Monopoles and Landau-Ginzburg Models II: Floer Homology

Abstract

This is the second paper in this series. Following the setup of Meng-Taubes, we define the monopole Floer homology for any pair (Y,ω), where Y is a compact oriented 3-manifold with toroidal boundary and ω is a suitable closed 2-form viewed as a decoration. This construction fits into a (3+1)-topological quantum field theory and generalizes the work of Kronheimer-Mrowka for closed oriented 3-manifolds. By a theorem of Meng-Taubes and Turaev, the Euler characteristic of this Floer homology recovers the Milnor-Turaev torsion invariant of the 3-manifold.