Edyta Kania-Strojec
Published 2020-04-29Version 1
We study Hardy spaces associated with a general multidimensional Bessel operator $\mathbb{B}_\nu$. This operator depends on a multiparameter of type $\nu$ that is usually restricted to a product of half-lines. Here we deal with the Bessel operator in the general context, with no restrictions on the type parameter. We define the Hardy space $H^1$ for $\mathbb{B}_\nu$ in terms of the maximal operator of the semigroup of operators $\exp(-t\mathbb{B}_\nu)$. Then we prove that, in general, $H^1$ admits an atomic decomposition of local type.
Comments: 25 pages, 2 figures
Remark on atomic decompositions for Hardy space $H^1$ in the rational Dunkl setting
Riesz transform characterization of H^1 spaces associated with certain Laguerre expansions
Hardy spaces on homogeneous trees with flow measures
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