Solutions of the Ginzburg-Landau equations with vorticity concentrating near a nondegenerate geodesic

Abstract

It is well-known that under suitable hypotheses, for a sequence of solutions of the (simplified) Ginzburg-Landau equations - u +-2(|u|2-1)u = 0, the energy and vorticity concentrate as 0 around a codimension 2 stationary varifold -- a (measure theoretic) minimal surface. Much less is known about the question of whether, given a codimension 2 minimal surface, there exists a sequence of solutions for which the given minimal surface is the limiting concentration set. The corresponding question is very well-understood for minimal hypersurfaces and the scalar Allen-Cahn equation, and for the Ginzburg-Landau equations when the minimal surface is locally area-minimizing, but otherwise quite open. We consider this question on a 3-dimensional closed Riemannian manifold (M,g), and we prove that any embedded nondegenerate closed geodesic can be realized as the asymptotic energy/vorticity concentration set of a sequence of solutions of the Ginzburg-Landau equations.

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