English

Weak Anchoring for a Two-Dimensional Liquid Crystal

Analysis of PDEs 2014-08-18 v2

Abstract

We study the weak anchoring condition for nematic liquid crystals in the context of the Landau-De Gennes model. We restrict our attention to two dimensional samples and to nematic director fields lying in the plane, for which the Landau-De Gennes energy reduces to the Ginzburg--Landau functional, and the weak anchoring condition is realized via a penalized boundary term in the energy. We study the singular limit as the length scale parameter ε0\varepsilon\to 0, assuming the weak anchoring parameter λ=λ(ε)\lambda=\lambda(\varepsilon)\to\infty at a prescribed rate. We also consider a specific example of a bulk nematic liquid crystal with an included oil droplet and derive a precise description of the defect locations for this situation, for λ(ε)=Kεα\lambda(\varepsilon)=K\varepsilon^{-\alpha} with α(0,1]\alpha\in (0,1]. We show that defects lie on the weak anchoring boundary for α(0,12)\alpha\in (0,\frac12), or for α=12\alpha=\frac12 and KK small, but they occur inside the bulk domain Ω\Omega for α>12\alpha>\frac12 or α=12\alpha=\frac12 with KK large.

Keywords

Cite

@article{arxiv.1405.3024,
  title  = {Weak Anchoring for a Two-Dimensional Liquid Crystal},
  author = {Stan Alama and Lia Bronsard and Bernardo Galvao-Sousa},
  journal= {arXiv preprint arXiv:1405.3024},
  year   = {2014}
}

Comments

appears in Nonlinear Analysis A 2014

R2 v1 2026-06-22T04:12:37.069Z