Representing interpolated free group factors as group factors
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Publication:2032438
DOI10.4171/GGD/565zbMath1478.46055arXiv1805.10707OpenAlexW3049083315MaRDI QIDQ2032438
Dimitri Shlyakhtenko, Sorin Popa
Publication date: 11 June 2021
Published in: Groups, Geometry, and Dynamics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1805.10707
Geometric group theory (20F65) Free probability and free operator algebras (46L54) General theory of von Neumann algebras (46L10)
Related Items (2)
\(\mathrm{W}^*\)-rigidity paradigms for embeddings of \(\mathrm{II}_1\) factors ⋮ Von Neumann equivalence and properly proximal groups
Cites Work
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- A class of superrigid group von Neumann algebras
- Stable orbit equivalence of Bernoulli shifts over free groups
- Unique Cartan decomposition for \(\mathrm{II}_1\) factors
- Free products of hyperfinite von Neumann algebras and free dimension
- Classification of injective factors. Cases \(\mathrm{II}_1\), \(\mathrm{II}_\infty\), \(\mathrm{III}_\lambda\), \(\lambda\neq 1\)
- \(A\)-valued semicircular systems
- Interpolated free group factors
- Random matrices, amalgamated free products and subfactors of the von Neumann algebra of a free group, of noninteger index
- Universal properties of \(L(\mathbb{F}_ \infty)\) in subfactor theory.
- Topics in orbit equivalence
- Cost of equivalence relations and groups
- Compressions of free products of von Neumann algebras
- Unique Cartan decomposition for \(\mathrm{II}_1\) factors arising from arbitrary actions of free groups
- A lemma for cost attained
- On rings of operators. IV
- On a question of D. Shlyakhtenko
- Orbit Equivalence and Measured Group Theory
- The Fundamental Group of the Von Neumann Algebra of a Free Group with Infinitely Many Generators is ℝ + \{0}
- Some applications of freeness with amalgamation
- On Groups of Measure Preserving Transformations. II
- L2-homology for von Neumann algebras
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