数学物理学报(英文版) ›› 2014, Vol. 34 ›› Issue (1): 194-198.doi: 10.1016/S0252-9602(13)60136-8

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A NOTE ON n-PERINORMAL OPERATORS

左红亮|左飞   

  1. College of Mathematics and Information Science, Henan Normal University, Xinxiang 453007, China
  • 收稿日期:2012-08-30 修回日期:2013-01-22 出版日期:2014-01-20 发布日期:2014-01-20
  • 基金资助:

    This work is partially supported by NNSF (11226185, 11201126) and the Basic Science and Technological Frontier Project of Henan Province (132300410261).

A NOTE ON n-PERINORMAL OPERATORS

 ZUO Hong-Liang, ZUO Fei   

  1. College of Mathematics and Information Science, Henan Normal University, Xinxiang 453007, China
  • Received:2012-08-30 Revised:2013-01-22 Online:2014-01-20 Published:2014-01-20
  • Supported by:

    This work is partially supported by NNSF (11226185, 11201126) and the Basic Science and Technological Frontier Project of Henan Province (132300410261).

摘要:

The study of operators satisfying σja(T) = σa(T) is of significant interest. Does σja(T) = σa(T) for n-perinormal operator T ∈B(H)? This question was raised by Mecheri and Braha [Oper. Matrices 6 (2012), 725–734]. In the note we construct a
counterexample to this question and obtain the following result: if T is a n-perinormal operator in B(H), then σja(T)\{0} = σa(T)\{0}. We also consider tensor product of n-perinormal operators.

关键词: n-perinormal operators, approximate point spectrum, joint approximate point spectrum, tensor product

Abstract:

The study of operators satisfying σja(T) = σa(T) is of significant interest. Does σja(T) = σa(T) for n-perinormal operator T ∈B(H)? This question was raised by Mecheri and Braha [Oper. Matrices 6 (2012), 725–734]. In the note we construct a
counterexample to this question and obtain the following result: if T is a n-perinormal operator in B(H), then σja(T)\{0} = σa(T)\{0}. We also consider tensor product of n-perinormal operators.

Key words: n-perinormal operators, approximate point spectrum, joint approximate point spectrum, tensor product

中图分类号: 

  • 47B20