Topology of weak G-bundles via Coulomb gauges in critical dimensions

Abstract

The transition maps for a Sobolev G-bundle are not continuous in the critical dimension and thus the usual notion of topology does not make sense. In this work, we show that if such a bundle P is equipped with a Sobolev connection A, then one can associate a topological isomorphism class to the pair ( P, A), which is invariant under Sobolev gauge changes and coincides with the usual notions for regular bundles and connections. This is based on a regularity result which says any bundle in the critical dimension in which a Sobolev connection is in Coulomb gauges are actually C0,α for any α < 1. We also show any such pair can be strongly approximated by smooth connections on smooth bundles. Finally, we prove that for sequences (P,A) with uniformly bounded n/2-Yang-Mills energy, the topology stabilizes if the n/2 norm of the curvatures are equiintegrable. This implies a criterion to detect topological flatness in Sobolev bundles in critical dimensions via n/2-Yang-Mills energy.