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- Willmore_energy abstract "In differential geometry, the Willmore energy is a quantitative measure of how much a given surface deviates from a round sphere. Mathematically, the Willmore energy of a smooth closed surface embedded in three-dimensional Euclidean space is defined to be the integral of the square of the mean curvature minus the Gaussian curvature. It is named after the English geometer Thomas Willmore.".
- Willmore_energy wikiPageID "2072431".
- Willmore_energy wikiPageLength "4012".
- Willmore_energy wikiPageOutDegree "37".
- Willmore_energy wikiPageRevisionID "674259195".
- Willmore_energy wikiPageWikiLink Calculus_of_variations.
- Willmore_energy wikiPageWikiLink Category:Differential_geometry.
- Willmore_energy wikiPageWikiLink Category:Geometric_flow.
- Willmore_energy wikiPageWikiLink Category:Surfaces.
- Willmore_energy wikiPageWikiLink Cell_membrane.
- Willmore_energy wikiPageWikiLink Closed_surface.
- Willmore_energy wikiPageWikiLink Conformal_map.
- Willmore_energy wikiPageWikiLink Conformal_transform.
- Willmore_energy wikiPageWikiLink Critical_point_(mathematics).
- Willmore_energy wikiPageWikiLink Differentiable_manifold.
- Willmore_energy wikiPageWikiLink Differential_geometry.
- Willmore_energy wikiPageWikiLink Embedding.
- Willmore_energy wikiPageWikiLink Euclidean_space.
- Willmore_energy wikiPageWikiLink Euler_characteristic.
- Willmore_energy wikiPageWikiLink Gaussian_curvature.
- Willmore_energy wikiPageWikiLink Gauss–Bonnet_theorem.
- Willmore_energy wikiPageWikiLink Geometric_flow.
- Willmore_energy wikiPageWikiLink Gradient_descent.
- Willmore_energy wikiPageWikiLink Gradient_flow.
- Willmore_energy wikiPageWikiLink Integral.
- Willmore_energy wikiPageWikiLink Manifold.
- Willmore_energy wikiPageWikiLink Mean_curvature.
- Willmore_energy wikiPageWikiLink Minimal_surface.
- Willmore_energy wikiPageWikiLink Minimax_eversion.
- Willmore_energy wikiPageWikiLink Principal_curvature.
- Willmore_energy wikiPageWikiLink Principal_curvatures.
- Willmore_energy wikiPageWikiLink Smooth_manifold.
- Willmore_energy wikiPageWikiLink Sphere.
- Willmore_energy wikiPageWikiLink Sphere_eversion.
- Willmore_energy wikiPageWikiLink Surface.
- Willmore_energy wikiPageWikiLink Surface_diffusion_(mathematics).
- Willmore_energy wikiPageWikiLink Thomas_Willmore.
- Willmore_energy wikiPageWikiLink Topological_property.
- Willmore_energy wikiPageWikiLink Vector_field.
- Willmore_energy wikiPageWikiLink Willmore_conjecture.
- Willmore_energy wikiPageWikiLinkText "Willmore energy".
- Willmore_energy wikiPageWikiLinkText "Willmore energy#Willmore_flow".
- Willmore_energy hasPhotoCollection Willmore_energy.
- Willmore_energy subject Category:Differential_geometry.
- Willmore_energy subject Category:Geometric_flow.
- Willmore_energy subject Category:Surfaces.
- Willmore_energy hypernym Measure.
- Willmore_energy type Work.
- Willmore_energy type Physic.
- Willmore_energy type Surface.
- Willmore_energy comment "In differential geometry, the Willmore energy is a quantitative measure of how much a given surface deviates from a round sphere. Mathematically, the Willmore energy of a smooth closed surface embedded in three-dimensional Euclidean space is defined to be the integral of the square of the mean curvature minus the Gaussian curvature. It is named after the English geometer Thomas Willmore.".
- Willmore_energy label "Willmore energy".
- Willmore_energy sameAs Willmore-Energie.
- Willmore_energy sameAs Energía_de_Willmore.
- Willmore_energy sameAs m.06k71z.
- Willmore_energy sameAs Q2581692.
- Willmore_energy sameAs Q2581692.
- Willmore_energy wasDerivedFrom Willmore_energy?oldid=674259195.
- Willmore_energy isPrimaryTopicOf Willmore_energy.