Search results for "FUNCTIONAL"

showing 10 items of 4822 documents

Asplund Operators on Locally Convex Spaces

2000

We study the relationship between the local Radon-Nikodým property, introduced by Defant [4] as a generalization of the Radon-Nikodým property to duals of locally convex spaces, and the Asplund operators, introduced by Robertson [7]. We also give a characterization of Asplund symmetric tensor products of Banach spaces in terms of Asplund maps.

Mathematics::Functional AnalysisPure mathematicsProperty (philosophy)GeneralizationLocally convex topological vector spaceMathematical analysisBanach spaceAstrophysics::Solar and Stellar AstrophysicsMathematics::General TopologySymmetric tensorDual polyhedronCharacterization (mathematics)Mathematics
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Some Remarks on the Spectral Properties of Toeplitz Operators

2019

In this paper, we study some local spectral properties of Toeplitz operators $$T_\phi $$ defined on Hardy spaces, as the localized single-valued extension property and the property of being hereditarily polaroid.

Mathematics::Functional AnalysisPure mathematicsProperty (philosophy)Weyl-type theoremslocalized single-valued extension propertyGeneral MathematicsSpectral propertiesExtension (predicate logic)Hardy spaceToeplitz matrixsymbols.namesakeToeplitz operatorSettore MAT/05 - Analisi MatematicasymbolsMathematicsMediterranean Journal of Mathematics
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Selected Topics on Banach Space Theory

2019

Basic topics on Banach space theory needed for the text are reviewed. Hahn-Banach theorem, Baire’s theorem, uniform boundedness principle, closed graph theorem, weak topologies, Banach-Alaoglu theorem, unconditional basis, Banach sequence spaces, summing operators, factorable operators, cotype, Kahane inequality.

Mathematics::Functional AnalysisPure mathematicsSequenceBasis (linear algebra)Uniform boundedness principleBanach spaceMathematics::General TopologyHahn–Banach theoremClosed graph theoremMathematicsSchauder basis
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Critical points for nondifferentiable functions in presence of splitting

2006

A classical critical point theorem in presence of splitting established by Brézis-Nirenberg is extended to functionals which are the sum of a locally Lipschitz continuous term and of a convex, proper, lower semicontinuous function. The obtained result is then exploited to prove a multiplicity theorem for a family of elliptic variational-hemivariational eigenvalue problems. © 2005 Elsevier Inc. All rights reserved.

Mathematics::Functional AnalysisPure mathematicsnon-smooth functionNonsmooth functionssplittingApplied MathematicsMathematical analysisMultiple solutionsMultiple solutionMathematics::Analysis of PDEsRegular polygoncritical point; non-smooth function; splittingcritical pointMultiplicity (mathematics)Critical pointsNonsmooth functionElliptic variational-hemivariational eigenvalue problemLipschitz continuityCritical point (mathematics)Elliptic variational–hemivariational eigenvalue problemsSplittingsEigenvalues and eigenvectorsAnalysisMathematics
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Dimension gap under Sobolev mappings

2015

Abstract We prove an essentially sharp estimate in terms of generalized Hausdorff measures for the images of boundaries of Holder domains under continuous Sobolev mappings, satisfying suitable Orlicz–Sobolev conditions. This estimate marks a dimension gap, which was first observed in [2] for conformal mappings.

Mathematics::Functional AnalysisPure mathematicsquasihyperbolic distanceGeneral Mathematicsgeneralized Hausdorff measureMathematical analysista111Sobolev mappingHausdorff spaceConformal map16. Peace & justiceSobolev inequalitySobolev spaceDimension (vector space)Orlicz–Sobolev mappingMathematicsAdvances in Mathematics
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Browder-Type Theorems

2018

This chapter may be viewed as the part of the book in which the interaction between local spectral theory and Fredholm theory comes into focus. The greater part of the chapter addresses some classes of operators on Banach spaces that have a very special spectral structure. We have seen that the Weyl spectrum σw(T) is a subset of the Browder spectrum σb(T) and this inclusion may be proper. In this chapter we investigate the class of operators on complex infinite-dimensional Banach spaces for which the Weyl spectrum and the Browder spectrum coincide. These operators are said to satisfy Browder’s theorem. The operators which satisfy Browder’s theorem have a very special spectral structure, ind…

