We introduce the concept of the almost-companion matrix (ACM) by relaxing the non-derogatory property of the standard companion matrix (CM). That is, we define an ACM as a matrix whose characteristic polynomial coincides with a given monic and generally complex polynomial. The greater flexibility inherent in the ACM concept, compared to CM, allows the construction of ACMs that have convenient matrix structures satisfying desired additional conditions, compatibly with specific properties of the polynomial coefficients. We demonstrate the construction of Hermitian and unitary ACMs starting from appropriate third-degree polynomials, with implications for their use in physical-mathematical problems, such as the parameterization of the Hamiltoni...
(communicated by L. Rodman) Abstract. Polynomial matrices G(z) = Izm−∑Cizi with hermitian coefficie...
Akemann G, Vernizzi G. Characteristic Polynomials of Complex Random Matrix Models. Nucl.Phys. B. 200...
AbstractWe obtain the singular value decomposition of multi-companion matrices. We completely charac...
We introduce the concept of the almost-companion matrix (ACM) by relaxing the non-derogatory propert...
AbstractThis note is concerned with the following problem: For a given matrix A∈Cn×n and a vector a∈...
AbstractWe show that the usual companion matrix of a polynomial of degree n can be factored into a p...
AbstractA systematic account is given of the properties and applications of the notion of infinite c...
AbstractFor a given polynomial in the usual power form, its associated companion matrix can be appli...
AbstractThe notion of infinite companion matrix is extended to the case of matrix polynomials (inclu...
AbstractThe existence of the companion matrices of three-variable polynomials is investigated. A the...
AbstractAs n × n Hessenberg matrix A is defined whose characteristic polynomial is relative to an ar...
In this talk we present a fast and stable algorithm for computing roots of polynomials. e roots are...
We obtain the singular value decomposition of multi-companion matrices. We completely characterise t...
In this lecture we will propose a new fast and stable manner of computing roots of polynomials. Root...
AbstractIn this paper, we introduce a new type of companion matrices, namely, D-companion matrices. ...
(communicated by L. Rodman) Abstract. Polynomial matrices G(z) = Izm−∑Cizi with hermitian coefficie...
Akemann G, Vernizzi G. Characteristic Polynomials of Complex Random Matrix Models. Nucl.Phys. B. 200...
AbstractWe obtain the singular value decomposition of multi-companion matrices. We completely charac...
We introduce the concept of the almost-companion matrix (ACM) by relaxing the non-derogatory propert...
AbstractThis note is concerned with the following problem: For a given matrix A∈Cn×n and a vector a∈...
AbstractWe show that the usual companion matrix of a polynomial of degree n can be factored into a p...
AbstractA systematic account is given of the properties and applications of the notion of infinite c...
AbstractFor a given polynomial in the usual power form, its associated companion matrix can be appli...
AbstractThe notion of infinite companion matrix is extended to the case of matrix polynomials (inclu...
AbstractThe existence of the companion matrices of three-variable polynomials is investigated. A the...
AbstractAs n × n Hessenberg matrix A is defined whose characteristic polynomial is relative to an ar...
In this talk we present a fast and stable algorithm for computing roots of polynomials. e roots are...
We obtain the singular value decomposition of multi-companion matrices. We completely characterise t...
In this lecture we will propose a new fast and stable manner of computing roots of polynomials. Root...
AbstractIn this paper, we introduce a new type of companion matrices, namely, D-companion matrices. ...
(communicated by L. Rodman) Abstract. Polynomial matrices G(z) = Izm−∑Cizi with hermitian coefficie...
Akemann G, Vernizzi G. Characteristic Polynomials of Complex Random Matrix Models. Nucl.Phys. B. 200...
AbstractWe obtain the singular value decomposition of multi-companion matrices. We completely charac...