Weyl’s theorem and Putnam’s inequality for class p-wA(s, t) operators
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Publication:4615276
DOI10.14232/actasm-017-020-yzbMath1424.47051OpenAlexW2903798948MaRDI QIDQ4615276
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Publication date: 1 February 2019
Published in: Acta Scientiarum Mathematicarum (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.14232/actasm-017-020-y
Related Items (2)
Fuglede-Putnam theorem and quasisimilarity of class p-wA(s,t) operators ⋮ Class p-wA(s,t) composition operators
Cites Work
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- Powers of class \(wA(s,t)\) operators associated with generalized Aluthge transformation.
- A duality theorem for an arbitrary operator
- An operator transform from class A to the class of hyponormal operators and its application
- Powers of an invertible \((s,p)\)-\(w\)-hyponormal operator
- The single valued extension property on a Banach space
- Putnam's theorems for \(w\)-hyponormal operators
- Aluthge transforms of operators
- Analysis of non-normal operators via Aluthge transformation
- Classes of operators determined by the Heinz-Kato-Furuta inequality and the Hölder-McCarthy inequality
- Relations between two inequalities \((B^{\frac r2} A^p B^{\frac r2})^{\frac r{p+r}}\geq B^r\) and \(A^p\geq(A^{\frac p2} B^r A^{\frac p2})^{\frac p{p+r}}\) and their applications
- Isolated point of spectrum of \(p\)-hyponormal, log-hyponormal operators.
- Spectrum of class \(wF(p,r,q)\) operators
- Weyl's theorem for nonnormal operators
- Spectral mapping theorems for essential spectra
- Quasi-similar \(p\)-hyponormal operators
- On p-hyponormal operators for \(0<p<1\)
- Spectrum of class p-wA(s, t) operators
- Putnam's Inequality for p-Hyponormal Operators
- A spectral mapping theorem for the Weyl spectrum
- Spectra of Polar Factors of Hyponormal Operators
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