On the variation of curvature functionals in a space form with application to a generalized Willmore energy

Gruber, Anthony; Toda, Magdalena; Tran, Hung

doi:10.1007/s10455-019-09661-0

Cited by 17 publications

(13 citation statements)

References 42 publications

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“…However, one may want to construct a general curvature functional where p is a smooth function with no symmetry constraint. A similar 2 form is given in [43,106], for a smooth function q(H , K ). A generalization to functions that depend on the position and the normal to the surface can be found in [19,26].…”

Section: The Willmore Helfrich and Generalized Curvature Functionalsmentioning

confidence: 87%

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Generation of Tubular and Membranous Shape Textures with Curvature Functionals

Song

2021

J Math Imaging Vis

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Tubular and membranous shapes display a wide range of morphologies that are difficult to analyze within a common framework. By generalizing the classical Helfrich energy of biomembranes, we model them as solutions to a curvature optimization problem in which the principal curvatures may play asymmetric roles. We then give a novel phase-field formulation to approximate this geometric problem, and study its Gamma-limsup convergence. This results in an efficient GPU algorithm that we validate on well-known minimizers of the Willmore energy; the software for the implementation of our algorithm is freely available online. Exploring the space of parameters reveals that this comprehensive framework leads to a wide continuum of shape textures. This first step towards a unifying theory will have several implications, in biology for quantifying tubular shapes or designing bio-mimetic scaffolds, but also in computer graphics, materials science, or architecture.

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Section: The Willmore Helfrich and Generalized Curvature Functionalsmentioning

confidence: 87%

“…In contrast to these models, the polynomial p is here not required to be symmetric in the principal curvatures, which allows the generation of tubules. Other generalizations have been proposed in [43,106] and [19,26].…”

Section: Introductionmentioning

confidence: 99%

Generation of Tubular and Membranous Shape Textures with Curvature Functionals

Song

2021

J Math Imaging Vis

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“…Finally, from the definition of A, we have that A(η) = 4H 2 φ − 2K S + 2R η, and then the Euler-Lagrange equation boils down to [18] when the energy does not depend on the Gaussian curvature. In particular, let P (2H φ ) = H 2 φ and ρ = 0, i.e.…”

Section: Mean Curvature Energiesmentioning

confidence: 99%

Critical tori for mean curvature energies in Killing submersions

Pámpano

2020

Nonlinear Analysis

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We study surface energies depending on the mean curvature in total spaces of Killing submersions, which extend the classical notion of Willmore energy. Based on a symmetry reduction procedure, we construct vertical tori critical for these mean curvature energies. These vertical tori are based on closed curves critical for curvature energy functionals in Riemannian 2-space forms.The binormal evolution of these critical curves in Riemannian 3-space forms generates rotational tori solutions for an ample family of Weingarten surfaces. Therefore, we also introduce some correspondence results between these two types of tori and illustrate their relation.

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“…By considering an arbitrary surface energy density depending on the mean curvature, we obtain an extension of the first term in the Helfrich energy H[X], (3), which includes (but is not restricted to) the original suggestions of S. Germain [11] as well as the Willmore and p-Willmore energies (see e.g. [14]). The additional inclusion of a total Gaussian curvature term is motivated mathematically by the conformal Willmore energy W[X], (2), and the Helfrich energy H[X], (3), but also plays an important role from a physical viewpoint.…”

Section: Introductionmentioning

confidence: 99%

“…Section 4 restricts to the special case of energy densities of the type P (H) = σ(H − c o ) p for σ > 0, c o ∈ R and non-negative integer p, i.e. p-Willmore energies with spontaneous curvature [14]. Equilibria are studied for each possible choice of the parameter p, paying special attention to the "ground state" H ≡ H o = c o which appears when p ≥ 2.…”

Section: Introductionmentioning

confidence: 99%

On p-Willmore Disks with Boundary Energies

Gruber¹,

Pámpano²,

Toda³

2021

Preprint

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We consider an energy functional on surface immersions which includes contributions from both boundary and interior. Inspired by physical examples, the boundary is modeled as the center line of a generalized Kirchhoff elastic rod, while the interior term is arbitrarily dependent on the mean curvature and linearly dependent on the Gaussian curvature. We study equilibrium configurations for this energy in general among topological disks, as well as specifically for the class of examples known as p-Willmore energies.

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On the variation of curvature functionals in a space form with application to a generalized Willmore energy

Cited by 17 publications

References 42 publications

Generation of Tubular and Membranous Shape Textures with Curvature Functionals

Generation of Tubular and Membranous Shape Textures with Curvature Functionals

Critical tori for mean curvature energies in Killing submersions

On p-Willmore Disks with Boundary Energies

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