About Subspace-Frequently Hypercyclic Operators

Q4 Mathematics

Communications in Mathematical Analysis Pub Date : 2020-07-01 DOI:10.22130/SCMA.2020.117046.707

M. Moosapoor, M. Shahriari

引用次数: 0

Abstract

In this paper, we introduce subspace-frequently hypercyclic operators. We show that these operators are subspace-hypercyclic and there are subspace-hypercyclic operators that are not subspace-frequently hypercyclic. There is a criterion like to subspace-hypercyclicity criterion that implies subspace-frequent hypercyclicity and if an operator $T$ satisfies this criterion, then $Toplus T$ is subspace-frequently hypercyclic. Additionally, operators on finite spaces can not be subspace-frequently hypercyclic.

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关于子空间频繁超循环算子

本文引入了子空间频繁超循环算子。我们证明了这些算子是子空间超循环的，并且有一些子空间超环算子不是子空间频繁超循环的。有一个类似于子空间超循环性准则的准则隐含子空间频繁超循环性，如果算子$T$满足这个准则，那么$Toplus T$就是子空间频繁高循环性。此外，有限空间上的算子不可能是子空间频繁超循环的。

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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来源期刊

Communications in Mathematical Analysis Mathematics-Applied Mathematics

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