The representations of the fundamental group of a closed orientable surface can be understood by means of a manifold (a vector bundle over the surface) together with some extra structure (a flat connection on this bundle). When a complex structure is chosen on the surface, the concept of a Higgs bundle over a Riemann surface arises naturally. The spaces parameterizing these objects, or moduli spaces, are related by the Hitchin-Kobayashi correspondence. The rich geometric structure of the moduli space of Higgs bundles then becomes a powerful tool to study the topology of the moduli space of surface group representations, or character variety. In this introductory course we will cover the following topics:
- The fundamental group of a surface and its representations.
- Basics on bundle theory.
- Local systems and at connections.
- Higgs bundles on Riemann surfaces.
- Moduli spaces and the Hitchin{Kobayashi correspondence.
- The geometry of the moduli space of Higgs bundles and the topology of the character variety.
An overview of the course will be given at the beginning of the �rst class. The �rest three weeks will cover the background material. From the fourth week, each weekly class will consist of three parts:
- A 45min survey lecture.
- A 90min hands-on working session.
- A 30min student-directed working session.
Those interested in knowing about this subject are most welcome to attend only the �rest part of the class from the fourth week. Those interested in a deep understanding and working knowledge can attend the other parts. Officially registered students are expected to attend and participate in most of the classes.