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On approximation properties of some non-positive Bernstein-Durrmeyer type operators

Bianca Ioana Vasian
Bianca Ioana Vasian
   | 04 feb 2023
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Pubblicato online: 04 feb 2023
Pagine: 251 - 269
Ricevuto: 19 mar 2022
Accettato: 25 lug 2022
DOI: https://doi.org/10.2478/auom-2023-0014
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© 2023 Bianca Ioana Vasian, published by Sciendo
This work is licensed under the Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License.

[1] Acar T., Aral A., Raa I., Modified Bernstein-Durrmeyer operators,General Mathermatics, Vol. 22, 2014. Search in Google Scholar

[2] Adell J.A., J. de la Cal, Bernstein-Durrmeyer operators, Computers & Mathematics with Applications, Volume 30, Issues 36, 1995.10.1016/0898-1221(95)00081-X Search in Google Scholar

[3] Bernstein S. N., Démonstration du théorém de Weierstrass fondeésur la calcul desprobabilitiés. Commun Soc Math Charkow Sér 2(13), 1912 Search in Google Scholar

[4] Cheng F., On the rate of convergence of Bernstein polynomials of functions of bounded variation. J Approx Theory 39(3):259-274, 198310.1016/0021-9045(83)90098-9 Search in Google Scholar

[5] Deo N., Noor M. A., Siddiqui M.A., On approximation by a class of new Bernstein type operators, Applied Mathematics and Computation, 2008.10.1016/j.amc.2007.12.056 Search in Google Scholar

[6] Derriennic M. M., Sur l’approixmation des fonctions integrables sur [0, 1] par des polynomes de Bernstein modifies, J. Approx. Theory, 31, 1981.10.1016/0021-9045(81)90101-5 Search in Google Scholar

[7] Durrmeyer J. L., Une formule d’inversion de la transformée de Laplace-applicationsálathéorie des moments,Thése de 3e cycle, Facultédes Science de l’Université de Paris, 1967. Search in Google Scholar

[8] Meleşteu D. A., Generalized Bernstein type operators, Bulletin of the Transilvania University of Braşov, Vol 13(62), No. 2, 2020.10.31926/but.mif.2020.13.62.2.20 Search in Google Scholar

[9] Gonska H., On the degree of approximation in Voronovskaja’s theorem. Stud Univ Babe Bolyai Math 52(3):103-115, 2007 Search in Google Scholar

[10] Gonska H., Raa I., Asymptotic behaviour of differentiated Bernstein polynomials. Mat Vesnik 61(1):53-60, 2009 Search in Google Scholar

[11] Gupta V., Heping W., The rate of convergence of q-Durrmeyer operators for 0 <q < 1, Math. Meth. Appl. Sci. 2008;.10.1002/mma.1012 Search in Google Scholar

[12] Mahmudov N. I., Sabancigil P., On Genuine q-Bernstein-Durrmeyer operators, Academia, 2009.10.5486/PMD.2010.4583 Search in Google Scholar

[13] Păltănea R., Approximation theory using positive linear operators. Birkhaüser, Boston, 2004.10.1007/978-1-4612-2058-9 Search in Google Scholar

[14] Siddiqui M. A., Agrawal R. R., Gupta N., On a class of modified new Bernstein operators, Adv. Stud. Contem. Math.,(Kyungshang),24, 2014. Search in Google Scholar

[15] Weierstrass, K.G.: U die analytische Darstellbarkeit sogenannter licher Funktionen einer reellen Veranderlichen, Sitzungsber. Akad. Berlin 2, 633-639, 1885. Search in Google Scholar

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