Asymptotic behavior of critical points of an energy involving a loop-well potential
Abstract
We describe the asymptotic behavior of critical points of ∫ [(1/2)|∇ u|2+W(u)/2] when 0. Here, W is a Ginzburg-Landau type potential, vanishing on a simple closed curve . Unlike the case of the standard Ginzburg-Landau potential W(u)=(1-|u|2)2/4, studied by Bethuel, Brezis and H\'elein, we do not assume any symmetry on W or . In order to overcome the difficulties due to the lack of symmetry, we develop new tools which might be of independent interest.
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