Description of limiting vorticities for the magnetic 2D Ginzburg-Landau equations

Abstract

Let be a bounded open set in R2. The aim of this article is to describe the functions h in H1() and the Radon measures μ which satisfy - h+h=μ and div(Th)=0 in , where Th is a 2× 2 matrix given by (Th)ij=2∂ih∂jh- (|∇ h|2+h2)δij for i,j=1,2. These equations arise as equilibrium conditions satisfied by limiting vorticities and limiting induced magnetic fields of solutions of the magnetic Ginzburg-Landau equations as shown by Sandier-Serfaty. Let us recall that they obtained that |∇ h| is continuous in . We prove that if x0 in belongs to μ and is such that |∇ h(x0)|≠ 0 then μ is absolutely continuous with respect to the 1D-Hausdorff measure restricted to a C1-curve near x0 whereas μ \| ∇ h|=0\=h|\ |∇ h|=0\. We also prove that if is smooth bounded and star-shaped and if h=0 on ∂ then h 0 in . This rules out the possibility of having critical points of the Ginzburg-Landau energy with a number of vortices much larger than the applied magnetic field hex in that case.