Symplectix 7 mars 2025

Location: IHP, room 201

The talks are broadcasted via Zoom:
https://zoom.us/j/89445897442?pwd=QmVZWHBiM2Nwb09yUVJERnYrSHJrUT09

 

10:45 Rohil Prasad (Berkeley)  
TBA.
Abstract: TBA.

14:00 Shah Faisal (Strasbourg)   
Extremal Lagrangian tori in toric domains.
Abstract:  The symplectic area of a Lagrangian submanifold L of a symplectic manifold is defined to be the minimal positive symplectic area of a smooth 2-disk with boundary on L.   An extremal Lagrangian torus is a Lagrangian torus that maximizes the symplectic area among the Lagrangian tori.  In this talk, I will explain that every extremal Lagrangian torus in the standard symplectic unit ball is entirely contained in the boundary of the ball. This answers a question attributed to Lazzarini and settles a conjecture of Cieliebak and Mohnke in the affirmative.
 

15:45 Amanda Hirschi (Jussieu)
TBA.
Abstract: TBA.

Next symplectix:

4/04 (Petr, Riegel, Zhang), 6/06

Other symplectic activity in Paris (and in France):

- Séminaire Nantes-Orsay
- Symplectic Zoominar (every Fridays at 15:15 (except Symplectix' Fridays) Paris time)

Symplectix 10 janvier 2025

Location: IHP, room 201

The talks are broadcasted via Zoom:
https://zoom.us/j/89445897442?pwd=QmVZWHBiM2Nwb09yUVJERnYrSHJrUT09

 

10:45 Vivek Shende (Odense)  
A topological classification of generating functions.
Abstract: From a generating function for a Legendrian in a 1-jet bundle, one may extract the following topological information: (1) a trivialization of the stable Gauss map, (2) the sheaf of sub-level-set stable cohomotopies, and (3) an identification of the microlocalization of the latter with the J-homomorphism image of the former. Here we show that in fact (1), (2), (3) completely classify generating functions up to the natural equivalence relations of stabilization and fiberwise diffeomorphism.
This talk presents joint work with Sylvain Courte.

14:00 Oğuz Şavk (Nantes)  
Homology concordances and links of isolated singularities of complex hypersurfaces.
Abstract:  In this talk, I will present my ongoing joint work with Marco Golla on the study of the homology concordance group, one of the high-dimensional generalizations of the concordance group to homology spheres and homology cobordisms. In particular, I will discuss the subgroup generated by links of Brieskorn-Pham singularities (which can be thought of as high-dimensional torus knots).
 

15:45 Seungook Yu (Nantes)
Contact instantons and its Legendrian Floer cohomology in one-jet bundle.
Abstract: In the study of Floer theory in contact geometry, symplectization has been widely used. However, the symplectization process may result in the loss of geometric or topological information inherent to the given contact manifold. To address this, it is necessary to develop Floer theory directly on contact manifolds without relying on symplectization. Contact instantons have been introduced as a tool to achieve this goal. In this talk, I will introduce contact instantons and use them to define Legendrian Floer cohomology for Legendrian submanifolds that are Hamiltonian isotopic to the zero section in one-jet bundles. If time permits, I will also discuss the construction of spectral invariants as an application. This is a joint work with Yong-Geun Oh. .

Next symplectix:

7/03, 4/04

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)

 

Symplectix 6 décembre 2024

 Location: IHP, room 201

The talks are broadcasted via Zoom:
https://zoom.us/j/89445897442?pwd=QmVZWHBiM2Nwb09yUVJERnYrSHJrUT09

 

10:45 Emmanuel Opshtein (Université de Strasbourg)  
Symplectic/contact rigidity of some Lagrangian/Legendrian skeleta in dimension 4.
Abstract: In the simplest framework of symplectic manifolds with rational symplectic class, symplectic polarizations are  smooth symplectic hypersurfaces Poincaré-Dual to a multiple of the symplectic class. Their complements retract to some skeleta, which are quite often Lagrangian CW-complexes. These notions were  introduced by Biran and he exhibited symplectic rigidity properties of these skeleta. In later work, I generalized the notion of symplectic polarizations to any closed symplectic manifold with a view towards effective constructions of symplectic embeddings.
    In the present talk, I will explain further generalization of these notions to the Liouville setting in dimension 4 and how it leads to new interesting results on the side of the symplectic rigidity of Lagrangian skeleta and the contact rigidiy of their Legendrian boundaries (for instance in terms of interlinking in Entov-Polterovich’s words). The talk will focus on examples.   
    This is a joint work with Felix Schlenk.

14:00 (Joint session with the Enumerative Geometry Seminar)
Sebastian Haney (Columbia University)  
Open enumerative mirror symmetry for lines in the mirror quintic.
Abstract:  One of the earliest achievements of mirror symmetry was the prediction of genus zero Gromov-Witten invariants for the quintic threefold in terms of period integrals on the mirror. Analogous predictions for open Gromov-Witten invariants in closed Calabi-Yau threefolds can be formulated in terms of relative period integrals on the mirror, which govern extensions of variations of Hodge structure. I will discuss work in which I construct an immersed Lagrangian in the quintic which supports a family of objects in the Fukaya category mirror to vector bundles on lines in the mirror quintic, and deduce its open Gromov-Witten invariants from homological mirror symmetry. The domain of this Lagrangian immersion is a closed 3-manifold obtained by gluing together two copies of a cusped hyperbolic 3-manifold. The open Gromov-Witten invariants of the Lagrangian are irrational numbers valued in the invariant trace field of the hyperbolic pieces.
 

15:45 Marco Robalo (Sorbonne Université)
Gluing Donaldson-Thomas invariants.
Abstract: Donaldson-Thomas invariants appear naturally in context of (algebraic) lagrangian intersections. Mirror symmetry led Kapustin-Rozansky to conjecture the existence of a particular invariant, related to the categories of matrix factorizations appearing in the B-model.
    In this talk, I will explain a joint work with the B.Hennion (Orsay) and J. Holstein (Hamburg) constructing these conjectural categorical invariants by a procedure that glues what happens in the simplest example, namely, when the lagrangian intersection is given by the critical points of a function.

Next symplectix:

10/01 (Şavk, Shende, Yu), 7/03, 4/04

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)