YoVDO

Functorial Construction of Lagrangian Floer Theory and Its Possible Applications

Offered By: IMSA via YouTube

Tags

Symplectic Geometry Courses Lagrangian Submanifolds Courses

Course Description

Overview

Save Big on Coursera Plus. 7,000+ courses at $160 off. Limited Time Only!
Explore a comprehensive lecture on the functorial construction of Lagrangian Floer theory and its potential applications. Delve into the current status of this mathematical approach as presented by renowned mathematician Kenji Fukaya from Stony Brook University. Over the course of 51 minutes, gain insights into the intricate details of Floer theory and its functional construction within the context of Lagrangian submanifolds. Discover how this theoretical framework can be applied to various mathematical problems and potentially extend to other fields. Suitable for advanced mathematics students and researchers interested in symplectic geometry, this talk offers a deep dive into cutting-edge mathematical concepts and their practical implications.

Syllabus

Kenji Fukaya, Stony Brook: Functorial construction of Lagrangian Floer theory & its possible apps


Taught by

IMSA

Related Courses

Integer-Valued Gromov-Witten Type Invariants - Guangbo Xu
Institute for Advanced Study via YouTube
Geometry and Topology of Hamiltonian Floer Complexes in Low-Dimension - Dustin Connery-Grigg
Institute for Advanced Study via YouTube
On the Spatial Restricted Three-Body Problem - Agustin Moreno
Institute for Advanced Study via YouTube
Distinguishing Monotone Lagrangians via Holomorphic Annuli - Ailsa Keating
Institute for Advanced Study via YouTube
Floer Cohomology and Arc Spaces - Mark McLean
Institute for Advanced Study via YouTube