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Publication Date:
March 2010
ISSN:
1572-9176
DOI:
10.1515/GMJ.2009.693

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Georgian Mathematical Journal

Editor-in-Chief: Kiguradze, Ivan / Shervashidze, T.

Editorial Board Member: Kvinikadze, M. / Bantsuri, R. / Baues, Hans-Joachim / Besov, O.V. / Bojarski, B. / Duduchava, R. / Engelbert, Hans-Jürgen / Gamkrelidze, R. / Gubeladze, J. / Hirzebruch, F. / Inassaridze, Hvedri / Jibladze, M. / Kadeishvili, T. / Kegel, Otto H. / Kharazishvili, Alexander / Kharibegashvili, S. / Khmaladze, E. / Kiguradze, Tariel / Kokilashvili, V. / Krushkal, S. I. / Kurzweil, J. / Kwapien, S. / Lerche, Hans Rudolf / Mawhin, J. / Ricci, P.E. / Tarieladze, V. / Triebel, Hans / Vakhania, N. / Zanolin, Fabio

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On the Rates of Convergence of Chlodovsky–Durrmeyer Operators and their Bézier Variant

Harun Karsli1 / Paulina Pych-Taberska2

1Abant Izzet Baysal University, Faculty of Science and Arts, Department of Mathematics, 14280, Bolu, Turkey. E-mail: karsli h@ibu.edu.tr

2Faculty of Mathematics and Computer Science, Adam Mickiewicz University, Umultowska 87, 61-614, Poznań, Poland. E-mail: ppych@amu.edu.pl

Citation Information: Georgian Mathematical Journal. Volume 16, Issue 4, Pages 693–704, ISSN (Online) 1072-9176, ISSN (Print) 1072-947X, DOI: 10.1515/GMJ.2009.693, March 2010

Publication History:
Received:
2009-05-04
Published Online:
2010-03-11

Abstract

We consider the Bézier variant of Chlodovsky–Durrmeyer operators 𝐷𝑛,α for functions 𝑓 measurable and locally bounded on the interval [0,∞). By using the Chanturia modulus of variation we estimate the rate of pointwise convergence of (𝐷𝑛,α𝑓) (𝑥) at those 𝑥 > 0 at which the one-sided limits 𝑓(𝑥+), 𝑓(𝑥–) exist. In the special case α = 1 the recent result of [Ibikli, Karsli, J. Inequal. Pure Appl. Math. 6: 12, 2005] concerning the Chlodovsky–Durrmeyer operators 𝐷𝑛 is essentially improved and extended to more general classes of functions.

Key words and phrases:: Rate of convergence; Chlodovsky–Durrmeyer operator; Bézier basis; Chanturia modulus of variation; 𝑝-th power variation

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