Symmetries and Detection of Surfaces by the Character Variety

Abstract

We extend Culler and Shalen's construction of detecting essential surfaces in 3-manifolds to 3-orbifolds. We do so in the setting of the SL2(C) character variety, and following Boyer and Zhang in the PSL2(C) character variety as well. We show that any slope detected on a canonical component of the (P)SL2(C) character variety of a one cusped hyperbolic 3-manifold with symmetries must be the slope of a symmetric surface. As an application, we show that for each symmetric double twist knot there are slopes which are strongly detected on the character variety but not on the canonical component.