A variational singular perturbation problem motivated by Ericksen's model for nematic liquid crystals

Abstract

We study the asymptotic behavior, when 0, of the minimizers \u\>0 for the energy equation* E(u)=∫(|∇ u|2+(12-1)|∇|u||2), equation* over the class of maps u∈ H1(, R2) satisfying the boundary condition u=g on ∂, where is a smooth, bounded and simply connected domain in R2 and g:∂ S1 is a smooth boundary data of degree D1. The motivation comes from a simplified version of the Ericksen model for nematic liquid crystals with variable degree of orientation. We prove convergence (up to a subsequence) of \u\ towards a singular S1-valued harmonic map u*, a result that resembles the one obtained in BBH for an analogous problem for the Ginzburg-Landau energy. There are however two striking differences between our result and the one involving the Ginzburg-Landau energy. First, in our problem the singular limit u* may have singularities of degree strictly larger than one. Second, we find that the principle of equi-partition holds for the energy of the minimizers, i.e., the contributions of the two terms in E(u) are essentially equal.