Action-angles variables in Poisson geometry, local and global.
Speaker: Camille Laurent-Gengoux, Metz, France
Abstract: The action-angle theorem is a well-known theorem that states that there is, locally, only one integrable system with compact leaves on a symplectic manifolds, and gives obstruction to the existence of a global trivialization. We investigate in the present work how the problem can be studied in Poisson geometry, in particular for Poisson manifolds with singularities.
Room Reservation Information
Room Number: 106 McAllister
Time: 3:35pm - 4:25pm