Search results for "wise"

showing 10 items of 369 documents

Regularity properties for quasiminimizers of a $(p,q)$-Dirichlet integral

2021

Using a variational approach we study interior regularity for quasiminimizers of a $(p,q)$-Dirichlet integral, as well as regularity results up to the boundary, in the setting of a metric space equipped with a doubling measure and supporting a Poincar\'{e} inequality. For the interior regularity, we use De Giorgi type conditions to show that quasiminimizers are locally H\"{o}lder continuous and they satisfy Harnack inequality, the strong maximum principle, and Liouville's Theorem. Furthermore, we give a pointwise estimate near a boundary point, as well as a sufficient condition for H\"older continuity and a Wiener type regularity condition for continuity up to the boundary. Finally, we cons…

PointwiseApplied MathematicsMathematical analysisPoincaré inequalityBoundary (topology)Hölder conditionMetric Geometry (math.MG)Functional Analysis (math.FA)Dirichlet integralMathematics - Functional Analysissymbols.namesakeMetric spaceMaximum principleMathematics - Analysis of PDEsMathematics - Metric GeometrySettore MAT/05 - Analisi MatematicasymbolsFOS: Mathematics(p q)-Laplace operator Measure metric spaces Minimal p-weak upper gradient Minimizer31E05 30L99 46E35AnalysisHarnack's inequalityMathematicsAnalysis of PDEs (math.AP)

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Fourier-transform spectroscopy and potential construction of the (2)1Π state in KCs

2015

The paper presents an empirical pointwise potential energy curve (PEC) of the (2)(1)Π state of the KCs molecule constructed by applying the Inverted Perturbation Approach routine. The experimental term values in the energy range E(v', J') ∈ [15 407; 16 579] cm(-1) involved in the fit were based on Fourier-Transform spectroscopy data obtained with 0.01 cm(-1) accuracy from the laser-induced (2)(1)Π → X(1)Σ(+) fluorescence spectra. Buffer gas Ar was used to facilitate the appearance of rotation relaxation lines in the spectra, thus enlarging the (2)(1)Π data set and allowing determination of the Λ-splitting constants. The data set included vibrational v' ∈ [0, 28] and rotational J' ∈ [7, 274]…

PointwiseChemistryAnalytical chemistryGeneral Physics and AstronomyQuantum numberPotential energyFourier transform spectroscopySpectral linesymbols.namesakeFourier transformExcited statesymbolsPhysical and Theoretical ChemistryAtomic physicsSpectroscopyThe Journal of Chemical Physics

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Fourier-transform spectroscopy and description of low-lying energy levels in the B(1)(1)Π state of RbCs.

2013

The Fourier transform spectrometer with resolution of 0.03 cm(-1) was applied to disperse the diode laser induced B(1)(1)Π → X(1)Σ(+) fluorescence spectra of the RbCs molecule in a heat pipe. The presence of buffer gas (Ar) produced in the spectra the dense pattern of collision-induced rotation relaxation lines, thus enlarging the B(1)(1)Π data set, allowing to determine the Λ-splitting constants and to reveal numerous local perturbations. In total, 2664 term values for (85)Rb(133)Cs and (87)Rb(133)Cs in the energy range from 13,770 to 15,200 cm(-1) were obtained with accuracy about 0.01 cm(-1). A pointwise potential energy curve (PEC) based on inverted perturbation approach was constructed…

PointwiseChemistryBuffer gasAnalytical chemistryGeneral Physics and AstronomyLaserPotential energyFourier transform spectroscopySpectral linelaw.inventionlawAb initio quantum chemistry methodsMoleculePhysical and Theoretical ChemistryAtomic physicsThe Journal of chemical physics

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Weighted pointwise Hardy inequalities

2009

We introduce the concept of a visual boundary of a domain �¶ �¼ Rn and show that the weighted Hardy inequality �¶ |u|pd�¶ �A.p C �¶ |�Þu|pd�¶ �A, where d�¶(x) = dist(x, �Ý�¶), holds for all u �¸ C �� 0 (�¶) with exponents �A < �A0 when the visual boundary of �¶ is sufficiently large. Here �A0 = �A0(p, n, �¶) is explicit, essentially sharp, and may even be greater than p . 1, which is the known bound for smooth domains. For instance, in the case of the usual von Koch snowflake domain the sharp bound is shown to be �A0 = p . 2 + �E, with �E = log 4/ log 3. These results are based on new pointwise Hardy inequalities.

PointwiseCombinatoricsGeneral MathematicsMathematical analysisA domainBoundary (topology)Koch snowflakeDomain (mathematical analysis)MathematicsJournal of the London Mathematical Society

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Finite element approximation of vector fields given by curl and divergence

1981

In this paper a finite element approximation scheme for the system curl is considered. The use of pointwise approximation of the boundary condition leads to a nonconforming method. The error estimate is proved and numerically tested.

