On the stability of radial solutions to an anisotropic Ginzburg-Landau equation

Abstract

We study the linear stability of entire radial solutions u(reiθ)=f(r)eiθ, with positive increasing profile f(r), to the anisotropic Ginzburg-Landau equation \[ - u -δ (∂x+i∂y)2 u =(1-|u|2)u, -1<δ <1, \] which arises in various liquid crystal models. In the isotropic case δ=0, Mironescu showed that such solution is nondegenerately stable. We prove stability of this radial solution in the range δ∈ (δ1,0] for some -1<δ1<0, and instability outside this range. In strong contrast with the isotropic case, stability with respect to higher Fourier modes is not a direct consequence of stability with respect to lower Fourier modes. In particular, in the case where δ≈ -1, lower modes are stable and yet higher modes are unstable.

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