Search results for "Mathematics::Functional Analysis"

showing 10 items of 236 documents

Lineability of non-differentiable Pettis primitives

2014

Let $X$ be an infinite-dimensional Banach space. In 1995, settling a long outstanding problem of Pettis, Dilworth and Girardi constructed an $X$-valued Pettis integrable function on $[0,1]$ whose primitive is nowhere weakly differentiable. Using their technique and some new ideas we show that $\mathbf{ND}$, the set of strongly measurable Pettis integrable functions with nowhere weakly differentiable primitives, is lineable, i.e., there is an infinite dimensional vector space whose nonzero vectors belong to $\mathbf{ND}$.

Discrete mathematicsPettis integralMathematics::Functional AnalysisIntegrable systemGeneral MathematicsBanach space46G10 28B05Functional Analysis (math.FA)Mathematics - Functional AnalysisSet (abstract data type)Dvoretzky's theoremFOS: MathematicsLocally integrable functionDifferentiable functionPettis Integral nowhere differentiable Dvoretzky's theorem lineable spaceableMathematicsVector spaceMonatshefte für Mathematik

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Property (R) under perturbations

2012

Property (R) holds for a bounded linear operator $${T \in L(X)}$$ , defined on a complex infinite dimensional Banach space X, if the isolated points of the spectrum of T which are eigenvalues of finite multiplicity are exactly those points λ of the approximate point spectrum for which λI − T is upper semi-Browder. In this paper we consider the permanence of this property under quasi nilpotent, Riesz, or algebraic perturbations commuting with T.

Discrete mathematicsProperty (R)Mathematics::Functional AnalysisPure mathematicsGeneral MathematicsWeyl's theoremSpectrum (functional analysis)Banach spaceMultiplicity (mathematics)Bounded operatorNilpotentSettore MAT/05 - Analisi MatematicaPoint (geometry)Algebraic numberEigenvalues and eigenvectorsMathematics

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The spectra of some algebras of analytic mappings

1999

Abstract Let E be a Banach space with the approximation property and let F be a Banach algebra with identity. We study the spectrum of the algebra H b(E, F) of all holomorphic mappings f : E → F that are bounded on the bounded subsets of E.

Discrete mathematicsPure mathematicsMathematics(all)Mathematics::Functional AnalysisApproximation propertyGeneral MathematicsSpectrum (functional analysis)Holomorphic functional calculusBanach spaceHolomorphic functionBanach manifoldBounded functionBanach *-algebraMathematicsIndagationes Mathematicae

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The Bishop–Phelps–Bollobás theorem for operators

2008

AbstractWe prove the Bishop–Phelps–Bollobás theorem for operators from an arbitrary Banach space X into a Banach space Y whenever the range space has property β of Lindenstrauss. We also characterize those Banach spaces Y for which the Bishop–Phelps–Bollobás theorem holds for operators from ℓ1 into Y. Several examples of classes of such spaces are provided. For instance, the Bishop–Phelps–Bollobás theorem holds when the range space is finite-dimensional, an L1(μ)-space for a σ-finite measure μ, a C(K)-space for a compact Hausdorff space K, or a uniformly convex Banach space.

Discrete mathematicsPure mathematicsMathematics::Functional AnalysisApproximation propertyEberlein–Šmulian theoremBanach spaceNorm attainingBishop–Phelps theoremUniform boundedness principleUniform convexityInterpolation spaceOperatorClosed graph theoremReflexive spaceBishop–Phelps theoremAnalysisMathematicsJournal of Functional Analysis

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Quasi-Normable Preduals of Spaces of Holomorphic Functions

1997

Abstract Let H ( U ) denote the space of all holomorphic functions on an open subset U of a separable Frechet space E . Let τ ω denote the compact-ported topology on H ( U ) introduced by Nachbin. Let G ( U ) denote the predual of H ( U ) constructed by Mazet. In our main result we show that E is quasi-normable if and only if G ( U ) is quasi-normable if and only if ( H ( U ), τ ω ) satisfies the strict Mackey convergence condition.

Discrete mathematicsPure mathematicsMathematics::Functional AnalysisFréchet spaceApplied MathematicsHolomorphic functionPredualMathematics::General TopologySpace (mathematics)AnalysisSeparable spaceMathematicsJournal of Mathematical Analysis and Applications

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Haar Type and Carleson Constants

2009

For a collection ℰ of dyadic intervals, a Banach space X, and p∈(1, 2], we assume the upper l p estimates where x I ∈X, and h I denotes the L ∞ normalized Haar function supported on I. We determine the minimal requirement on the size of ℰ such that these estimates imply that X is of Haar type p. The characterization is given in terms of the Carleson constant of ℰ.

Discrete mathematicsPure mathematicsMathematics::Functional AnalysisGeneral MathematicsBanach spaceMathematics::Classical Analysis and ODEsHaarFunction (mathematics)Characterization (mathematics)Type (model theory)Functional Analysis (math.FA)Mathematics - Functional Analysis46B20FOS: Mathematics46B07Constant (mathematics)46B07 ; 46B20Mathematics

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Extensions and Imbeddings

1998

AbstractWe establish a connection between the Sobolev imbedding theorem and the extendability of Sobolev functions. As applications we give geometric criteria for extendability and give a result on the dependence of the extension property on the exponentp.

Discrete mathematicsSobolev spacePure mathematicsMathematics::Functional AnalysisProperty (philosophy)Mathematics::Analysis of PDEsExtension (predicate logic)AnalysisConnection (mathematics)Sobolev inequalityMathematicsJournal of Functional Analysis

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Fixed Points for Pseudocontractive Mappings on Unbounded Domains

2010

We give some fixed point results for pseudocontractive mappings on nonbounded domains which allow us to obtain generalizations of recent fixed point theorems of Penot, Isac, and Németh. An application to integral equations is given.

Discrete mathematicsT57-57.97QA299.6-433Mathematics::Functional AnalysisApplied mathematics. Quantitative methodsApplied MathematicsFixed-point theoremFixed pointIntegral equationDifferential geometryGeometry and TopologyCoincidence pointAnalysisTopology (chemistry)MathematicsFixed Point Theory and Applications

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On Weakly Locally Uniformly Rotund Banach Spaces

1999

Abstract We show that every normed space E with a weakly locally uniformly rotund norm has an equivalent locally uniformly rotund norm. After obtaining a σ -discrete network of the unit sphere S E for the weak topology we deduce that the space E must have a countable cover by sets of small local diameter, which in turn implies the renorming conclusion. This solves a question posed by Deville, Godefroy, Haydon, and Zizler. For a weakly uniformly rotund norm we prove that the unit sphere is always metrizable for the weak topology despite the fact that it may not have the Kadec property. Moreover, Banach spaces having a countable cover by sets of small local diameter coincide with the descript…

Discrete mathematicsUnit sphereMathematics::Functional AnalysisPure mathematicslocally uniformly rotundBanach spacedescriptive Banach spacesUniformly convex spaceweakly locally uniformly rotundNorm (mathematics)Metrization theoremCountable setrenormingAnalysisMathematicsNormed vector spaceJournal of Functional Analysis

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Generalized dimension distortion under planar Sobolev homeomorphisms

2009

We prove essentially sharp dimension distortion estimates for planar Sobolev-Orlicz homeomorphisms.

Distortion (mathematics)Sobolev spaceMathematics::Functional AnalysisMathematics::Dynamical SystemsPlanarDimension (vector space)Applied MathematicsGeneral MathematicsMathematical analysisMathematics::Classical Analysis and ODEsMathematics::Analysis of PDEsMathematics::General TopologyMathematicsProceedings of the American Mathematical Society

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