Ww study the vortex convergence for an inhomogeneous Ginzburg-Landau equation,-△u=ε^-2u(a(x)-|u|^2),and prove that the vortices are attracted to the ninimum point b of a(x) as ε→o.Moreover,we show that there exists a subsequeence ε→0 such that uε converges to u strongly in Hoc^1(Ω{b}).
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