Homological Link Invariants from Floer Theory

Abstract

There is a generalization of Heegaard-Floer theory from gl1|1 to other Lie (super)algebras Lg. The corresponding category of A-branes is solvable explicitly and categorifies quantum Uq(Lg) link invariants. The theory was discovered in A1,A2, using homological mirror symmetry. It has novel features, including equivariance and, if Lg ≠ gl1|1, coefficients in categories. In this paper, we describe the theory and how it is solved in detail in the two simplest cases: the gl1|1 theory itself, categorifying the Alexander polynomial, and the su2 theory, categorifying the Jones polynomial. Our approach to solving the theory is new, even in the familiar gl1|1 case.