spheres being the most canonical example). The proof consists of a simple observation. When \(d=3\) the range corresponds exactly to the full Tomas-Stein one, but is otherwise a proper subset when \(d>3\). We also present an application regarding the Lebesgue points of functions in \(\mathcal{F}(L^p)\) when \(p\) is sufficiently close to 1.

Keywords

Fourier restriction, maximal operators

Hrčak ID:

289610

URI

https://hrcak.srce.hr/289610

Publication date:

30.12.2022.

Visits: 360 *

Publication date: 30 December 2022

Volume: Vol 57

Issue: Svezak 2

Pages: 313-319

DOI: https://doi.org/10.3336/gm.57.2.10

Article Information (continued)

Categories:

Subject: Izvorni znanstveni članak

Keywords:

Keyword: Fourier restriction, maximal operators

A note on maximal Fourier restriction for spheres in all dimensions

Marco Vitturi[1]

Email: marco.vitturi@ucc.ie

 

[1] School of Mathematical Sciences, University College Cork, Western Gateway Building, Western Road, Cork, Ireland

Abstract

We prove a maximal Fourier restriction theorem for hypersurfaces in \(\mathbb{R}^{d}\) for any dimension \(d\geq 3\) in a restricted range of exponents given by the Tomas-Stein theorem (spheres being the most canonical example). The proof consists of a simple observation. When \(d=3\) the range corresponds exactly to the full Tomas-Stein one, but is otherwise a proper subset when \(d>3\). We also present an application regarding the Lebesgue points of functions in \(\mathcal{F}(L^p)\) when \(p\) is sufficiently close to 1.

This display is generated from NISO JATS XML with jats-html.xsl. The XSLT engine is libxslt.