2013
DOI: 10.1016/j.laa.2012.10.004
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Components of topological uniform descent resolvent set and local spectral theory

Abstract: In this paper, we shall study the components of topological uniform descent resolvent set ρ ud (T) for a bounded linear operator T acting on a Banach space. We first show the constancy of certain subspace valued mappings on the components of ρ ud (T). Then using these results and, the equivalences of SVEP at a point λ for T and T * in the case that λI−T has topological uniform descent, we obtain a classification of these components. Finally, we give some applications of the classification. In particular, we gi… Show more

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Cited by 9 publications
(12 citation statements)
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References 15 publications
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“…As an application we get that a bounded linear operator T is meromorphic, that is its non-zero spectral points are poles of its resolvent, if and only if σ BΦ (T ) ⊂ {0} and this is exactly when σ T UD (T ) ⊂ {0}. This result was obtained earlier (see [9] and [18]). Q. Jiang, H. Zhong and S. Zhang in [18,Corollary 3.3] proved it by using the local constancy of the mappings λ → K(λI Theorem 2.6] and results about SVEP established in [17], but our method of proof is rather different and more direct.…”
Section: Introductionsupporting
confidence: 66%
“…As an application we get that a bounded linear operator T is meromorphic, that is its non-zero spectral points are poles of its resolvent, if and only if σ BΦ (T ) ⊂ {0} and this is exactly when σ T UD (T ) ⊂ {0}. This result was obtained earlier (see [9] and [18]). Q. Jiang, H. Zhong and S. Zhang in [18,Corollary 3.3] proved it by using the local constancy of the mappings λ → K(λI Theorem 2.6] and results about SVEP established in [17], but our method of proof is rather different and more direct.…”
Section: Introductionsupporting
confidence: 66%
“…Especially, operators which have topological uniform descent for n ≥ 0 are precisely the semi-regular operators studied by Mbekhta in [32]. Discussions of operators with eventual topological uniform descent may be found in [12,20,27,28,29,40].…”
Section: Resultsmentioning
confidence: 99%
“…In [29], Jiang, Zhong and Zhang obtained a classification of the components of eventual topological unif orm descent resolvent set ρ ud (T ) := C\σ ud (T ). As an application of the classification, they show that σ ud (T ) = ∅ precisely when T is algebraic.…”
Section: Resultsmentioning
confidence: 99%
“…(ii) ⇔ (iv) Every semi B-Fredholm operator has topological uniform ascent ( [20]), so, by [31,Corollary 2.8],…”
Section: Definementioning
confidence: 99%