Search results for "Mathematical analysis"

showing 10 items of 2409 documents

Feuilletages Riemanniens singuliers

2006

Abstract We prove that a singular foliation on a compact manifold admitting an adapted Riemannian metric for which all leaves are minimal must be regular. To cite this article: V. Miquel, R.A. Wolak, C. R. Acad. Sci. Paris, Ser. I 342 (2006).

Pure mathematicsMathematical analysisGeneral MedicineRiemannian geometryFundamental theorem of Riemannian geometryPseudo-Riemannian manifoldLevi-Civita connectionsymbols.namesakesymbolsMinimal volumeMathematics::Differential GeometryExponential map (Riemannian geometry)Ricci curvatureScalar curvatureMathematicsComptes Rendus Mathematique
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The structure of Fedosov supermanifolds

2009

Abstract Given a supermanifold ( M , A ) which carries a supersymplectic form ω , we study the Fedosov structures that can be defined on it, through a set of tensor fields associated to any symplectic connection ∇ . We give explicit recursive expressions for the resulting curvature and study the particular case of a base manifold M with constant holomorphic sectional curvature.

Pure mathematicsMathematical analysisHolomorphic functionGeneral Physics and AstronomyCurvatureManifoldConnection (mathematics)Tensor fieldSupermanifoldMathematics::Differential GeometryGeometry and TopologySectional curvatureMathematics::Symplectic GeometryMathematical PhysicsMathematicsSymplectic geometryJournal of Geometry and Physics
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Lipschitz continuity of Cheeger-harmonic functions in metric measure spaces

2003

Abstract We use the heat equation to establish the Lipschitz continuity of Cheeger-harmonic functions in certain metric spaces. The metric spaces under consideration are those that are endowed with a doubling measure supporting a (1,2)-Poincare inequality and in addition supporting a corresponding Sobolev–Poincare-type inequality for the modification of the measure obtained via the heat kernel. Examples are given to illustrate the necessity of our assumptions on these spaces. We also provide an example to show that in the general setting the best possible regularity for the Cheeger-harmonic functions is Lipschitz continuity.

Pure mathematicsMathematical analysisLipschitz continuityModulus of continuityCheeger-harmonicConvex metric spaceUniform continuityMetric spaceLipschitz domainPoincaré inequalityheat kerneldoubling measureMetric mapLipschitz regularitylogarithmic Sobolev inequalityMetric differentialhypercontractivityAnalysisNewtonian spaceMathematicsJournal of Functional Analysis
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Hasse diagrams and orbit class spaces

2011

Abstract Let X be a topological space and G be a group of homeomorphisms of X. Let G ˜ be an equivalence relation on X defined by x G ˜ y if the closure of the G-orbit of x is equal to the closure of the G-orbit of y. The quotient space X / G ˜ is called the orbit class space and is endowed with the natural order inherited from the inclusion order of the closure of the classes, so that, if such a space is finite, one can associate with it a Hasse diagram. We show that the converse is also true: any finite Hasse diagram can be realized as the Hasse diagram of an orbit class space built from a dynamical system ( X , G ) where X is a compact space and G is a finitely generated group of homeomo…

Pure mathematicsMathematical analysisOrbit classClosure (topology)Hasse diagramTopological spaceGroup of homeomorphismsQuotient space (linear algebra)Hasse principleRealizationHomogeneous spaceCovering relationFinitely generated groupGeometry and TopologyHasse diagramMathematicsTopology and its Applications
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Supermanifolds, Symplectic Geometry and Curvature

2016

We present a survey of some results and questions related to the notion of scalar curvature in the setting of symplectic supermanifolds.

