Search results for " Differentiability"

showing 8 items of 8 documents

Absolutely continuous functions with values in a Banach space

2017

Abstract Let Ω be an open subset of R n , n > 1 , and let X be a Banach space. We prove that α-absolutely continuous functions f : Ω → X are continuous and differentiable (in some sense) almost everywhere in Ω.

Discrete mathematicsApplied Mathematics010102 general mathematicsBanach space0102 computer and information sciencesAbsolute continuity01 natural sciencesw⁎-DifferentiabilitySobolev spaceMetric differentiability010201 computation theory & mathematicsSettore MAT/05 - Analisi MatematicaPointwise Lipschitz functionAlmost everywhereDifferentiable function0101 mathematicsAnalysisMathematics
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Radon–Nikodym Property and Area Formula for Banach Homogeneous Group Targets

2013

We prove a Rademacher-type theorem for Lipschitz mappings from a subset of a Carnot group to a Banach homogeneous group, equipped with a suitably weakened Radon-Nikodym property. We provide a metric area formula that applies to these mappings and more generally to all almost everywhere metrically differentiable Lipschitz mappings defined on a Carnot group. peerReviewed

Discrete mathematicsMathematics::Functional AnalysisProperty (philosophy)General Mathematicsmetric area formulata111Mathematics::Analysis of PDEsCarnot groupBanach homogeneous groupsalmost everywhere differentiabilityRadon-Nikodym propertyLipschitz continuityRadon–Nikodym theoremBanach homogeneous groups; metric area formula; almost everywhere differentiability; Radon-Nikodym propertyMetric (mathematics)Homogeneous groupMathematics::Metric GeometryAlmost everywhereDifferentiable functionMathematics
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Everywhere differentiability of viscosity solutions to a class of Aronsson's equations

2017

For any open set $\Omega\subset\mathbb R^n$ and $n\ge 2$, we establish everywhere differentiability of viscosity solutions to the Aronsson equation $$ =0 \quad \rm in\ \ \Omega, $$ where $H$ is given by $$H(x,\,p)==\sum_{i,\,j=1}^na^{ij}(x)p_i p_j,\ x\in\Omega, \ p\in\mathbb R^n, $$ and $A=(a^{ij}(x))\in C^{1,1}(\bar\Omega,\mathbb R^{n\times n})$ is uniformly elliptic. This extends an earlier theorem by Evans and Smart \cite{es11a} on infinity harmonic functions.

Lebesgue integration01 natural scienceseverywhere differentiabilityMatrix (mathematics)symbols.namesakeMathematics - Analysis of PDEsL∞-variational problemFOS: MathematicsPoint (geometry)Differentiable function0101 mathematicsAronsson's equationCoefficient matrixMathematical PhysicsMathematicsabsolute minimizerApplied Mathematics010102 general mathematicsMathematical analysista111Riemannian manifold010101 applied mathematicsHarmonic functionMetric (mathematics)symbolsAnalysisAnalysis of PDEs (math.AP)
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Universal differentiability sets and maximal directional derivatives in Carnot groups

2019

We show that every Carnot group G of step 2 admits a Hausdorff dimension one `universal differentiability set' N such that every real-valued Lipschitz map on G is Pansu differentiable at some point of N. This relies on the fact that existence of a maximal directional derivative of f at a point x implies Pansu differentiability at the same point x. We show that such an implication holds in Carnot groups of step 2 but fails in the Engel group which has step 3.

Pure mathematicsCarnot groupGeneral MathematicsDirectional derivative01 natural sciencesdifferentiaaligeometriasymbols.namesake0103 physical sciencesFOS: MathematicsCarnot group; Directional derivative; Lipschitz map; Pansu differentiable; Universal differentiability set; Mathematics (all); Applied MathematicsMathematics (all)Point (geometry)Differentiable function0101 mathematicsUniversal differentiability setEngel groupMathematics43A80 46G05 46T20 49J52 49Q15 53C17Directional derivativeuniversal differentiability setApplied Mathematicsta111010102 general mathematicsCarnot group16. Peace & justiceLipschitz continuityPansu differentiableFunctional Analysis (math.FA)Mathematics - Functional AnalysisHausdorff dimensionsymbols010307 mathematical physicsLipschitz mapfunktionaalianalyysiCarnot cycledirectional derivative
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On the problem of regularity in the Sobolev space Wloc1,n

2009

Abstract We prove that a variant of the Hencl's notion of A C λ n -mapping (see [S. Hencl, On the notions of absolute continuity for functions of several variables, Fund. Math. 173 (2002) 175–189]), in which λ is not a constant, produces a new solution to the problem of regularity in the Sobolev space W loc 1 , n .

