Monopoles and Landau-Ginzburg Models I

Abstract

The endpoint of this series of papers is to construct 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. In the first paper, we exploit the framework of the gauged Landau-Ginzburg models to address two model problems for the (perturbed) Seiberg-Witten moduli spaces on either C× or H2+×, where is any compact Riemann surface of genus ≥ 1. Our first result states that finite energy solutions to the perturbed equations on C× are necessarily trivial. The second states that small energy solutions on H2+× necessarily have energy decaying exponentially in the spatial direction. These results will lead eventually to the compactness theorem in the second paper.