Add to ORKGWe study the azimuthal defect-free nematic state on a two-dimensional annulus within a simplified and reduced two-dimensional Landau–de Gennes model for nematic liquid crystals. We perform a detailed asymptotic analysis of the instabilities of the defect-free state in terms of a dimensionless material and temperature-dependent variable and the annular aspect ratio. The asymptotic analysis is accompanied by a rigorous local stability result, again in terms of a dimensionless material and temperature-dependent parameter and annular aspect ratio. In contrast to Oseen-Frank predictions, the defect-free state can be unstable in this model, with elastic isotropy and strong anchoring, for a range of macroscopically relevant annular aspect ratios
Defects in liquid crystals are of great practical importance and theoretical interest. Despite treme...
We investigate prototypical profiles of point defects in two-dimensional liquid crystals within the ...
We present numerical solutions to the Landau-de Gennes free-energy model under the one-constant appr...
We study the azimuthal defect-free nematic state on a two-dimensional annulus within a simplified an...
We study planar nematic equilibria on a two-dimensional annulus with strong and weak tangent anchori...
Nematic liquid crystals are mesogenic materials that are popular working materials for optical displ...
We study the effects of elastic anisotropy on Landau- de Gennes critical points, for nematic liquid ...
We model nematic liquid crystals using the Landau-de Gennes continuum theory, where equilibrium conf...
We study $k$-radially symmetric solutions corresponding to topological defects of charge $\frac{k}{2...
In this paper, we prove the stability of half-degree point defect profiles in R-2 for the nematic li...
International audienceWe study $k$-radially symmetric solutions corresponding to topological defects...
We analyze nematic defects on arbitrary three-dimensional (3D) geometries subject to strong anchorin...
We study a class of symmetric critical points in a variational 2D Landau-de Gennes model where the s...
We study nematic equilibria on rectangular domains, in a reduced two-dimensional Landau–de Gennes fr...
We study nematic equilibria in an unbounded domain, with a two-dimensional regular polygonal hole wi...
Defects in liquid crystals are of great practical importance and theoretical interest. Despite treme...
We investigate prototypical profiles of point defects in two-dimensional liquid crystals within the ...
We present numerical solutions to the Landau-de Gennes free-energy model under the one-constant appr...
We study the azimuthal defect-free nematic state on a two-dimensional annulus within a simplified an...
We study planar nematic equilibria on a two-dimensional annulus with strong and weak tangent anchori...
Nematic liquid crystals are mesogenic materials that are popular working materials for optical displ...
We study the effects of elastic anisotropy on Landau- de Gennes critical points, for nematic liquid ...
We model nematic liquid crystals using the Landau-de Gennes continuum theory, where equilibrium conf...
We study $k$-radially symmetric solutions corresponding to topological defects of charge $\frac{k}{2...
In this paper, we prove the stability of half-degree point defect profiles in R-2 for the nematic li...
International audienceWe study $k$-radially symmetric solutions corresponding to topological defects...
We analyze nematic defects on arbitrary three-dimensional (3D) geometries subject to strong anchorin...
We study a class of symmetric critical points in a variational 2D Landau-de Gennes model where the s...
We study nematic equilibria on rectangular domains, in a reduced two-dimensional Landau–de Gennes fr...
We study nematic equilibria in an unbounded domain, with a two-dimensional regular polygonal hole wi...
Defects in liquid crystals are of great practical importance and theoretical interest. Despite treme...
We investigate prototypical profiles of point defects in two-dimensional liquid crystals within the ...
We present numerical solutions to the Landau-de Gennes free-energy model under the one-constant appr...