Shape preserving properties of $ (\mathfrak{p}, \mathfrak{q}) $ Bernstein Bèzier curves and corresponding results over $ [a, b] $

IF 1.3 Q3 COMPUTER SCIENCE, THEORY & METHODS Mathematical foundations of computing Pub Date : 2023-01-01 DOI:10.3934/mfc.2022041

V. Sharma, Asif Khan, M. Mursaleen

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Abstract

This article deals with shape preserving and local approximation properties of post-quantum Bernstein bases and operators over arbitrary interval \begin{document}$ [a, b] $\end{document} defined by Khan and Sharma (Iran J Sci Technol Trans Sci (2021)). The properties for \begin{document}$ (\mathfrak{p}, \mathfrak{q}) $\end{document}-Bernstein bases and Bézier curves over \begin{document}$ [a, b] $\end{document} have been given. A de Casteljau algorithm has been discussed. Further we obtain the rate of convergence for \begin{document}$ (\mathfrak{p}, \mathfrak{q}) $\end{document}-Bernstein operators over \begin{document}$ [a, b] $\end{document} in terms of Lipschitz type space having two parameters and Lipschitz maximal functions.

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$ (\mathfrak{p}， \mathfrak{q}) $ Bernstein b曲线的保形性质及其在$ [a, b] $上的结果

This article deals with shape preserving and local approximation properties of post-quantum Bernstein bases and operators over arbitrary interval \begin{document}$ [a, b] $\end{document} defined by Khan and Sharma (Iran J Sci Technol Trans Sci (2021)). The properties for \begin{document}$ (\mathfrak{p}, \mathfrak{q}) $\end{document}-Bernstein bases and Bézier curves over \begin{document}$ [a, b] $\end{document} have been given. A de Casteljau algorithm has been discussed. Further we obtain the rate of convergence for \begin{document}$ (\mathfrak{p}, \mathfrak{q}) $\end{document}-Bernstein operators over \begin{document}$ [a, b] $\end{document} in terms of Lipschitz type space having two parameters and Lipschitz maximal functions.

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