Parabolic gap theorems for the Yang-Mills energy
Abstract
We prove parabolic versions of several known gap theorems in classical Yang-Mills theory. On an SU(r)-bundle of charge over the 4-sphere, we show that the space of all connections with Yang-Mills energy less than 4 π2 ( || + 2 ) deformation-retracts under Yang-Mills flow onto the space of instantons, allowing us to simplify the proof of Taubes's path-connectedness theorem. On a compact quaternion-K\"ahler manifold with positive scalar curvature, we prove that the space of pseudo-holomorphic connections whose sp(1) curvature component has small Morrey norm deformation-retracts under Yang-Mills flow onto the space of instantons. On a nontrivial bundle over a compact manifold of general dimension, we prove that the infimum of the scale-invariant Morrey norm of curvature is positive.
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