| (ω1)性质与单值扩张性质 |
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| 引用本文: | 戴磊,黄小静,郭奇.(ω1)性质与单值扩张性质[J].山东大学学报(理学版),2019,54(8):55-61. |
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| 作者姓名: | 戴磊 黄小静 郭奇 |
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| 作者单位: | 1. 渭南师范学院数理学院, 陕西 渭南 714099;2. 陕西师范大学数学与信息科学学院, 陕西 西安 710119 |
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| 基金项目: | 国家自然科学基金资助项目(11501419);渭南师范学院特色学科建设项目(18TSXK03) |
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| 摘 要: | 称有界线性算子 T满足(ω1)性质, 如果T的上半Weyl谱在它的逼近点谱中的补集包含在它的谱集中孤立的有限重的特征值的全体中。根据单值扩张性质定义了一种新的谱集, 利用该谱集给出了Hilbert 空间中有界线性算子满足(ω1)性质的充分必要条件。作为应用, 给出了亚(或超)循环算子类满足(ω1)性质的等价刻画。
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| 关 键 词: | (ω1)性质 单值扩张性质 亚循环算子 超循环算子 谱 |
Property(ω1)and the single-valued extension property |
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| DAI Lei,HUANG Xiao-jing,GUO Qi.Property(ω1)and the single-valued extension property[J].Journal of Shandong University,2019,54(8):55-61. |
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| Authors: | DAI Lei HUANG Xiao-jing GUO Qi |
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| Institution: | 1. School of Mathematics and Physics, Weinan Normal University, Weinan 714099, Shaanxi, China;2. School of Mathematics and Information Science, Shaanxi Normal University, Xian 710119, Shaanxi, China |
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| Abstract: | A bounded linear operator T satisfies property(ω1), if the complement in the approximate point spectrum σa(T)of the upper semi-Weyl spectrum σea(T)is contained in the set of all isolated points of the spectrum σ(T)which are finite eigenvalues. In this paper, by means of the new spectrum defined in view of the single-valued extension property, the sufficient and necessary conditions for a bounded linear operator defined on a Hilbert space satisfying the property(ω1)are established. As an application, the property(ω1)for hypercyclic(or supercyclic)operators are characterised. |
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| Keywords: | property(ω1) single-valued extension property hypercyclic operator supercyclic operator spectrum |
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