几类次调和函数的奇异集结构

Pub Date : 2021-12-01 DOI:10.35634/vm210401

B. Abdullaev, S. Imomkulov, R.A. Sharipov

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引用次数: 0

摘要

本文综述了最近关于$m$-次调和($m-sh$)和强$m$-次调和($sh_m$)类以及$\ α $-次调和函数的可移动奇异集的研究结果，并将其应用于研究$sh_{m}$函数的奇异集。特别地，对于类$L_{loc}^{p}$中的强$m$-次调和函数，证明了当一个集$C_{q,s}$-容量为零时，它是一个可移动的奇异集。这个命题的证明是基于这样一个事实:在集合$D\反斜杠E$上支持的基本函数的空间在集合$D$上定义的测试函数的空间在$L_{q}^{s}$-范数上是稠密的。L. Carleson、E. Dolzhenko、M. Blanchet、S. Gardiner、J. Riihentaus、V. Shapiro、A. Sadullaev和Zh的著作也研究了经典(次)谐波函数的类似结果。Yarmetov, B. Abdullaev和S. Imomkulov。

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Structure of singular sets of some classes of subharmonic functions

In this paper, we survey the recent results on removable singular sets for the classes of $m$-subharmonic ($m-sh$) and strongly $m$-subharmonic ($sh_m$), as well as $\alpha$-subharmonic functions, which are applied to study the singular sets of $sh_{m}$ functions. In particular, for strongly $m$-subharmonic functions from the class $L_{loc}^{p}$, it is proved that a set is a removable singular set if it has zero $C_{q,s}$-capacity. The proof of this statement is based on the fact that the space of basic functions, supported on the set $D\backslash E$, is dense in the space of test functions defined in the set $D$ on the $L_{q}^{s}$-norm. Similar results in the case of classical (sub)harmonic functions were studied in the works by L. Carleson, E. Dolzhenko, M. Blanchet, S. Gardiner, J. Riihentaus, V. Shapiro, A. Sadullaev and Zh. Yarmetov, B. Abdullaev and S. Imomkulov.

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