Pure mathematicsDifferentiabilityMathematical analysisAbsolute continuity Differentiability Lusin’s condition (N) Change of variables formulasChange of variables formulasAbsolute continuityAbsolute continuityLusin's condition (N)Sobolev inequalitySobolev spaceSettore MAT/05 - Analisi MatematicaGeometry and TopologyDifferentiable functionConstant (mathematics)MathematicsTopology and its Applications
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Tangent lines and Lipschitz differentiability spaces

2015

We study the existence of tangent lines, i.e. subsets of the tangent space isometric to the real line, in tangent spaces of metric spaces. We first revisit the almost everywhere metric differentiability of Lipschitz continuous curves. We then show that any blow-up done at a point of metric differentiability and of density one for the domain of the curve gives a tangent line. Metric differentiability enjoys a Borel measurability property and this will permit us to use it in the framework of Lipschitz differentiability spaces. We show that any tangent space of a Lipschitz differentiability space contains at least $n$ distinct tangent lines, obtained as the blow-up of $n$ Lipschitz curves, whe…

Pure mathematicsLipschitz differentiability spaces; metric geometry; Ricci curvature; tangent of metric spaces01 natural sciencesMathematics - Metric GeometrySettore MAT/05 - Analisi MatematicaTangent lines to circles0103 physical sciencesTangent spaceClassical Analysis and ODEs (math.CA)FOS: Mathematicsmetric geometryDifferentiable function0101 mathematicsReal lineMathematicstangent of metric spacesQA299.6-433Applied Mathematics010102 general mathematicsTangentLipschitz differentiability spacesMetric Geometry (math.MG)Lipschitz continuityFunctional Analysis (math.FA)Mathematics - Functional AnalysisMetric spaceRicci curvatureMathematics - Classical Analysis and ODEsMetric (mathematics)010307 mathematical physicsGeometry and TopologyMathematics::Differential GeometryAnalysis
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RADEMACHER'S THEOREM IN BANACH SPACES WITHOUT RNP

2017

Abstract We improve a Duda’s theorem concerning metric and w *-Gâteaux differentiability of Lipschitz mappings, by replacing the σ-ideal 𝓐 of Aronszajn null sets [ARONSZAJN, N.: Differentiability of Lipschitzian mappings between Banach spaces, Studia Math. 57 (1976), 147–190], with the smaller σ-ideal 𝓐 of Preiss-Zajíček null sets [PREISS, D.—ZAJÍČEK, L.: Directional derivatives of Lipschitz functions, Israel J. Math. 125 (2001), 1–27]. We also prove the inclusion C̃ o ⊂ 𝓐, where C̃ o is the σ-ideal of Preiss null sets [PREISS, D.: Gâteaux differentiability of cone-monotone and pointwise Lipschitz functions, Israel J. Math. 203 (2014), 501–534].

Pure mathematicsRademacher's theoremSettore MAT/05 - Analisi MatematicaGeneral Mathematics010102 general mathematics0103 physical sciencesBanach spaceLipschitz maps Radon-Nikodym property metric Gateaux differentiability w-Gòateaux differentiability.010307 mathematical physics0101 mathematics01 natural sciencesMathematics
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Existence, uniqueness and Malliavin differentiability of Lévy-driven BSDEs with locally Lipschitz driver

2019

We investigate conditions for solvability and Malliavin differentiability of backward stochastic differential equations driven by a L\'evy process. In particular, we are interested in generators which satisfy a locally Lipschitz condition in the $Z$ and $U$ variable. This includes settings of linear, quadratic and exponential growths in those variables. Extending an idea of Cheridito and Nam to the jump setting and applying comparison theorems for L\'evy-driven BSDEs, we show existence, uniqueness, boundedness and Malliavin differentiability of a solution. The pivotal assumption to obtain these results is a boundedness condition on the terminal value $\xi$ and its Malliavin derivative $D\xi…

Statistics and Probabilitymatematiikkalocally Lipschitz generatormalliavin differentiability of BSDEsMalliavin-laskentaexistence and uniqueness of solutions to BSDEsBSDEs with jumpsLipschitz continuityLévy processArticleStochastic differential equationMathematics::ProbabilityModeling and Simulationquadratic BSDEsApplied mathematics60H10UniquenessDifferentiable functiondifferentiaaliyhtälötMathematics - Probabilitystokastiset prosessitMathematics
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