Symmetric vortices for two-component Ginzburg-Landau systems

Abstract

We study Ginzburg--Landau equations for a complex vector order parameter Psi=(psi+,psi-). We consider symmetric (equivariant) vortex solutions in the plane R2 with given degrees n, and prove existence, uniqueness, and asymptotic behavior of solutions for large r. We also consider the monotonicity properties of solutions, and exhibit parameter ranges in which both vortex profiles |psi+|, |psii| are monotone, as well as parameter regimes where one component is non-monotone. The qualitative results are obtained by means of a sub- and supersolution construction and a comparison theorem for elliptic systems.