Abstract
This paper is concerned with the asymptotic behavior of the radial minimizers of the p(x)-Ginzburg-Landau type functional. We prove the uniqueness of radial minimizers in the case of 1 < p(x) < 2. In addition, this unique minimizer can be viewed as a limit of radial minimizers of a regularized functional. Based on these results, we obtain the Hölder convergence by establishing the local W 1,l-estimate. A new technique of counteracting the singularity plays a key role by estimating an accurate asymptotic rate. We believe that such a uniform estimate can provide some enlightenments how to handle other Ginzburg-Landau type equations, such as the p(x)-Laplace system without the radial structure.
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