Tensor finite elements for smectic liquid crystals
Thomas Führer, Norbert Heuer, and Torsten Linß
We present a tensor-based finite element scheme for a smectic-A liquid crystal model.
We propose a simple Céa-type finite element projection in the linear case
and prove its quasi-optimal convergence. Special emphasis is put on the formulation
and treatment of appropriate boundary conditions. For the nonlinear case we present
a formulation in two space dimensions and prove the existence of a solution.
We propose a discretization that extends the linear case in Uzawa-fashion to the
nonlinear case by an additional Poisson solver.
Numerical results illustrate the performance and convergence of our schemes.