A Natural Min-Max Construction for Ginzburg-Landau Functionals

Abstract

We use min-max techniques to produce nontrivial solutions uε:M R2 of the Ginzburg-Landau equation uε+1ε2(1-|uε|2)uε=0 on a given compact Riemannian manifold, whose energy grows like |ε| as ε 0. When the degree one cohomology H1dR(M)=0, we show that the energy of these solutions concentrates on a nontrivial stationary, rectifiable (n-2)-varifold V.