International audienceWe 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
AbstractA new class of differential operators on the simplex is introduced, which define weighted So...
The Bernstein operator is one of the important topics of approximation theory in which it has been s...
Abstract In the present paper, we study a new type of Bernstein operators depending on the parameter...
AbstractWe define and study a new family of univariate rational Bernstein operators. They are positi...
AbstractIn this paper we present the sequence of linear Bernstein-type operators defined for f∈C[0,1...
This book provides comprehensive information on the main aspects of Bernstein operators, based on th...
AbstractIn this paper, we discuss shape-preserving properties of the ω,q-Bernstein polynomials Bnω,q...
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...
International Conference on Recent Advances in Pure and Applied Mathematics, ICRAPAM 2018 -- 23 Octo...
We investigate shape preserving for q-Bernstein-Stancu polynomials Bnq,α(f;x) introduced by Nowak in...
à paraîtreInternational audienceOn a given closed bounded interval, an infinite nested sequence of E...
summary:We define Bernstein-type operators on the half line $\mathopen [0,+\infty \mathclose [$ by m...
Abstract In this paper, we introduce a new family of generalized Bernstein operators based on q inte...
AbstractWe give an interesting generalization of the Bernstein polynomials. We find sufficient and n...
AbstractA new class of differential operators on the simplex is introduced, which define weighted So...
The Bernstein operator is one of the important topics of approximation theory in which it has been s...
Abstract In the present paper, we study a new type of Bernstein operators depending on the parameter...
AbstractWe define and study a new family of univariate rational Bernstein operators. They are positi...
AbstractIn this paper we present the sequence of linear Bernstein-type operators defined for f∈C[0,1...
This book provides comprehensive information on the main aspects of Bernstein operators, based on th...
AbstractIn this paper, we discuss shape-preserving properties of the ω,q-Bernstein polynomials Bnω,q...
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...
International Conference on Recent Advances in Pure and Applied Mathematics, ICRAPAM 2018 -- 23 Octo...
We investigate shape preserving for q-Bernstein-Stancu polynomials Bnq,α(f;x) introduced by Nowak in...
à paraîtreInternational audienceOn a given closed bounded interval, an infinite nested sequence of E...
summary:We define Bernstein-type operators on the half line $\mathopen [0,+\infty \mathclose [$ by m...
Abstract In this paper, we introduce a new family of generalized Bernstein operators based on q inte...
AbstractWe give an interesting generalization of the Bernstein polynomials. We find sufficient and n...
AbstractA new class of differential operators on the simplex is introduced, which define weighted So...
The Bernstein operator is one of the important topics of approximation theory in which it has been s...
Abstract In the present paper, we study a new type of Bernstein operators depending on the parameter...
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