AbstractThe determination of an approximate greatest common divisor (GCD) of two inexact polynomials f=f(y) and g=g(y) arises in several applications, including signal processing and control. This approximate GCD can be obtained by computing a structured low rank approximation S*(f,g) of the Sylvester resultant matrix S(f,g). In this paper, the method of structured total least norm (STLN) is used to compute a low rank approximation of S(f,g), and it is shown that important issues that have a considerable effect on the approximate GCD have not been considered. For example, the established works only yield one matrix S*(f,g), and therefore one approximate GCD, but it is shown in this paper that a family of structured low rank approximations c...
AbstractWe present some results on approximate GCD for univariate polynomials: given n polynomials P...
This paper considers the computation of the degree t of an approximate greatest common divisor d(y)...
summary:The computation of polynomial greatest common divisor (GCD) ranks among basic algebraic prob...
The determination of an approximate greatest common divisor (GCD) of two inexact polynomials f=f(y) ...
Abstract. The task of determining the approximate greatest common divisor (GCD) of univariate polyno...
AbstractThis paper reports on improvements to recent work on the computation of a structured low ran...
AbstractWe study the approximate GCD of two univariate polynomials given with limited accuracy or, e...
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...
AbstractA non-linear structure preserving matrix method for the computation of a structured low rank...
A non-linear structure preserving matrix method for the computation of a structured low rank approxi...
In this paper the following problem is considered: given two coprime polynomials, find the smallest ...
We present an iterative algorithm for calculating approximate greatest common divisor (GCD) of univa...
AbstractIn this paper, we consider computations involving polynomials with inexact coefficients, i.e...
The task of determining the approximate greatest common divisor (GCD) of more than two univariate po...
AbstractWe present some results on approximate GCD for univariate polynomials: given n polynomials P...
This paper considers the computation of the degree t of an approximate greatest common divisor d(y)...
summary:The computation of polynomial greatest common divisor (GCD) ranks among basic algebraic prob...
The determination of an approximate greatest common divisor (GCD) of two inexact polynomials f=f(y) ...
Abstract. The task of determining the approximate greatest common divisor (GCD) of univariate polyno...
AbstractThis paper reports on improvements to recent work on the computation of a structured low ran...
AbstractWe study the approximate GCD of two univariate polynomials given with limited accuracy or, e...
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...
AbstractA non-linear structure preserving matrix method for the computation of a structured low rank...
A non-linear structure preserving matrix method for the computation of a structured low rank approxi...
In this paper the following problem is considered: given two coprime polynomials, find the smallest ...
We present an iterative algorithm for calculating approximate greatest common divisor (GCD) of univa...
AbstractIn this paper, we consider computations involving polynomials with inexact coefficients, i.e...
The task of determining the approximate greatest common divisor (GCD) of more than two univariate po...
AbstractWe present some results on approximate GCD for univariate polynomials: given n polynomials P...
This paper considers the computation of the degree t of an approximate greatest common divisor d(y)...
summary:The computation of polynomial greatest common divisor (GCD) ranks among basic algebraic prob...