Your search keyword '"Radial hedgehog"' showing total 4 results

1. Defects in liquid crystals : mathematical and experimental studies

Author

Lewis, Alexander, Aarts, Dirk, Majumdar, Apala, and Howell, Peter

Subjects

530.4, Mathematics, Liquid Crystals, Defects in liquid crystals, Radial hedgehog, fd-virus

Abstract

Nematic liquid crystals are mesogenic materials that are popular working materials for optical displays. There has been an increased interest in bistable liquid crystal devices which support two optically distinct stable equilibria. These devices typically exploit a complex geometry or anchoring conditions, which often induces defects in the equilibria. There remains a great deal to be understood about the structure of the defects and how they stabilize multiple equilibria in modern devices. This thesis focuses on four problems: the first three explore the effect of confinement and defects on nematic equilibria in simple geometries, with the aim of exploring multistability in these geometries; the fourth problem concerns the fine structure of point defects, essential for future modelling of nematic equilibria in more complex geometries. Firstly, we study nematic liquid crystals confined to two-dimensional rectangular wells using the Oseen-Frank theory. Secondly, we study equilibria within a semi-infinite rectangular domain with weak tangential anchoring on the surfaces. Thirdly, we study nematic equilibria within two-dimensional annuli. We derive explicit expressions for the director fields and free energies of equilibria within these geometries and discuss the stability of the predicted states. These three problems are motivated by the experimental work on colloidal nematic liquid crystals, which we interpret in the context of our results. Finally, we study the fine structure and stability of the radial hedgehog defect in the Landau-de Gennes theory with a sixth order bulk potential, relevant to the observability of global biaxial phases in a model with higher order potential terms.

Published

2015

2. Perturbed hedgehogs: continuous deformation of point defects in biaxial nematic liquid crystals.

Author

CHILLINGWORTH, D. R. G.

Subjects

*DEFORMATIONS (Mechanics), *POINT defects, *NEMATIC liquid crystals, *PHYSICAL laws, *ECOLOGICAL disturbances

Abstract

A spherically symmetric isolated point defect in a 3D uniaxial nematic liquid crystal sample is often called a radial hedgehog. We use topological methods to describe local configurations of uniaxial and biaxial states into which a hedgehog naturally deforms under small perturbations: these include the biaxial torus and split core configurations studied in the literature using analytical and numerical methods. The topological results here take no account of the governing physical laws but provide a library of options from which the physics must make a choice. [ABSTRACT FROM AUTHOR]

Published

2016

3. SYMMETRY OF UNIAXIAL GLOBAL LANDAU--DE GENNES MINIMIZERS IN THE THEORY OF NEMATIC LIQUID CRYSTALS.

Author

HENAO, DUVAN and MAJUMDAR, APALA

Subjects

*LIQUID crystals, *EQUATIONS, *SUPERCONDUCTIVITY, *EQUILIBRIUM, *BOUNDARY value problems

Abstract

We extend the recent radial symmetry results by Pisante [J. Funct. Anal., 260 (2011), pp. 892-905] and Millot and Pisante [J. Eur. Math. Soc. (JEMS), 12 (2010), pp. 1069- 1096] (who show that the equivariant solutions are the only entire solutions of the three-dimensional Ginzburg--Landau equations in superconductivity theory) to the Landau--de Gennes framework in the theory of nematic liquid crystals. In the low temperature limit, we obtain a characterization of global Landau--de Gennes minimizers, in the restricted class of uniaxial tensors, in terms of the well-known radial-hedgehog solution. We use this characterization to prove that global Landau--de Gennes minimizers cannot be purely uniaxial for sufficiently low temperatures. [ABSTRACT FROM AUTHOR]

Published

2012

4. Singularités dans le modèle de Landau-de Gennes pour les cristaux liquides

Author

Canevari, Giacomo, Laboratoire Jacques-Louis Lions (LJLL), Université Pierre et Marie Curie - Paris 6 (UPMC)-Université Paris Diderot - Paris 7 (UPD7)-Centre National de la Recherche Scientifique (CNRS), Université Pierre & Marie Curie - Paris 6, Fabrice Bethuel, Université Pierre et Marie Curie - Paris VI, STAR, ABES, and Canevari, Giacomo

