Search results for "Inequality"

showing 10 items of 1076 documents

Heisenberg quasiregular ellipticity

2016

Following the Euclidean results of Varopoulos and Pankka--Rajala, we provide a necessary topological condition for a sub-Riemannian 3-manifold $M$ to admit a nonconstant quasiregular mapping from the sub-Riemannian Heisenberg group $\mathbb{H}$. As an application, we show that a link complement $S^3\backslash L$ has a sub-Riemannian metric admitting such a mapping only if $L$ is empty, the unknot or Hopf link. In the converse direction, if $L$ is empty, a specific unknot or Hopf link, we construct a quasiregular mapping from $\mathbb{H}$ to $S^3\backslash L$. The main result is obtained by translating a growth condition on $\pi_1(M)$ into the existence of a supersolution to the $4$-harmonic…

Pure mathematicsGeneral MathematicsSobolev–Poincaré inequality01 natural sciences3-sphereMathematics - Geometric TopologyMathematics - Metric GeometryEuclidean geometryHeisenberg groupFOS: Mathematicssub-Riemannian manifold0101 mathematicsComplex Variables (math.CV)topologiaUnknotLink (knot theory)Complement (set theory)MathematicsMathematics::Complex VariablesMathematics - Complex Variablescapacity010102 general mathematicsta111Hopf linkGeometric Topology (math.GT)Metric Geometry (math.MG)quasiregular mappingisoperimetric inequality3-sphereHopf linkcontact manifoldlink complementpotentiaaliteoriaMathematics::Differential GeometryIsoperimetric inequalitymonistot

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Hardy–Littlewood Inequality

2019

Pure mathematicsHardy–Littlewood inequalityMathematics

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Generalized Harnack inequality for semilinear elliptic equations

2015

Abstract This paper is concerned with semilinear equations in divergence form div ( A ( x ) D u ) = f ( u ) , where f : R → [ 0 , ∞ ) is nondecreasing. We introduce a sharp Harnack type inequality for nonnegative solutions which is a quantified version of the condition for strong maximum principle found by Vazquez and Pucci–Serrin in [30] , [24] and is closely related to the classical Keller–Osserman condition [15] , [22] for the existence of entire solutions.

Pure mathematicsHarnack inequalitynonhomogeneous equationsApplied MathematicsGeneral Mathematicsta111010102 general mathematicselliptic equations in divergence formsemilinear equationsMathematics::Analysis of PDEsType inequality01 natural sciences010101 applied mathematicsMaximum principleMathematics - Analysis of PDEsFOS: MathematicsMathematics::Differential Geometry0101 mathematicsDivergence (statistics)MathematicsHarnack's inequalityAnalysis of PDEs (math.AP)

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Self-improvement of pointwise Hardy inequality

2019

We prove the self-improvement of a pointwise p p -Hardy inequality. The proof relies on maximal function techniques and a characterization of the inequality by curves.

Pure mathematicsInequalityGeneral Mathematicsmedia_common.quotation_subjectCharacterization (mathematics)Mathematics - Analysis of PDEsuniform fatnessClassical Analysis and ODEs (math.CA)FOS: Mathematicsepäyhtälötpointwise Hardy inequalitymedia_commonMathematicsPointwiseosittaisdifferentiaaliyhtälötSelf improvementApplied Mathematicsmetric spacemetriset avaruudetMetric spaceMathematics - Classical Analysis and ODEsself-improvementMaximal functionpotentiaaliteoria31C15 (Primary) 31E05 35A23 (Secondary)Analysis of PDEs (math.AP)

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Korn inequality on irregular domains

2013

Abstract In this paper, we study the weighted Korn inequality on some irregular domains, e.g., s-John domains and domains satisfying quasihyperbolic boundary conditions. Examples regarding sharpness of the Korn inequality on these domains are presented. Moreover, we show that Korn inequalities imply certain Poincare inequality.

Pure mathematicsInequalityKorn inequalityquasihyperbolic metricApplied Mathematicsmedia_common.quotation_subjectta111Mathematics::Analysis of PDEss-John domainPoincaré inequalitysymbols.namesakeMathematics - Analysis of PDEsMathematics - Classical Analysis and ODEsPoincaré inequalityClassical Analysis and ODEs (math.CA)FOS: Mathematicssymbolsdivergence equationBoundary value problem26D10 35A23AnalysisAnalysis of PDEs (math.AP)Mathematicsmedia_commonJournal of Mathematical Analysis and Applications

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Sharp inequalities via truncation

2003

Abstract We show that Sobolev–Poincare and Trudinger inequalities improve to inequalities on Lorentz-type scales provided they are stable under truncations.

