The Parabolic U(1)-Higgs Equations and Codimension-two Mean Curvature Flows

Abstract

We develop the asymptotic analysis as ε 0 for the natural gradient flow of the self-dual U(1)-Higgs energies Eε(u,∇)=∫M(|∇ u|2+ε2|F∇|2+(1-|u|2)24ε2) on Hermitian line bundles over closed manifolds (Mn,g) of dimension n 3, showing that solutions converge in a measure-theoretic sense to codimension-two mean curvature flows -- i.e., integral (n-2)-Brakke flows -- generalizing results of the last two authors from the stationary case. Given any integral (n-2)-cycle 0 in M, these results can be used together with the convergence theory developed in previous work of the authors to produce nontrivial integral Brakke flows starting at 0 with additional structure, similar to those produced via Ilmanen's elliptic regularization.