Columbia Symplectic Geometry, Gauge Theory, and Categorification Seminar

Jan 30: Yikai Teng (Rutgers University-Newark) "Khovanov homology and exotic planes"

Since the 1980s, mathematicians have discovered uncountably many "exotic" embeddings of R^2 in R^4, i.e., embeddings that are topologically but not smoothly isotopic to the standard xy-plane. However, until today, there have been no direct, computable invariants that could detect such exotic behavior (with prior results relying on indirect arguments). In this talk, we define the end Khovanov homology, which is the first known combinatorial invariant of properly embedded surfaces in R^4 up to ambient diffeomorphism. Moreover, we apply this invariant to detect new exotic planes, including the first known example of an exotic plane that is a Lagrangian submanifold of the standard symplectic R^4.

Feb 6: Amanda Hirschi (Sorbonne University) "On the Donaldson 4-6 problem"

The Donaldson 4-6 question asks how deformation classes of stabilised symplectic forms, i.e. after taking the product with S^2, are related to the underlying smooth structures on the underlying smooth manifold in dimension 4 I will describe one example of a smooth 4-manifold admitting two symplectic forms which remain deformation inequivalent after taking the product with S^2, giving counterexamples to one implication of the conjectured relation. On the other hand, I will explain why two symplectic manifolds, whose stabilisations are deformation equivalent, have the same Gromov-Witten invariants. This is joint work with Luya Wang.