JOURNAL ARTICLE
Approximation by bivariate generalized Bernstein–Schurer operators and associated GBS operators
Year: 2020 Journal: Advances in Difference Equations Vol: 2020 (1) Publisher: Springer Nature
Abstract
Abstract We construct the bivariate form of Bernstein–Schurer operators based on parameter α . We establish the Voronovskaja-type theorem and give an estimate of the order of approximation with the help of Peetre’s K -functional of our newly defined operators. Moreover, we define the associated generalized Boolean sum (shortly, GBS) operators and estimate the rate of convergence by means of mixed modulus of smoothness. Finally, the order of approximation for Bögel differentiable function of our GBS operators is presented.
Keywords:
Mathematics Bivariate analysis Modulus of continuity Operator theory Ordinary differential equation Smoothness Spectral theorem Order (exchange) Differentiable function Fourier integral operator Applied mathematics Microlocal analysis Type (biology) Constant coefficients Rate of convergence Pure mathematics Mathematical analysis Differential equation Statistics
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Citation History
Topics
Approximation Theory and Sequence Spaces
Physical Sciences → Mathematics → Statistics and Probability
Iterative Methods for Nonlinear Equations
Physical Sciences → Mathematics → Numerical Analysis
Mathematical Inequalities and Applications
Physical Sciences → Mathematics → Applied Mathematics
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