On log-hyponormal operators

Normal Operators and their Generalizations, On commutator of generalized Aluthge transformations and Fuglede-Putnam theorem, Properties of \(p\)-\(\omega\)-hyponormal operators, The Berberian's transform and an asymmetric Putnam-Fuglede theorem, Spherical Aluthge transform, sphericalpandlog-hyponormality of commuting pairs of operators, A note on \(({\mathcal C}_p,\alpha )\)-hyponormal operators, On Fuglede-Putnam properties, Generalized numerical radius of a bounded linear operator, Comprehensive survey on an order preserving operator inequality, Some conditions implying normality of operators, On some normality-like properties and Bishop's property \((\beta)\) for a class of operators on Hilbert spaces, On \(n\)th roots of bounded and unbounded quasinormal operators, Spectrum of quasi-class \((A,k)\) operators, On Quasi-Class A Operators, Spectrum of class \(wF(p,r,q)\) operators, Spectra of completely log-hyponormal operators, On \(k\)-quasiclass \(A\) operators, Common properties of operators \(RS\) and \(SR\) and \(p\)-hyponormal operators, Totally P-posinormal operators are subscalar, Spectral pictures of Aluthge transforms of operators, Angular cutting for log-hyponormal operators, \(p\)-hyponormal operators satisfy Bishop's condition \({\beta}\), An expression of spectral radius via Aluthge transformation, Powers of an invertible \(\omega\)-hyponormal operator, Notes on *-finite operators class, Applications of polar decompositions of idempotent and 2-nilpotent operators, Isolated point of spectrum of \(p\)-quasihyponormal operators, New class of operators where the distance between the identity operator and the generalized Jordan \(\ast\)-derivation range is maximal, Inequalities of Putnam and Berger-Shaw for \(p\)-quasihyponormal operators, \(\omega\)-hyponormal operators. II, Aluthge transforms of operators, Unnamed Item, 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., On operators satisfying the generalized Cauchy-Schwarz inequality, Characterizations of \(\log A\geq\log B\) and normaloid operators via Heinz inequality

• Unnamed Item
• Spectral theory of hyponormal operators
• A trace estimate for p-hyponormal operators
• Further extensions of Aluthge transformation on \(p\)-hyponormal operators
• A characterization of chaotic order and a problem
• A trace estimate of \((T^*T)^ p-(TT^*)^ p\)
• Über monotone Matrixfunktionen
• A note on \(p\)-hyponormal operators for \(0<p<1\)
• Some generalized theorems on \(p\)-hyponormal operators
• On p-hyponormal operators for \(0<p<1\)
• Beiträge zur Störungstheorie der Spektralzerlegung
• On subclasses of hyponormal operators
• The p-Hyponormality of The Aluthge Transform.
• A note on $p$-hyponormal operators
• Characterization of chaotic order and its application to Furuta inequality
• Generalized Aluthge transformation on 𝑝-hyponormal operators
• Putnam's Inequality for p-Hyponormal Operators
• $A \geq B \geq 0$ Assures $(B^r A^p B^r)^{1/q} \geq B^{(p+2r)/q$ for $r \geq 0$, $p \geq 0$, $q \geq 1$ with $(1 + 2r)q \geq p + 2r$