Minimal submanifolds from the abelian Higgs model

Abstract

Given a Hermitian line bundle L M over a closed, oriented Riemannian manifold M, we study the asymptotic behavior, as ε 0, of couples (uε,∇ε) critical for the rescalings align* &Eε(u,∇)=∫M(|∇ u|2+ε2|F∇|2+14ε2(1-|u|2)2) align* of the self-dual Yang-Mills-Higgs energy, where u is a section of L and ∇ is a Hermitian connection on L with curvature F∇. Under the natural assumption ε 0Eε(uε,∇ε)<∞, we show that the energy measures converge subsequentially to (the weight measure μ of) a stationary integral (n-2)-varifold. Also, we show that the (n-2)-currents dual to the curvature forms converge subsequentially to 2π, for an integral (n-2)-cycle with ||μ. Finally, we provide a variational construction of nontrivial critical points (uε,∇ε) on arbitrary line bundles, satisfying a uniform energy bound. As a byproduct, we obtain a PDE proof, in codimension two, of Almgren's existence result of (nontrivial) stationary integral (n-2)-varifolds in an arbitrary closed Riemannian manifold.