A Ginzburg-Landau type problem for highly anisotropic nematic liquid crystals

Abstract

We carry out an asymptotic analysis of a thin nematic liquid crystal in which one elastic constant dominates over the others, namely align energyab ∈f E(u)where E(u) := 12∫ \\,|∇ u|2 + 1 \,(|u|2 - 1)2 + L \,(div\,u)2\ \,dx. align Here u: R2 is a vector field, 0 < 1 is a small parameter, and L > 0 is a fixed constant, independent of . We derive the -limit E0, which is a sum of a bulk term penalizing divergence and an Aviles-Giga type wall energy involving the cube of the jump in the tangential component of the S1-valued order parameter. We then derive criticality conditions for E0 and analyze minimization of E0 both rigorously and numerically for various domains and a variety of Dirichlet boundary conditions.