On maximizers of convolution operators in $L_p$ spaces

Gleb Kalachev; Sergey Sadov

arXiv:1712.08836·math.CA·October 17, 2019

On maximizers of convolution operators in $L_p$ spaces

Gleb Kalachev, Sergey Sadov

PDF

TL;DR

This paper proves the existence of maximizers for convolution operators in $L_p$ spaces under certain conditions, discusses related open questions, and explores the computation of best constants in the Hausdorff-Young inequality for the Laplace transform.

Contribution

It establishes the existence of functions attaining the maximum convolution norm in $L_p$ spaces for a broad range of parameters, advancing understanding of convolution operator extremizers.

Findings

01

Existence of maximizers for convolution operators in specified $L_p$ spaces.

02

Discussion of open questions related to convolution extremizers.

03

Analysis of best constants in the Hausdorff-Young inequality for the Laplace transform.

Abstract

A convolution operator in $R^{d}$ with kernel in $L_{q}$ acts from $L_{p}$ to $L_{s}$ , where $1/ p + 1/ q = 1 + 1/ s$ . The main theorem states that if $1 < q, p, s < \infty$ , then there exists an $L_{p}$ function of unit norm on which the $s$ -norm of the convolution is attained. A number of questions, solved and open, related to the statement and proof of the main theorem, are discussed. The problem of computing best constants in the Hausdorff-Young inequality for the Laplace transform, which prompted this research, is considered.

Peer Reviews

No public reviews on file for this paper yet. If you reviewed it on a platform where reviews are public (OpenReview, ICLR, NeurIPS, ICML), you can paste yours below so the community can read it here.

Videos

No videos yet. Explain this paper in a talk, walkthrough, or lecture? Add one.