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Symmetry and multiplicity of solutions in a two-dimensional Landau-de Gennes model for liquid crystals

We consider a variational two-dimensional Landau-de Gennes model in the theory of nematic liquid crystals in a disk of radius $R$. We prove that under a symmetric boundary condition carrying a topological defect of degree $\frac{k}{2}$ for some given {\bf even} non-zero integer $k$, there are exactly two minimizers for all large enough $R$. We show that the minimizers do not inherit the full symmetry structure of the energy functional and the boundary data. We further show that there are at least five symmetric critical points.

preprint2019arXivOpen access
Radu IgnatLuc NguyenValeriy SlastikovArghir Zarnescu
math.AP
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Open access4 authors1 topic
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Radu IgnatLuc NguyenValeriy SlastikovArghir Zarnescu

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