Monotone Sobolev Mappings of Planar Domains and Surfaces

Iwaniec, Tadeusz; Onninen, Jani

doi:10.1007/s00205-015-0894-6

Cited by 33 publications

(21 citation statements)

References 44 publications

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“…Then every continuous monotone map h : X onto − − → Y of Sobolev class W 1,p (X, R 2 ), p > 1, can be approximated uniformly and strongly in W 1,p (X, R 2 ) by homeomorphisms h j : X onto − − → Y (and with diffeomorphisms as well). This result has been established by the present authors in [42]. The reader may wish to notice that for 1 < p < 2 the lack of uniform continuity estimates prevents a W 1,p -limit of homeomorphisms from being continuous and monotone.…”

Section: Remaks On Monotone Sobolev Mappingssupporting

confidence: 74%

Limits of Sobolev homeomorphisms

Iwaniec

Onninen

2017

J. Eur. Math. Soc.

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Let X, Y ⊂ R 2 be topologically equivalent bounded Lipschitz domains. We prove that weak and strong limits of homeomorphisms h : X onto − − → Y in the Sobolev space W 1,p (X, R 2 ), p ≥ 2, are the same. As an application, we establish the existence of 2D-traction free minimal deformations for fairly general energy integrals.Keywords. Energy-minimal deformations, approximation of Sobolev homeomorphisms, variational integrals, harmonic mappings, p-harmonic equation 1,p • (X, R 2 ) denote the completion of C ∞ • (X, R 2 ) in W 1,p (X, R 2 ).

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Section: Remaks On Monotone Sobolev Mappingssupporting

confidence: 74%

Limits of Sobolev homeomorphisms

Iwaniec

Onninen

2017

J. Eur. Math. Soc.

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“…It is quite easy to see that mappings in H 1,2 (A, A * ) extend as continuous monotone maps of A onto A * . As a converse Iwaniec and Onninen [27] proved a Sobolev variant of the classical Youngs approximation theorem. According to their result the class H 1,2 (A, A * ) equals the class of orientation-preserving monotone mappings from A onto A * in the Sobolev class W 1,2 (A, C) that also preserve the order of the boundary components of annuli.…”

Section: Introductionmentioning

confidence: 95%

Radial symmetry of minimizers to the weighted Dirichlet energy

Koski

Onninen²

2020

Proceedings of the Royal Society of Edinburgh: Section A Mathem

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We consider the problem of minimizing the weighted Dirichlet energy between homeomorphisms of planar annuli. A known challenge lies in the case when the weight λ depends on the independent variable z. We prove that for an increasing radial weight λ(z) the infimal energy within the class of all Sobolev homeomorphisms is the same as in the class of radially symmetric maps. For a general radial weight λ(z) we establish the same result in the case when the target is conformally thin compared to the domain. Fixing the admissible homeomorphisms on the outer boundary we establish the radial symmetry for every such weight.Recall that a Sobolev homeomorphism f ∈ W 1,1 loc (A * , C) has finite distortion if there is a measurable function K(z) 1, finite a.e., such that (1.2) |Df (z)| 2 2 K(z) J f (z) , J f (z) = det Df (z).

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“…As U t is C 1,β -smooth, this discussion justifies writing DŨ t L p (M ) in estimates below. Furthermore, the careful analysis of constants in the proof of Theorem 4.2 reveals that the above constant C is, in fact, independent of p t , again due to the uniform bound 2 ≤ p t ≤ p. In a consequence, (36) holds true for C independent of t.…”

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confidence: 93%

The Radó–Kneser–Choquet theorem for $p$-harmonic mappings between Riemannian surfaces

2020

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In the planar setting the Radó-Kneser-Choquet theorem states that a harmonic map from the unit disk onto a Jordan domain bounded by a convex curve is a diffeomorphism provided that the boundary mapping is a homeomorphism. We prove the injectivity criterion of Radó-Kneser-Choquet for p-harmonic mappings between Riemannian surfaces.In our proof of the injecticity criterion we approximate the p-harmonic map with auxiliary mappings that solve uniformly elliptic systems. We prove that each auxiliary mapping has a positive Jacobian by a homotopy argument. We keep the maps injective all the way through the homotopy with the help of the minimum principle for a certain subharmonic expression that is related to the Jacobian.

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Monotone Sobolev Mappings of Planar Domains and Surfaces

Cited by 33 publications

References 44 publications

Limits of Sobolev homeomorphisms

Limits of Sobolev homeomorphisms

Radial symmetry of minimizers to the weighted Dirichlet energy

The Radó–Kneser–Choquet theorem for $p$-harmonic mappings between Riemannian surfaces

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