Let be a Banach space and be a bounded linear operator on . We denote by the set of all complex such that does not have the single-valued extension property at . In this note we prove equality up to between the left Drazin spectrum, the upper semi-B-Fredholm spectrum and the semi-essential approximate point spectrum. As applications, we investigate generalized Weyl’s theorem for operator matrices and multiplier operators.
Let be a Banach space operator. In this paper we characterize -Browder’s theorem for by the localized single valued extension property. Also, we characterize -Weyl’s theorem under the condition where is the set of all eigenvalues of which are isolated in the approximate point spectrum and is the set of all left poles of Some applications are also given.
2000 Mathematics Subject Classification: 47B47, 47B10, 47A30.
In this note, we characterize quasi-normality of two-sided multiplication, restricted to a norm ideal and we extend this result, to an important class which contains all quasi-normal operators. Also we give some applications of this result.
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