Short Talks by Postdoctoral Members
Hamiltonian local models for symplectic derived stacks
After giving some motivation, we discuss the notion of symplectic form in derived algebraic geometry and explain how, in particular, it allows one to describe the local structure of moduli stacks of vector bundles on Calabi-Yau varieties in terms of graded Darboux coordinates and a graded Hamiltonian function.
Date & Time
September 25, 2013 | 2:30pm – 2:45pm
Location
S-101Speakers
Christopher Brav
Affiliation
Member, School of Mathematics