The Putnam-Fuglede property for paranormal and ∗-paranormal operators
An operator \(T \in {\cal B}(H)\) is said to have the Putnam-Fuglede commutativity property (PF property for short) if \(T^*X = XJ\) for any \(X \in {\cal B}(K,H)\) and any isometry \(J \in {\cal B}(K)\) such that \(TX = XJ^*\). The main purpose of this paper is to examine if paranormal operators ha...
Main Author: | Patryk Pagacz |
---|---|
Format: | Article |
Language: | English |
Published: |
AGH Univeristy of Science and Technology Press
2013-01-01
|
Series: | Opuscula Mathematica |
Subjects: | |
Online Access: | http://www.opuscula.agh.edu.pl/vol33/3/art/opuscula_math_3330.pdf |
Similar Items
-
Asymmetric Putnam-Fuglede Theorem for (n,k)-Quasi-∗-Paranormal Operators
by: Ahmed Bachir, et al.
Published: (2019-01-01) -
Paranormal tourism: study of economics and public policy
by: Haynes, Everett Drake
Published: (2016) -
Notes on *-finite operators class
by: Nuha H. Hamada
Published: (2017-01-01) -
Putnam-Fuglede type theorem for class $ \mathcal{A}_k $ operators
by: Ahmed Bachir, et al.
Published: (2021-02-01) -
Crenças no paranormal e estilos de pensamento racional versus experiencial Belief in the paranormal and rational versus experiential thinking styles
by: Tatiana Severino de Vasconcelos, et al.
Published: (2004-12-01)