- A Radon-Nikodym theorem for von Neumann algebras Stefaan Vaes
- Weight theory for C -algebraic quantum groups
- Locally compact quantum groups in the von Neumann algebraic setting
- A simple definition for locally compact quantum groups C.R. Acad. Sci., Paris, Ser. I 328 (10) (1999), 871876.
- Cocycle and orbit superrigidity for lattices in SL(n, R) acting on homogeneous spaces
- Sminaire Bourbaki Astrisque 311 (2007), 237294 RIGIDITY RESULTS FOR BERNOULLI ACTIONS AND THEIR
- UNIVERSITE PARIS VII -DENIS DIDEROT U.F.R de Mathematiques
- Oberwolfach Reports 2 (2005), 23092311. Boundaries and exactness for discrete quantum groups
- The unitary implementation of a locally compact quantum group action
- The operator algebra approach to quantum groups Proceedings of the National Academy of Sciences USA 97 (2) (2000), 547552.
- Examples of locally compact quantum groups through the bicrossed product construction
- KATHOLIEKE UNIVERSITEIT LEUVEN Faculteit Wetenschappen
- Actions of F whose II1 factors and orbit equivalence relations have prescribed fundamental group
- STRICTLY OUTER ACTIONS OF GROUPS AND QUANTUM GROUPS Journal fur die reine und angewandte Mathematik (Crelle's Journal) 578 (2005), 147184.
- The representation category of any compact group is the bimodule category of a II1 factor
- On the fundamental group of II1 factors and equivalence relations arising from group actions
- Oberwolfach Reports 5 (2008), 21142115. Fundamental groups of II1 factors and equivalence relations
- Strong rigidity of generalized Bernoulli actions and computations of their symmetry groups
- Oberwolfach Reports 5 (2008), 28082810. Superrigid actions of lattices in SL(n, R) on homogeneous spaces
- The boundary of universal discrete quantum groups, exactness and factoriality
- A CLASS OF SUPERRIGID GROUP VON NEUMANN ALGEBRAS ADRIAN IOANA(1)
- Poisson boundary of the discrete quantum group Au(F) by Stefaan Vaes and Nikolas Vander Vennet
- Group measure space decomposition of II1 factors and W*-superrigidity
- Induction of C -algebra coactions
- Proceedings of the International Congress of Mathematicians Hyderabad, India, 2010
- An inner amenable group whose von Neumann algebra does not have property Gamma
- A new approach to induction and imprimitivity results by Stefaan Vaes
- KATHOLIEKE UNIVERSITEIT LEUVEN Faculteit Wetenschappen
- Two remarks on the crossed product decomposition of II1 factors
- Explicit computations of all finite index bimodules for a family of II1 factors
- KATHOLIEKE UNIVERSITEIT LEUVEN Faculteit Wetenschappen
- One-cohomology and the uniqueness of the group measure space decomposition of a II1 factor
- Rigid actions need not be strongly ergodic by Adrian Ioana(1) and Stefaan Vaes(2)
- HNN extensions and unique group measure space decomposition of II1 factors
- Every compact group arises as the outer automorphism group of a II1 factor
- Factors of type II1 without non-trivial finite index subfactors
- Identification of the Poisson and Martin boundaries of orthogonal discrete quantum groups
- Ergodic coactions with large multiplicity and monoidal equivalence of quantum groups
- Seminaire Bourbaki Asterisque 299 (2005), 329350 56`eme annee, 2003-2004, no 937
- Measurable Kac cohomology for bicrossed products Transactions of the AMS 357 (2005), 1497-1524.
- Double crossed products of locally compact quantum groups Journal of the Institute of Mathematics of Jussieu 4 (2005), 135173.
- Non-semi-regular quantum groups coming from number theory Communications in Mathematical Physics 235 (1) (2003), 139-167.
- On Low-Dimensional Locally Compact Quantum Groups
- Extensions of locally compact quantum groups and the bicrossed product construction
- Amenability and the bicrossed product construction
- Locally compact quantum groups Annales Scientifiques de l'Ecole Normale Superieure 33 (6) (2000), 837934.
- Mathematica Scandinavica 92 (1) (2003), 6892. LOCALLY COMPACT QUANTUM GROUPS IN THE VON
- Stefaan Vaes and Alfons Van Daele
- Oberwolfach Reports 7 (2010), 673675. A class of group factors LG that remember the group G
- The Heisenberg commutation relations, commuting squares and
- Approximation of center-valued-Betti-numbers and
- SOME COMPUTATIONS OF INVARIANTS
- KATHOLIEKE UNIVERSITEIT LEUVEN Faculteit Wetenschappen
- A class of II1 factors with many non conjugate Cartan subalgebras
- A class of groups for which every action -superrigid
- Stable orbit equivalence of Bernoulli actions of free groups and isomorphism of some of their factor actions
- Unique Cartan decomposition for II1 factors arising from arbitrary actions of free groups
- Unique Cartan decomposition for II1 factors arising from arbitrary actions of hyperbolic groups
- TYPE III FACTORS WITH UNIQUE CARTAN DECOMPOSITION CYRIL HOUDAYER* AND STEFAAN VAES**