Pure mathematicsMathematical analysisSymplectic representationGeneral Relativity and Quantum CosmologyHigh Energy Physics::TheorySymplectic vector spaceMathematics::Differential GeometrySymplectomorphismMathematics::Symplectic GeometryMoment mapGeometry and topologyScalar curvatureSymplectic geometrySymplectic manifoldMathematics
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Strongly measurable Kurzweil-Henstock type integrable functions and series

2008

We give necessary and sufficient conditions for the scalar Kurzweil-Henstock integrability and the Kurzweil-Henstock-Pettis integrability of functions $f:[1, infty) ightarrow X$ defined as $f=sum_{n=1}^infty x_n chi_{[n,n+1)}$. Also the variational Henstock integrability is considered

Pure mathematicsMathematics (miscellaneous)Integrable systemKurzweil-Henstock integral Kurzweil-Henstock-Pettis integral variational Henstock integralSettore MAT/05 - Analisi MatematicaMathematical analysisScalar (mathematics)Mathematics
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Sharp estimate on the inner distance in planar domains

2020

We show that the inner distance inside a bounded planar domain is at most the one-dimensional Hausdorff measure of the boundary of the domain. We prove this sharp result by establishing an improved Painlev\'e length estimate for connected sets and by using the metric removability of totally disconnected sets, proven by Kalmykov, Kovalev, and Rajala. We also give a totally disconnected example showing that for general sets the Painlev\'e length bound $\kappa(E) \le\pi \mathcal{H}^1(E)$ is sharp.

Pure mathematicsMathematics - Complex VariablesGeneral MathematicsBoundary (topology)accessible pointsMetric Geometry (math.MG)31A15Domain (mathematical analysis)inner distancePlanarMathematics - Metric GeometryPrimary 28A75. Secondary 31A15Bounded functionTotally disconnected spaceMetric (mathematics)FOS: Mathematics28A75Hausdorff measureComplex Variables (math.CV)Painlevé lengthMathematics
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Quasisymmetric Koebe uniformization with weak metric doubling measures

2020

We give a characterization of metric spaces quasisymmetrically equivalent to a finitely connected circle domain. This result generalizes the uniformization of Ahlfors 2-regular spaces by Merenkov and Wildrick. peerReviewed

Pure mathematicsMathematics - Complex VariablesMathematics::Complex VariablesGeneral MathematicsCharacterization (mathematics)metriset avaruudetDomain (mathematical analysis)funktioteoriaMetric spaceMetric (mathematics)FOS: MathematicsMathematics::Metric GeometrymittateoriaComplex Variables (math.CV)Uniformization (set theory)MathematicsIllinois Journal of Mathematics
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Relative differential forms and complex polynomials

2000

Pure mathematicsMathematics(all)Gegenbauer polynomialsGeneral MathematicsDiscrete orthogonal polynomialsMathematical analysisAskey–Wilson polynomialsClassical orthogonal polynomialssymbols.namesakeMacdonald polynomialsDifference polynomialssymbolsJacobi polynomialsKoornwinder polynomialsMathematicsBulletin des Sciences Mathématiques
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The De Giorgi measure and an obstacle problem related to minimal surfaces in metric spaces

2010

Abstract We study the existence of a set with minimal perimeter that separates two disjoint sets in a metric measure space equipped with a doubling measure and supporting a Poincare inequality. A measure constructed by De Giorgi is used to state a relaxed problem, whose solution coincides with the solution to the original problem for measure theoretically thick sets. Moreover, we study properties of the De Giorgi measure on metric measure spaces and show that it is comparable to the Hausdorff measure of codimension one. We also explore the relationship between the De Giorgi measure and the variational capacity of order one. The theory of functions of bounded variation on metric spaces is us…

Pure mathematicsMathematics(all)General MathematicsApplied Mathematics010102 general mathematicsMathematical analysisBoxing inequalityCaccioppoli setDiscrete measureσ-finite measure01 natural sciencesRelaxed problemCapacitiesTransverse measure0103 physical sciencesComplex measureOuter measureHausdorff measure010307 mathematical physics0101 mathematicsBorel measureFunctions of bounded variationMathematicsJournal de Mathématiques Pures et Appliquées
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