Pure mathematicsInequalityTruncationmedia_common.quotation_subjectApplied MathematicsMathematical analysisMathematics::Analysis of PDEsPoincaré inequalitySobolev inequalitySobolev spacesymbols.namesakesymbolsAnalysisMathematicsmedia_commonJournal of Mathematical Analysis and Applications

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Improved Bounds for Hermite–Hadamard Inequalities in Higher Dimensions

2019

Let $\Omega \subset \mathbb{R}^n$ be a convex domain and let $f:\Omega \rightarrow \mathbb{R}$ be a positive, subharmonic function (i.e. $\Delta f \geq 0$). Then $$ \frac{1}{|\Omega|} \int_{\Omega}{f dx} \leq \frac{c_n}{ |\partial \Omega| } \int_{\partial \Omega}{ f d\sigma},$$ where $c_n \leq 2n^{3/2}$. This inequality was previously only known for convex functions with a much larger constant. We also show that the optimal constant satisfies $c_n \geq n-1$. As a byproduct, we establish a sharp geometric inequality for two convex domains where one contains the other $ \Omega_2 \subset \Omega_1 \subset \mathbb{R}^n$: $$ \frac{|\partial \Omega_1|}{|\Omega_1|} \frac{| \Omega_2|}{|\partial \Ome…

Pure mathematicsInequalitymedia_common.quotation_subject01 natural sciencesConvexitysymbols.namesakeMathematics - Metric GeometrySettore MAT/05 - Analisi MatematicaHadamard transformHermite–Hadamard inequality0103 physical sciencesClassical Analysis and ODEs (math.CA)FOS: Mathematics[MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP]Hermite-Hadamard inequality subharmonic functions convexity.0101 mathematicsComputingMilieux_MISCELLANEOUSsubharmonic functionsmedia_commonMathematicsSubharmonic functionHermite polynomialsconvexity010102 general mathematicsMetric Geometry (math.MG)Functional Analysis (math.FA)Mathematics - Functional AnalysisMSC : 26B25 28A75 31A05 31B05 35B50Mathematics::LogicHermite-Hadamard inequalityDifferential geometryMathematics - Classical Analysis and ODEsFourier analysissymbols010307 mathematical physicsGeometry and TopologyThe Journal of Geometric Analysis

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Some Multiplicative Inequalities for Inner Products and of the Carlson Type

2008

We prove a multiplicative inequality for inner products, which enables us to deduce improvements of inequalities of the Carlson type for complex functions and sequences, and also other known inequalities. Validerad; 2008; Bibliografisk uppgift: Paper id:: 890137; 20080826 (ysko)

Pure mathematicsInequalitymedia_common.quotation_subjectApplied Mathematicslcsh:MathematicsMultiplicative functionMathematical AnalysisType (model theory)lcsh:QA1-939AlgebraMatematisk analysDiscrete Mathematics and CombinatoricsAnalysisMathematicsmedia_commonJournal of Inequalities and Applications

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In between the inequalities of Sobolev and Hardy

2015

We establish both sufficient and necessary conditions for the validity of the so-called Hardy-Sobolev inequalities on open sets of the Euclidean space. These inequalities form a natural interpolating scale between the (weighted) Sobolev inequalities and the (weighted) Hardy inequalities. The Assouad dimension of the complement of the open set turns out to play an important role in both sufficient and necessary conditions.

Pure mathematicsInequalitymedia_common.quotation_subjectDimension (graph theory)Open set35A23 (26D15 46E35)Scale (descriptive set theory)01 natural sciencesSobolev inequalityMathematics - Analysis of PDEsEuclidean spaceClassical Analysis and ODEs (math.CA)FOS: Mathematics0101 mathematicsmedia_commonComplement (set theory)MathematicsMathematics::Functional AnalysisEuclidean space010102 general mathematicsMathematical analysista111010101 applied mathematicsSobolev spaceMathematics - Classical Analysis and ODEsHardy-Sobolev inequalitiesAnalysisAnalysis of PDEs (math.AP)

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Bivariate Grüss-Type Inequalities for Positive Linear Operators

2018

Pure mathematicsInequalitymedia_common.quotation_subjectLinear operatorsBivariate analysisType (model theory)Mathematicsmedia_common

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