Add to ORKGWe consider the convergence of equi-uniform approximation processes of interpolation type operators for vector-valued functions and give quantitative estimates of the rate of its convergence in terms of the modulus of continuity of functions to be approximated. Furthermore, applications are presented by Bernstein type operators and Hermite-Fejér type operators
AbstractP. Sablonnière introduced the so-called left Bernstein quasi-interpolant, and proved that th...
For operators defined on the Cartesian product of random and deterministic continuous functions the ...
In this chapter we present univariate and multivariate basic approximation by Kantorovich–Choquet ty...
We consider the convergence of equi-uniform approximation processes of interpolation type operators ...
We give quantitative estimates of the rate of convergence of equi-uniform summation processes of int...
We consider approximation processes of fractional interpolation type operators on spaces of function...
We establish quantitative pointwise estimates of the rate of convergence of equi-uniform approximati...
We consider the convergence of equi-uniform approximation processes of integral operators in Banach ...
We consider the approximation by integral type operators for Banach space-valued functions and its a...
The aim of the work is to study approximate properties of Lagrange-Sturm-Liouville interpolation ope...
Here we study quantitatively the approximation of multivariate function by general multivariate posi...
AbstractWe prove necessary and sufficient conditions for linear operators to approximate and interpo...
Here we study quantitatively the approximation of multivariate function by general multivariate posi...
Recently there have been established various results concerned with rates of convergence for a numbe...
AbstractInterpolation and quasi-interpolation are very important methods for function approximation....
AbstractP. Sablonnière introduced the so-called left Bernstein quasi-interpolant, and proved that th...
For operators defined on the Cartesian product of random and deterministic continuous functions the ...
In this chapter we present univariate and multivariate basic approximation by Kantorovich–Choquet ty...
We consider the convergence of equi-uniform approximation processes of interpolation type operators ...
We give quantitative estimates of the rate of convergence of equi-uniform summation processes of int...
We consider approximation processes of fractional interpolation type operators on spaces of function...
We establish quantitative pointwise estimates of the rate of convergence of equi-uniform approximati...
We consider the convergence of equi-uniform approximation processes of integral operators in Banach ...
We consider the approximation by integral type operators for Banach space-valued functions and its a...
The aim of the work is to study approximate properties of Lagrange-Sturm-Liouville interpolation ope...
Here we study quantitatively the approximation of multivariate function by general multivariate posi...
AbstractWe prove necessary and sufficient conditions for linear operators to approximate and interpo...
Here we study quantitatively the approximation of multivariate function by general multivariate posi...
Recently there have been established various results concerned with rates of convergence for a numbe...
AbstractInterpolation and quasi-interpolation are very important methods for function approximation....
AbstractP. Sablonnière introduced the so-called left Bernstein quasi-interpolant, and proved that th...
For operators defined on the Cartesian product of random and deterministic continuous functions the ...
In this chapter we present univariate and multivariate basic approximation by Kantorovich–Choquet ty...