Entire vortex solutions of negative degree for the anisotropic Ginzburg-Landau system
Abstract
The anisotropic Ginzburg-Landau system \[ u+δ\, ∇ (div\: u) +δ\, curl*(curl\: u)=(|u|2-1) u, \] for u R2 R2 and δ∈ (-1,1), models the formation of vortices in liquid crystals. We prove the existence of entire solutions such that |u(x)| 1 and u has a prescribed topological degree d≤ -1 as |x|∞, for small values of the anisotropy parameter |δ| < δ0(d). Unlike the isotropic case δ=0, this cannot be reduced to a one-dimensional radial equation. We obtain these solutions by minimizing the anisotropic Ginzburg-Landau energy in an appropriate class of equivariant maps, with respect to a finite symmetry subgroup.
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