Link homology, bridge trisections, and invariants of knotted surfaces
Link homology, bridge trisections, and invariants of knotted surfaces
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Adam Saltz (University of Georgia)
Fine Hall 314
I will describe an invariant of knotted surfaces in S^4 obtained by applying link homology to Meier and Zupan's bridge trisections. This invariant takes values in Z/2Z and distinguishes the unknotted sphere from the spun (2,3)-torus knot. I'll finish by speculating about a relative invariant and connections to invariants of four-manifolds.