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http://dx.doi.org/10.4134/JKMS.2007.44.4.809

ENDPOINT ESTIMATES FOR MAXIMAL COMMUTATORS IN NON-HOMOGENEOUS SPACES  

Hu, Guoen (DEPARTMENT OF APPLIED MATHEMATICS UNIVERSITY OF INFORMATION ENGINEERING)
Meng, Yan (SCHOOL OF INFORMATION RENMIN UNIVERSITY OF CHINA)
Yang, Dachun (SCHOOL OF MATHEMATICAL SCIENCES BEIJING NORMAL UNIVERSITY)
Publication Information
Journal of the Korean Mathematical Society / v.44, no.4, 2007 , pp. 809-822 More about this Journal
Abstract
Certain weak type endpoint estimates are established for maximal commutators generated by $Calder\acute{o}n-Zygmund$ operators and $Osc_{exp}L^{\gamma}({\mu})$ functions for ${\gamma}{\ge}1$ under the condition that the underlying measure only satisfies some growth condition, where the kernels of $Calder\acute{o}n-Zygmund$ operators only satisfy the standard size condition and some $H\ddot{o}rmander$ type regularity condition, and $Osc_{exp}L^{\gamma}({\mu})$ are the spaces of Orlicz type satisfying that $Osc_{exp}L^{\gamma}({\mu})$ = RBMO(${\mu}$) if ${\gamma}$ = 1 and $Osc_{exp}L^{\gamma}({\mu}){\subset}RBMO({\mu})$ if ${\gamma}$ > 1.
Keywords
$Calder\acute{o}n$-Zygmund operator; $Osc_{exp}L^r({\mu})$; maximal commutator; endpoint estimate;
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