On the construction of q-analogues for some positive linear operators
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Publication:5020410
DOI10.2298/FIL1713287SzbMath1499.05066OpenAlexW2509051361WikidataQ130109164 ScholiaQ130109164MaRDI QIDQ5020410
Publication date: 5 January 2022
Published in: Filomat (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2298/fil1713287s
(q)-calculus and related topics (05A30) Linear operators on function spaces (general) (47B38) Positive linear operators and order-bounded operators (47B65)
Related Items (3)
On approximation properties of some class positive linear operators in q-analysis ⋮ On the q-analogues for some Kantorovich type linear operators ⋮ The \(q\)-Chlodowsky and \(q\)-Szasz-Durrmeyer hybrid operators on weighted spaces
Cites Work
- On a generalization of Bleimann, Butzer and Hahn operators based on \(q\)-integers
- Convergence of generalized Bernstein polynomials
- \(q\)-extension of a multivariable and multiparameter generalization of the Gottlieb polynomials in several variables
- The rate of pointwise approximation of positive linear operators based on \(q\)-integer
- \(q\)-parametric Bleimann Butzer and Hahn operators
- On statistical approximation of a general class of positive linear operators extended in \(q\)-calculus
- \(q\)-Bernstein polynomials and their iterates.
- Approximation properties of \(q\)-Baskakov operators
- Operators constructed by means of \(q\)-Lagrange polynomials and \(A\)-statistical approximation
- Properties of convergence for \(\omega,q\)-Bernstein polynomials
- Bleimann, Butzer, and Hahn operators based on the \(q\)-integers
- Some approximation properties of \(q\)-Durrmeyer operators
- The rate of convergence of \(q\)-Bernstein polynomials for \(0<q<1\)
- Properties of convergence for the \(q\)-Meyer-König and Zeller operators
- \(q\)-Bernoulli numbers and polynomials
- Generalized q-Baskakov operators
- ON q-BASKAKOV TYPE OPERATORS
- Applications of q-Calculus in Operator Theory
- Quantum calculus
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