Quantization and non-quantization of energy for higher-dimensional Ginzburg-Landau vortices

Abstract

Given a family of critical points uε:Mn for the complex Ginzburg--Landau energies align* &Eε(u)=∫M(|du|22+(1-|u|2)24ε2), align* on a manifold M, with natural energy growth Eε(uε)=O(|ε| ), it is known that the vorticity sets \|uε|≤ 12\ converge subsequentially to the support of a stationary, rectifiable (n-2)-varifold V in the interior, characterized as the concentrated portion of the limit ε 0 eε(uε)π|ε| of the normalized energy measures. When n=2 or the solutions uε are energy-minimizing, it is known moreover that this varifold V is integral; i.e., the (n-2)-density n-2(|V|,x) of |V| takes values in N at |V|-a.e. x∈ M. In the present paper, we show that for a general family of critical points with Eε(uε)=O(|ε| ) in dimension n≥ 3, this energy quantization phenomenon only holds where the density is less than 2: namely, we prove that the density n-2(|V|,x) of the limit varifold takes values in \1\ [2,∞) at |V|-a.e. x∈ M, and show that this is sharp, in the sense that for any n≥ 3 and θ∈ \1\ [2,∞), there exists a family of critical points uε for Eε in the ball B1n(0) with concentration varifold V given by an (n-2)-plane with density θ.