关于满足条件T*|T1+n|2/1+nT≥T*|T*|2T的一类算子

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关于满足条件T^|T¹⁺ⁿ|^2/1+nT≥T^|T^*|²T的一类算子

On Operators Satisfying T^|T¹⁺ⁿ|^2/1+nT&ge|T^|T^*|²T

关于满足条件T^|T¹⁺ⁿ|^2/1+nT≥T^|T^*|²T的一类算子

On Operators Satisfying T^|T¹⁺ⁿ|^2/1+nT&ge|T^|T^*|²T

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数学物理学报 ›› 2011, Vol. 31 ›› Issue (5): 1311-1316.

申俊丽¹|左飞²|杨长森²

1. 新乡学院数学系河南新乡 453000;
2.河南师范大学数学与信息科学学院河南新乡 453007

收稿日期:2009-07-25 修回日期:2010-10-22 出版日期:2011-10-25 发布日期:2011-10-25
基金资助:
教育部科技司(208081)资助

SHEN Jun-Li¹, ZUO Fei², YANG Chang-Sen²

1.Department of Mathematics, Xinxiang University, Henan Xinxiang 453000;
2.College of Mathematics and Information Science, Henan Normal |University, Henan Xinxiang 453007

Received:2009-07-25 Revised:2010-10-22 Online:2011-10-25 Published:2011-10-25
Supported by:
教育部科技司(208081)资助

摘要：

设 $T\in B(H)$ 为复Hilbert空间 $H$ 上的一个有界线性算子, 作者引入一类新的算子类---拟- $*$ - $A(n)$ 类算子,并证明这类算子的一些性质,如:
若 $T$ 是拟- $*$ - $A(n)$ 类算子且 $\lambda\neq0$ , 则它的点谱与联合点谱相等.作为这个结果的应用,证明了若 $T$ 是一个拟- $*$ - $A(n)$ 算子且 $N(T)\subseteq N(T^{*})$ ,则Weyl谱和本质近似点谱的谱映射定理成立.

关键词: 拟-*-A(n)算子, 拟相似, 单值扩展性质, Weyl谱, 本质近似点谱

Abstract:

Let T ∈B(H) be a bounded linear operator on a complex Hilbert space H. In this paper the authors introduce a new class of operator--quasi-*-A(n) and prove some properties of these operators, such as, if T is quasi-*-A(n), then its point spectrum and joint point spectrum are identical. Using these results, the authors also prove that if T or T^* is quasi-*-A(n), then the spectral mapping theorem holds for the weyl spectrum and for the essential approximate point spectrum.

Key words: Quasi-*-A(n), Quasisimilarity, Single valued extension property, Weyl spectrum, Essential approximate point spectrum

中图分类号:

47B20

申俊丽, 左飞, 杨长森. 关于满足条件T^*|T¹⁺ⁿ|^2/1+nT≥T^*|T^*|²T的一类算子[J]. 数学物理学报, 2011, 31(5): 1311-1316.

SHEN Jun-Li, ZUO Fei, YANG Chang-Sen. On Operators Satisfying T^*|T¹⁺ⁿ|^2/1+nT&ge|T^*|T^*|²T[J]. Acta mathematica scientia,Series A, 2011, 31(5): 1311-1316.

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