4–8 juil. 2022
Institut Henri Poincaré
Fuseau horaire Europe/Paris

Localization and flexibilization in symplectic geometry

8 juil. 2022, 11:00
1h
Amphithéâtre Hermite (Institut Henri Poincaré)

Amphithéâtre Hermite

Institut Henri Poincaré

11 rue Pierre et Marie Curie 75005 Paris

Orateur

Oleg Lazarev (University of Massachusetts Boston)

Description

Localization is an important construction in algebra and topology that allows one to study global phenomena a single prime at a time. Flexibilization is an operation in symplectic topology introduced by Cieliebak and Eliashberg that makes any two symplectic manifolds that are diffeomorphic (plus a bit of tangent bundle data)  become symplectomorphic. In this talk, I will explain that it is fruitful to view flexibilization as a localization (away from zero ). Building on work of Abouzaid and Seidel, l will also give examples of new localization functors of symplectic manifolds (up to stabilization and subcriticals) that interpolate between flexible and rigid symplectic geometry and can be viewed as symplectic analogs of topological localization of Sullivan, Quillen, and Bousfield. 
This talk is based on joint work with Z. Sylvan and H. Tanaka.

Documents de présentation

Aucun document.