Local minimality of RN-valued and SN-valued Ginzburg-Landau vortex solutions in the unit ball BN

Abstract

We study the existence, uniqueness and minimality of critical points of the form m,η(x) = (f,η(|x|)x|x|, g,η(|x|)) of the functional \[ E,η[m] = ∫BN [12 |∇ m|2 + 122 (1 - |m|2)2 + 12η2 mN+12]\,dx \] for m=(m1, …, mN, mN+1) ∈ H1(BN,RN+1) with m(x) = (x,0) on ∂ BN. We establish a necessary and sufficient condition on the dimension N and the parameters and η for the existence of an escaping vortex solution (f,η, g,η) with g,η> 0. We also establish its uniqueness and local minimality. In the limiting case η = 0, we prove the local minimality of the degree-one vortex solution for the Ginzburg-Landau (GL) energy for every > 0 and N ≥ 2. Similarly, when = 0, we prove the local minimality of the degree-one escaping vortex solution to an SN-valued GL model arising in micromagnetics for every η > 0 and 2 ≤ N ≤ 6.