International audienceIn this paper, we focus on extensions of methods for interpolating rational functions from their evaluations, in the context of erroneous evaluations. This problem can be seen both from a computer algebra and a coding theory point of view. In computer algebra, this is a generalization of Simultaneous Rational Function Reconstruction with errors and multiprecision evaluations. From an error correcting codes point of view, this problem is related to the decoding of some algebraic codes such as Reed-Solomon, Derivatives or Multiplicity codes. We give conditions on the inputs of the problem which guarantee the uniqueness of the interpolant.Since we deal with rational functions, some evaluation points may be poles: a first ...
AbstractPolynomial interpolation is known to be ill-conditioned if the interpolating points are not ...
We present two algorithms on sparse rational interpolation. The first is the interpolation algorithm...
AbstractIn this work we propose three different procedures for vector-valued rational interpolation ...
International audienceIn this paper, we focus on extensions of methods for interpolating rational fu...
This dissertation deals with a Computer Algebra problem which has significant consequencesin Algebra...
In [Kaltofen and Yang, Proc. ISSAC 2013] we have gen-eralized algebraic error-correcting decoding to...
International audienceIn this paper we present a new algorithm for Polynomial Linear System Solving ...
We treat the interpolation problem {f(xj)=yj}j=1N for polynomial and rational functions. Developing ...
The black box algorithm for separating the numerator from the denominator of a multivariate rational...
This book aims to present the theory of interpolation for rational matrix functions as a recently ma...
In this work we remark on the error estimation in cubature formulae. Methods from Commutative Algebr...
This thesis concerns with the polynomial interpolation problem and the rational function reconstruct...
AbstractThe univariate error formulas for Pade´approximants and rational interpolants, which are rep...
We present two algorithms for interpolating sparse rational functions. The first is the interpolatio...
This dissertation is concerned with algebraic list- decoding of error-correcting codes. During the p...
AbstractPolynomial interpolation is known to be ill-conditioned if the interpolating points are not ...
We present two algorithms on sparse rational interpolation. The first is the interpolation algorithm...
AbstractIn this work we propose three different procedures for vector-valued rational interpolation ...
International audienceIn this paper, we focus on extensions of methods for interpolating rational fu...
This dissertation deals with a Computer Algebra problem which has significant consequencesin Algebra...
In [Kaltofen and Yang, Proc. ISSAC 2013] we have gen-eralized algebraic error-correcting decoding to...
International audienceIn this paper we present a new algorithm for Polynomial Linear System Solving ...
We treat the interpolation problem {f(xj)=yj}j=1N for polynomial and rational functions. Developing ...
The black box algorithm for separating the numerator from the denominator of a multivariate rational...
This book aims to present the theory of interpolation for rational matrix functions as a recently ma...
In this work we remark on the error estimation in cubature formulae. Methods from Commutative Algebr...
This thesis concerns with the polynomial interpolation problem and the rational function reconstruct...
AbstractThe univariate error formulas for Pade´approximants and rational interpolants, which are rep...
We present two algorithms for interpolating sparse rational functions. The first is the interpolatio...
This dissertation is concerned with algebraic list- decoding of error-correcting codes. During the p...
AbstractPolynomial interpolation is known to be ill-conditioned if the interpolating points are not ...
We present two algorithms on sparse rational interpolation. The first is the interpolation algorithm...
AbstractIn this work we propose three different procedures for vector-valued rational interpolation ...