We study a modified Landau–de Gennes model for nematic liquid crystals, where the elastic term is assumed to be of subquadratic growth in the gradient. We analyze the behaviour of global minimizers in two- and three-dimensional domains, subject to uniaxial boundary conditions, in the asymptotic regime where the length scale of the defect cores is small compared to the length scale of the domain. We obtain uniform convergence of the minimizers and of their gradients, away from the singularities of the limiting uniaxial map. We also demonstrate the presence of maximally biaxial cores in minimizers on two-dimensional domains, when the temperature is sufficiently low.
|Number of pages||42|
|Journal||Archive for Rational Mechanics and Analysis|
|Early online date||1 Apr 2019|
|Publication status||Published - 1 Sept 2019|
- Landau–de Gennes model
- nematic liquid crystals
- elastic energy