Muckenhoupt双权的一个新实变特征

A New Real-variable Characterization of Muckenhoupt Two-weight

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摘要通过Hardy-Littlewood极大函数从加权Lebesgue空间到加权弱Morrey空间的有界性,刻画Muckenhoupt双权的实变特征.首先给出加权弱Morrey空间的定义,再考虑Muckenhoupt双权与加权弱Morrey空间之间的关系,最后证明Muckenhoupt双权的一些相关性质. In this note we characterize the Muckenhoupt two-weight via the boundedness of Hardy-Littlewood maximal function from weighted Lebesgue space to weighted weak Morrey space.We first define weighted weak Morrey space,then we consider the relationship between Muckenhoupt two-weight and weighted weak Morrey space,finally we prove some related properties of Muckenhoupt two-weight.

作者吴尹慧子马柏林叶燕玲朱豪杰 WU Yinhuizi;MA Bolin;YE YanLing;ZHU HaoJie(School of Mathematics and Computer Science,Zhejiang Normal University,Jinhua 321004,China;College of Data Science,Jiaxing University,Jiaxing 314001,China)

机构地区浙江师范大学数学与计算机科学学院嘉兴学院数据科学学院

出处《湖州师范学院学报》 2023年第4期9-13,共5页 Journal of Huzhou University

基金国家自然科学基金项目(11871452) 嘉兴学院SRT项目(8517221099,8517211391)。

关键词 Muckenhoupt权 MORREY空间 HARDY-LITTLEWOOD极大函数 Muckenhoupt weight Morrey space Hardy-Littlewood maximal function

分类号 O178 [理学—基础数学]

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参考文献4

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湖州师范学院学报

2023年第4期

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Muckenhoupt双权的一个新实变特征

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