紧凑算子的舒尔检验

IF 1.2 4区 数学 Q1 MATHEMATICS Acta Mathematica Scientia Pub Date : 2024-08-27 DOI:10.1007/s10473-024-0524-1
Qijian Kang, Maofa Wang
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引用次数: 0

摘要

无穷矩阵理论是函数分析的一个重要分支。就空间的正交基而言,复可分离无限维希尔伯特空间上的每个线性算子都对应于一个无限矩阵,但并非每个无限矩阵都对应于一个算子。经典的舒尔检验为线性算子的有界性提供了一个优雅而有用的标准,被认为是一项令人尊敬的数学成就。在本文中,我们证明了舒尔检验的紧凑版本。此外,我们还提供了 Schatten 类 S2 的舒尔检验。值得注意的是,我们的主要结果可以适用于一般矩阵,而不受非负数的限制。最后,我们提供了从 lp 到 lq 的紧凑算子的舒尔检验。
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The Schur test of compact operators

Infinite matrix theory is an important branch of function analysis. Every linear operator on a complex separable infinite dimensional Hilbert space corresponds to an infinite matrix with respect a orthonormal base of the space, but not every infinite matrix corresponds to an operator. The classical Schur test provides an elegant and useful criterion for the boundedness of linear operators, which is considered a respectable mathematical accomplishment. In this paper, we prove the compact version of the Schur test. Moreover, we provide the Schur test for the Schatten class S2. It is worth noting that our main results can be applicable to the general matrix without limitation on non-negative numbers. We finally provide the Schur test for compact operators from lp into lq.

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来源期刊
CiteScore
2.00
自引率
10.00%
发文量
2614
审稿时长
6 months
期刊介绍: Acta Mathematica Scientia was founded by Prof. Li Guoping (Lee Kwok Ping) in April 1981. The aim of Acta Mathematica Scientia is to present to the specialized readers important new achievements in the areas of mathematical sciences. The journal considers for publication of original research papers in all areas related to the frontier branches of mathematics with other science and technology.
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