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Symmetric Properties of λ-Szász Operators Coupled with Generalized Beta Functions and Approximation Theory

Nadeem Rao, Mohammad Farid, Mohd Raiz

2024Symmetry16 citationsDOIOpen Access PDF

Abstract

This research work focuses on λ-Szász–Mirakjan operators coupling generalized beta function. The kernel functions used in λ-Szász operators often possess even or odd symmetry. This symmetry influences the behavior of the operator in terms of approximation and convergence properties. The convergence properties, such as uniform convergence and pointwise convergence, are studied in view of the Korovkin theorem, the modulus of continuity, and Peetre’s K-functional of these sequences of positive linear operators in depth. Further, we extend our research work for the bivariate case of these sequences of operators. Their uniform rate of approximation and order of approximation are investigated in Lebesgue measurable spaces of function. The graphical representation and numerical error analysis in terms of the convergence behavior of these operators are studied.

Topics & Concepts

MathematicsPointwise convergenceModulus of continuityPointwiseOperator theoryOperator (biology)Convergence (economics)Rate of convergenceBivariate analysisSymmetry (geometry)Applied mathematicsPure mathematicsMathematical analysisType (biology)EconomicsApproxRepressorOperating systemElectrical engineeringGeometryBiochemistryBiologyChemistryChannel (broadcasting)EcologyTranscription factorEngineeringGeneEconomic growthComputer scienceStatisticsApproximation Theory and Sequence SpacesMathematical Approximation and IntegrationIterative Methods for Nonlinear Equations
Symmetric Properties of λ-Szász Operators Coupled with Generalized Beta Functions and Approximation Theory | Litcius