Search results for "53A30"

showing 8 items of 8 documents

$n$-harmonic coordinates and the regularity of conformal mappings

2014

This article studies the smoothness of conformal mappings between two Riemannian manifolds whose metric tensors have limited regularity. We show that any bi-Lipschitz conformal mapping or $1$-quasiregular mapping between two manifolds with $C^r$ metric tensors ($r > 1$) is a $C^{r+1}$ conformal (local) diffeomorphism. This result was proved in [12, 27, 33], but we give a new proof of this fact. The proof is based on $n$-harmonic coordinates, a generalization of the standard harmonic coordinates that is particularly suited to studying conformal mappings. We establish the existence of a $p$-harmonic coordinate system for $1 < p < \infty$ on any Riemannian manifold.

Harmonic coordinatesMathematics - Differential GeometryPure mathematicsSmoothness (probability theory)GeneralizationGeneral MathematicsCoordinate systemta111conformal mappingsConformal map53A30 (Primary) 35J60 35B65 (Secondary)Riemannian manifoldMathematics - Analysis of PDEsDifferential Geometry (math.DG)Metric (mathematics)FOS: MathematicsDiffeomorphismMathematics::Differential GeometryMathematicsAnalysis of PDEs (math.AP)
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Local Gauge Conditions for Ellipticity in Conformal Geometry

2013

In this article we introduce local gauge conditions under which many curvature tensors appearing in conformal geometry, such as the Weyl, Cotton, Bach, and Fefferman-Graham obstruction tensors, become elliptic operators. The gauge conditions amount to fixing an $n$-harmonic coordinate system and normalizing the determinant of the metric. We also give corresponding elliptic regularity results and characterizations of local conformal flatness in low regularity settings.

Mathematics - Differential Geometry53A30 (Primary) 53B20 35J60 (Secondary)General MathematicsCoordinate systemConformal mapCurvatureconformal geometry01 natural sciencessymbols.namesakeMathematics - Analysis of PDEs0103 physical sciencesFOS: Mathematics0101 mathematicsFlatness (mathematics)Mathematics010308 nuclear & particles physicsta111010102 general mathematicsMathematical analysisgauge conditionsGauge (firearms)Elliptic operatorDifferential Geometry (math.DG)symbolsWeyl transformationMathematics::Differential GeometryConformal geometryAnalysis of PDEs (math.AP)curvature tensors
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p-harmonic coordinates for H\"older metrics and applications

2015

We show that on any Riemannian manifold with H\"older continuous metric tensor, there exists a $p$-harmonic coordinate system near any point. When $p = n$ this leads to a useful gauge condition for regularity results in conformal geometry. As applications, we show that any conformal mapping between manifolds having $C^\alpha$ metric tensors is $C^{1+\alpha}$ regular, and that a manifold with $W^{1,n} \cap C^\alpha$ metric tensor and with vanishing Weyl tensor is locally conformally flat if $n \geq 4$. The results extend the works [LS14, LS15] from the case of $C^{1+\alpha}$ metrics to the H\"older continuous case. In an appendix, we also develop some regularity results for overdetermined el…

Mathematics - Differential Geometry53A30 (Primary) 35J60 35B65 (Secondary)
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Conformal invariance of the writhe of a knot

2008

We give a new proof of an old theorem by Banchoff and White 1975 that claims that the writhe of a knot is conformally invariant.

