Solutions of the Ginzburg-Landau equations concentrating on codimension-2 minimal submanifolds

Abstract

We consider the magnetic Ginzburg-Landau equations in a compact manifold N cases -2 A u=12(1-|u|2)u,\\ 2 d*dA=∇A u,iu cases formally corresponding to the Euler-Lagrange equations for the energy functional E(u,A)=12∫N2|∇Au|2+4|dA|2+14(1-|u|2)2. Here u:N C and A is a 1-form on N. Given a codimension-2 minimal submanifold M⊂ N which is also oriented and non-degenerate, we construct a solution (u,A) such that u has a zero set consisting of a smooth surface close to M. Away from M we have u(x)z|z|, A(x)1|z|2(-z2dz1+z1dz2), x=y(zββ(y)). as 0, for all sufficiently small z 0 and y∈ M. Here, \1,2\ is a normal frame for M in N. This improves a recent result by De Philippis and Pigati who built a solution for which the concentration phenomenon holds in an energy, measure-theoretical sense.

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