Talk page

Title:
Shifted symplectic structures and applications

Speaker:
Tony Pantev

Abstract:
I will give a brief overview of shifted symplectic and Poisson structures in derived geometry and their quantization. I will survey constructions of these structures on moduli stacks and will discuss several explicit examples. In the rest of the talk I will discuss interesting connections and applications to enumerative geometry, low dimensional topology, and Hodge theory. Time permitting, I will conclude with a sampling of recent results and developments including additivity theorems, connections with Bloch's conductor conjecture, and the Azumaya nature of shifted differential operators in positive characteristic.

Link:
https://www.msri.org/workshops/862/schedules/25979

Workshop:
MSRI- Introductory Workshop: Derived Algebraic Geometry and Birational Geometry and Moduli Spaces