The “maximal” tensor product of operator spaces
From MaRDI portal
Publication:4267527
DOI10.1017/S0013091500020241zbMath0940.46042arXivmath/9704208OpenAlexW2964261666MaRDI QIDQ4267527
Publication date: 4 October 1999
Published in: Proceedings of the Edinburgh Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math/9704208
Operator spaces and completely bounded maps (46L07) Operator spaces (= matricially normed spaces) (47L25) Tensor products of (C^*)-algebras (46L06) Tensor products in functional analysis (46M05)
Related Items (8)
Failure of the trilinear operator space Grothendieck theorem ⋮ Tensor products of operator systems ⋮ Quantum Query Algorithms are Completely Bounded Forms. ⋮ Grothendieck’s Theorem, past and present ⋮ Quantum Query Algorithms Are Completely Bounded Forms ⋮ Free transport for convex potentials ⋮ Joint similarity problems and the generation of operator algebras with bounded length ⋮ Bilinear ideals in operator spaces
Cites Work
- Unnamed Item
- A characterization of operator algebras
- Tensor products of non-self-adjoint operator algebras
- The standard dual of an operator space
- Representations of completely bounded multilinear operators
- Multilinear maps and tensor norms on operator systems
- Completely bounded multilinear maps and \(C^ *\)-algebraic cohomology
- Subspaces of \(C^ *\)-algebras
- Self-duality for the Haagerup tensor product and Hilbert space factorizations
- Tensor products of operator spaces
- On non-semisplit extensions, tensor products and exactness of group \(C^*\)-algebras
- Bounded linear operators between \(C^*\)-algebras
- The Grothendieck-Pietsch and Dvoretzky-Rogers theorems for operator spaces
- Operator spaces and residually finite-dimensional \(C^*\)-algebras
- Bilinear forms on exact operator spaces and \(B(H) \otimes B(H)\)
- A completely bounded characterization of operator algebras
- On the Abstract Characterization of Operator Spaces
- The Dual of the Haagerup Tensor Product
- A Survey of Completely Bounded Operators
- Injectivity of Operator Spaces
- Injective matricial Hilbert spaces
- Explicit Construction of Universal Operator Algebras and Applications to Polynomial Factorization
- A New Approach to Operator Spaces
- Tensor Products of Operator Spaces II
- VARIETIES OF BANACH ALGEBRAS
- Mapping Spaces and Liftings for Operator Spaces
- ON APPROXIMATION PROPERTIES FOR OPERATOR SPACES
- Theory of operator algebras I.
This page was built for publication: The “maximal” tensor product of operator spaces
