Haagerup approximation property for arbitrary von Neumann algebras
From MaRDI portal
Publication:496428
DOI10.4171/PRIMS/165zbMath1335.46052arXiv1312.1033MaRDI QIDQ496428
Publication date: 21 September 2015
Published in: Publications of the Research Institute for Mathematical Sciences, Kyoto University (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1312.1033
Related Items (15)
RIESZ TRANSFORMS ON COMPACT QUANTUM GROUPS AND STRONG SOLIDITY ⋮ Complete metric approximation property for \(q\)-Araki-Woods algebras ⋮ Relative Haagerup property for arbitrary von Neumann algebras ⋮ On invariant subalgebras of group and von Neumann algebras ⋮ $q$-Araki-Woods algebras: Extension of second quantisation and Haagerup approximation property ⋮ Haagerup property of semigroup crossed products ⋮ Splitting in orbit equivalence, treeable groups, and the Haagerup property ⋮ Generalisations of the Haagerup approximation property to arbitrary von Neumann algebras ⋮ Gradient forms and strong solidity of free quantum groups ⋮ Graph products of operator algebras ⋮ The Haagerup approximation property for von Neumann algebras via quantum Markov semigroups and Dirichlet forms ⋮ Structure of extensions of free Araki-Woods factors ⋮ Maximal subgroups and von Neumann subalgebras with the Haagerup property ⋮ The Haagerup approximation property for arbitrary C*-algebras ⋮ BMO spaces of $\sigma $-finite von Neumann algebras and Fourier–Schur multipliers on ${\rm SU}_q(2)$
Cites Work
- Unnamed Item
- Unnamed Item
- Ultraproducts, QWEP von Neumann algebras, and the Effros-Maréchal topology
- Group factors of the Haagerup type
- Approximation properties and absence of Cartan subalgebra for free Araki-Woods factors
- CCAP for universal discrete quantum groups
- Semidiscrete Hilbert spaces
- Operator valued weights in von Neumann algebras. II
- Kernel representation of completely positive Hilbert-Schmidt operators on standard forms
- Injectivity and operator spaces
- Selfpolar forms and their applications to the \(C^*\)-algebra theory
- Classification of injective factors. Cases \(\mathrm{II}_1\), \(\mathrm{II}_\infty\), \(\mathrm{III}_\lambda\), \(\lambda\neq 1\)
- An example of a non nuclear C*-algebra, which has the metric approximation property
- \(C^*\)-algebras and \(W^*\)-algebras.
- On the method of constructing irreducible finite index subfactors of Popa
- Some properties of modular conjugation operator of von Neumann algebras and a non-commutative Radon-Nikodym theorem with a chain rule
- Caractérisation des espaces vectoriels ordonnés sous jacents aux algèbres de Von Neumann
- Theory of operator algebras. II
- Amenable correspondences and approximation properties for von Neumann algebras
- Reduced operator algebras of trace-preserving quantum automorphism groups
- On a class of type \(\text{II}_1\) factors with Betti numbers invariants
- Ultraproducts of von Neumann algebras
- On some extension properties of von Neumann algebras
- The Radon-Nikodym theorem for von Neumann algebras
- The Haagerup property for locally compact quantum groups
- Approximation properties for free orthogonal and free unitary quantum groups
- Property T for von Neumann Algebras
- The Haagerup Property for Arbitrary von Neumann Algebras
- The standard form of von Neumann algebras.
- Locally compact quantum groups in the von Neumann algebraic setting
- Rigid $\mathcal{OL}_p$structures of non-commutative $L_p$-spaces associated with hyperfinite von Neumann algebras
- Haagerup approximation property for quantum reflection groups
- The non-commutative flow of weights on a von Neumann algebra
- Theory of operator algebras I.
This page was built for publication: Haagerup approximation property for arbitrary von Neumann algebras
