A topological model for the HOMFLY-PT polynomial

We give the first known topological model for the HOMFLY-PT polynomial. More precisely, we prove that this invariant is given by a set of graded intersections between explicit Lagrangian submanifolds in a fixed configuration space on a Heegaard surface for the link exterior. The submanifolds are supported on arcs and ovals on the surface. The construction also leads to a topological model for the Jones polynomial constructed from Heegaard surfaces associated directly to the link diagram. In particular, it does not rely on a choice of a braid representative for the link. This opens up new avenues for investigation of the geometry of these invariants, as well as categorifications of geometric nature.