In this paper we present a new family of companion forms associated to a regular polynomial matrix. Similar results have been presented in a recent paper by M. Fiedler [1] where the scalar case is considered. It is shown that the new family of companion forms preserves both the …nite and infinite elementary divisors structure of the original polynomial matrix, thus all its members can be seen as linearizations of the corresponding polynomial matrix. Furthermore, for the special class of self-adjoint polynomial matrices a particular member is shown to be self-adjoint itself
{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, ...
AbstractThe comrade matrix was introduced recently as the analogue of the companion matrix when a po...
AbstractWe show that the usual companion matrix of a polynomial of degree n can be factored into a p...
AbstractThis note is concerned with the following problem: For a given matrix A∈Cn×n and a vector a∈...
AbstractFor a given polynomial in the usual power form, its associated companion matrix can be appli...
Mención Internacional en el título de doctorMatrix polynomials arise frequently associated with Poly...
AbstractPresented in this paper are some new properties of a function f(C) of a companion matrix C, ...
A standard way of dealing with a matrix polynomial $P(\lambda)$ is to convert it into an equivalen...
We construct a new family of strong linearizations of rational matrices considering the polynomial p...
AbstractA systematic account is given of the properties and applications of the notion of infinite c...
The main purpose of this work is to propose new notions of equivalence between polynomial matrices t...
AbstractThe notion of infinite companion matrix is extended to the case of matrix polynomials (inclu...
AbstractIt is shown that the matrix obtained by applying a matrix bilinear transformation to a compa...
Computing roots of scalar polynomials as the eigenvalues of Frobenius companion matrices using backw...
{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, ...
AbstractThe comrade matrix was introduced recently as the analogue of the companion matrix when a po...
AbstractWe show that the usual companion matrix of a polynomial of degree n can be factored into a p...
AbstractThis note is concerned with the following problem: For a given matrix A∈Cn×n and a vector a∈...
AbstractFor a given polynomial in the usual power form, its associated companion matrix can be appli...
Mención Internacional en el título de doctorMatrix polynomials arise frequently associated with Poly...
AbstractPresented in this paper are some new properties of a function f(C) of a companion matrix C, ...
A standard way of dealing with a matrix polynomial $P(\lambda)$ is to convert it into an equivalen...
We construct a new family of strong linearizations of rational matrices considering the polynomial p...
AbstractA systematic account is given of the properties and applications of the notion of infinite c...
The main purpose of this work is to propose new notions of equivalence between polynomial matrices t...
AbstractThe notion of infinite companion matrix is extended to the case of matrix polynomials (inclu...
AbstractIt is shown that the matrix obtained by applying a matrix bilinear transformation to a compa...
Computing roots of scalar polynomials as the eigenvalues of Frobenius companion matrices using backw...
{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, ...
AbstractThe comrade matrix was introduced recently as the analogue of the companion matrix when a po...