Exact Lagrangians and the Hatcher-Waldhausen map
Vendredi, 10 Mai, 2019 - 10:30
Résumé :
In this talk I will define the Hatcher-Waldhausen map and sketch why the space M∞ defined by Gromov and Eliasberg is an explicit geometric model for its homotopy fiber. The space M∞ has deep relations to exact Lagrangian submanifolds and the extensive results on the Hatcher-Waldhausen map in the literature then implies new results on such. As a sample we sketch a proof that any exact Lagrangian filling in D2n of the standard Legendrian unknot S2n−1 has a homotopy trivial stable Lagrangian Gauss map.
Institution de l'orateur :
Uppsala
Thème de recherche :
Topologie
Salle :
4