Dimension of character varieties for 3-manifolds

Abstract

Let M be a 3-manifold, compact with boundary and its fundamental group. Consider a complex reductive algebraic group G. The character variety X(,G) is the GIT quotient Hom(,G)//G of the space of morphisms G by the natural action by conjugation of G. In the case G=SL(2, C) this space has been thoroughly studied. Following work of Thurston, as presented by Culler-Shalen, we give a lower bound for the dimension of irreducible components of X(,G) in terms of the Euler characteristic (M) of M, the number t of torus boundary components of M, the dimension d and the rank r of G. Indeed, under mild assumptions on an irreducible component X0 of X(,G), we prove the inequality dim(X0)≥ t · r - d(M).