English

A Reduced Study for Nematic Equilibria on Two-Dimensional Polygons

Mathematical Physics 2020-08-07 v2 math.MP

Abstract

We study reduced nematic equilibria on regular two-dimensional polygons with Dirichlet tangent boundary conditions, in a reduced two-dimensional Landau-de Gennes framework, discussing their relevance in the full three-dimensional framework too. We work at a fixed temperature and study the reduced stable equilibria in terms of the edge length, λ\lambda of the regular polygon, EKE_K with KK edges. We analytically compute a novel "ring solution" in the λ0\lambda \to 0 limit, with a unique point defect at the centre of the polygon for K4K \neq 4. The ring solution is unique. For sufficiently large λ\lambda, we deduce the existence of at least [K/2]\left[K/2 \right] classes of stable equilibria and numerically compute bifurcation diagrams for reduced equilibria on a pentagon and hexagon, as a function of λ2\lambda^2, thus illustrating the effects of geometry on the structure, locations and dimensionality of defects in this framework.

Keywords

Cite

@article{arxiv.1910.05740,
  title  = {A Reduced Study for Nematic Equilibria on Two-Dimensional Polygons},
  author = {Yucen Han and Apala Majumdar and Lei Zhang},
  journal= {arXiv preprint arXiv:1910.05740},
  year   = {2020}
}

Comments

21 pages, 12 figures

R2 v1 2026-06-23T11:42:14.487Z