Spring 2023
The course starts at 10.15 in Seminar Room IB 3/73 .
Description of the reading course
The goal is to cover as many details as possible of the construction of Floer homology for the Hamiltonian action on closed symplectically aspherical symplectic manifolds. After briefly recalling the
Fredholm properties of the linearized Floer operator (which were already discussed in the course „Variational Methods for Differential Equations“ in the winter semester 22/23), we will cover the following topics: the Calderon-Zygmund inequality,
Transversality in Floer homology, Gromov compactness, The Conley-Zehnder index, Gluing and broken Floer trajectories, Continuation and Computation of Floer homology, Other Floer type homologies.
NEW DATE! 13.07.2023 Johanna Bimmermann "Other Floer type homologies"
Link to video here
22.06.2023 Jacobus Sander de Pooter "Continuation and computation of Floer homology"
Link to video here
15.06.2023 Simon Vialaret "Gluing and broken Floer trajectories"
Link to video here
25.05.2023 Manuel Stange "The Conley-Zehnder index"
There is no video this time.
11.05.2023 Michael Vogel "Gromov compactness"
Link to video here
04.05.2023 Pierre-Alexandre Arlove "Transversality in Floer homology"
Link to video here
27.04.2023 Luca Asselle "The Calderon-Zygmund inequality"
Link to video here
20.04.2023 Luca Asselle "Summary of the content of the course VMFDE"
Notes