H\"ormander's multiplier theorem on $H^p$-spaces in the rational Dunkl setting

TL;DR

This paper extends Hörmander's multiplier theorem to Hardy spaces associated with Dunkl operators on $R^N$, establishing boundedness of certain Fourier multipliers under smoothness conditions.

Contribution

It introduces a Hörmander-type multiplier theorem for $H^p$-spaces in the Dunkl setting, utilizing atomic and molecular characterizations for the proof.

Findings

Boundedness of Dunkl multiplier operators on $H^p$ spaces for $0<p extless=1.

Extension of classical harmonic analysis results to the Dunkl setting.

Verification of Hörmander's condition ensures operator boundedness.

Abstract

On $\mathbb{R}^N$ equipped with a normalized root system $\mathcal R$ and a multiplicity function $k\geq 0$, let $dw(\mathbf x)=\Pi_{\alpha\in \mathcal R}|\langle \mathbf x,\alpha\rangle|^{k(\alpha)}\, d\mathbf x$, $\mathbf{N}=N+\sum_{\alpha\in \mathcal R}k(\alpha)$ denote the associated measure and the homogeneous dimension of the system $(\mathcal R,k)$ respectively. Let $\mathcal F$ stand for the Dunkl transform. For $0<p\leq 1$, let $m$ be a bounded function on $\mathbb{R}^N$, which satisfies the classical H\"ormander's condition with smoothness $s>\mathbf{N}/p$. We show that the multiplier operator $\mathcal T_mf=\mathcal F^{-1}(m\mathcal Ff)$, initially defined on $H^p_{\mathrm{Dunkl}}\cap L^2(dw)$, has a unique extension to a bounded operator in $H^p_{\mathrm{Dunkl}}$, where the space $H^p_{\mathrm{Dunkl}}$ is defined by means of a Littlewood-Paley square function. To prove the theorem, we use special atomic and molecule characterizations of $H^p_{\mathrm{Dunkl}}$.