测量的规律性与平滑性

arXiv: Functional Analysis Pub Date : 2019-12-16 DOI:10.2140/pjm.2021.311.257

J. Fraser, Sascha Troscheit

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引用次数: 1

摘要

上下维谱和维谱通过考虑同心球的相对测度来量化测度的规律性。另一方面，我们可以通过考虑其密度的L^p$范数来量化一个绝对连续测度的平滑性。我们在这两个概念之间建立了明确的关系。粗略地说，我们表明光滑的措施必须是规则的，而规则的措施不一定是光滑的。

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Regularity versus smoothness of measures

The Assouad and lower dimensions and dimension spectra quantify the regularity of a measure by considering the relative measure of concentric balls. On the other hand, one can quantify the smoothness of an absolutely continuous measure by considering the $L^p$ norms of its density. We establish sharp relationships between these two notions. Roughly speaking, we show that smooth measures must be regular, but that regular measures need not be smooth.

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arXiv: Functional Analysis

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