Subjects

Biaxialité, radial hedgehog, Q-tensors, functions of Vanishing Mean Oscillation, uniaxialité et biaxialité, analyse asymptotique, indice d’un champ de vecteurs, singularités topologiques, [MATH.MATH-GM]Mathematics [math]/General Mathematics [math.GM], uniaxial and biaxial tensors, solutions à symétrie radiale, [MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], [MATH.MATH-AP] Mathematics [math]/Analysis of PDEs [math.AP], hérisson radial, formule de Poincaré-Hopf-Morse, Landau-de Gennes, line defects, [MATH.MATH-GM] Mathematics [math]/General Mathematics [math.GM], Topological peculiarity, asymptotic analysis, topological singularities, index of a vector field, radially symmetric solutions, rectifiable sets, Poincaré-Hopf-Morse formula, ensembles rectifiables, défauts de ligne, Q-tenseurs, fonctions VMO (« Vanishing Mean Oscillation »)

Abstract

In this thesis we consider the Landau-de Gennes variational model for nematic liquid crystals. Nematic liquid crystals are an intermediate phase of matter, which shares properties both with liquids and crystalline solids. They are composed of molecules which can flow freely, but tend to align locally along some preferred directions. Nematic phases exhibit defects, which can occur at isolated points or along lines, and are one of their mean features. This thesis mainly aims at discussing some results towards the mathematical understanding of defects and their generation, within the framework of the Landau-de Gennes theory.In the first chapter, we study minimizers of the energy functional in a bounded, smooth domain in dimension two. We are interested in their asymptotic behaviour as the elastic constant tends to zero. We show that minimizers converge to a locally minimizing harmonic map, with a finite number of point singularities. Moreover, minimizers are biaxial in the core of defects. Biaxiality means that more than one preferred direction of molecular alignment exists at a given point.Chapter two deals with the asymptotic analysis of minimizers in dimension three. We assume that the energy is comparable to the logarithm of the elastic constant and prove a compactness result, as in the two-dimensional case. However, the limiting map is now allowed to have line singularities as well as point singularities. We also provide sufficient conditions for the logarithmic energy estimate to be satisfied.In the third chapter, we study the existence of radially symmetric minimizers on spherical shells, in dimension three. We prove that, if the shell width is small enough or the temperature is low enough, then there exists a unique minimizer for the Landau-de gennes energy, which is radially symmetric. Finally, in chapter four, we discuss a topological obstruction to the existence of unit vector fields of low regularity on a compact manifold with boundary. This result can be understood as a first step in the analysis of some variational models for a surface coated with a thin nematic film., Dans cette thèse, nous nous intéressons aux cristaux liquides nématiques, qui sont une phase de la matière intermédiaire entre les liquides et les solides cristallins ; en particulier, les molécules peuvent se déplacer librement, mais elles tendent à s’orienter localement dans une direction commune. Ces états sont caractérisés par la présence de défauts ponctuels ou de ligne. L’objectif principal de cette thèse est d’apporter une contribution à l’étude mathématique des défauts, dans le cadre de la théorie variationnelle de Landau-de Gennes.Dans le premier chapitre, nous nous intéressons aux minimiseurs de l’énergie dans des domaines bornés et réguliers de dimension deux. Nous nous intéressons au comportement asymptotique lorsque la constante élastique du matériau tend vers zéro. Nous montrons que les minimiseurs convergent vers une application localement harmonique, avec un nombre fini de singularités ponctuelles. Au voisinage de celles-ci, les minimiseurs sont biaxes, c’est-à-dire, deux directions d’alignement local sont présentes en tout point.Le deuxième chapitre est consacré à l’analyse asymptotique des minimiseurs en dimension trois, en supposant l’énergie majorée par le logarithme de la constante élastique. Comme dans le cas bidimensionnel nous obtenons un résultat de compacité des minimiseurs, mais cette fois l’application limite peut présenter à la fois des singularités ponctuelles et de ligne. Nous donnons aussi des conditions suffisantes pour que l’hypothèse sur l’énergie évoquée précédemment soit satisfaite.Le troisième chapitre porte sur l’existence de minimiseurs à symétrie radiale dans une couronne en dimension trois. Nous montrons que, si la largeur de la couronne est petite ou la température est suffisamment basse, alors il existe un unique minimiseur, qui est à symétrie radiale, pour l’énergie de Landau-de Gennes. Enfin, dans le dernier chapitre nous présentons une obstruction topologique à l’existence de champs de vecteurs unitaires de faible régularité, sur des variétés compactes à bord. Ce résultat peut être considéré comme une étape préliminaire à l’étude de certains modèles variationnels pour les films nématiques sur une surface.

Published

2015