Results 101 to 110 of about 873 (117)

Approximation by (p,q)-Lupaş–Schurer–Kantorovich operators

, 2020
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α-Schurer Durrmeyer operators and their approximation properties

Annals of the University of Craiova Mathematics and Computer Science Series, 2023
The key goal of the present research article is to introduce a new sequence of linear positive operator i.e., α-Schurer Durrmeyer operator and their approximation behaviour on the basis of function η (z), where η infinitely differentiable on [0,1], η(z)=0, η(1)=1 and η'(z)>0, for all z∈[0,1]. Further, we calculate central moments and basic estimates
Mohd Raiz, Ruchi Singh Rajawat, Vishnu Narayan Mishra   +2 more
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Approximation properties of $$\mu $$-Bernstein–Schurer–Stancu operators

Bulletin of the Iranian Mathematical Society, 2023
The authors introduce the below operator which is called \(\mu\)-Bernstein-Schurer-Stancu operator from \(C[0,1]\) to \(C[0,1]\) \[ \overline{BSS}_{n}^{\alpha \beta}(g;y) = \sum_{k=0}^{n} g\left(\frac{k+\alpha}{n+\beta}\right) \overline{b}_{n,k}(\mu,y) \] where \(\alpha,\beta\) are real parameters and \begin{align*} \overline{b}_{m,0}(\mu,y) & =b_{m,0}(
Naim L. Braha, Toufik Mansour
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q-Bernstein-Schurer-Kantorovich type operators

Bollettino dell'Unione Matematica Italiana, 2015
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Agrawal, P. N., Goyal, Meenu, Kajla, Arun   +2 more
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Bivariate q-Bernstein-Schurer-Kantorovich Operators

Results in Mathematics, 2014
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Agrawal, P. N., Finta, Zoltán, Kumar, A. Sathish   +2 more
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Complex Generalized Stancu-Schurer Operators

Mathematica Slovaca
Abstract In the present study, we determine a Schurer type of complex generalized Stancu operators and examine its some approximation properties. Firstly, we obtain upper quantitative estimates for the convergence and then we get lower estimates from a qualitative Voronovskaja-type result for these specified operators attached to the ...
Çetin, Nursel, Mutlu, Nesibe Manav
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On q-analogue of Bernstein–Schurer–Stancu operators

Applied Mathematics and Computation, 2013
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Agrawal, P. N., Gupta, Vijay, Kumar, A. Sathish   +2 more
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Bernstein–Schurer–Kantorovich operators based on q-integers

Applied Mathematics and Computation, 2015
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Agrawal, P. N., Finta, Zoltán, Sathish Kumar, A.   +2 more
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Approximation by q-Baskakov-Schurer-Szász type operators

AIP Conference Proceedings, 2013
In this study, we introduce an q-analogue of Baskakov-Schurer-Szasz type linear positive operators. We give a weighted approximation theorem and obtain rates of convergence of these operators for continuous functions.
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Stancu–Schurer–Kantorovich operators based on q-integers

Applied Mathematics and Computation, 2015
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