A nonlinear bending theory for nematic LCE plates

Bartels, Sören; Max, Griehl,; Neukamm, Stefan; Padilla‐Garza, David; Palus, Christian

doi:10.48550/arxiv.2203.04010

Cited by 4 publications

(16 citation statements)

References 44 publications

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“…This situation admits smooth minimizing harmonic maps in each homotopy class. We start the solvers from the nodal interpolation of the function (11).…”

Section: Benchmarking the Solversmentioning

confidence: 99%

“…On a macroscopic level popular liquid crystal models are based on the Oseen-Frank energy, which is the Dirichlet energy of the field of molecule orientations. The emergence of new technologies in the manufacturing of liquid crystal compound materials as well as new ideas for technical applications [18,30,47,49] have lead to an ongoing interest also in corresponding simulation schemes [11,36,45].…”

Section: Introductionmentioning

confidence: 99%

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Benchmarking Numerical Algorithms for Harmonic Maps into the Sphere

Bartels¹,

Böhnlein²,

Palus³

et al. 2022

Preprint

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We numerically benchmark methods for computing harmonic maps into the unit sphere, with particular focus on harmonic maps with singularities. For the discretization we compare two different approaches, both based on Lagrange finite elements. While the first method enforces the unit-length constraint only at the Lagrange nodes, the other one adds a pointwise projection to fulfill the constraint everywhere. For the solution of the resulting algebraic problems we compare a nonconforming gradient flow with a Riemannian trust-region method. Both are energy-decreasing and can be shown to converge globally to a stationary point of the Dirichlet energy. We observe that while the nonconforming and the conforming discretizations both show similar behavior, the second-order trust-region method vastly outperforms the solver based on gradient flow.

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“…This situation admits smooth minimizing harmonic maps in each homotopy class. We start the solvers from the nodal interpolation of the function (11).…”

Section: Benchmarking the Solversmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Benchmarking Numerical Algorithms for Harmonic Maps into the Sphere

Bartels¹,

Böhnlein²,

Palus³

et al. 2022

Preprint

Self Cite

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show abstract

“…A notorious property of the Γ-limit model based on classical elasticity is its de-coupling of the limit into either a membrane-like (scaling with h) or bending-like problem (scaling with h 3 ), see e.g. [12,45].…”

Section: Introductionmentioning

confidence: 99%

A geometrically nonlinear Cosserat (micropolar) curvy shell model via Gamma convergence

Saem¹,

Ghiba²,

Neff³

2022

Preprint

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Using Γ-convergence arguments, we construct a nonlinear membrane-like Cosserat shell model on a curvy reference configuration starting from a geometrically nonlinear, physically linear three-dimensional isotropic Cosserat model. Even if the theory is of order O(h) in the shell thickness h, by comparison to the membrane shell models proposed in classical nonlinear elasticity, beside the change of metric, the membrane-like Cosserat shell model is still capable to capture the transverse shear deformation and the Cosserat-curvature due to remaining Cosserat effects. We formulate the limit problem by scaling both unknowns, the deformation and the microrotation tensor, and by expressing the parental three-dimensional Cosserat energy with respect to a fictitious flat configuration. The model obtained via Γ-convergence is similar to the membrane (no O(h 3 ) flexural terms, but still depending on the Cosserat-curvature) Cosserat shell model derived via a derivation approach but these two models do not coincide. Comparisons to other shell models are also included.

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“…Depending on the density of crosslinks, the director field may be either totally free [19,20] or subject to a Frank elasticity term [21,22,23,24]. This kind of blueprinted configuration describes the situation where the LCs are unconstrained or constrained only on a low-level by rubbery polymers.…”

Section: Introductionmentioning

confidence: 99%

“…The metric condition giving zero stretching energy becomes a constraint in the bending model. Some existing bending models include theory derived via formal asymptotics [25], a von Karman plate model derived in [38] using asymptotics, a rigorous Gamma convergence theory for a model of bilayer materials composed of LCEs and a classical isotropic elastic plate [24], or a plate model where the LC dramatically changes its orientation through the thickness [39]. Moreover, reduced 1D models for LCNs/LCEs have been explored as well; we refer to [40] for a rod model and to [41,42] for ribbon models.…”

Section: Introductionmentioning

confidence: 99%

Reduced Membrane Model for Liquid Crystal Polymer Networks: Asymptotics and Computation

Bouck¹,

Nochetto²,

Yang³

2022

Preprint

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We examine a reduced membrane model of liquid crystal polymer networks (LCNs) via asymptotics and computation. This model requires solving a minimization problem for a non-convex stretching energy. We show a formal asymptotic derivation of the 2D membrane model from 3D rubber elasticity. We construct approximate solutions with point defects. We design a finite element method with regularization, and propose a nonlinear gradient flow with Newton inner iteration to solve the non-convex discrete minimization problem. We present numerical simulations of practical interests to illustrate the ability of the model and our method to capture rich physical phenomena.

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A nonlinear bending theory for nematic LCE plates

Cited by 4 publications

References 44 publications

Benchmarking Numerical Algorithms for Harmonic Maps into the Sphere

Benchmarking Numerical Algorithms for Harmonic Maps into the Sphere

A geometrically nonlinear Cosserat (micropolar) curvy shell model via Gamma convergence

Reduced Membrane Model for Liquid Crystal Polymer Networks: Asymptotics and Computation

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