A compactness theorem for stable flat SL(2,C) connections on 3-folds

Abstract

Let Y be a closed 3-manifold such that all flat SU(2)-connections on Y are non-degenerate. In this article, we prove a Uhlenbeck-type compactness theorem on Y for stable flat SL(2,C) connections satisfying an L2-bound for the real curvature. Combining the compactness theorem and a previous result in Huang, we prove that the moduli space of the stable flat SL(2,C) connections is disconnected under certain technical assumptions.