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Harun Karsli
Harun Karsli
Bolu Abant Izzet Baysal University Department of Mathematics
Verified email at ibu.edu.tr
Title
Cited by
Cited by
Year
Rate of convergence of new gamma type operators for functions with derivatives of bounded variation
H Karsli
Mathematical and computer modelling 45 (5-6), 617-624, 2007
952007
Some approximation properties of q-Chlodowsky operators
H Karsli, V Gupta
Applied Mathematics and Computation 195 (1), 220-229, 2008
632008
Voronovskaya-type theorems for derivatives of the Bernstein-Chlodovsky polynomials and the Szász-Mirakyan operator
PL Butzer, H Karsli
Commentationes Mathematicae 49 (1), 2009
592009
Nonlinear integral operators with homogeneous kernels: pointwise approximation theorems
C Bardaro, G Vinti, H Karsli
Applicable Analysis 90 (3-4), 463-474, 2011
552011
On pointwise convergence of linear integral operators with homogeneous kernels
C Bardaro, G Vinti, H Karsli
Integral Transforms and Special Functions 19 (6), 429-439, 2008
502008
Convergence and rate of convergence by nonlinear singular integral operators depending on two parameters
H Karsli
Applicable Analysis 85 (6-7), 781-791, 2006
482006
On convergence of convolution type singular integral operators depending on two parameters
H Karsli, E Ibikli
Fasc. Math 38, 25-39, 2007
342007
Direct local and global approximation results for operators of Gamma type
H Karsli, A Özarslan
Hacettepe Journal of Mathematics and Statistics 39 (2), 241-253, 2010
292010
Rate of convergence of nonlinear integral operators for functions of bounded variation.
H Karsli, V Gupta
Calcolo 45 (2), 2008
282008
On pointwise convergence of Mellin type nonlinear m-singular integral operators
C Bardaro, H Karsli, G Vinti
Communications on Applied Nonlinear Analysis 20 (2), 25-39, 2013
242013
Rate of pointwise convergence of a new kind of gamma operators for functions of bounded variation
H Karsli, V Gupta, A Izgi
Applied Mathematics Letters 22 (4), 505-510, 2009
242009
Convergence rate of a new Bezier variant of Chlodowsky operators to bounded variation functions
H Karsli, E Ibikli
Journal of computational and applied mathematics 212 (2), 431-443, 2008
232008
On the approximation properties of a class of convolution type nonlinear singular integral operators
H Karsli
Walter de Gruyter GmbH & Co. KG 15 (1), 77-86, 2008
222008
General Gamma type operators based on q-integers
H Karsli, PN Agrawal, M Goyal
Applied Mathematics and Computation 251, 564-575, 2015
212015
Some convergence results for nonlinear singular integral operators
H Karsli
Demonstratio Mathematica 46 (4), 729-740, 2013
212013
Approximation properties of convolution type singular integral operators depending on two parameters and of their derivatives in L1 (a, b)
H Karsli, E Ibikli
Proc. 16th Int. Conf. Jangjeon Math. Soc 16, 66-76, 2005
202005
Approximation results for Urysohn type two dimensional nonlinear Bernstein operators
H Karslı
Constructive Mathematical Analysis 1 (1), 45-57, 2018
172018
Some approximation properties by q-Szász-Mirakyan-Baskakov-Stancu operators
V Gupta, H Karsli
Lobachevskii Journal of Mathematics 33, 175-182, 2012
172012
A Voronovskaya-type theorem for the second derivative of the Bernstein-Chlodovsky polynomials
H Karsli
Proceedings of the Estonian Academy of Sciences 61 (1), 9, 2012
172012
Rate of convergence of Chlodowsky type Durrmeyer operators
E Ibikli, H Karsli
J. Inequal. Pure and Appl. Math 6 (4), 2005
172005
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