Energy quantization for Willmore surfaces and applications

Bernard, Yann; Rivière, Tristan

doi:10.4007/annals.2014.180.1.2

Cited by 58 publications

(156 citation statements)

References 42 publications

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“…[BR2] and the references therein). Such point singularities of Willmore surfaces also occur as blow-ups of the Willmore flow (cf.…”

Section: Overviewmentioning

confidence: 99%

Singularity removability at branch points for Willmore surfaces

Bernard

Rivière

2013

Pacific J. Math.

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I OverviewThe Willmore energy of an immersed closed surface Φ : Σ → R m≥3 is given bywhere H denotes the weak mean curvature vector, and dvol g is the area form of the metric g induced on Φ(Σ) by the canonical Euclidean metric on R m . Critical points of the Lagrangian W for perturbations of the form Φ+t ξ, where ξ is an arbitrary compactly supported smooth map on Σ into R m , are known as Willmore surfaces. Not only is the Willmore functional invariant under reparametrization, but more importantly, it is invariant under the group of Möbius transformations of R m ∪{∞}. This remarkable property prompts the use of the Willmore energy in various fields of science. A survey of the Willmore functional, of its properties, and of the relevant literature is available in [Ri3]. Owing to the Gauss-Bonnet theorem, we note that the Willmore energy (I.1) may be equivalently expressed aswhere I is the second fundamental form, and χ(Σ) is the Euler characteristic of Σ, which is a topological invariant for a closed surface. From the variational point of view, Willmore surfaces are thus critical points of the energyIt then appears natural to restrict our attention on immersions whose second fundamental forms are locally square-integrable.We assume that the point-singularity lies at the origin, and we localize the problem by considering a map Φ : D 2 → R m≥3 , which is an immersion of D 2 \ {0}, and satisfyingBy a procedure detailed in [KS2], it is possible to construct a parametrization ζ of the unit-disk such that Φ•ζ is conformal. To do so, one first extends Φ to all of C\{0} while keeping a bounded image and the second fundamental form squareintegrable. One then shifts so as to have Φ(0) = 0, and inverts about the origin so as to obtain a complete immersion with square-integrable second fundamental form. Calling upon a result of Huber [Hu] (see also [MS] and [To]), one deduces that the image of the immersion is conformally equivalent to C. Inverting yet once more about the origin finally gives the desired conformal immersion 1 , which we shall abusively continue to denote Φ. It has the aforementioned properties (i)-(iii), and moreover,1 which degenerates at the origin in a particular way, see (I.9).Away from the origin, we define the Gauss map n viawhere (x 1 , x 2 ) are standard Cartesian coordinates on the unit-disk D 2 , and ⋆ is the Euclidean Hodge-star operator. The immersion Φ is conformal, i.e.where λ is the conformal parameter. An elementary computation shows thatHence, by hypothesis, we see that n ∈ W 1,2 (D 2 \ {0}). In dimension two, the 2-capacity of isolated points is null, so we actually have Φ ∈ W 1,2 (D 2 ) and n ∈ W 1,2 (D 2 ) (note however that Φ remains a non-degenerate immersion only away from the singularity). Rescaling if necessary, we shall henceforth always assume thatwhere the adjustable parameter ε 0 is chosen to fit our various needs (in particular, we will need it to be "small enough" in Proposition A.1).For the sake of the following paragraph, we consider a conformal immersion Φ : D 2 → R m , whi...

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“…[BR2] and the references therein). Such point singularities of Willmore surfaces also occur as blow-ups of the Willmore flow (cf.…”

Section: Overviewmentioning

confidence: 99%

Singularity removability at branch points for Willmore surfaces

Bernard

Rivière

2013

Pacific J. Math.

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“…The system becomes subcritical and regularity statements ensue [3,51]. Furthermore, one veri es that (1.5) is stable under a weak limiting process, which has many nontrivial consequences [3,5].…”

Section: Introductionmentioning

confidence: 97%

Noether’s theorem and the Willmore functional

Bernard

2016

Advances in Calculus of Variations

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“…Using the argument in [4] -first by [4, Lemma VI.1] we extend E nˆk in B k with energy control and then we use Hélein's construction of energy controlled moving frame, see [8, Theorem V.2.1] -we deduce the existence of an orthonormal frame .E e 1;k ; E e 2;k / on B 1 .0/ n B k .0/ such that…”

Section: Lemma 52 (Cutting and Filling Lemmamentioning

confidence: 99%

Immersed spheres of finite total curvature into manifolds

Mondino

Rivière²

2013

Advances in Calculus of Variations

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Abstract. We prove that a sequence of possibly branched, weak immersions of the 2-sphere S 2 into an arbitrary compact Riemannian manifold .M m ; h/ with uniformly bounded area and uniformly bounded L 2 -norm of the second fundamental form either collapse to a point or weakly converges as current, modulo extraction of a subsequence, to a Lipschitz mapping of S 2 and whose image is made of a connected union of finitely many, possibly branched, weak immersions of S 2 with finite total curvature. We prove moreover that if the sequence belongs to a class of 2 .M m /, the limiting Lipschitz mapping of S 2 realizes this class as well.

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Energy quantization for Willmore surfaces and applications

Cited by 58 publications

References 42 publications

Singularity removability at branch points for Willmore surfaces

Singularity removability at branch points for Willmore surfaces

Noether’s theorem and the Willmore functional

Immersed spheres of finite total curvature into manifolds

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