$L^p$-$L^q$ Boundedness of Spectral Multipliers of the Anharmonic   Oscillator

Marianna Chatzakou; Vishvesh Kumar

arXiv:2110.15294·math.AP·March 22, 2022

$L^p$-$L^q$ Boundedness of Spectral Multipliers of the Anharmonic Oscillator

Marianna Chatzakou, Vishvesh Kumar

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TL;DR

This paper investigates the boundedness of spectral multipliers for anharmonic oscillators in certain L^p-L^q spaces, extending classical Fourier analysis techniques to nonharmonic settings.

Contribution

It introduces an extension of H"ormander's Paley-type inequality to analyze spectral multipliers of anharmonic oscillators.

Findings

01

Established L^p-L^q boundedness for spectral multipliers

02

Extended Paley-type inequality to nonharmonic Fourier analysis

03

Provided a framework for analyzing differential operators with high-order derivatives

Abstract

In this note we study the $L^{p} - L^{q}$ boundedness of Fourier multipliers of anharmonic oscillators, and as a consequence also of spectral multipliers, for the range $1 < p \leq 2 \leq q < \infty$ . The underlying Fourier analysis is associated with the eigenfunctions of an anharmonic oscillator in some family of differential operators having derivatives of any order. Our analysis relies on a version of the classical Paley-type inequality, introduced by H\"ormander, that we extend in our nonharmonic setting.

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Taxonomy

TopicsAdvanced Harmonic Analysis Research