The gauge fixing theorem with applications to the Yang-Mills flow over Riemannian manifolds

Abstract

In 1982, Uhlenbeck U2 established the well-known gauge fixing theorem, which has played a fundamental role for Yang-Mills theory. In this paper, we apply the idea of Uhlenbeck to establish a parabolic type of gauge fixing theorems for the Yang-Mills flow and prove existence of a weak solution of the Yang-Mills flow on a compact n-dimensional manifold with initial value A0 in W1,n/2(M). When n=4, we improve a key lemma of Uhlenbeck (Lemma 2.7 of U2) to prove uniqueness of weak solutions of the Yang-Mills flow on a four dimensional manifold.