choquet 积分、hausdorff 内容和分式算子

Pub Date : 2024-03-19 DOI:10.1017/s000497272400011x

NAOYA HATANO, RYOTA KAWASUMI, HIROKI SAITO, HITOSHI TANAKA

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引用次数: 0

摘要

我们证明了分数积分算子 $I_{\alpha }$ , $0<\alpha <n$ 和分数最大算子 $M_{\alpha }$ , $0\le \alpha <n$ 在弱 Choquet 空间上关于 Hausdorff 内容是有界的。我们还在 Choquet-Morrey 空间上研究了这些算子。小数最大算子 $M_\alpha $ 的结果是唐['Choquet 积分、加权 Hausdorff 内容和最大算子'，Georgian Math.J.18（3）（2011），587-596] 以及亚当斯和奥罗比特及韦尔德拉的早期工作。分数积分算子 $I_{\alpha }$ 的结果本质上是新的。

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CHOQUET INTEGRALS, HAUSDORFF CONTENT AND FRACTIONAL OPERATORS

We show that the fractional integral operator

$I_{\alpha }$

,

$0<\alpha <n$

, and the fractional maximal operator

$M_{\alpha }$

,

$0\le \alpha <n$

, are bounded on weak Choquet spaces with respect to Hausdorff content. We also investigate these operators on Choquet–Morrey spaces. The results for the fractional maximal operator

$M_\alpha $

are extensions of the work of Tang [‘Choquet integrals, weighted Hausdorff content and maximal operators’, Georgian Math. J.18(3) (2011), 587–596] and earlier work of Adams and Orobitg and Verdera. The results for the fractional integral operator

$I_{\alpha }$

are essentially new.

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