Symplectic field theory and codimension-2 stable Hamiltonian submanifolds
Symplectic field theory and codimension-2 stable Hamiltonian submanifolds
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Richard Siefring , Ruhr-Universitat Bochum
IAS Room S-101
Motivated by the goal of establishing a "symplectic sum formula" in symplectic field theory, we will discuss the intersection behavior between punctured pseudoholomorphic curves and symplectic hypersurfaces in a symplectization. In particular we will show that the count of such intersections is always bounded from above by a finite, topologically-determined quantity even though the curve, the target manifold, and the symplectic hypersurface in question are all noncompact.