Geometry of the ends of the moduli space of anti-self-dual connections

Abstract

Let X be a closed, four-dimensional, oriented, smooth manifold with a Riemannian metric, g, let G be a compact Lie group, and P be a principal G bundle over X. D. Groisser and T. Parker (1987, 1989) and S. K. Donaldson (1990) conjectured that the moduli space of g-anti-self-dual connections on P, endowed with the L2 metric, has finite volume and diameter. The purpose of this article is to prove this conjecture under the following additional hypotheses. Suppose that g is generic and X is simply-connected. If (i) G=SU(2) or SO(3) and b+(X)=0 or (ii) G=SO(3) and w2(P)≠ 0, where w2(P) is the second Stiefel-Whitney class of P, then we prove that the moduli space of g-anti-self-dual connections on P has finite volume and diameter with respect to the L2 metric. Our development of the bubble-tree compactification of the moduli space of g-anti-self-dual connections --- based on ideas of Sacks and Uhlenbeck for sequences of harmonic maps from the two-sphere (1981), Taubes (1988) for sequences of Yang-Mills connections, and Parker and Wolfson (1993, 1996) for sequences of pseudo-holomorphic maps --- provides one of the key technical tools used in the proof.