韦尔定理和超循环性

Ying Liu, Xiaohong Cao
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引用次数: 0

摘要

让 H 是一个复杂的无限维希尔伯特空间,B(H) 是作用于 H 的所有有界线性算子的代数,((overline{HC(H)})是 B(H) 中所有超循环算子(超循环算子)的规范闭包。\是 B(H) 中所有超循环算子(超循环算子)类的规范闭包。如果 T 在 \(\overline{HC(H)}\) 中,那么就可以说算子 \(T\in B(H)\) 具有超周期性(supercyclicity)。\(\overline{SC(H)})中。利用从 "一致可逆性 "定义的新谱,本文给出了 T 符合 a-Browder 定理或 a-Weyl 定理的必要条件和充分条件。此外,本文还给出了 T 同时符合 a-isoloid 定理、a-Weyl's 定理和超周期性(超周期性)的必要条件和充分条件。此外,本文还通过新谱讨论了 T 具有超周期性(超循环性)与 T 同时具有 a-Weyl 定理和孤立体之间的关系。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
a-Weyl’s theorem and hypercyclicity

Let H be a complex infinite dimensional Hilbert space, B(H) be the algebra of all bounded linear operators acting on H, and \(\overline{HC(H)}\) \((\overline{SC(H)})\) be the norm closure of the class of all hypercyclic operators (supercyclic operators) in B(H). An operator \(T\in B(H)\) is said to be with hypercyclicity (supercyclicity) if T is in \(\overline{HC(H)}\) \((\overline{SC(H)})\). Using a new spectrum defined from “consistent in invertibility”, this paper gives necessary and sufficient conditions that T is with a-Browder’s theorem or with a-Weyl’s theorem. Further, this paper gives a necessary and sufficient condition that T is a-isoloid, with a-Weyl’s theorem and with hypercyclicity (supercyclicity) concurrently. Also, the relations between that T is with hypercyclicity (supercyclicity) and that T is both with a-Weyl’s theorem and a-isoloid are discussed by means of the new spectrum.

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