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The long-time behavior of the transient Ginzburg-Landau model for superconductivity II

✍ Scribed by Jishan Fan

Publisher
Elsevier Science
Year
1996
Tongue
English
Weight
138 KB
Volume
9
Category
Article
ISSN
0893-9659

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✦ Synopsis

In this paper we prove that the global existence, uniqueness of the solution of a Ginzburg-Landau superconductivity model with the assumptions that the initial data (Β’0, ~40) E Β£2(12) x L2(ft) only. Under suitable choice of gauge, say, the Lorentz gauge or the Coulomb gauge, we prove that the solutions of the evolutionary superconductivity model must subconverge strongly in ~2(~) x H2(i-/) to one of the solutions of the stationary problem in the Coulomb gauge as time goes to infinity. Because we know little about the number of solutions of the corresponding stationary problem, we can only prove subconvergence in time. However, we can also prove the existence of a maximal attractor in Β£:2(~t) x L2(f~) and of an inertial set under the Lorentz gauge.

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## Let be a domain in R n occupied by a superconductor material. According to the Ginzburg-Landau theory, the order parameter (complex-valued) and the induced magnetic potential A of the material must minimize the following Ginzburg-Landau functional: where H is the applied magnetic ΓΏeld and k is