New Hardy spaces of Musielak-Orlicz type and boundedness of sublinear operators (1103.3757v3)
Abstract: We introduce a new class of Hardy spaces $H{\varphi(\cdot,\cdot)}(\mathbb Rn)$, called Hardy spaces of Musielak-Orlicz type, which generalize the Hardy-Orlicz spaces of Janson and the weighted Hardy spaces of Garc\'ia-Cuerva, Str\"omberg, and Torchinsky. Here, $\varphi: \mathbb Rn\times [0,\infty)\to [0,\infty)$ is a function such that $\varphi(x,\cdot)$ is an Orlicz function and $\varphi(\cdot,t)$ is a Muckenhoupt $A_\infty$ weight. A function $f$ belongs to $H{\varphi(\cdot,\cdot)}(\mathbb Rn)$ if and only if its maximal function $f*$ is so that $x\mapsto \varphi(x,|f*(x)|)$ is integrable. Such a space arises naturally for instance in the description of the product of functions in $H1(\mathbb Rn)$ and $BMO(\mathbb Rn)$ respectively (see \cite{BGK}). We characterize these spaces via the grand maximal function and establish their atomic decomposition. We characterize also their dual spaces. The class of pointwise multipliers for $BMO(\mathbb Rn)$ characterized by Nakai and Yabuta can be seen as the dual of $L1(\mathbb Rn)+ H{\rm log}(\mathbb Rn)$ where $ H{\rm log}(\mathbb Rn)$ is the Hardy space of Musielak-Orlicz type related to the Musielak-Orlicz function $\theta(x,t)=\displaystyle\frac{t}{\log(e+|x|)+ \log(e+t)}$. Furthermore, under additional assumption on $\varphi(\cdot,\cdot)$ we prove that if $T$ is a sublinear operator and maps all atoms into uniformly bounded elements of a quasi-Banach space $\mathcal B$, then $T$ uniquely extends to a bounded sublinear operator from $H{\varphi(\cdot,\cdot)}(\mathbb Rn)$ to $\mathcal B$. These results are new even for the classical Hardy-Orlicz spaces on $\mathbb Rn$.