Add to ORKGA collection of recent papers reveals that linear barycentric rational interpolation with the weights suggested by Floater and Hormann is a good choice for approximating smooth functions, especially when the interpolation nodes are equidistant. In the latter setting, the Lebesgue constant of this rational interpolation process is known to grow only logarithmically with the number of nodes. But since practical applications not always allow to get precisely equidistant samples, we relax this condition in this paper and study the Floater–Hormann family of rational interpolants at distributions of nodes which are only almost equidistant. In particular, we show that the corresponding Lebesgue constants still grow logarithmically, albeit with a l...
We show that the Lebesgue constant for Berrut's rational interpolant at equally spaced points has lo...
AbstractPolynomial interpolation between large numbers of arbitrary nodes does notoriously not, in g...
.- Polynomial interpolation between large numbers of arbitrary nodes does notouriously not in genera...
A collection of recent papers reveals that linear barycentric rational interpolation with the weight...
Recent results reveal that the family of barycentric rational interpolants introduced by Floater and...
We show that the Lebesgue constant for barycentric rational interpolation at equally spaced points o...
AbstractIt is well known that polynomial interpolation at equidistant nodes can give bad approximati...
It is well known that polynomial interpolation at equidistant nodes can give bad approximation resul...
It has recently been shown that the Lebesgue constant for Berrut’s rational interpolant at equidista...
It has recently been shown that the Lebesgue constant for Berrut’s rational interpolant at equidista...
A well-known result in linear approximation theory states that the norm of the operator, known as th...
It has recently been shown that the Lebesgue constant for Berrut’s rational interpolant at equidista...
Well-conditioned, stable and infinitely smooth interpolation in arbitrary nodes is by no means a tri...
It has recently been shown that the Lebesgue constant for Berrut\u2019s rational interpolant at equi...
It is well known that the classical polynomial interpolation gives bad approximation if the nodes ar...
We show that the Lebesgue constant for Berrut's rational interpolant at equally spaced points has lo...
AbstractPolynomial interpolation between large numbers of arbitrary nodes does notoriously not, in g...
.- Polynomial interpolation between large numbers of arbitrary nodes does notouriously not in genera...
A collection of recent papers reveals that linear barycentric rational interpolation with the weight...
Recent results reveal that the family of barycentric rational interpolants introduced by Floater and...
We show that the Lebesgue constant for barycentric rational interpolation at equally spaced points o...
AbstractIt is well known that polynomial interpolation at equidistant nodes can give bad approximati...
It is well known that polynomial interpolation at equidistant nodes can give bad approximation resul...
It has recently been shown that the Lebesgue constant for Berrut’s rational interpolant at equidista...
It has recently been shown that the Lebesgue constant for Berrut’s rational interpolant at equidista...
A well-known result in linear approximation theory states that the norm of the operator, known as th...
It has recently been shown that the Lebesgue constant for Berrut’s rational interpolant at equidista...
Well-conditioned, stable and infinitely smooth interpolation in arbitrary nodes is by no means a tri...
It has recently been shown that the Lebesgue constant for Berrut\u2019s rational interpolant at equi...
It is well known that the classical polynomial interpolation gives bad approximation if the nodes ar...
We show that the Lebesgue constant for Berrut's rational interpolant at equally spaced points has lo...
AbstractPolynomial interpolation between large numbers of arbitrary nodes does notoriously not, in g...
.- Polynomial interpolation between large numbers of arbitrary nodes does notouriously not in genera...