Mathematics::Functional AnalysisPure mathematicssymbols.namesakeClass (set theory)Spectral theorySpectrum (functional analysis)Spectral structuresymbolsBanach spaceType (model theory)Fredholm theoryMathematics
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Weyl-Type Theorems

2018

In the previous chapters we introduced several classes of operators which have their origin in Fredholm theory. We also know that the spectrum of a bounded linear operator T on a Banach space X can be split into subsets in many different ways.

Mathematics::Functional AnalysisPure mathematicssymbols.namesakeSpectrum (functional analysis)Banach spacesymbolsType (model theory)Fredholm theoryMathematicsBounded operator
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Biorthogonal vectors, sesquilinear forms, and some physical operators

2018

Continuing the analysis undertaken in previous articles, we discuss some features of non-self-adjoint operators and sesquilinear forms which are defined starting from two biorthogonal families of vectors, like the so-called generalized Riesz systems, enjoying certain properties. In particular we discuss what happens when they forms two $\D$-quasi bases.

Mathematics::Functional AnalysisQuantum Physics010102 general mathematicsFOS: Physical sciencesStatistical and Nonlinear PhysicsMathematical Physics (math-ph)01 natural sciencesMathematical OperatorsAlgebraBiorthogonal system0103 physical sciences010307 mathematical physics0101 mathematicsQuantum Physics (quant-ph)Mathematical PhysicsMathematicsStatistical and Nonlinear Physic
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Bounded compositions on scaling invariant Besov spaces

2012

For $0 < s < 1 < q < \infty$, we characterize the homeomorphisms $��: \real^n \to \real^n$ for which the composition operator $f \mapsto f \circ ��$ is bounded on the homogeneous, scaling invariant Besov space $\dot{B}^s_{n/s,q}(\real^n)$, where the emphasis is on the case $q\not=n/s$, left open in the previous literature. We also establish an analogous result for Besov-type function spaces on a wide class of metric measure spaces as well, and make some new remarks considering the scaling invariant Triebel-Lizorkin spaces $\dot{F}^s_{n/s,q}(\real^n)$ with $0 < s < 1$ and $0 < q \leq \infty$.

Mathematics::Functional AnalysisQuasiconformal mappingPure mathematics46E35 30C65 47B33Function spaceComposition operator010102 general mathematicsta11116. Peace & justiceTriebel–Lizorkin space01 natural sciencesFunctional Analysis (math.FA)Mathematics - Functional AnalysisMathematics - Classical Analysis and ODEsBounded function0103 physical sciencesClassical Analysis and ODEs (math.CA)FOS: MathematicsBesov space010307 mathematical physics0101 mathematicsInvariant (mathematics)ScalingAnalysisMathematicsJournal of Functional Analysis
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Spatial Besov regularity for stochastic partial differential equations on Lipschitz domains

2010

We use the scale of Besov spaces B^\alpha_{\tau,\tau}(O), \alpha>0, 1/\tau=\alpha/d+1/p, p fixed, to study the spatial regularity of the solutions of linear parabolic stochastic partial differential equations on bounded Lipschitz domains O\subset R^d. The Besov smoothness determines the order of convergence that can be achieved by nonlinear approximation schemes. The proofs are based on a combination of weighted Sobolev estimates and characterizations of Besov spaces by wavelet expansions.

Mathematics::Functional AnalysisSmoothness (probability theory)General MathematicsProbability (math.PR)Mathematics::Analysis of PDEsScale (descriptive set theory)Numerical Analysis (math.NA)Lipschitz continuitySobolev spaceStochastic partial differential equation60H15 Secondary: 46E35 65C30WaveletRate of convergenceBounded functionFOS: MathematicsApplied mathematicsMathematics - Numerical AnalysisMathematics - ProbabilityMathematicsStudia Mathematica
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