The Pushforward Theorem and Applications
Offered By: IMSA via YouTube
Course Description
Overview
Explore a comprehensive lecture on the Pushforward Theorem and its applications, delivered by Tony Pantev from the University of Pennsylvania. Delve into the concept of relative shifted symplectic structures along the stalks of constructible sheaves of derived stacks on stratified spaces. Learn about a general pushforward theorem that produces relative shifted symplectic forms and discover techniques for computing these forms. Examine a universal construction of Poisson structures on derived moduli of Stokes data on smooth varieties, and understand how symplectic leaves arise from fixing irregular types and local formal monodromies at infinity. Follow the lecture's structure, covering topics such as the problem statement, recap, examples, honorable dice, nearby cycles, forms, and the pushforward process.
Syllabus
Introduction
The Problem
Recap
Examples
Honorable Dice
Nearby Cycles
Forms
Pushforward
Taught by
IMSA
Related Courses
Integer-Valued Gromov-Witten Type Invariants - Guangbo XuInstitute 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