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Some approximation results on a class of new type λ-Bernstein polynomials

Reşat Aslan, M. ‎Mursaleen

2022Journal of Mathematical Inequalities40 citationsDOIOpen Access PDF

Abstract

The main concern of this article is to acquire some approximation properties of a new class of Bernstein polynomials based on Bzier basis functions with shape parameter [-1,1] . We prove Korovkin type approximation theorem and estimate the degree of convergence in terms of the modulus of continuity, for the functions belong to Lipschitz type class and Peetre's K -functional, respectively. Additionally, with the help of Maple software, we present the comparison of the convergence of newly defined operators to the certain functions with some graphical illustrations and error estimation tables. Also, we conclude that the error estimation of our newly defined operators in some cases is better than classical Bernstein operators [3], Cai et al. [4] and Izgi [10].

Topics & Concepts

MathematicsClass (philosophy)Type (biology)Bernstein polynomialPure mathematicsAlgebra over a fieldArtificial intelligenceComputer scienceEcologyBiologyApproximation Theory and Sequence Spaces