Mathematics - Differential GeometryPure mathematicsQuantitative Biology::BiomoleculesAlgebra and Number TheoryConformal mapGeometric Topology (math.GT)Mathematics::Geometric TopologyMathematics - Geometric TopologyDifferential Geometry (math.DG)Conformal symmetryFOS: Mathematics57M25 53A30Knot (mathematics)MathematicsWrithe
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Darboux curves on surfaces I

2017

International audience; In 1872, G. Darboux defined a family of curves on surfaces of $\mathbb{R}^3$ which are preserved by the action of the Mobius group and share many properties with geodesics. Here, we characterize these curves under the view point of Lorentz geometry and prove that they are geodesics in a 3-dimensional sub-variety of a quadric $\Lambda^4$ contained in the 5-dimensional Lorentz space $\mathbb{R}^5_1$ naturally associated to the surface. We construct a new conformal object: the Darboux plane-field $\mathcal{D}$ and give a condition depending on the conformal principal curvatures of the surface which guarantees its integrability. We show that $\mathcal{D}$ is integrable w…

[ MATH ] Mathematics [math]GeodesicGeneral MathematicsDarboux frame02 engineering and technology01 natural sciencessymbols.namesakeMoving frame57R300202 electrical engineering electronic engineering information engineeringDarboux curves0101 mathematics[MATH]Mathematics [math]Möbius transformationMathematicsConformal geometryEuclidean spaceMSC: Primary 53A30 Secondary: 53C12 53C50 57R3053A3053C50010102 general mathematicsMathematical analysis53C12Ridge (differential geometry)Family of curvessymbolsSpace of spheres020201 artificial intelligence & image processingConformal geometry
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Foliations of $\mathbb{S}^3$ by Cyclides

2018

Throughout the last 2–3 decades, there has been great interest in the extrinsic geometry of foliated Riemannian manifolds (see [2], [4] and [22]). ¶One approach is to build examples of foliations with reasonably simple singularities with leaves admitting some very restrictive geometric condition. For example (see [22], [23] and [17]), consider in particular foliations of $\mathbb{S}^{3}$ by totally geodesic or totally umbilical leaves with isolated singularities. ¶The article [14] provides families of foliations of $\mathbb{S}^{3}$ by Dupin cyclides with only one smooth curve of singularities. Quadrics and other families of cyclides like Darboux cyclides provide other examples. These foliat…

[ MATH ] Mathematics [math]Pure mathematics65D17Dupin cyclides53A30foliations of $\mathbb{S}^{3}$Darboux cyclidesMathematics::Differential Geometry[MATH] Mathematics [math][MATH]Mathematics [math]quadrics53C12ComputingMilieux_MISCELLANEOUS
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Canal foliations of S 3

2012

The goal of the article is to classify foliations of S3 by regular canal surfaces, that is envelopes of one-parameter families of spheres which are immersed surfaces. We will add some extra information when the leaves are “surfaces of revolution” in a conformal sense.

foliationGeneral Mathematics53A30Foliation (geology)Conformal mapGeometryMathematics::Differential GeometrySurface of revolution53C12MathematicsComputingMethodologies_COMPUTERGRAPHICScanal surface
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Limiting Carleman weights and conformally transversally anisotropic manifolds

2020

We analyze the structure of the set of limiting Carleman weights in all conformally flat manifolds, 3 3 -manifolds, and 4 4 -manifolds. In particular we give a new proof of the classification of Euclidean limiting Carleman weights, and show that there are only three basic such weights up to the action of the conformal group. In dimension three we show that if the manifold is not conformally flat, there could be one or two limiting Carleman weights. We also characterize the metrics that have more than one limiting Carleman weight. In dimension four we obtain a complete spectrum of examples according to the structure of the Weyl tensor. In particular, we construct unimodular Lie groups whose …

osittaisdifferentiaaliyhtälötComputer Science::Machine LearningApplied MathematicsGeneral Mathematics010102 general mathematicsMathematical analysis35R30 53A30LimitingMathematics::Spectral TheoryComputer Science::Digital Libraries01 natural sciencesinversio-ongelmatdifferentiaaligeometria010101 applied mathematicsStatistics::Machine LearningMathematics - Analysis of PDEsFOS: MathematicsComputer Science::Mathematical Softwaremonistot0101 mathematicsAnisotropyAnalysis of PDEs (math.AP)MathematicsTransactions of the American Mathematical Society
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