Riesz Transform Characterizations of Musielak-Orlicz-Hardy Spaces

TL;DR

This paper establishes Riesz transform characterizations of Musielak-Orlicz-Hardy spaces, generalizing weighted and Orlicz-Hardy spaces, with results applicable to a broad class of weights and higher order transforms.

Contribution

It introduces new Riesz transform characterizations for Musielak-Orlicz-Hardy spaces, extending known results to more general weight classes and higher order transforms.

Findings

Characterization via first order Riesz transforms when errac{i(\u03c6)}{q(er)}>rac{n-1}{n}

Extension to higher order Riesz transforms with errac{i(er)}{q(er)}>rac{n-1}{n+m-1}

Broader weight range in Riesz characterization of weighted Hardy spaces, from A_1 to A_ with sharp critical index

Abstract

Let $\varphi$ be a Musielak-Orlicz function satisfying that, for any $(x,\,t)\in\mathbb{R}^n\times(0,\,\infty)$, $\varphi(\cdot,\,t)$ belongs to the Muckenhoupt weight class $A_\infty (\mathbb{R}^n)$ with the critical weight exponent $q(\varphi)\in[1,\,\infty)$ and $\varphi(x,\,\cdot)$ is an Orlicz function with $0<i(\varphi)\le I(\varphi)\le 1$ which are, respectively, its critical lower type and upper type. In this article, the authors establish the Riesz transform characterizations of the Musielak-Orlicz-Hardy spaces $H_\varphi (\mathbb{R}^n)$ which are generalizations of weighted Hardy spaces and Orlicz-Hardy spaces. Precisely, the authors characterize $H_\varphi (\mathbb{R}^n)$ via all the first order Riesz transforms when $\frac{i(\varphi)}{q(\varphi)}>\frac{n-1}{n}$, and via all the Riesz transforms with the order not more than $m\in\mathbb{N}$ when $\frac{i(\varphi)}{q(\varphi)}>\frac{n-1}{n+m-1}$. Moreover, the authors also establish the Riesz transform characterizations of $H_\varphi(\mathbb{R}^n)$, respectively, by means of the higher order Riesz transforms defined via the homogenous harmonic polynomials or the odd order Riesz transforms. Even if when $\varphi(x,t):=tw(x)$ for all $x\in{\mathbb R}^n$ and $t\in [0,\infty)$, these results also widen the range of weights in the known Riesz characterization of the classical weighted Hardy space $H^1_w({\mathbb R}^n)$ obtained by R. L. Wheeden from $w\in A_1({\mathbb R}^n)$ into $w\in A_\infty({\mathbb R}^n)$ with the sharp range $q(w)\in [1,\frac n{n-1})$, where $q(w)$ denotes the critical index of the weight $w$.