Multipoint polynomial evaluation and interpolation are fundamental for modern algebraic and numerical computing. The known algorithms solve both problems over any field by using O(N log2N) arithmetic operations for the input of size N, but the cost grows to quadratic for numerical solution. Our study results in numerically stable algorithms that use O(uN logN) arithmetic time for approximate evaluation (within the relative output error norm 2−u) and O(uN log2N) time for approximate interpolation. The problems are equivalent to multiplication of an n × n Vandermonde matrix by a vector and the solution of a nonsingular Vandermonde linear systems of n equations, respectively. The algorithms and complexity estimates can be also applied where th...
It is well known that, using fast algorithms for polynomial multiplication and division, evaluation ...
In [P90] we proposed to employ Vandermonde and Hankel multipliers to transform into each other the m...
Four problems are considered: 1) from an n-precision integer compute its residues modulo n single pr...
AbstractThe fastest known algorithms for the problems of polynomial evaluation and multipoint interp...
Abstract. Multipoint polynomial evaluation and interpolation are fun-damental for modern numerical a...
We present parallel algorithms for fast polynomial interpolation. These algo-rithms can be used for ...
Abstract: Since the works of Newton and Lagrange, interpolation had been a mature technique in the n...
This paper deals with the polynomial interpolation of degree at most n passing through n 1 distinct ...
Abstract. We consider the problem of interpolating sparse multivariate polynomials from their values...
Combination of algebraic and numerical techniques for improving the computations in algebra and geom...
AbstractWe give an algorithm for the interpolation of a polynomial A given by a straight-line progra...
AbstractWe give complexity estimates for the problems of evaluation and interpolation on various pol...
AbstractEight different algorithms for polynomial interpolation are compared with respect to stabili...
Given $n$ points $(x_{i},y_{i})$ the best algorithms for finding the unique interpolating polynomial...
AbstractMatrices consisting of two parts one of Vandermonde and the other of Löwner type are conside...
It is well known that, using fast algorithms for polynomial multiplication and division, evaluation ...
In [P90] we proposed to employ Vandermonde and Hankel multipliers to transform into each other the m...
Four problems are considered: 1) from an n-precision integer compute its residues modulo n single pr...
AbstractThe fastest known algorithms for the problems of polynomial evaluation and multipoint interp...
Abstract. Multipoint polynomial evaluation and interpolation are fun-damental for modern numerical a...
We present parallel algorithms for fast polynomial interpolation. These algo-rithms can be used for ...
Abstract: Since the works of Newton and Lagrange, interpolation had been a mature technique in the n...
This paper deals with the polynomial interpolation of degree at most n passing through n 1 distinct ...
Abstract. We consider the problem of interpolating sparse multivariate polynomials from their values...
Combination of algebraic and numerical techniques for improving the computations in algebra and geom...
AbstractWe give an algorithm for the interpolation of a polynomial A given by a straight-line progra...
AbstractWe give complexity estimates for the problems of evaluation and interpolation on various pol...
AbstractEight different algorithms for polynomial interpolation are compared with respect to stabili...
Given $n$ points $(x_{i},y_{i})$ the best algorithms for finding the unique interpolating polynomial...
AbstractMatrices consisting of two parts one of Vandermonde and the other of Löwner type are conside...
It is well known that, using fast algorithms for polynomial multiplication and division, evaluation ...
In [P90] we proposed to employ Vandermonde and Hankel multipliers to transform into each other the m...
Four problems are considered: 1) from an n-precision integer compute its residues modulo n single pr...