Generalized Morrey Spaces - Revisited
Abstract
The generalized Morrey space M-p,M-phi(R-n) was defined by Mizuhara 1991 and Nakai in 1994. It is equipped with a parameter 0 < p < infinity and a function phi : R-n x (0, infinity) -> (0, infinity). Our experience shows that M-p,M-phi(R-n) is easy to handle when 1 < p < infinity. However, when 0 < p <= 1, the function space M-p,M-phi(R-n) is difficult to handle as many examples show. We propose a way to deal with M-p,M-phi(R-n) for 0 < p <= 1, in particular, to obtain some estimates of the Hardy-Littlewood maximal operator on these spaces. Especially, the vector-valued estimates obtained in the earlier papers are refined. The key tool is the weighted dual Hardy operator. Much is known on the weighted dual Hardy operator.
Source
ZEITSCHRIFT FUR ANALYSIS UND IHRE ANWENDUNGENVolume
36Issue
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