Defect ground states for liquid crystals on cones and hyperbolic cones

TL;DR

This paper investigates the ground states of liquid crystals on conical and hyperbolic cone surfaces, revealing how boundary conditions and cone geometry influence defect configurations and topological charges.

Contribution

It provides a detailed analysis of defect states in liquid crystals on cones, including the effects of boundary conditions and the extension to hyperbolic cones, supported by numerical validation.

Findings

Ground states depend on cone angle and symmetry, with apex absorbing or emitting quantized defects.

Numerical simulations confirm analytical predictions for specific cone geometries.

Hyperbolic cones exhibit defect pair nucleation influenced by negative deficit angles.

Abstract

This contribution is intended for Journal of Physics A: Mathematical and Theoretical Special issue on Non-equilibrium Dynamics in Complex Systems: Celebrating the Contributions of Uwe T\"{a}uber on his 60th Birthday. Cones with orientational order in the local tangent plane provide a soft matter analog of the Aharonov-Bohm effect. We first review recent work on 2D liquid crystals with $p$-fold rotational symmetry on cones. We exploit an analogy with electrostatics to determine the ground state as a function of both the cone angle and the liquid crystal symmetry for both free and tangential boundary conditions applied at the cone base. There is an effective topological charge $-\chi$ at the apex, where $2\pi\chi$ is the deficit angle. The ground states are in general frustrated due to parallel transport along the azimuthal direction on the cone. In the case of tangential boundary conditions, the ground state changes as a function of $\chi$, where the apex absorbs and emits quantized defect charges, with intricate dependence on both the deficit angle and $p$. We check our predictions numerically for a set of commensurate cone angles, whose surfaces can be polygonized as a perfect triangular or square mesh, and find excellent agreement. Cones with both free and tangential boundary conditions can also exhibit metastable states distinguished by quantized screening of the apex charge. We also present preliminary work on hyperbolic cones, where the Gaussian curvature singularity is negative at the apex. When free boundary conditions are applied at the base, the ground states are characterized by an effective topological charge at the apex, similarly to the case of conventional cones. However, when tangential boundary conditions are applied, decreasing the deficit angle (which is now negative) induces neutral defect pair nucleation at the apex followed by emission of a positive defect.