Evaluation points for cyclic operators with Bishop's property (\(\beta\))
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Publication:1425151
DOI10.1016/S0022-1236(03)00127-7zbMath1053.47004OpenAlexW2044956623MaRDI QIDQ1425151
Mostafa Mbekhta, Hassan Zerouali
Publication date: 15 March 2004
Published in: Journal of Functional Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/s0022-1236(03)00127-7
Spectrum, resolvent (47A10) Cyclic vectors, hypercyclic and chaotic operators (47A16) Local spectral properties of linear operators (47A11)
Related Items (3)
The interior of bounded point evaluations for rationally cyclic operators ⋮ Subscalarity for extension of totally polynomially posinormal operators ⋮ Spectra of operators with Bishop's property $(\beta)$
Cites Work
- Perturbation theory for nullity, deficiency and other quantities of linear operators
- On holomorphic families of subspaces of a Banach space
- Quasisimilarity of hyponormal and subdecomposable operators
- On multicyclic operators
- \(H^2(\mu)\) spaces and bounded point evaluations
- Operators which do not have the single valued extension property
- Quasi-similarity of tuples with Bishop's property \((\beta{})\)
- On the generalized resolvent in Banach spaces
- Bounded point evaluations for cyclic operators and local spectra
- Generalisation de la decomposition de kato aux opérateurs paranormaux et spectraux
- Local Spectrum and Generalized Spectrum
- Resolvant Generalise Et Separation Des Points Singuliers Quasi-Fredholm
- Equality of Spectra of Quasi-Similar Hyponormal Operators
- Asymptotic intertwining and spectral inclusions on Banach spaces
- Analytical Functional Models and Local Spectral Theory
- \(p\)-hyponormal operators satisfy Bishop's condition \({\beta}\)
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