Biaxiality in the asymptotic analysis of a 2D Landau−de Gennes model for liquid crystals

Biaxiality in the asymptotic analysis of a 2D Landau−de Gennes model for liquid crystals

We consider the Landau−de Gennes variational problem on a bounded, two dimensional domain, subject to Dirichlet smooth boundary conditions. We prove that minimizers are maximally biaxial near the singularities, that is, their biaxiality parameter reaches the maximum value 1. Moreover, we discuss the...

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Veröffentlicht in:ESAIM. Control, optimisation and calculus of variations optimisation and calculus of variations, 2015-01, Vol.21 (1), p.101-137
1. Verfasser: Canevari, Giacomo
Format: Artikel
Sprache:eng
Schlagworte:
35B40
35J25
35J61
35Q70
Asymptotic properties
biaxiality
Boundary conditions
convergence
Dirichlet problem
Elastic limit
Elastic properties
Landau−de Gennes model
Liquid crystals
Q-tensor
Singularity (mathematics)
Smooth boundaries
Two dimensional analysis
Two dimensional models
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Beschreibung
Zusammenfassung:We consider the Landau−de Gennes variational problem on a bounded, two dimensional domain, subject to Dirichlet smooth boundary conditions. We prove that minimizers are maximally biaxial near the singularities, that is, their biaxiality parameter reaches the maximum value 1. Moreover, we discuss the convergence of minimizers in the vanishing elastic constant limit. Our asymptotic analysis is performed in a general setting, which recovers the Landau−de Gennes problem as a specific case.
ISSN:1292-8119
1262-3377
DOI:10.1051/cocv/2014025