Location: IHP, room 201
The talks are broadcasted via Zoom:
https://zoom.us/j/89445897442?pwd=QmVZWHBiM2Nwb09yUVJERnYrSHJrUT09
10:45 Marcelo Atallah (Shefield)
The number of periodic points of surface symplectomorphisms.
Abstract: A celebrated result of Franks shows that a Hamiltonian diffeomorphism of the sphere with more than two fixed points must have infinitely many periodic points. We present a symplectic variant of this phenomenon for symplectomorphisms of surfaces of higher genus that are isotopic to the identity; it implies an upper bound for the Floer-homological count of the number of fixed points of a symplectomorphism with finitely many periodic points. From a higher dimensional viewpoint, this can be understood as evidence for a non-Hamiltonian variant of Shelukhin’s result on the Hofer-Zehnder conjecture. Furthermore, we discuss the construction of a symplectic flow on a surface of any positive genus having a single fixed point and no other periodic orbits. This is joint work with Marta Batoréo and Brayan Ferreira.
14:00 Rima Chatterjee (Köln)
Classification problem of Legendrian knots vs links.
Abstract: A knot in a contact manifold is Legendrian if it is everywhere tangent to the contact planes. The classification problem in Legendrian knot theory is lot finer than its topological counter part. The problem gets even trickier when we start considering links. In this talk, I'll survey some of the recent results in this area and then discuss the classification problem for cable links. Part of this is joint work with John Etnyre and Tom Rodewald.
15:45 Merlin Christ (Univ. Paris Cité)
From Lefschetz fibrations to sheaves of categories.
Abstract: Suppose we are given an exact symplectic manifold with a Lefschetz fibration to the disc. As shown by Seidel, the Fukaya category can be recovered from the Fukaya-Seidel category of the fibration, built from the Fukaya category of the regular fiber and the Lagrangian vanishing cycles. We will see in this talk how this construction can be reformulated in terms of a perverse sheaf of categories on the disc. One of the advantages of the sheaf language is that it can be applied to Lefschetz fibrations over any surface with boundary. We then specialize to examples of Fukaya categories of Lefschetz fibrations over surfaces due to Ivan Smith, which can be studied quite effectively using this sheaf language. In these examples, standard construction in symplectic geometry, for instance of Lagrangian matching spheres, acquire representation theoretic meanings.
Next symplectix:
6/12 (Haney, Opshtein, Vertesi (postponed)) 10/01 (?, ?, ?)
Other symplectic activity in Paris (and in France):
- CAST 2025 Workshop (6-8 February in Grenoble)- Séminaire Nantes-Orsay
- Symplectic Zoominar (every Fridays at 15:15 (except Symplectix' Fridays) Paris time)