Title of article
The normed finiteness property of compact contraction operators Original Research Article
Author/Authors
Yuan-Chuan Li، نويسنده , , Mau-Hsiang Shih، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2008
Pages
5
From page
2319
To page
2323
Abstract
We study the joint spectral radius given by a finite set of compact operators on a Hilbert space. It is shown that the normed finiteness property holds in this case, that is, if all the compact operators are contractions and the joint spectral radius is equal to 1 then there exists a finite product that has a spectral radius equal to 1. We prove an additional statement in that the requirement that the joint spectral radius be equal to 1 can be relaxed to the asking that the maximum norm of finite products of a length norm is equal to 1. The length of this product is related to the dimension of the subspace on which the set of operators is norm preserving.
Keywords
Normed finiteness property , Hilbert space , Joint spectral radius , Compact operator , Contraction
Journal title
Linear Algebra and its Applications
Serial Year
2008
Journal title
Linear Algebra and its Applications
Record number
825924
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