全纯延拓成定义在其骨架上的函数矩阵球

IF 0.6 Q3 MATHEMATICS

Vestnik Udmurtskogo Universiteta-Matematika Mekhanika Kompyuternye Nauki Pub Date : 2021-06-01 DOI:10.35634/vm210210

G. Khudayberganov, J. Abdullayev

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引用次数: 0

摘要

本文研究了在某一定义域的整个边界上定义的函数在该定义域上全纯延拓的可能性问题。定义在边界部分上的函数的描述问题可以全纯地扩展到一个固定的区域，这引起了人们越来越多的兴趣。在这篇文章中，我们重新表述了正在考虑的问题:在什么条件下我们可以全纯地将矩阵球的骨架部分上给出的函数扩展到矩阵球?描述了矩阵球的Bochner-Hua - logeng型积分可以全纯推广到的区域。作为主要结果，我们给出了函数的矩阵球的全纯延拓的判据，这些函数被定义在矩阵球骨架的一部分上。简要介绍了几个结果的证明。最近的一些进展得到了强调。本文所得结果推广了L.A. Aizenberg, A.M.Kytmanov和G. Khudayberganov。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Holomorphic continuation into a matrix ball of functions defined on a piece of its skeleton

The question of the possibility of holomorphic continuation into some domain of functions defined on the entire boundary of this domain has been well studied. The problem of describing functions defined on a part of the boundary that can be extended holomorphically into a fixed domain is attracting more interest. In this article, we reformulate the problem under consideration: Under what conditions can we extend holomorphically to a matrix ball the functions given on a part of its skeleton? We describe the domains into which the integral of the Bochner—Hua Luogeng type for a matrix ball can be extended holomorphically. As the main result, we present the criterion of holomorphic continuation into a matrix ball of functions defined on a part of the skeleton of this matrix ball. The proofs of several results are briefly presented. Some recent advances are highlighted. The results obtained in this article generalize the results of L.A. Aizenberg, A.M. Kytmanov and G. Khudayberganov.

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来源期刊

Vestnik Udmurtskogo Universiteta-Matematika Mekhanika Kompyuternye Nauki MATHEMATICS-

CiteScore

1.20

自引率

40.00%

发文量