PointwiseCurl (mathematics)Vector operatorApproximation errorGeneral MathematicsMathematical analysisGeneral EngineeringMixed finite element methodComplex lamellar vector fieldMathematicsVector potentialExtended finite element methodMathematical Methods in the Applied Sciences

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Pointwise resolutive significance of data and applications in experimental design and data treatment

1992

Abstract The concept of the resolutive significance of a point in a data set with regard to a number of addressed parameters is introduced, and two algorithms able to measure it are proposed. The algorithms are validated using simulated experiments. The sum of all the pointwise resolutive significances of a data set is also proposed as a measure of the resolution of the data set. This sum correlates well with the reciprocal of the standard deviation of the fitted parameters, indicating the precision that can be expected for each parameters. Applications in experimental design, and a method for establishing the weights in the least-quarters regression analysis are discussed.

PointwiseData processingChemistryRegression analysisBiochemistryMeasure (mathematics)Standard deviationAnalytical ChemistryData setStatisticsEnvironmental ChemistryPoint (geometry)AlgorithmSpectroscopyReciprocalAnalytica Chimica Acta

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γ‐Agregation operators and some aspects of generalized aggregation problem

2010

We explore questions related to the aggregation operators and aggregation of fuzzy sets. No preliminary knowledge of the aggregation operators theory and of the fuzzy sets theory are required, because all necessary information is given in Section 2. Later we introduce a new class of γ‐aggregation operators, which “ignore” arguments less than γ. Due to this property γ‐aggregation operators simplify the aggregation process and extend the area of possible applications. The second part of the paper is devoted to the generalized aggregation problem. We use the definition of generalized aggregation operator, introduced by A. Takaci in [7], and study the pointwise extension of a γ‐agop. First publ…

PointwiseDiscrete mathematicsgeneralized aggregationProperty (philosophy)Fuzzy setAggregation problemExtension (predicate logic)Operator theoryγ‐aggregation operatorAlgebrapointwise extensionOperator (computer programming)Modeling and Simulationaggregation operatorQA1-939Ordered weighted averaging aggregation operatororder relationAnalysisMathematicsMathematicsMathematical Modelling and Analysis

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Determination of strain and stress distribution on shearwalls by using the speckle photography technique

2003

Abstract Speckle photography (SP) is a powerful tool that is adequate to determine small displacements in micrometer range. This information shows other characteristics of structure deformation under loads and can be determined as stress and strain distribution. In this paper we present the results of the application of the SP technique used to study the behaviour of discontinuities in a shearwall model. These structural elements are very important to the stability of buildings. The displacement whole field around the discontinuities and loading points was determined using the pointwise method. This allows us to determine stress distribution at the point of interest by means of the suitable…

PointwiseMaterials scienceDeformation (mechanics)business.industryMechanical EngineeringStress–strain curveMathematical analysisClassification of discontinuitiesStability (probability)Atomic and Molecular Physics and OpticsFinite element methodDisplacement (vector)Electronic Optical and Magnetic MaterialsStress (mechanics)OpticsElectrical and Electronic Engineeringbusiness

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Sharp capacity estimates for annuli in weighted $$\mathbf {R}^n$$ R n and in metric spaces

2016

We obtain estimates for the nonlinear variational capacity of annuli in weighted $$\mathbf {R}^n$$ and in metric spaces. We introduce four different (pointwise) exponent sets, show that they all play fundamental roles for capacity estimates, and also demonstrate that whether an end point of an exponent set is attained or not is important. As a consequence of our estimates we obtain, for instance, criteria for points to have zero (resp. positive) capacity. Our discussion holds in rather general metric spaces, including Carnot groups and many manifolds, but it is just as relevant on weighted $$\mathbf {R}^n$$ . Indeed, to illustrate the sharpness of our estimates, we give several examples of …

PointwiseMathematics(all)Pure mathematicsEnd pointGeneral Mathematics010102 general mathematicsZero (complex analysis)01 natural sciences010101 applied mathematicsSet (abstract data type)Metric spaceNonlinear systemsymbols.namesakesymbolsExponent0101 mathematicsCarnot cycleMathematicsMathematische Zeitschrift

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Pointwise characterizations of Hardy-Sobolev functions

2006

We establish simple pointwise characterizations of functions in the Hardy-Sobolev spaces within the range n/(n+1)<p <=1. In addition, classical Hardy inequalities are extended to the case p <= 1.

PointwiseMathematics::Functional Analysis42B30 (Primary) 26D15General Mathematics42B25 (Secondary)010102 general mathematicsMathematical analysisMathematics::Classical Analysis and ODEsMathematics::Analysis of PDEs01 natural sciencesFunctional Analysis (math.FA)Mathematics - Functional Analysis010101 applied mathematicsSobolev spaceCombinatoricsNull setType conditionMathematics - Classical Analysis and ODEsClassical Analysis and ODEs (math.CA)FOS: Mathematics46E35Locally integrable function0101 mathematics46E35; 42B30 (Primary) 26D15; 42B25 (Secondary)Mathematics

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