Higgs bundles for real groups and the Hitchin-Kostant-Rallis section

Abstract

We consider the moduli space of polystable L-twisted G-Higgs bundles over a compact Riemann surface X, where G is a real reductive Lie group, and L is a holomorphic line bundle over X. Evaluating the Higgs field at a basis of the ring of polynomial invariants of the isotropy representation, one defines the Hitchin map. This is a map to an affine space, whose dimension is determined by L and the degrees of the polynomials in the basis. Building up on the work of Kostant-Rallis and Hitchin, in this paper, as a first step in the study of the Hitchin map, we construct a section of this map. This generalizes the section constructed by Hitchin when L is the canonical line bundle of X and G is complex. In this case the image of the section is related to the Hitchin-Teichm\"uller components of the moduli space of representations of the fundamental group of X in GSplit, a split real form of G. In fact, our construction is very natural in that we can start with the moduli space for GSplit, instead of G, and construct the section for the Hitchin map for GSplit directly. The construction involves the notion of maximal split subgroup of a real reductive Lie group.