Turkish Journal of Mathematics and Computer Science

Turkish Journal of Mathematics and Computer Science

A New Generalization of Bernstein Polynomials

Yazarlar: Harun ÇİÇEK, Aydın İZGİ

Cilt 13 , Sayı 1 , 2021 , Sayfalar 211 - 220

Konular:Matematik

DOI:10.47000/tjmcs.853544

Anahtar Kelimeler:Approximation properties,Modulus of continuity,Bernstein operators

Özet: We will hereby introduce a new generalization of the Schurer, Stancu, Deo, and Izgi operators which are the modifications of the Bernstein polynomials and calculate the rate of approximation for the new operator with the help of the continuity module. Then, by using graphs and numerical values, we will demonstrate that the new general operator yields better results than the above classical operators which can be seen as the basis of the approximation theory.

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@article{2021, title={A New Generalization of Bernstein Polynomials}, volume={13}, number={211–220}, publisher={Turkish Journal of Mathematics and Computer Science}, author={Harun ÇİÇEK,Aydın İZGİ}, year={2021} }
APA
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Harun ÇİÇEK,Aydın İZGİ. (2021). A New Generalization of Bernstein Polynomials (Vol. 13). Vol. 13. Turkish Journal of Mathematics and Computer Science.
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Harun ÇİÇEK,Aydın İZGİ. A New Generalization of Bernstein Polynomials. no. 211–220, Turkish Journal of Mathematics and Computer Science, 2021.
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