Spectral Networks and Non-abelianization

Abstract

We generalize the non-abelianization of Gaiotto-Moore-Neitzke from the case of SL(n) and GL(n) to arbitrary reductive algebraic groups. This gives a map between a moduli space of certain N-shifted weakly W-equivariant T-local systems on an open subset of a cameral cover X→ X to the moduli space of G-local systems on a punctured Riemann surface X. For classical groups, we give interpretations of these moduli spaces using spectral covers. Non-abelianization uses a set of lines on the Riemann surface X called a spectral network, defined using a point in the Hitchin base. We show that these lines are related to trajectories of quadratic differentials on quotients of X. We use this to describe some of the generic behaviour of lines in a spectral network.