24-25 November 2016
Poitiers
Europe/Paris timezone

Around the geometry of Calogero-Moser spaces

24 Nov 2016, 14:00
50m
0-6 (Poitiers)

0-6

Poitiers

Board: 4
Exposé de 50 min

Speaker

Prof. Cédric Bonnafé

Description

Numerical evidences suggest that the representation theory of a finite reductive group should be connected to the geometry of the Calogero-Moser variety associated with its corresponding Weyl group. Despite we have no (serious) clue for what should be the link, pursuing this analogy leads to new questions about the geometry of this variety, which might have an interest by themselves: symplectic resolutions, Poisson structure and symplectic leaves, fixed points, equivariant cohomology.

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