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 | 95 | 2007 |
Some approximation properties of q-Chlodowsky operators H Karsli, V Gupta Applied Mathematics and Computation 195 (1), 220-229, 2008 | 63 | 2008 |
Voronovskaya-type theorems for derivatives of the Bernstein-Chlodovsky polynomials and the Szász-Mirakyan operator PL Butzer, H Karsli Commentationes Mathematicae 49 (1), 2009 | 59 | 2009 |
Nonlinear integral operators with homogeneous kernels: pointwise approximation theorems C Bardaro, G Vinti, H Karsli Applicable Analysis 90 (3-4), 463-474, 2011 | 55 | 2011 |
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 | 50 | 2008 |
Convergence and rate of convergence by nonlinear singular integral operators depending on two parameters H Karsli Applicable Analysis 85 (6-7), 781-791, 2006 | 48 | 2006 |
On convergence of convolution type singular integral operators depending on two parameters H Karsli, E Ibikli Fasc. Math 38, 25-39, 2007 | 34 | 2007 |
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 | 29 | 2010 |
Rate of convergence of nonlinear integral operators for functions of bounded variation. H Karsli, V Gupta Calcolo 45 (2), 2008 | 28 | 2008 |
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 | 24 | 2013 |
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 | 24 | 2009 |
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 | 23 | 2008 |
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 | 22 | 2008 |
General Gamma type operators based on q-integers H Karsli, PN Agrawal, M Goyal Applied Mathematics and Computation 251, 564-575, 2015 | 21 | 2015 |
Some convergence results for nonlinear singular integral operators H Karsli Demonstratio Mathematica 46 (4), 729-740, 2013 | 21 | 2013 |
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 | 20 | 2005 |
Approximation results for Urysohn type two dimensional nonlinear Bernstein operators H Karslı Constructive Mathematical Analysis 1 (1), 45-57, 2018 | 17 | 2018 |
Some approximation properties by q-Szász-Mirakyan-Baskakov-Stancu operators V Gupta, H Karsli Lobachevskii Journal of Mathematics 33, 175-182, 2012 | 17 | 2012 |
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 | 17 | 2012 |
Rate of convergence of Chlodowsky type Durrmeyer operators E Ibikli, H Karsli J. Inequal. Pure and Appl. Math 6 (4), 2005 | 17 | 2005 |