Title: On integrable billiards, Birkhoff conjecture, and deformational spectral rigidity.
Speaker: Vadim Kaloshin
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G.D.Birkhoff introduced a mathematical billiard inside of a convex domain as the motion of a massless particle with elastic reflection at the boundary. A theorem of Poncelet says that the billiard inside an ellipse is integrable, in the sense that the neighborhood of the boundary is foliated by smooth closed curves and each billiard orbit near the boundary is tangent to one and only one such curve (in this particular case, a confocal ellipse). A famous conjecture by Birkhoff claims that ellipses are the only domains with this property. We show a local version of this conjecture - namely, that a small perturbation of an ellipse has this property only if it is itself an ellipse. It turns out that the method of proof gives an insight into deformational spectral rigidity of planar axis symmetric domains and gives a partial answer to a question of P. Sarnak. This is based on several papers with Avila, De Simoi, G.Huang, Sorrentino, Q. Wei.
Date: Wednesday, November 14, 2018
Time: 4:10pm
Where: Lunt 105
Contact Person: Dmitry Tamarkin
Contact email: zelditch@math.northwestern.edu
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