Compactifications of character varieties and skein relations on conformal blocks

Abstract

Let MC(G) be the moduli space of semistable principal G-bundles over a smooth curve C. We show that a flat degeneration of this space MC(G) associated to a singular stable curve C contains the free group character variety X(Fg, G) as a dense, open subset, where g = genus(C). In the case G = SL2(C) we describe the resulting compactification explicitly, and in turn we conclude that the coordinate ring of MC(SL2(C)) is presented by homogeneous skein relations. Along the way, we prove the parabolic version of these results over stable, marked curves (C, p).