AbstractIn this paper, we first apply the Fitzpatrick algorithm to osculatory rational interpolation. Then based on a Fitzpatrick algorithm, we present a Neville-like algorithm for Cauchy interpolation. With this algorithm, we can determine the value of the interpolating function at a single point without computing the rational interpolating function
We present two algorithms for interpolating sparse rational functions. The first is the interpolatio...
Using a polynomial description of rational interpolation with prescribed poles a simple purely algeb...
AbstractWe study rational interpolation formulas on the interval [−1,1] for a given set of real or c...
A recursive algorithm for the construction of the generalized form of the interpolating rational fun...
AbstractThis paper is concerned with interpolation in the sense of Hermite by certain rational funct...
AbstractA general framework, leading to a parametrization of all rational functions which interpolat...
In this paper a new method is developed to create a space surface interpolation using only values of...
The problem of interpolating multivariate polynomials whose coefficient domain is the rational numbe...
AbstractIn this work we propose three different procedures for vector-valued rational interpolation ...
AbstractThis paper is concerned with interpolation in the sense of Hermite by certain rational funct...
We present a solution for the classical univariate rational interpolation problem by means of (univa...
We present algorithms of the Bulirsch{Stoer{Neville form for calculating the value of the vector rat...
the paper deals with iterative interpolation methods in forms of similar recursive procedures define...
This book aims to present the theory of interpolation for rational matrix functions as a recently ma...
AbstractConsider the black box interpolation of a τ-sparse, n-variate rational function f, where τ i...
We present two algorithms for interpolating sparse rational functions. The first is the interpolatio...
Using a polynomial description of rational interpolation with prescribed poles a simple purely algeb...
AbstractWe study rational interpolation formulas on the interval [−1,1] for a given set of real or c...
A recursive algorithm for the construction of the generalized form of the interpolating rational fun...
AbstractThis paper is concerned with interpolation in the sense of Hermite by certain rational funct...
AbstractA general framework, leading to a parametrization of all rational functions which interpolat...
In this paper a new method is developed to create a space surface interpolation using only values of...
The problem of interpolating multivariate polynomials whose coefficient domain is the rational numbe...
AbstractIn this work we propose three different procedures for vector-valued rational interpolation ...
AbstractThis paper is concerned with interpolation in the sense of Hermite by certain rational funct...
We present a solution for the classical univariate rational interpolation problem by means of (univa...
We present algorithms of the Bulirsch{Stoer{Neville form for calculating the value of the vector rat...
the paper deals with iterative interpolation methods in forms of similar recursive procedures define...
This book aims to present the theory of interpolation for rational matrix functions as a recently ma...
AbstractConsider the black box interpolation of a τ-sparse, n-variate rational function f, where τ i...
We present two algorithms for interpolating sparse rational functions. The first is the interpolatio...
Using a polynomial description of rational interpolation with prescribed poles a simple purely algeb...
AbstractWe study rational interpolation formulas on the interval [−1,1] for a given set of real or c...
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