Character varieties for real forms of classical complex groups

Abstract

Let be a finitely generated group, GC be a classical complex group and GR a real form of GC. We propose a definition of the GR-character variety of as a subset XGR() of the GC-character variety XGC(). We prove that these subsets cover the set of irreducible GC-characters fixed by an anti-holomorphic involution of XGC(). Whenever GR is compact, we prove that XGR() is homeomorphic to the topological quotient Hom(,GR)/GR. Finally, we identify the reducible points of XGL(n,C)() fixed by an anti-holomorphic involution as coming from direct sums of representations with values in real groups.