Uniform profile near the point defect of Landau-de Gennes model
Abstract
For the Landau-de Gennes functional on 3D domains, equation* I(Q,):=∫\12|∇ Q|2+12( -a22tr(Q2)-b23tr(Q3)+c24[tr(Q2)]2 ) \\,dx, equation* it is well-known that under suitable boundary conditions, the global minimizer Q converges strongly in H1() to a uniaxial minimizer Q*=s+(n* n*-13Id) up to some subsequence n→∞ , where n*∈ H1(,S2) is a minimizing harmonic map. In this paper we further investigate the structure of Q near the core of a point defect x0 which is a singular point of the map n*. The main strategy is to study the blow-up profile of Q_n(xn+n y) where \xn\ are carefully chosen and converge to x0. We prove that Q_n(xn+n y) converges in C2loc(Rn) to a tangent map Q(x) which at infinity behaves like a "hedgehog" solution that coincides with the asymptotic profile of n* near x0. Moreover, such convergence result implies that the minimizer Q_n can be well approximated by the Oseen-Frank minimizer n* outside the O(n) neighborhood of the point defect.
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