Search results for "equality"

showing 10 items of 1338 documents

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
researchProduct

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)
researchProduct

Bivariate Grüss-Type Inequalities for Positive Linear Operators

2018

Pure mathematicsInequalitymedia_common.quotation_subjectLinear operatorsBivariate analysisType (model theory)Mathematicsmedia_common
researchProduct

Univariate Grüss- and Ostrowski-Type Inequalities for Positive Linear Operators

2018

Pure mathematicsInequalitymedia_common.quotation_subjectLinear operatorsUnivariateType (model theory)media_commonMathematics
researchProduct

Bonnesenʼs inequality for John domains in Rn

2012

Abstract We prove sharp quantitative isoperimetric inequalities for John domains in R n . We show that the Bonnesen-style inequalities hold true in R n under the John domain assumption which rules out cusps. Our main tool is a proof of the isoperimetric inequality for symmetric domains which gives an explicit estimate for the isoperimetric deficit. We use the sharp quantitative inequalities proved in Fusco et al. (2008) [7] and Fuglede (1989) [4] to reduce our problem to symmetric domains.

Pure mathematicsJohn domainInequalitymedia_common.quotation_subjectMathematical analysisIsoperimetric dimensionQuasiconformal mapDomain (mathematical analysis)Quantitative isoperimetric inequalityMathematics::Metric GeometryIsoperimetric inequalityAnalysismedia_commonMathematicsJournal of Functional Analysis
researchProduct

Nonlinear balayage on metric spaces

2009

We develop a theory of balayage on complete doubling metric measure spaces supporting a Poincaré inequality. In particular, we are interested in continuity and p-harmonicity of the balayage. We also study connections to the obstacle problem. As applications, we characterize regular boundary points and polar sets in terms of balayage. Original Publication:Anders Björn, Jana Björn, Tero Mäkäläinen and Mikko Parviainen, Nonlinear balayage on metric spaces, 2009, Nonlinear Analysis, (71), 5-6, 2153-2171.http://dx.doi.org/10.1016/j.na.2009.01.051Copyright: Elsevier Science B.V., Amsterdam.http://www.elsevier.com/

Pure mathematicsMatematikBalayageApplied MathematicsMathematical analysisPoincaré inequalityBoundary (topology)Measure (mathematics)symbols.namesakeMetric spaceMetric (mathematics)Obstacle problemsymbolsBalayage; Boundary regularity; Continuity; Doubling measure; Metric space; Nonlinear; Obstacle problem; Perron solution; p-harmonic; Polar set; Poincaré inequality; Potential theory; SuperharmonicAnalysisMathematicsMathematicsPolar set (potential theory)
researchProduct

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
researchProduct

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
researchProduct

Hitchhiker's guide to the fractional Sobolev spaces

2012

AbstractThis paper deals with the fractional Sobolev spaces Ws,p. We analyze the relations among some of their possible definitions and their role in the trace theory. We prove continuous and compact embeddings, investigating the problem of the extension domains and other regularity results.Most of the results we present here are probably well known to the experts, but we believe that our proofs are original and we do not make use of any interpolation techniques nor pass through the theory of Besov spaces. We also present some counterexamples in non-Lipschitz domains.

Pure mathematicsMathematics(all)General MathematicsMathematical proof01 natural sciencesSobolev inequalityFractional LaplacianSobolev embeddingsMathematics - Analysis of PDEsSettore MAT/05 - Analisi MatematicaFOS: Mathematics0101 mathematicsNehari manifoldMathematicsSobolev spaces for planar domains010102 general mathematicsMathematical analysisFractional Sobolev spacesFractional Sobolev spaces; Gagliardo norm; Fractional Laplacian; Nonlocal energy; Sobolev embeddingsGagliardo normNonlocal energyFunctional Analysis (math.FA)Mathematics - Functional Analysis010101 applied mathematicsSobolev spaceInterpolation spaceAnalysis of PDEs (math.AP)CounterexampleTrace theoryBull. Sci. Math.
researchProduct

A quantitative isoperimetric inequality for fractional perimeters

2011

Abstract Recently Frank and Seiringer have shown an isoperimetric inequality for nonlocal perimeter functionals arising from Sobolev seminorms of fractional order. This isoperimetric inequality is improved here in a quantitative form.

Pure mathematicsMathematics::Functional Analysis010102 general mathematicsFractional Sobolev spaces01 natural sciencesFunctional Analysis (math.FA)PerimeterSobolev spaceMathematics - Functional AnalysisQuantitative isoperimetric inequalityMathematics::Group TheoryMathematics - Analysis of PDEs0103 physical sciencesFractional perimeterFOS: MathematicsOrder (group theory)Mathematics::Metric Geometry010307 mathematical physicsMathematics::Differential Geometry0101 mathematicsIsoperimetric inequalityAnalysisMathematicsAnalysis of PDEs (math.AP)
researchProduct