Approximation by the modified $ \lambda $-Bernstein-polynomial in terms of basis function
M. Mursaleen, Md. Nasiruzzaman, Nadeem Rao, Mohammad Dilshad, Kottakkaran Sooppy Nisar
Abstract
<abstract><p>In this article by means of shifted knots properties, we introduce a new type of coupled Bernstein operators for Bézier basis functions. First, we construct the operators based on shifted knots properties of Bézier basis functions then investigate the Korovkin's theorem, establish a local approximation theorem, and provide a convergence theorem for Lipschitz continuous functions and Peetre's $ K $-functional. In addition, we also obtain an asymptotic formula of the type Voronovskaja.</p></abstract>
Topics & Concepts
MathematicsBernstein polynomialLipschitz continuityType (biology)Bézier curveConvergence (economics)Basis (linear algebra)PolynomialLambdaBasis functionPure mathematicsFunction (biology)Applied mathematicsMathematical analysisGeometryEconomic growthPhysicsEcologyOpticsEconomicsEvolutionary biologyBiologyApproximation Theory and Sequence SpacesMathematical Approximation and IntegrationIterative Methods for Nonlinear Equations