A Finite Element Method for a Phase Field Model of Nematic Liquid Crystal Droplets

Abstract: We develop a novel finite element method for a phase field model of nematic liquid crystal droplets.The continuous model considers a free energy comprised of three components: the Ericksen's energy for liquid crystals, the Cahn-Hilliard energy representing the interfacial energy of the droplet, and a weak anchoring energy representing the interaction of the liquid crystal molecules with the surface tension on the interface (i.e. anisotropic surface tension). Applications of the model are for finding minimizers… Show more

“…In contrast, our method has the following advantages: (a) no assumption is made on the mesh structure (other than being shape regular); (b) the Ericksen energy can be very general (not just the one-constant approximation); (c) the method non-linearly couples full electro-statics, which was not done previously. Therefore, our result is more general than in [33,70,71].…”

“…We show that the finite element approximation of the discrete energy (3.18) Γ-converges to the continuous energy (2.42). The result presented here is not the same as the result shown in [70,71] or in [33], all of which used a special discretization of the Ericksen energy that is limited to the one constant approximation (5.2). Furthermore, their discretization requires the underlying mesh to be weakly acute in order to prove Γ-convergence of their method; the weakly acute assumption is quite severe for three-dimensional meshes [51,52,86].…”

“…We use an alternating direction minimization algorithm, similar to what is in [33,63,70,71], for finding discrete (local) minimizers of ℎ . In addition, we use a line search to ensure that the energy decreases at each step.…”

“…which is needed to ensure that does not trivially vanish on the interface, and so cause (2.30) to vanish as well [33,63,71]. The parameters ⊥ , ‖ , ori : Γ → [0, ∞) allow for different weighting and the ability to model more general physical settings; throughout the paper, we assume ⊥ , ‖ , ori in ∞ (Γ).…”

“…A discrete form of the energy (5.2) was developed in [69,70] and shown to Γ-converge to (5.2); in addition, a method for computing discrete minimizers was given. This method was later extended to account for colloidal particle effects and external electric fields [71], as well as simulating liquid crystal droplets with anisotropic surface tension effects [33,63]. The two main limitations of the approach in [33,63,70,71] are: (1) it is for the one-constant Ericksen model, and (2) the method requires the computational mesh to be weakly acute to guarantee convexity of the discrete energy.…”

A finite element method for the generalized Ericksen model of nematic liquid crystals

“…In contrast, our method has the following advantages: (a) no assumption is made on the mesh structure (other than being shape regular); (b) the Ericksen energy can be very general (not just the one-constant approximation); (c) the method non-linearly couples full electro-statics, which was not done previously. Therefore, our result is more general than in [33,70,71].…”

“…We show that the finite element approximation of the discrete energy (3.18) Γ-converges to the continuous energy (2.42). The result presented here is not the same as the result shown in [70,71] or in [33], all of which used a special discretization of the Ericksen energy that is limited to the one constant approximation (5.2). Furthermore, their discretization requires the underlying mesh to be weakly acute in order to prove Γ-convergence of their method; the weakly acute assumption is quite severe for three-dimensional meshes [51,52,86].…”

“…We use an alternating direction minimization algorithm, similar to what is in [33,63,70,71], for finding discrete (local) minimizers of ℎ . In addition, we use a line search to ensure that the energy decreases at each step.…”

“…which is needed to ensure that does not trivially vanish on the interface, and so cause (2.30) to vanish as well [33,63,71]. The parameters ⊥ , ‖ , ori : Γ → [0, ∞) allow for different weighting and the ability to model more general physical settings; throughout the paper, we assume ⊥ , ‖ , ori in ∞ (Γ).…”

“…A discrete form of the energy (5.2) was developed in [69,70] and shown to Γ-converge to (5.2); in addition, a method for computing discrete minimizers was given. This method was later extended to account for colloidal particle effects and external electric fields [71], as well as simulating liquid crystal droplets with anisotropic surface tension effects [33,63]. The two main limitations of the approach in [33,63,70,71] are: (1) it is for the one-constant Ericksen model, and (2) the method requires the computational mesh to be weakly acute to guarantee convexity of the discrete energy.…”

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