Some remarks on weak compactness in the dual space of a JB*-triple
From MaRDI portal
Publication:854465
DOI10.2748/tmj/1156256398zbMath1126.46046OpenAlexW2009685591MaRDI QIDQ854465
Publication date: 4 December 2006
Published in: Tôhoku Mathematical Journal. Second Series (Search for Journal in Brave)
Full work available at URL: https://semanticscholar.org/paper/f58d8773d96ba4e8800a4b4d78ac4176d00fd65a
General theory of (C^*)-algebras (46L05) Jordan structures on Banach spaces and algebras (17C65) Nonassociative selfadjoint operator algebras (46L70)
Related Items (3)
A Kadec-Pelczyński dichotomy-type theorem for preduals of JBW\(^\ast\)-algebras ⋮ Measures of weak non-compactness in preduals of von Neumann algebras and \(JBW^\ast\)-triples ⋮ The Kadec–Pełczyński–Rosenthal subsequence splitting lemma for JBW*-triple preduals
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Cônes autopolaires et algèbres de Jordan
- On the conjugate space of operator algebra
- A Riemann mapping theorem for bounded symmetric domains in complex Banach spaces
- On weakly compact operators on \(C^*\)-algebras
- Weakly compact operators on Jordan triples
- Jordan \(C^*\)-algebras
- A bounded sequence of normal functionals has a subsequence which is nearly weakly convergent
- On the preduals of \(W^ *\)-algebras
- Weak compactness in the dual space of a \(C^*\)-algebra
- Norm Preserving Extensions in JBW-Triple Preduals
- Grothendieck's Inequalities for Real and Complex JBW*-Triples
- An Alternative Dunford-Pettis Property for JB-Triples
- Structure of the predual of a JBW*-triple.
- BOUNDED DERIVATIONS OF JB* - TRIPLES
- Weak*-continuity of Jordan triple products and its applications.
- Grothendieck's Inequality for JB ∗ -Triples and Applications
- Characterization of the predual and ideal structure of a JBW*-triple.
- The Dunford-Pettis property in Jb*-Triples
- The Dual Space of an Operator Algebra
This page was built for publication: Some remarks on weak compactness in the dual space of a JB*-triple
