用与小波相关的二元立方体描述阿赫福斯规则空间的几何特征，并将其应用于等价利普齐兹空间

IF 0.8 4区数学 Q2 MATHEMATICS Expositiones Mathematicae Pub Date : 2024-05-13 DOI:10.1016/j.exmath.2024.125574

Fan Wang , Dachun Yang , Wen Yuan

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引用次数: 0

摘要

假设 (X,d,μ) 是由 R. R. Coifman 和 G. Weiss 引入的均质型空间。在本文中，作者通过海托宁（T. Hytönen ）和凯尔玛（A. Kairema）构建的二元立方体建立了阿赫弗斯正则空间的几何特征。作为应用，作者证明了当且仅当 X 是一个 Ahlfors 正则空间时，通过所考虑的准度量定义的 Lipschitz 空间和通过所考虑的度量定义的 Lipschitz 空间以等效规范重合。此外，作者还证明，如果且仅如果 X 是一个 Ahlfors 正则空间，通过所考虑的准度量定义的 Lipschitz 空间和通过球定义的 Campanato 空间与等效规范重合。

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Geometric characterization of Ahlfors regular spaces in terms of dyadic cubes related to wavelets with its applications to equivalences of Lipschitz spaces

Assume that $(X, d, μ)$ is a space of homogeneous type introduced by R. R. Coifman and G. Weiss. In this article, the authors establish a geometric characterization of Ahlfors regular spaces via the dyadic cubes constructed by T. Hytönen and A. Kairema. As applications, the authors show that Lipschitz spaces defined via the quasi-metric under consideration and Lipschitz spaces defined via the measure under consideration coincide with equivalent norms if and only if $X$ is an Ahlfors regular space. Moreover, the authors also prove that Lipschitz spaces defined via the quasi-metric under consideration and Campanato spaces defined via balls coincide with equivalent norms if and only if $X$ is an Ahlfors regular space.

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来源期刊

Expositiones Mathematicae 数学-数学

CiteScore

1.30

自引率

0.00%

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审稿时长

40 days

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