A priori estimates and η-compactness for anisotropic Ginzburg-Landau minimizers with tangential anchoring
Abstract
We consider minimizers u of the Ginzburg-Landau energy with quadratic divergence or curl penalization on a simply-connected two-dimensional domain . On the boundary, strong tangential anchoring is imposed. We prove a priori estimates for u in L∞ uniform in and that the Lipschitz constant of u blows up like -1. We then deduce compactness for a subsequence that converges to an S1-valued map with either one interior point defect or two boundary half-defects. We conclude our study with a proof that no boundary vortices can occur in the divergence penalized case.
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