Search results for "Mathematics::Differential Geometry"

showing 10 items of 209 documents

Fl�chen Beschr�nkter Mittlerer Kr�mmung in Einer Dreidimensionalen Riemannschen Mannigfaltigkeit

1973

In recent papers HILDEBRANDT [11] and HARTH [5] proved the existence of solutions of the problem of Plateau for surfaces of bounded mean curvature with fixed and free boundaries in E3 and for minimal surfaces with free boundaries in a Riemannian manifold, respectively. Here their methods will be combined to solve the problem of Plateau for surfaces of bounded mean curvature in a Riemannian manifold. This will be done for fixed and free boundaries. Moreover, isoperimetric inequalities for the solutions will be given.

Mean curvature flowMean curvatureMinimal surfaceGeneral MathematicsPrescribed scalar curvature problemMathematical analysisMathematics::Differential GeometryIsoperimetric dimensionRiemannian manifoldRicci curvatureMathematicsScalar curvatureManuscripta Mathematica

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Mean curvature flow of graphs in warped products

2012

Let M be a complete Riemannian manifold which either is compact or has a pole, and let φ be a positive smooth function on M . In the warped product M ×φ R, we study the flow by the mean curvature of a locally Lipschitz continuous graph on M and prove that the flow exists for all time and that the evolving hypersurface is C∞ for t > 0 and is a graph for all t. Moreover, under certain conditions, the flow has a well defined limit.

Mean curvature flowPure mathematicsMean curvatureApplied MathematicsGeneral MathematicsMathematical analysisRiemannian manifoldLipschitz continuityCurvatureGraphHypersurfaceMathematics::Differential GeometryMathematicsScalar curvatureTransactions of the American Mathematical Society

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Volume estimate for a cone with a submanifold as vertex

1992

We give some estimates for the volume of a cone with vertex a submanifold P of a Riemannian or Kaehler manifold M. The estimates are functions of bounds of the mean curvature of P and the sectional curvature of M. They are sharp on cones having a basis which is contained in a tubular hypersurface about P in a space form or in a complex space form.

Mean curvature flowPure mathematicsMean curvatureMathematics::Complex VariablesMathematical analysisSubmanifoldHypersurfaceVertex (curve)Mathematics::Differential GeometryGeometry and TopologySectional curvatureMathematics::Symplectic GeometryRicci curvatureMathematicsScalar curvatureJournal of Geometry

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Compact Hopf hypersurfaces of constant mean curvature in complex space forms

1994

We prove that every connected compact Hopf hypersurface of a complex space form , contained in a geodesic ball of radius strictly smaller than the injectivity radius of , having constant mean curvature and with if if λ < 0 is a geodesic sphere of .

Mean curvatureGeodesicGeodesic domeMathematical analysislaw.inventionHypersurfaceComplex spaceDifferential geometrylawMathematics::Differential GeometryGeometry and TopologyBall (mathematics)AnalysisMathematicsAnnals of Global Analysis and Geometry

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Pappus type theorems for motions along a submanifold

2004

Abstract We study the volumes volume( D ) of a domain D and volume( C ) of a hypersurface C obtained by a motion along a submanifold P of a space form M n λ . We show: (a) volume( D ) depends only on the second fundamental form of P , whereas volume( C ) depends on all the i th fundamental forms of P , (b) when the domain that we move D 0 has its q -centre of mass on P , volume( D ) does not depend on the mean curvature of P , (c) when D 0 is q -symmetric, volume( D ) depends only on the intrinsic curvature tensor of P ; and (d) if the image of P by the ln of the motion (in a sense which is well-defined) is not contained in a hyperplane of the Lie algebra of SO ( n − q − d ), and C …

Mean curvatureGeodesicVolumeSpace formParallel motionImage (category theory)Second fundamental formMathematical analysisSubmanifoldMotion along a submanifoldCombinatoricsHypersurfaceComputational Theory and MathematicsTubePappus formulaeLie algebraDomain (ring theory)Comparison theoremMathematics::Differential GeometryGeometry and TopologyAnalysisMathematicsDifferential Geometry and its Applications

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Curvature locus and principal configurations of submanifolds of Euclidean space

2017

We study relations between the properties of the curvature loci of a submanifold M in Euclidean space and the behaviour of the principal configurations of M, in particular the existence of umbilic and quasiumbilic fields. We pay special attention to the case of submanifolds with vanishing normal curvature. We also characterize local convexity in terms of the curvature locus position in the normal space.

Mean curvaturePrincipal curvatureGeneral MathematicsHyperbolic spaceMathematical analysisCurvature formCenter of curvatureMathematics::Differential GeometrySectional curvatureCurvatureMathematicsScalar curvatureRevista Matemática Iberoamericana

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A new proof of the existence of hierarchies of Poisson-Nijenhuis structures

2004

Given a Poisson-Nijenhuis manifold, a two-parameter family of Poisson- Nijenhuis structures can be defined. As a consequence we obtain a new and noninductive proof of the existence of hierarchies of Poisson-Nijenhuis structures.

Nonlinear Sciences::Exactly Solvable and Integrable SystemsMathematics::Differential GeometryMathematics::Symplectic GeometryMatemàtica

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An elliptic equation on n-dimensional manifolds

2020

We consider an elliptic equation driven by a p-Laplacian-like operator, on an n-dimensional Riemannian manifold. The growth condition on the right-hand side of the equation depends on the geometry of the manifold. We produce a nontrivial solution by using a Palais–Smale compactness condition and a mountain pass geometry.

Numerical AnalysisPure mathematicsN dimensionalApplied MathematicsOperator (physics)p-Laplacian-like operator010102 general mathematicsIsocapacitary inequalityRiemannian manifoldSobolev space01 natural sciences010101 applied mathematicsSobolev spaceComputational MathematicsElliptic curvemountain pass geometrySettore MAT/05 - Analisi MatematicaMathematics::Differential Geometry0101 mathematicsOrlicz spaceAnalysisMathematicsComplex Variables and Elliptic Equations

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On the volume of unit vector fields on spaces of constant sectional curvature

2004

A unit vector field X on a Riemannian manifold determines a submanifold in the unit tangent bundle. The volume of X is the volume of this submanifold for the induced Sasaki metric. It is known that the parallel fields are the trivial minima.

Parallelizable manifoldGeneral MathematicsGEOMETRIA RIEMANNIANAMathematical analysisRiemannian manifoldSubmanifoldNormal bundleUnit tangent bundleMathematics::Differential GeometrySectional curvatureMathematics::Symplectic GeometryTangential and normal componentsTubular neighborhoodMathematics

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Transportation-cost inequality on path spaces with uniform distance

2008

Abstract Let M be a complete Riemannian manifold and μ the distribution of the diffusion process generated by 1 2 ( Δ + Z ) where Z is a C 1 -vector field. When Ric − ∇ Z is bounded below and Z has, for instance, linear growth, the transportation-cost inequality with respect to the uniform distance is established for μ on the path space over M . A simple example is given to show the optimality of the condition.

Path (topology)Statistics and ProbabilityTransportation-cost inequalityPath spaceApplied MathematicsMathematical analysisRiemannian manifoldManifoldUniform distanceQuasi-invariant flowDistribution functionModeling and SimulationBounded functionModelling and SimulationVector fieldMathematics::Differential GeometryInvariant (mathematics)Damped gradientDistribution (differential geometry)MathematicsStochastic Processes and their Applications

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