抽象维纳空间中的BV容量和周长及其应用

Pub Date : 2023-11-29 DOI:10.1515/gmj-2023-2081
Guiyang Liu, He Wang, Yu Liu
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引用次数: 0

摘要

本文引入并研究了抽象Wiener空间X中的有界变容和周长,从而发现了一些相关的不等式。抽象维纳空间X中的有界变分函数已被许多学者研究。作为本研究的继续,我们定义了相应的BV容量上限H(⋅){\operatorname{cap}_{H}(\,\cdot\,)}(现称为抽象Wiener BV容量)并研究了其性质。我们还研究了有限γ周长集的一些性质,其中γ是高斯测度。随后,给出了与cap H(⋅){\operatorname{cap}_{H}(\,\cdot\,)}相关的等容不等式,并证明了它等价于高斯等容不等式。最后,我们证明了X上的每一个有限γ周长集合在L 1¹(X, γ) {L^{1}(X,\gamma)}中具有平均曲率。
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BV capacity and perimeter in abstract Wiener spaces and applications
This paper is devoted to introducing and investigating the bounded variation capacity and the perimeter in the abstract Wiener space X, thereby discovering some related inequalities. Functions of bounded variation in an abstract Wiener space X have been studied by many scholars. As the continuation of this research, we define the corresponding BV capacity cap H ( ) {\operatorname{cap}_{H}(\,\cdot\,)} (now called abstract Wiener BV capacity) and investigate its properties. We also investigate some properties of sets of finite γ-perimeter, with γ being a Gaussian measure. Subsequently, the isocapacitary inequality associated with cap H ( ) {\operatorname{cap}_{H}(\,\cdot\,)} is presented and we are able to show that it is equivalent to the Gaussian isoperimetric inequality. Finally, we prove that every set of finite γ-perimeter in X has mean curvature in L 1 ( X , γ ) {L^{1}(X,\gamma)} .
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