Various generalizations and deformations of PSL(2,R) surface group representations and their Higgs bundles

Abstract

Recall that the group PSL(2, R) is isomorphic to PSp(2, R),\ SO0(1,2) and PU(1,1). The goal of this paper is to examine the various ways in which Fuchsian representations of the fundamental group of a closed surface of genus g into PSL(2, R) and their associated Higgs bundles generalize to the higher rank groups PSL(n, R),\ PSp(2n, R),\ SO0(2,n),\ SO0(n,n+1) and PU(n,n). For the SO0(n,n+1)-character variety, we parameterize n(2g-2) new connected components as the total space of vector bundles over appropriate symmetric powers of the surface and study how these components deform in the SO0(n,n+2)-character variety. This generalizes results of Hitchin for PSL(2, R).