Add to ORKGAbstract. Starting from a natural generalization of the trigonometric case, we construct a de la Vallée Poussin approximation process in the uniform and L 1 norms. With respect to the classical approach we obtain the convergence for a wider class of Jacobi weights. Even if we only consider the Jacobi case, our construction is very general and can be extended to other classes of weights. 1
Abstract: The Hermite-Pade approximants for the Cauchy transforms of the Jacobi weights on...
AbstractHermite-Fejér interpolation operators based on the zeros of Jacobi polynomials, in general, ...
The authors obtain upper bounds for Jacobi polynominals which are uniform in all the parameters invo...
In this paper a general approach to de la Vallée Poussin means is given and the resulting near best ...
© 2016, Springer Science+Business Media New York. In this paper, a general approach to de la Vallée ...
In this paper we study the degree of approximation of functionsf inC 2 andC 2 1 by the operatorsV n ...
We give a very simply computable interpolatory process, wich approx-imates in near-best order on [-1...
AbstractThe concern of this paper is the study of local approximation properties of the de la Vallée...
We show the pointwise version of the Stečkin theorem on approximation by de la Vallée-Poussin means....
In this work we consider the operator associated with the three-term recurrence relation for the Jac...
We investigate the simultaneous approximation properties of the de la Vallée-Poussin means in weight...
WOS: 000496946500014In this paper, we introduce a Kantorovich type generalization of Jakimovski-Levi...
A transplantation theorem for Jacobi series proved by Muckenhoupt is reinvestigated by means of a su...
Abstract. We study Hermite-Pade ́ approximation of so called Nikishin systems of functions. In parti...
Here we give the approximation properties with rates of generalized discrete versions of Picard, Gau...
Abstract: The Hermite-Pade approximants for the Cauchy transforms of the Jacobi weights on...
AbstractHermite-Fejér interpolation operators based on the zeros of Jacobi polynomials, in general, ...
The authors obtain upper bounds for Jacobi polynominals which are uniform in all the parameters invo...
In this paper a general approach to de la Vallée Poussin means is given and the resulting near best ...
© 2016, Springer Science+Business Media New York. In this paper, a general approach to de la Vallée ...
In this paper we study the degree of approximation of functionsf inC 2 andC 2 1 by the operatorsV n ...
We give a very simply computable interpolatory process, wich approx-imates in near-best order on [-1...
AbstractThe concern of this paper is the study of local approximation properties of the de la Vallée...
We show the pointwise version of the Stečkin theorem on approximation by de la Vallée-Poussin means....
In this work we consider the operator associated with the three-term recurrence relation for the Jac...
We investigate the simultaneous approximation properties of the de la Vallée-Poussin means in weight...
WOS: 000496946500014In this paper, we introduce a Kantorovich type generalization of Jakimovski-Levi...
A transplantation theorem for Jacobi series proved by Muckenhoupt is reinvestigated by means of a su...
Abstract. We study Hermite-Pade ́ approximation of so called Nikishin systems of functions. In parti...
Here we give the approximation properties with rates of generalized discrete versions of Picard, Gau...
Abstract: The Hermite-Pade approximants for the Cauchy transforms of the Jacobi weights on...
AbstractHermite-Fejér interpolation operators based on the zeros of Jacobi polynomials, in general, ...
The authors obtain upper bounds for Jacobi polynominals which are uniform in all the parameters invo...