Speaker
Pavel Shlykov
(University of Toronto)
Description
Symplectic duality is an observation that symplectic resolutions tend to come in pairs with matching geometric properties. Equivariant Hikita-Nakajima conjecture is one such statement, which connects the geometric and algebraic properties of symplectically dual pairs. In this talk I try to explain, what is usually meant by symplectic duality, provide some examples and state the conjecture I am working on. The talk is based on a joint work with Vasily Krylov (arXiv:2202.09934).
