Construction of q-Baskakov Operators by Wavelets and Approximation Properties

Nasiruzzaman, Md.; Kılıçman, Adem; Mursaleen, Mohammad Ayman

doi:10.1007/s40995-022-01360-z

Cited by 24 publications

(3 citation statements)

References 21 publications

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“…The q-calculus has several applications in different areas, e.g., summability theory [13,14], approximation theory [2,15,18], integral equations [10], etc. Most recently, the Cesàro q-difference sequence spaces have been studied in [22].…”

Section: Definition 12mentioning

confidence: 99%

Sequence spaces derived by $q_{\lambda}$ operators in $\ell _{p}$ spaces and their geometric properties

Braha,

Yaying,

Mursaleen

2024

J Inequal Appl

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In this paper, we establish a novel category of sequence spaces $\ell _{p}^{q_{\lambda}}$ ℓ p q λ and $\ell _{\infty}^{q_{\lambda}}$ ℓ ∞ q λ by utlizing q-analogue $\Lambda^{q}$ Λ q of Λ-matrix. Our investigation outlines several topological characteristics and inclusion results of these newly introduced sequence spaces, specifically identifying them as BK-spaces. Subsequently, we demonstrate that these novel sequence spaces are of nonabsolute type and establish their isometric isomorphism with $\ell _{p}$ ℓ p and $\ell _{\infty}$ ℓ ∞ . Moreover, we obtain the α-, β-, and γ-duals of these sequence spaces. We further characterize the class $(\ell _{p}^{q_{\lambda}},X)$ ( ℓ p q λ , X ) of matrices, where X is any of the spaces $\ell _{\infty }$ ℓ ∞ , c, or $c_{0}$ c 0 . Lastly, our study delves into the exploration of specific geometric properties exhibited by the space $\ell _{p}^{q_{\lambda}}$ ℓ p q λ .

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Section: Definition 12mentioning

confidence: 99%

Sequence spaces derived by $q_{\lambda}$ operators in $\ell _{p}$ spaces and their geometric properties

Braha,

Yaying,

Mursaleen

2024

J Inequal Appl

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“…Also given is their behavior related to the kind of modulus of continuity and smoothness. For recent developments in this direction, we refer to [1][2][3][4][5][6][7][8].…”

Section: Introductionmentioning

confidence: 99%

Approximation properties by Bézier variant of the Baskakov–Schurer–Szász–Stancu operators

Braha,

Mansour,

Mursaleen

2023

Math Methods in App Sciences

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In this paper, we have construct a new version of the Bézier‐type Baskakov–Schurer–Szász–Stancu operators. For this new class of operators, uniform convergence is shown in any compact subset or positive real line. We prove Korovkin‐type theorem, Voronovskaya‐type theorem, and Grüss–Voronovskaya‐type theorem. Moreover, at the end, we express the behavior of the operators in the Lipschitz‐type space using the modulus of continuity and smoothness.

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“…Mohiuddine et al [6], Acu et al [7], İçöz and Çekim [8,9], and Kajla and Micláus [10,11] constructed new sequences of linear positive operators to investigate the rapidity of convergence and order of approximation in diferent functional spaces in terms of several generating functions. Some other researchers developed many other useful operators [6,[12][13][14][15][16][17][18][19][20][21][22][23][24][25][26][27][28][29][30] in the same feld. In the recent past, for g ∈ [0, 1], m ∈ N and α ∈ [−1, 1], Chen et al [31] constructed a sequence of new linear positive operators as…”

Section: Introductionmentioning

confidence: 99%

A Note on Approximation of Blending Type Bernstein–Schurer–Kantorovich Operators with Shape Parameter α

Ayman-Mursaleen,

Rao,

Rani

et al. 2023

Journal of Mathematics

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The objective of this paper is to construct univariate and bivariate blending type α-Schurer–Kantorovich operators depending on two parameters α∈0,1 and ρ>0 to approximate a class of measurable functions on 0,1+q,q>0. We present some auxiliary results and obtain the rate of convergence of these operators. Next, we study the global and local approximation properties in terms of first- and second-order modulus of smoothness, weight functions, and by Peetre’s K-functional in different function spaces. Moreover, we present some study on numerical and graphical analysis for our operators.

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Construction of q-Baskakov Operators by Wavelets and Approximation Properties

Abstract: We use wavelets to define the Kantorovich variant of q-Baskakov type operators, and for $$1\le p< \infty$$ 1 ≤ p < ∞ , we study the $$L_{p}$$ L p -approximation. Let $$\xi$$ ξ be any positive constant and $$\Psi _{k}(x)$$ … Show more

Cited by 24 publications

References 21 publications

Sequence spaces derived by $q_{\lambda}$ operators in $\ell _{p}$ spaces and their geometric properties

Sequence spaces derived by $q_{\lambda}$ operators in $\ell _{p}$ spaces and their geometric properties

Approximation properties by Bézier variant of the Baskakov–Schurer–Szász–Stancu operators

A Note on Approximation of Blending Type Bernstein–Schurer–Kantorovich Operators with Shape Parameter α

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