Add to ORKGMax-Product algebra is new direction in constructive approximation of functions by operators. In this study, we introduce the q-analog of Bernstein-Chlodowsky operators using max-product algebra and investigate approximation properties of a sequence of these operators. Also, an upper estimate of the approximation error of the form Cω1(f; 1/√n + 1) with C > 0 obvious constant is obtained.Publisher's Versio
summary:Due to the fact that in the case $q>1$ the $q$-Bernstein polynomials are no longer positive ...
AbstractThe Lupaş q-transform emerges in the study of the limit q-Lupaş operator. The latter comes o...
AbstractThe largest subclass of C[0, ∞) for which the Bernstein-type operator Ln is a pointwise appr...
We dene the max-product (nonlinear) Bernstein-Chlodowsky operators andobtain some upper estimates of...
In this paper, we construct a certain family of nonlinear operators in order to approximate a functi...
We introduce a Stancu type generalization of the Lupaș \(q\)-analogue of the Bernstein operator via ...
In the present paper we introduce positive linear operators q-Bernstein - Chlodowsky polynomials on ...
AbstractThe aim of this paper is to present norm estimates in C[0,1] for the q-Bernstein basic polyn...
summary:We introduce modified $(p,q)$-Bernstein-Durrmeyer operators. We discuss approximation proper...
summary:Using the $q$-Bernstein basis, we construct a new sequence $\{ L_{n} \}$ of positive linear ...
In this paper, we obtain an approximation theorem by max-product operators with the use of power ser...
In this study, we focus on the approximation to continuous functions by max-product operators in the...
AbstractLet Bn(f,q;x),n=1,2,… be the q-Bernstein polynomials of a function f∈C[0,1]. In the case 0<q...
Since in the case q > 1 the q-Bernstein polynomials Bn,q are not positive linear operators on C[0...
AbstractThe authors present a Bernstein-type operator Ln which is given by a finite sum and defined ...
summary:Due to the fact that in the case $q>1$ the $q$-Bernstein polynomials are no longer positive ...
AbstractThe Lupaş q-transform emerges in the study of the limit q-Lupaş operator. The latter comes o...
AbstractThe largest subclass of C[0, ∞) for which the Bernstein-type operator Ln is a pointwise appr...
We dene the max-product (nonlinear) Bernstein-Chlodowsky operators andobtain some upper estimates of...
In this paper, we construct a certain family of nonlinear operators in order to approximate a functi...
We introduce a Stancu type generalization of the Lupaș \(q\)-analogue of the Bernstein operator via ...
In the present paper we introduce positive linear operators q-Bernstein - Chlodowsky polynomials on ...
AbstractThe aim of this paper is to present norm estimates in C[0,1] for the q-Bernstein basic polyn...
summary:We introduce modified $(p,q)$-Bernstein-Durrmeyer operators. We discuss approximation proper...
summary:Using the $q$-Bernstein basis, we construct a new sequence $\{ L_{n} \}$ of positive linear ...
In this paper, we obtain an approximation theorem by max-product operators with the use of power ser...
In this study, we focus on the approximation to continuous functions by max-product operators in the...
AbstractLet Bn(f,q;x),n=1,2,… be the q-Bernstein polynomials of a function f∈C[0,1]. In the case 0<q...
Since in the case q > 1 the q-Bernstein polynomials Bn,q are not positive linear operators on C[0...
AbstractThe authors present a Bernstein-type operator Ln which is given by a finite sum and defined ...
summary:Due to the fact that in the case $q>1$ the $q$-Bernstein polynomials are no longer positive ...
AbstractThe Lupaş q-transform emerges in the study of the limit q-Lupaş operator. The latter comes o...
AbstractThe largest subclass of C[0, ∞) for which the Bernstein-type operator Ln is a pointwise appr...