Floer homology of manifolds with torus boundary
Floer homology of manifolds with torus boundary
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Jacob Rasmussen
Taplin Auditorium
The bordered Floer homology of a 3-manifold with torus boundary determines an object in the Fukaya category of the punctured torus. This object takes the form of a collection of immersed curves equipped with local systems. I'll discuss some geometrical properties of this collection of curves, and give some applications to problems about L-spaces. This is joint work with Jonathan Hanselman and Liam Watson.