Global uniform estimate for the modulus of 2D Ginzburg-Landau vortexless solutions with asymptotically infinite boundary energy
Abstract
For >0, let u: R2 be a solution of the Ginzburg-Landau system - u= 12 u (1-|u|2) in a Lipschitz bounded domain . In an energy regime that excludes interior vortices, we prove that 1-|u| is uniformly estimated by a positive power of globally in provided that the energy of u at the boundary ∂ does not grow faster than -α with α∈ (0,1).
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