A remark on the radial minimizer of the Ginzburg-Landau functional
Abstract
Denote by Eε the Ginzburg-Landau functional in the plane and let u be the radial solution to the Euler equation associated to the problem \E(u,B1): \>. u ∂ B1=( , )\. Let ⊂ 2 be a smooth, bounded domain with the same area as B1. Denoted by K=\v=(v1,v2) ∈ H1(;2):\> ∫ v1\,dx=∫ v2\,dx=0,\> ∫ |v|2\,dx ∫B1 | u|2\,dx\, we prove v ∈ K E (v,) E ( u,B1).
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