Quantitative Voronovskaya and Grüss-Voronovskaya type theorems for Jain-Durrmeyer operators of blending type
From MaRDI portal
Publication:2009445
DOI10.1007/s13324-018-0229-5zbMath1428.41027OpenAlexW2799740073MaRDI QIDQ2009445
Arun Kajla, Sheetal Deshwal, Purshottam N. Agrawal
Publication date: 28 November 2019
Published in: Analysis and Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s13324-018-0229-5
Continuity and related questions (modulus of continuity, semicontinuity, discontinuities, etc.) for real functions in one variable (26A15) Rate of convergence, degree of approximation (41A25) Approximation by positive operators (41A36)
Related Items (5)
Weighted simultaneous approximation of the linear combinations of Baskakov operators ⋮ On Szász-Durrmeyer type modification using Gould Hopper polynomials ⋮ Unnamed Item ⋮ The Product of Two Functions Using Positive Linear Operators ⋮ Quantitative theorems for a rich class of novel Miheşan-type approximation operators incorporating the Boas-Buck polynomials
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- The new forms of Voronovskaya's theorem in weighted spaces
- Quantitative \(q\)-Voronovskaya and \(q\)-Grüss-Voronovskaya-type results for \(q\)-Szász operators
- Asymptotic formulae via a Korovkin-type result
- A generalization of Jain's operators
- Asymptotic formulas for generalized Szász-Mirakyan operators
- Jain-Durrmeyer operators associated with the inverse Pólya-Eggenberger distribution
- Grüss-type and Ostrowski-type inequalities in approximation theory
- On the generalized Szász-Mirakyan operators
- Weighted approximation by a certain family of summation integral-type operators
- Approximation properties of a class of linear operators
- Approximation Properties of the Modified Stancu Operators
- q-Voronovskaya type theorems forq-Baskakov operators
- Gr\"uss and Gr\"uss-Voronovskaya-type estimates for some Bernstein-type polynomials of real and complex variables
- Quantitative estimates for Jain-Kantorovich operators
- Generalization of Bernstein's polynomials to the infinite interval
- Approximation properties of generalized Jain operators
- Approximation of functions by a new class of linear operators
- Über das Maximum des absoluten Betrages von \[ \frac 1{b-a}\int _a^bf(x)g(x)\,dx-\frac 1{(b-a)^2}\int _a^bf(x)\,dx\int _a^bg(x)\,dx. \ .]
This page was built for publication: Quantitative Voronovskaya and Grüss-Voronovskaya type theorems for Jain-Durrmeyer operators of blending type
