The first and second Frobenius companion matrices appear frequently in numerical application, but it is well known that they possess many properties that are undesirable numerically, which limit their use in applications. Fiedler companion matrices, or Fiedler matrices for brevity, introduced in 2003, is a family of matrices which includes the two Frobenius matrices. The main goal of this work is to study whether or not Fiedler companion matrices can be used with more reliability than the Frobenius ones in the numerical applications where Frobenius matrices are used. For this reason, in this work we present a thorough study of Fiedler matrices: their structure and numerical properties, where we mean by numerical properties those properties...
AbstractRecent work in the characterization of structured matrices in terms of characteristic polyno...
Interplay between structured matrices and corresponding systems of polynomials is a classical topic,...
The standard way to solve polynomial eigenvalue problems is through linearizations. The family of F...
The first and second Frobenius companion matrices appear frequently in numerical application, but i...
{Computing roots of scalar polynomials as the eigenvalues of Frobenius companion matrices using back...
The proceeding at: 6th Conference on Structured Numerical Linear and Multilinear Algebra: Analysis, ...
Computing roots of scalar polynomials as the eigenvalues of Frobenius companion matrices using backw...
Several matrix norms of the classical Frobenius companion matrices of a monic polynomial p(z) have b...
The aim of the present paper is to analyze the behavior of Fiedler companion matrices in the polynom...
The development of new classes of linearizations of square matrix polynomials that generalize the c...
When Fiedler published his “A note on Companion matrices” in 2003 in Linear Algebra and its Applicat...
The aim of the present paper is to analyze the behavior of Fiedler companion matrices in the polynom...
AbstractThe development of new classes of linearizations of square matrix polynomials that generaliz...
The development of new classes of linearizations of square matrix polynomials that generalize the cl...
AbstractRecent work in the characterization of structured matrices in terms of characteristic polyno...
Interplay between structured matrices and corresponding systems of polynomials is a classical topic,...
The standard way to solve polynomial eigenvalue problems is through linearizations. The family of F...
The first and second Frobenius companion matrices appear frequently in numerical application, but i...
{Computing roots of scalar polynomials as the eigenvalues of Frobenius companion matrices using back...
The proceeding at: 6th Conference on Structured Numerical Linear and Multilinear Algebra: Analysis, ...
Computing roots of scalar polynomials as the eigenvalues of Frobenius companion matrices using backw...
Several matrix norms of the classical Frobenius companion matrices of a monic polynomial p(z) have b...
The aim of the present paper is to analyze the behavior of Fiedler companion matrices in the polynom...
The development of new classes of linearizations of square matrix polynomials that generalize the c...
When Fiedler published his “A note on Companion matrices” in 2003 in Linear Algebra and its Applicat...
The aim of the present paper is to analyze the behavior of Fiedler companion matrices in the polynom...
AbstractThe development of new classes of linearizations of square matrix polynomials that generaliz...
The development of new classes of linearizations of square matrix polynomials that generalize the cl...
AbstractRecent work in the characterization of structured matrices in terms of characteristic polyno...
Interplay between structured matrices and corresponding systems of polynomials is a classical topic,...
The standard way to solve polynomial eigenvalue problems is through linearizations. The family of F...