November 2 – 6, 2015
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One of the aims of noncommutative geometry is to generalize the main tools of geometry to a class of regular enough C*-algebras that can be considered as «noncommutative spaces» and thus get applications in geometry, analysis, number theory and quantum mechanics. This involves many different tools and questions. This conference will make an overview of some of them :
We intend to spend one day on each of the preceding themes. An expert of each theme will be asked to give an overview of the subject, and this will be followed by more recent results or particularly important results. The aim is to get an overview on the recent progress on all of these themes together with a glimpse of their interactions. |
Scientific & Organizing Committee
Claire Debord (Université Blaise Pascal Clermont-Ferrand) Speakers
From groups to semigroups and groupoids
Quelques applications de l’équivalence monoidale des groupes quantiques localement compacts
Unification et modèle spectral
C*-algebras associated with algebraic actions
Central extensions of current Lie algebras
Group actions on Banach spaces
Compact bicrossed products
Geometric dimension and approximations in orbit equivalence
KK-theory for reduced free product C*-algebras
The geometry and noncommutative geometry of parabolic induction
Asymptotic structure and rigidity of free product von Neumann algebras
On the Lp Baum-Connes conjecture
Quelques aperçus du programme de Langlands
Representations of groupoid C*-algebras and invertibility
Indomitable rho-invariants
Approximating freeness under constraints, with applications
Semigroupes, P-graphes et groupoïdes
Supramenable groups and their actions on locally compact spaces and
Homotopy invariants of closed manifolds through higher signatures
Free probability of type B and asymptotics of nite-rank perturbations of ran-
Cohomology and L2-Betti numbers for subfactors and quasi-regular inclusions
Expanders and box spaces
The bi-free extension of free probability
Dimension and K-theory |