New class of operators where the distance between the identity operator and the generalized Jordan ∗-derivation range is maximal

New class of operators where the distance between the identity operator and the generalized Jordan ∗-derivation range is maximal

A new class of operators, larger than ∗\ast -finite operators, named generalized ∗\ast -finite operators and noted by Gℱ∗(ℋ){{\mathcal{G {\mathcal F} }}}^{\ast }\left({\mathcal{ {\mathcal H} }}) is introduced, where: Gℱ∗(ℋ)={(A,B)∈ℬ(ℋ)×ℬ(ℋ):∥TA−BT∗−λI∥≥∣λ∣,∀λ∈C,∀T∈ℬ(ℋ)}.{{\mathcal{G {\mathcal F} }}}...

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Bibliographic Details
Main Authors: Messaoudene Hadia, Mesbah Nadia
Format: article
Language:EN
Published: De Gruyter 2021
Subjects:
∗-finite operator
numerical range
generalized jordan ∗-derivation
finite operator
paranormal operator
47b47
47a12
Mathematics
QA1-939
Online Access:https://doaj.org/article/20f9be0886aa4fbcbf6da4add912de44
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https://doaj.org/article/20f9be0886aa4fbcbf6da4add912de44

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