This work is licensed under the Creative Commons Attribution 4.0 Public License.
A. Jakimovski, D. Leviatan, Generalized Szász operators for the approximation in the infinite interval, Mathematica (Cluj) 34 (1969) 97-103JakimovskiA.LeviatanD.Generalized Szász operators for the approximation in the infinite intervalSearch in Google Scholar
I. Chlodowsky, Sur le développement des fonctions définies dans un intervalle infini en séries de polynomes de M.S. Bernstein, Compos. Math. 4 (1937) 380-393ChlodowskyI.Sur le développement des fonctions définies dans un intervalle infini en séries de polynomes de M.S. BernsteinSearch in Google Scholar
I. Büyükyazıcı, H. Tanberkan, S. Kırcı Serenbay and Ç. Atakut, Approximation by Chlodowsky type Jakimovski-Leviatan operators, Journal of Computational and Applied Mathematics 259 (2014) 153-163BüyükyazıcıI.TanberkanH.Kırcı SerenbayS.AtakutÇ.Approximation by Chlodowsky type Jakimovski-Leviatan operatorsSearch in Google Scholar
P. P. Krovkin, - On the convergence of linear positive operators in the space of continuous functions, Dokl. Akad. Nauk, 90(1953), 961-964.KrovkinP. P.- On the convergence of linear positive operators in the space of continuous functionsSearch in Google Scholar
A. Ciupa, On the approximation by Favard-Szász type operators, Rev. Anal. Numer. Theor. Approx. 25 (1996), 57-61.CiupaA.On the approximation by Favard-Szász type operatorsSearch in Google Scholar
B. Wood, Generalized Szász operators for approximation in the complex domain, SIAM J. Appl. Math. 17 (4) (1969) 790–801WoodB.Generalized Szász operators for approximation in the complex domainSearch in Google Scholar
J. P. King, Positive Linear Operators which preserve x2, Acta Math. Hungari, 99, 203-208, 2003.KingJ. P.Positive Linear Operators which preserve x2Search in Google Scholar
A.D. Gadjiev, A. Aral, The estimates of approximation by using a new type of weighted modulus of continuity, Comput. Math. Appl. 54 (2007) 127–135.GadjievA.D.AralA.The estimates of approximation by using a new type of weighted modulus of continuitySearch in Google Scholar
O. Duman, M. A. Ozarslan, B. Della Veccihia, Modified Szász- Mirakjan-Kantrovich operators preserving linear functions, Turk. J. Math. 33, 151-158(2009) How to use the mc.cls class file 549DumanO.OzarslanM. A.Della VeccihiaB.Modified Szász- Mirakjan-Kantrovich operators preserving linear functionsSearch in Google Scholar
V.I. Volkov, On the convergence of sequences of linear positive operators in the space of continuous functions of two variables, Dokl. Akad. Nauk SSSR, 115(1957), 17-19.VolkovV.I.On the convergence of sequences of linear positive operators in the space of continuous functions of two variablesSearch in Google Scholar
A. Holhş, The rate of approximation of functions in an infinite interval by positive linear operators. Studia Univ. “Babeş-Bolyai”, Mathematica 55(2), 133-142 (2010)HolhşA.The rate of approximation of functions in an infinite interval by positive linear operatorsSearch in Google Scholar
B.D. Boyanov, V.M. Veselinov, A note on the approximation of functions in an infinite interval by linear positive operators. Bull. Math. Soc. Sci. Math. Roum 14(62), 9–13 (1970).BoyanovB.D.VeselinovV.M.A note on the approximation of functions in an infinite interval by linear positive operatorsSearch in Google Scholar
T. Acar, A. Aral and H. Gonska, On Szászrakyan Operators Preserving e2ax; a > 0, Mediterr. J. Math. (2017) 14(6)AcarT.AralA.GonskaH.On Szászrakyan Operators Preserving e2ax; a > 0Search in Google Scholar