The task of determining the approximate greatest common divisor (GCD) of more than two univariate polynomials with inexact coefficients can be formulated as computing for a given Bezout matrix a new Bezout matrix of lower rank whose entries are near the corresponding entries of that input matrix. We present an algorithm based on a version of structured nonlinear total least squares (SNTLS) method for computing approximate GCD and demonstrate the practical performance of our algorithm on a diverse set of univariate polynomials
Title: Approximate Polynomial Greatest Common Divisor Author: Ján Eliaš Department: Department of Nu...
AbstractThis paper reports on improvements to recent work on the computation of a structured low ran...
summary:The computation of polynomial greatest common divisor (GCD) ranks among basic algebraic prob...
Abstract. The task of determining the approximate greatest common divisor (GCD) of univariate polyno...
The determination of an approximate greatest common divisor (GCD) of two inexact polynomials f=f(y) ...
Defining and computing a greatest common divisor of two polynomials with inexact coefficients is a c...
Defining and computing a greatest common divisor of two polynomials with inexact coefficients is a c...
We present an iterative algorithm for calculating approxi-mate greatest common divisor (GCD) of univ...
AbstractBarnett’s method through Bezoutians is a purely linear algebra method allowing to compute th...
A new algorithm is presented for computing an integer polynomial similar to the GCD of two polynom...
We implemented the approximate GCD algorithm [KYZ06] in our LIBSNAP library, and did a couple of per...
This paper revisits the Bézout, Sylvester, and power-basis matrix representations of the greatest co...
Based on the Bezout approach we propose a simple algorithm to determine the gcd of two polynomials t...
AbstractWe study the approximate GCD of two univariate polynomials given with limited accuracy or, e...
AbstractThe determination of an approximate greatest common divisor (GCD) of two inexact polynomials...
Title: Approximate Polynomial Greatest Common Divisor Author: Ján Eliaš Department: Department of Nu...
AbstractThis paper reports on improvements to recent work on the computation of a structured low ran...
summary:The computation of polynomial greatest common divisor (GCD) ranks among basic algebraic prob...
Abstract. The task of determining the approximate greatest common divisor (GCD) of univariate polyno...
The determination of an approximate greatest common divisor (GCD) of two inexact polynomials f=f(y) ...
Defining and computing a greatest common divisor of two polynomials with inexact coefficients is a c...
Defining and computing a greatest common divisor of two polynomials with inexact coefficients is a c...
We present an iterative algorithm for calculating approxi-mate greatest common divisor (GCD) of univ...
AbstractBarnett’s method through Bezoutians is a purely linear algebra method allowing to compute th...
A new algorithm is presented for computing an integer polynomial similar to the GCD of two polynom...
We implemented the approximate GCD algorithm [KYZ06] in our LIBSNAP library, and did a couple of per...
This paper revisits the Bézout, Sylvester, and power-basis matrix representations of the greatest co...
Based on the Bezout approach we propose a simple algorithm to determine the gcd of two polynomials t...
AbstractWe study the approximate GCD of two univariate polynomials given with limited accuracy or, e...
AbstractThe determination of an approximate greatest common divisor (GCD) of two inexact polynomials...
Title: Approximate Polynomial Greatest Common Divisor Author: Ján Eliaš Department: Department of Nu...
AbstractThis paper reports on improvements to recent work on the computation of a structured low ran...
summary:The computation of polynomial greatest common divisor (GCD) ranks among basic algebraic prob...