Z/2 harmonic 1-forms, R-trees, and the Morgan-Shalen compactification

Abstract

This paper studies the relationship between an analytic compactification of the moduli space of flat SL2(C) connections on a closed, oriented 3-manifold M defined by Taubes, and the Morgan-Shalen compactification of the SL2(C) character variety of the fundamental group of M. We exhibit an explicit correspondence between Z/2 harmonic 1-forms, measured foliations, and equivariant harmonic maps to R-trees, as initially proposed by Taubes. As an application, we prove that Z/2 harmonic 1-forms exist on all Haken manifolds with respect to all Riemannian metrics. We also show that there exist manifolds that support singular Z/2 harmonic 1-forms but have compact SL2(C) character varieties, which resolves a folklore conjecture.