Home /  FHT Reading Group: "Homological Link Invariants from Mirror Symmetry: Computations"

Seminar

FHT Reading Group: "Homological Link Invariants from Mirror Symmetry: Computations" November 08, 2022 (02:00 PM PST - 03:00 PM PST)
Parent Program:
Location: SLMath: Baker Board Room, Online/Virtual
Speaker(s) Mina Aganagic (University of California, Berkeley)
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Homological mirror symmetry leads to the solution of the knot categorification problem. It provides a categorification of quantum link invariants, which works uniformy with respect to the choice of a Lie algebra, and originates from geometry and physics. The symplectic side of mirror symmetry is a theory which generalizes Heegard-Floer theory. The theory has many special features, which render it solvable explicitly. In this talk, I will describe in some detail how the theory is solved.

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