Far-Field Expansions for Harmonic Maps and the Electrostatics Analogy in Nematic Suspensions

Abstract

For a smooth bounded domain G⊂R3 we consider maps n R3 G S2 minimizing the energy E(n)=∫ R3 G|∇ n|2 +Fs(n∂ G) among S2-valued map such that n(x)≈ n0 as |x|∞. This is a model for a particle G immersed in nematic liquid crystal. The surface energy Fs describes the anchoring properties of the particle, and can be quite general. We prove that such minimizing map n has an asymptotic expansion in powers of 1/r. Further, we show that the leading order 1/r term is uniquely determined by the far-field condition n0 for almost all n0∈ S2, by relating it to the gradient of the minimal energy with respect to n0. We derive various consequences of this relation in physically motivated situations: when the orientation of the particle G is stable relative to a prescribed far-field alignment n0; and when the particle G has some rotational symmetries. In particular, these corollaries justify some approximations that can be found in the physics literature to describe nematic suspensions via a so-called electrostatics analogy.