A reflexivity problem concerning the 𝐶*-algebra 𝐶(𝑋)⊗ℬ(ℋ)
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Publication:4517492
DOI10.1090/S0002-9939-00-05604-5zbMath0959.47022arXivmath/9909047OpenAlexW2764595091MaRDI QIDQ4517492
Publication date: 22 November 2000
Published in: Proceedings of the American Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math/9909047
Linear operators on Banach algebras (47B48) Automorphisms of selfadjoint operator algebras (46L40) Transformers, preservers (linear operators on spaces of linear operators) (47B49)
Related Items (2)
Order isomorphisms on effect algebras of the \(\mathrm{C}^\ast\)-algebras of type \(\mathscr{C}(\mathscr{X})\otimes\mathscr{B}(\mathscr{H})\) ⋮ Homomorphisms between algebras of Lipschitz functions with the values in function algebras
Cites Work
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- Order isomophisms and triple isomorphisms of operator ideals and their reflexivity
- Local derivations
- Reflexivity of the automorphism and isometry groups of \(C^*\)-algebras in BDF theory
- On topological reflexivity of the groups of \(^*\)-automorphisms and surjective isometries of \({\mathcal B}(H)\)
- Derivations and automorphisms of operator algebras
- A generalized Schwarz inequality and algebraic invariants for operator algebras
- The set of automorphisms of B(H) is topologically reflexive in B(B(H))
- Reflexivity, Algebraic Reflexivity and Linear Interpolation
- Reflexivity of the group of surjective isometries on some Banach spaces
- On local automorphisms of group algebras of compact groups
- Automorphisms of Certain Operator Algebras
- On Invariant Subspaces and Reflexive Algebras
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