Search results for "Uniform convergence"

showing 7 items of 7 documents

The uniform convergence of a double sequence of functions at a point and Korovkin-type approximation theorems

2020

Abstract In this paper, we introduce an interesting kind of convergence for a double sequence called the uniform convergence at a point. We give an example and demonstrate a Korovkin-type approximation theorem for a double sequence of functions using the uniform convergence at a point. Then we show that our result is stronger than the Korovkin theorem given by Volkov and present several graphs. Finally, in the last section, we compute the rate of convergence.

010101 applied mathematicsPure mathematicsGeneral MathematicsUniform convergence010102 general mathematicsPoint (geometry)0101 mathematicsType (model theory)01 natural sciencesDouble sequenceMathematicsGeorgian Mathematical Journal
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When a convergence of filters is measure-theoretic

2022

Abstract Convergence almost everywhere cannot be induced by a topology, and if measure is finite, it coincides with almost uniform convergence and is finer than convergence in measure, which is induced by a metrizable topology. Measures are assumed to be finite. It is proved that convergence in measure is the Urysohn modification of convergence almost everywhere, which is pseudotopological. Extensions of these convergences from sequences to arbitrary filters are discussed, and a concept of measure-theoretic convergence is introduced. A natural extension of convergence almost everywhere is neither measure-theoretic, nor finer than a natural extension of convergence in measure. A straightforw…

Convergence in measureMetrization theoremUniform convergenceConvergence (routing)Applied mathematicsAlmost everywhereTopology (electrical circuits)Geometry and TopologyExtension (predicate logic)Measure (mathematics)MathematicsTopology and its Applications
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On the Problem of Well-Posedness for the Radon Transform

1981

In this note, we first discuss some continuity and discontinuity properties of the inverse Radon transform (R.t.). Any such property gives a positive (or negative) answer to the question, whether under certain contitions the problem of inverting the R.t. is well-posed.

Discontinuity (linguistics)Property (philosophy)Inverse radonRadon transformUniform convergenceMathematical analysisSingular measureWell posednessMathematics
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On the integration of Riemann-measurable vector-valued functions

2016

We confine our attention to convergence theorems and descriptive relationships within some subclasses of Riemann-measurable vector-valued functions that are based on the various generalizations of the Riemann definition of an integral.

Dominated convergence theoremRiemann-measurable functionPure mathematicsMeasurable functionGeneral Mathematics02 engineering and technologyLebesgue measurable gaugeLebesgue integration01 natural sciencessymbols.namesakeConvergence (routing)0202 electrical engineering electronic engineering information engineeringCalculusMathematics (all)0101 mathematicsMathematicsBirkhoff McShane Henstock and Pettis integralMathematics::Complex Variables010102 general mathematicsRiemann integralRiemann hypothesisBounded variationBounded variationAlmost uniform convergencesymbols020201 artificial intelligence & image processingVector-valued function$$ACG_*$$ACG∗and $$ACG_delta ^*$$ACGδ∗functionMonatshefte für Mathematik
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Boundary regularity and the uniform convergence of quasiconformal mappings

1979

Image domainQuasiconformal mappingGeneral MathematicsNormal convergenceUniform convergenceMathematical analysisBoundary (topology)Modes of convergenceCompact convergenceNormal familyMathematicsCommentarii Mathematici Helvetici
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Multiphoton-ionization transition amplitudes and the Keldysh approximation.

1989

The Keldysh approximation to treat the multiphoton ionization of atoms is reconsidered. It is shown that, if one consistently uses the hypothesis under which the approximation should be valid (essentially, that of a weak, short-range binding potential), a Keldysh-like term results as an approximation to the first term of a uniformly convergent series in powers of the binding potential. No cancellation occurs when higher-order terms are taken into account. This result allows one to consider the Keldysh approximation as a well-defined theoretical model, without implying, however, that it is adequate to describe multiphoton ionization of real atoms.

PhysicsAmplitudeSeries (mathematics)Quantum mechanicsIonizationUniform convergenceBorn–Huang approximationPhysics::Atomic and Molecular ClustersPhysics::Atomic PhysicsPhotoionizationCondensed Matter::Mesoscopic Systems and Quantum Hall EffectTerm (time)Physical review. A, General physics
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Yet Another New Variant of Szász–Mirakyan Operator

2021

In this paper, we construct a new variant of the classical Szász–Mirakyan operators, Mn, which fixes the functions 1 and eax,x≥0,a∈R. For these operators, we provide a quantitative Voronovskaya-type result. The uniform weighted convergence of Mn and a direct quantitative estimate are obtained. The symmetry of the properties of the classical Szász–Mirakyan operator and of the properties of the new sequence is investigated. Our results improve and extend similar ones on this topic, established in the last decade by many authors.

SequencePure mathematicsPhysics and Astronomy (miscellaneous)weighted approximationGeneral MathematicsUniform convergenceMathematicsofComputing_GENERALEAX modeuniform convergenceExponential functionOperator (computer programming)Chemistry (miscellaneous)Convergence (routing)Computer Science (miscellaneous)QA1-939Szász–Mirakyan operatorsexponential functionsSymmetry (geometry)Yet anotherMathematicsMathematicsSymmetry
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