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Ginzburg-Landau Vortices in Inhomogeneous Superconductors |
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| Authors: | Huaiyu Jian & Youde Wang |
| Abstract: | We study the vortex convergence for an inhomogeneous Ginzburg-Landau equation, -Δu = ∈^{-2}u(a(x) - |u|²), and prove that the vortices are attracted to the minimum point b of a(x) as ∈ → 0. Moreover, we show that there exists a subsequence ∈ → 0 such that u_∈ converges to u strongly in H¹_{loc}(overline{Ω} {b}). |
| Keywords: | Vortex Ginzburg-Landau equation elliptic estimate H¹-strong convergence |
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