Uniqueness of degree-one Ginzburg-Landau vortex in the unit ball in dimensions N ≥ 7
Abstract
For ε>0, we consider the Ginzburg-Landau functional for RN-valued maps defined in the unit ball BN⊂ RN with the vortex boundary data x on ∂ BN. In dimensions N≥ 7, we prove that for every ε>0, there exists a unique global minimizer uε of this problem; moreover, uε is symmetric and of the form uε(x)=fε(|x|)x|x| for x∈ BN.
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