H\"ormander's multiplier theorem for the Dunkl transform

TL;DR

This paper extends Hörmander's multiplier theorem to the Dunkl transform setting, establishing boundedness of certain Fourier multiplier operators under smoothness conditions on the multiplier.

Contribution

It proves a Hörmander-type multiplier theorem for the Dunkl transform, including weak and strong type bounds and Hardy space boundedness, using properties of Dunkl translations and convolutions.

Findings

Multiplier operator is of weak type (1,1)

Bounded on L^p for 1<p<∞

Bounded on Hardy space H^1

Abstract

For a normalized root system $R$ in $\mathbb R^N$ and a multiplicity function $k\geq 0$ let $\mathbf N=N+\sum_{\alpha \in R} k(\alpha)$. Denote by $dw(\mathbf x)=\prod_{\alpha\in R}|\langle \mathbf x,\alpha\rangle|^{k(\alpha)}\, d\mathbf x $ the associated measure in $\mathbb R^N$. Let $\mathcal F$ stands for the Dunkl transform. Given a bounded function $m$ on $\mathbb R^N$, we prove that if there is $s>\mathbf N$ such that $m$ satisfies the classical H\"ormander condition with the smoothness $s$, then the multiplier operator $\mathcal T_mf=\mathcal F^{-1}(m\mathcal Ff)$ is of weak type $(1,1)$, strong type $(p,p)$ for $1<p<\infty$, and bounded on a relevant Hardy space $H^1$. To this end we study the Dunkl translations and the Dunkl convolution operators and prove that if $F$ is sufficiently regular, for example its certain Schwartz class seminorm is finite, then the Dunkl convolution operator with the function $F$ is bounded on $L^p(dw)$ for $1\leq p\leq \infty$. We also consider boundedness of maximal operators associated with the Dunkl convolutions with Schwartz class functions.