AbstractWe define and study a new family of univariate rational Bernstein operators. They are positive operators exact on linear polynomials. Moreover, like classical polynomial Bernstein operators, they enjoy the traditional shape preserving properties and they are total variation diminishing. Finally, for a specific class of denominators, some convergence results are proved, in particular a Voronovskaja theorem, and some error bounds are given
In the present paper we introduce positive linear operators q-Bernstein - Chlodowsky polynomials on ...
AbstractIn this paper we present the sequence of linear Bernstein-type operators defined for f∈C[0,1...
AbstractThe authors give error estimates, a Voronovskaya-type relation, strong converse results and ...
International audienceWe define and study a new family of univariate rational Bernstein operators. T...
The Bernstein operator is one of the important topics of approximation theory in which it has been s...
AbstractIn this paper we present the sequence of linear Bernstein-type operators defined for f∈C[0,1...
summary:In the paper, we discuss convergence properties and Voronovskaja type theorem for bivariate ...
summary:In the paper, we discuss convergence properties and Voronovskaja type theorem for bivariate ...
In this note, we derive some approximation properties of the generalized Bernstein-Kantorovich type ...
AbstractP. Sablonnière introduced the so-called left Bernstein quasi-interpolant, and proved that th...
à paraîtreInternational audienceOn a given closed bounded interval, an infinite nested sequence of E...
à paraîtreInternational audienceOn a given closed bounded interval, an infinite nested sequence of E...
à paraîtreInternational audienceOn a given closed bounded interval, an infinite nested sequence of E...
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...
AbstractIn this paper we introduce a class of Bernstein–Durrmeyer operators with respect to an arbit...
In the present paper we introduce positive linear operators q-Bernstein - Chlodowsky polynomials on ...
AbstractIn this paper we present the sequence of linear Bernstein-type operators defined for f∈C[0,1...
AbstractThe authors give error estimates, a Voronovskaya-type relation, strong converse results and ...
International audienceWe define and study a new family of univariate rational Bernstein operators. T...
The Bernstein operator is one of the important topics of approximation theory in which it has been s...
AbstractIn this paper we present the sequence of linear Bernstein-type operators defined for f∈C[0,1...
summary:In the paper, we discuss convergence properties and Voronovskaja type theorem for bivariate ...
summary:In the paper, we discuss convergence properties and Voronovskaja type theorem for bivariate ...
In this note, we derive some approximation properties of the generalized Bernstein-Kantorovich type ...
AbstractP. Sablonnière introduced the so-called left Bernstein quasi-interpolant, and proved that th...
à paraîtreInternational audienceOn a given closed bounded interval, an infinite nested sequence of E...
à paraîtreInternational audienceOn a given closed bounded interval, an infinite nested sequence of E...
à paraîtreInternational audienceOn a given closed bounded interval, an infinite nested sequence of E...
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...
AbstractIn this paper we introduce a class of Bernstein–Durrmeyer operators with respect to an arbit...
In the present paper we introduce positive linear operators q-Bernstein - Chlodowsky polynomials on ...
AbstractIn this paper we present the sequence of linear Bernstein-type operators defined for f∈C[0,1...
AbstractThe authors give error estimates, a Voronovskaya-type relation, strong converse results and ...
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