Involutions and higher order automorphisms of Higgs bundle moduli spaces

Abstract

We consider the moduli space M(G) of G-Higgs bundles over a compact Riemann surface X, where G is a complex semisimple Lie group. This is a hyperk\"ahler manifold homeomorphic to the moduli space R(G) of representations of the fundamental group of X in G. In this paper we study finite order automorphisms of M(G) obtained by combining the action of an element of order n in H1(X,Z) Out(G), where Z is the centre of G and Out(G) is the group of outer automorphisms of G, with the multiplication of the Higgs field by an nth-root of unity, and describe the subvarieties of fixed points. We give special attention to the case of involutions, defined by the action of an element of order 2 in H1(X,Z)Out(G) combined with the multiplication of the Higgs field by 1. In this situation, the subvarieties of fixed points are hyperk\"ahler submanifolds of M(G) in the (+1)-case, corresponding to the moduli space of representations of the fundamental group in certain reductive complex subgroups of G defined by holomorphic involutions of G; while in the (-1)-case they are Lagrangian subvarieties corresponding to the moduli space of representations of the fundamental group of X in real forms of G and certain extensions of these. We illustrate the general theory with the description of involutions for G=SL(n,C) and involutions and order three automorphism defined by triality for G=Spin(8,C).