Representations of surface groups in the projective general linear group

Abstract

Given a closed, oriented surface X of genus g>1, and a semisimple Lie group G, let RG be the moduli space of reductive representations of the fundamental group of X in G. We determine the number of connected components of RPGL(n,R), for n>=4 even. In order to have a first division of connected components, we first classify real projective bundles over such a surface. Then we achieve our goal, using holomorphic methods through the theory of Higgs bundles over compact Riemann surfaces. We also show that the complement of the Hitchin component in RSL(3,R) is homotopically equivalent to RSO(3).