Approximation properties of bivariate extension of \(q\)-Szász-Mirakjan-Kantorovich operators
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Publication:2437696
DOI10.1186/1029-242X-2013-324zbMath1284.41010WikidataQ59299692 ScholiaQ59299692MaRDI QIDQ2437696
Publication date: 13 March 2014
Published in: Journal of Inequalities and Applications (Search for Journal in Brave)
\(q\)-integersSzász-Mirakjan operatorsweighted \(A\)-statistical approximationKantorovich-type operatorsbivariate operators
Related Items (4)
Bounds for \(q\)-integrals of \({}_{r+1}\psi_{r+1}\) with applications ⋮ On new class of linear and positive operators ⋮ Bivariate \(q\)-Bernstein-Schurer-Kantorovich operators ⋮ An inequality for \(q\)-integral and its applications
Cites Work
- Statistical approximation of a kind of Kantorovich type \(q\)-Szász-Mirakjan operators
- Approximation theorems by positive linear operators in weighted spaces
- Statistical approximation of Baskakov and Baskakov-Kantorovich operators based on the \(q\)-integers
- Generalized Szász Durrmeyer operators
- On \(q\)-parametric Szász-Mirakjan operators
- The \(q\)-derivate and applications to \(q\)-Sz'asz Mirakyan operators
- Densities and summability
- Statistical approximation properties of \(q\)-Baskakov-Kantorovich operators
- The inequalities for some types of \(q\)-integrals
- Operators constructed by means of \(q\)-Lagrange polynomials and \(A\)-statistical approximation
- On \(q\)-analogue of Bernstein-Schurer-Stancu operators
- Some approximation properties of \(q\)-Durrmeyer operators
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