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http://dx.doi.org/10.4134/JKMS.2002.39.1.061

MAPPING PROPERTIES OF THE MARCINKIEWICZ INTEGRALS ON HOMOGENEOUS GROUPS  

Choi, Young-Woo (Department of Mathematics Ajou University)
Rim, Kyung-Soo (School of Mathematics Korea Institute for Advanced Study)
Publication Information
Journal of the Korean Mathematical Society / v.39, no.1, 2002 , pp. 61-75 More about this Journal
Abstract
Under the cancellation property and the Lipschitz condition on kernels, we prove that the Marcinkiewicz integrals defined on a homogeneous group H are bounded from $H^1$(H) to $L^1$(H), from $L_{c}$ $^{\infty}$(H) to BMO (H), and from $L^{p}$ (H) to $L^{p}$ (H) for 1 < p < $\infty$ assuming the $L^{q}$ -boundedness for some q > 1.for some q > 1.
Keywords
Marcinkiewicz integrals; homogeneous groups;
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