Some approximation results on a class of new type λ-Bernstein polynomials

Aslan, Reşat; Mursaleen, M.

doi:10.7153/jmi-2022-16-32

Cited by 18 publications

(3 citation statements)

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“…The magnificent polynomials of Bernstein were likewise used in many different mathematical fields for the purpose of solving partial differential equations numerically, computer-aided geometric design (CAGD), computer graphics, and so on. For more information, readers are referred to the literature [30][31][32][33][34][35][36].…”

Section: Introductionmentioning

confidence: 99%

Approximation by Riemann–Liouville type fractional α$$ \alpha $$‐Bernstein–Kantorovich operators

Berwal,

Mohiuddine,

Kajla

et al. 2024

Math Methods in App Sciences

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In this research paper, we construct a new sequence of Riemann–Liouville type fractional ‐Bernstein–Kantorovich operators. We prove a Korovkin type approximation theorem and discuss the rate of convergence with the first order modulus of continuity of these operators. Further, we study Voronovskaja type theorem, quantitative Voronovskaya type theorem, Chebyshev–Grüss inequality and Grüss–Voronovskaya type theorem.

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Section: Introductionmentioning

confidence: 99%

Approximation by Riemann–Liouville type fractional α$$ \alpha $$‐Bernstein–Kantorovich operators

Berwal,

Mohiuddine,

Kajla

et al. 2024

Math Methods in App Sciences

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“…Yadav et al [12] considered a modiőcation of α-Bernstein summation-integral type operators in view of a strictly positive continuous function. Aslan et al [13] proposed and studied a novel family of λ-Bernstein operators. Cai et al [14] invented a novel of (λ, q)-Bernstein operators.…”

Section: Introductionmentioning

confidence: 99%

Enhanced Approximation Techniques: Stancu-type (λ,μ)-Bernstein-Kantorovich Operators

Cai,

Aslan,

Ozger

et al. 2024

Preprint

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The principal aim of this study is to investigate a range of approximation characteristics exhibited by Stancu-type (λ, μ)-Bernstein-Kantorovich operators denoted as Fλ,μ r,α,β(ϕ; z). In the initial stage, we conduct a comprehensive examination of diverse moment estimates pertaining to operators Fλ,μ r,α,β(ϕ; z). Subsequently, we delve into the exploration of several facets of direct results, including the order of convergence with respect to the usual modulus of continuity, Lipschitz-type continuous functions, and the Peetre’s K-functional. Furthermore, in order to gain insights into the asymptotic characteristics of the operators Fλ,μ r,α,β(ϕ; z), we derive a Voronovskaya-type asymptotic theorem. Additionally, we provide an analysis of the A-statistical convergence behavior and pointwise estimates associated with the operators Fλ,μ r,α,β(ϕ; z). Finally, we have included graphical representations and numerical error value tables to demonstrate the efficiency and accuracy of our proposed operator. Our analysis reveals that our operator yields significantly superior approximation results compared to certain other linear positive operators documented in the existing literature. Keywords and

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“…In [13], the authors investigated various pointwise and uniform approximation results. Furthermore, many researchers, e.g., Kilicman et al [15], Acar et al [16], Aral et al [17], Cai et al [18,19], Çetin et al [20,21], Mohiuddine et al [22], Aslan et al [23,24], Acu et al [25], Agrawal [26], Nasiruzzaman et al [27], and Ayman-Mursaleen et al [28,29], have intensively studied α-Bernstein operators and their modifications for better approximation results. In [30][31][32] some interesting studies have been carried out.…”

Section: Introductionmentioning

confidence: 99%

On One- and Two-Dimensional α–Stancu–Schurer–Kantorovich Operators and Their Approximation Properties

Heshamuddin

Rao²,

Lamichhane

et al. 2022

Mathematics

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The goal of this research article is to introduce a sequence of α–Stancu–Schurer–Kantorovich operators. We calculate moments and central moments and find the order of approximation with the aid of modulus of continuity. A Voronovskaja-type approximation result is also proven. Next, error analysis and convergence of the operators for certain functions are presented numerically and graphically. Furthermore, two-dimensional α–Stancu–Schurer–Kantorovich operators are constructed and their rate of convergence, graphical representation of approximation and numerical error estimates are presented.

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Some approximation results on a class of new type λ-Bernstein polynomials

Cited by 18 publications

References 0 publications

Approximation by Riemann–Liouville type fractional α$$ \alpha $$‐Bernstein–Kantorovich operators

Approximation by Riemann–Liouville type fractional α$$ \alpha $$‐Bernstein–Kantorovich operators

Enhanced Approximation Techniques: Stancu-type (λ,μ)-Bernstein-Kantorovich Operators

On One- and Two-Dimensional α–Stancu–Schurer–Kantorovich Operators and Their Approximation Properties

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