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A Study of Szász–Durremeyer-Type Operators Involving Adjoint Bernoulli Polynomials

Nadeem Rao, Mohammad Farid, Rehan Ali

2024Mathematics13 citationsDOIOpen Access PDF

Abstract

This research work introduces a connection of adjoint Bernoulli’s polynomials and a gamma function as a sequence of linear positive operators. Further, the convergence properties of these sequences of operators are investigated in various functional spaces with the aid of the Korovkin theorem, Voronovskaja-type theorem, first order of modulus of continuity, second order of modulus of continuity, Peetre’s K-functional, Lipschitz condition, etc. In the last section, we extend our research to a bivariate case of these sequences of operators, and their uniform rate of approximation and order of approximation are investigated in different functional spaces. Moreover, we construct a numerical example to demonstrate the applicability of our results.

Topics & Concepts

MathematicsModulus of continuityLipschitz continuityType (biology)Sequence (biology)Bivariate analysisBernoulli's principleOrder (exchange)Rate of convergencePure mathematicsConnection (principal bundle)Spectral theoremConvergence (economics)Operator theoryDiscrete mathematicsGeneticsElectrical engineeringFinanceEngineeringGeometryBiologyEcologyEconomicsEconomic growthStatisticsChannel (broadcasting)Aerospace engineeringApproximation Theory and Sequence SpacesIterative Methods for Nonlinear EquationsMathematical Approximation and Integration
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