DOIAbstract
summary:Using the $q$-Bernstein basis, we construct a new sequence $\{ L_{n} \}$ of positive linear operators in $C[0,1].$ We study its approximation properties and the rate of convergence in terms of modulus of continuity
summary:Using the $q$-Bernstein basis, we construct a new sequence $\{ L_{n} \}$ of positive linear operators in $C[0,1].$ We study its approximation properties and the rate of convergence in terms of modulus of continuity
AbstractIn the present paper we construct q-Szász–Mirakjan operators that preserve x2. The rate of g...
In this paper, we estimate the third and the fourth order central moments for the difference of the ...
AbstractIn this paper, the following generalization of multivariate Bernstein polynomials has been s...
summary:Using the $q$-Bernstein basis, we construct a new sequence $\{ L_{n} \}$ of positive linear ...
In the present paper, using the method developed in \cite{Finta1}, we prove the existence of the lim...
AbstractIn this paper, we discuss properties of convergence for the q-Meyer-König and Zeller operato...
AbstractIn the note, we consider saturation of convergence on the interval [0,1] for the q-Bernstein...
AbstractIn the paper, we discuss Voronovskaya-type theorem and saturation of convergence for q-Berns...
We introduce a Stancu type generalization of the Lupaș \(q\)-analogue of the Bernstein operator via ...
AbstractWe establish a strong version of a known extremal property of Bernstein operators, as well a...
AbstractLet Ln(f, x)(f ϵ C)[0, ∞)) be a Bernstein-type approximation operator as defined and studied...
AbstractThe aim of this paper is to present norm estimates in C[0,1] for the q-Bernstein basic polyn...
AbstractIn the present paper, introducing a King type modification of the Lupaş operators, the rates...
International audienceWe introduce here a generalization of the modified Bernstein polynomials for J...
AbstractIn this paper, we discuss properties of the ω,q-Bernstein polynomials Bnω,q(f;x) introduced ...
AbstractIn the present paper we construct q-Szász–Mirakjan operators that preserve x2. The rate of g...
In this paper, we estimate the third and the fourth order central moments for the difference of the ...
AbstractIn this paper, the following generalization of multivariate Bernstein polynomials has been s...
summary:Using the $q$-Bernstein basis, we construct a new sequence $\{ L_{n} \}$ of positive linear ...
In the present paper, using the method developed in \cite{Finta1}, we prove the existence of the lim...
AbstractIn this paper, we discuss properties of convergence for the q-Meyer-König and Zeller operato...
AbstractIn the note, we consider saturation of convergence on the interval [0,1] for the q-Bernstein...
AbstractIn the paper, we discuss Voronovskaya-type theorem and saturation of convergence for q-Berns...
We introduce a Stancu type generalization of the Lupaș \(q\)-analogue of the Bernstein operator via ...
AbstractWe establish a strong version of a known extremal property of Bernstein operators, as well a...
AbstractLet Ln(f, x)(f ϵ C)[0, ∞)) be a Bernstein-type approximation operator as defined and studied...
AbstractThe aim of this paper is to present norm estimates in C[0,1] for the q-Bernstein basic polyn...
AbstractIn the present paper, introducing a King type modification of the Lupaş operators, the rates...
International audienceWe introduce here a generalization of the modified Bernstein polynomials for J...
AbstractIn this paper, we discuss properties of the ω,q-Bernstein polynomials Bnω,q(f;x) introduced ...
AbstractIn the present paper we construct q-Szász–Mirakjan operators that preserve x2. The rate of g...
In this paper, we estimate the third and the fourth order central moments for the difference of the ...
AbstractIn this paper, the following generalization of multivariate Bernstein polynomials has been s...
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