When Fiedler published his “A note on Companion matrices” in 2003 in Linear Algebra and its Applications, he could not have foreseen the significance of this elegant factorization of a companion matrix into essentially two-by-two Gaus- sian transformations, which we will name (scalar) elementary Fiedler factors. Since then, researchers extended these results and studied the various resulting lineariza- tions, the stability of Fiedler companion matrices, factorizations of block companion matrices, Fiedler pencils, and even looked at extensions to non-monomial bases. In this chapter, we introduce a new way to factor block Fiedler companion matrices into the product of scalar elementary Fiedler factors. We use this theory to prove that, e.g., ...
Let A be an m × n real matrix with m \u3e n such that the submatrix of A consisting of the first n r...
The development of new classes of linearizations of square matrix polynomials that generalize the cl...
Fiedler pencils are a family of strong linearizations for polynomials expressed in the monomial basi...
When Fiedler published his “A note on Companion matrices” in 2003 on Linear Algebra and its Applicat...
The first and second Frobenius companion matrices appear frequently in numerical application, but i...
The standard way of solving the polynomial eigenvalue problem associated with a matrix polynomial is...
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...
Fiedler pencils are a family of strong linearizations for polynomials expressed in the monomial basi...
A standard way of dealing with a matrix polynomial $P(\lambda)$ is to convert it into an equivalen...
Several matrix norms of the classical Frobenius companion matrices of a monic polynomial p(z) have b...
The proceeding at: 6th Conference on Structured Numerical Linear and Multilinear Algebra: Analysis, ...
AbstractThe main concern of this paper is linear matrix equations with block-companion matrix coeffi...
The development of new classes of linearizations of square matrix polynomials that generalize the c...
AbstractThe development of new classes of linearizations of square matrix polynomials that generaliz...
Let A be an m × n real matrix with m \u3e n such that the submatrix of A consisting of the first n r...
The development of new classes of linearizations of square matrix polynomials that generalize the cl...
Fiedler pencils are a family of strong linearizations for polynomials expressed in the monomial basi...
When Fiedler published his “A note on Companion matrices” in 2003 on Linear Algebra and its Applicat...
The first and second Frobenius companion matrices appear frequently in numerical application, but i...
The standard way of solving the polynomial eigenvalue problem associated with a matrix polynomial is...
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...
Fiedler pencils are a family of strong linearizations for polynomials expressed in the monomial basi...
A standard way of dealing with a matrix polynomial $P(\lambda)$ is to convert it into an equivalen...
Several matrix norms of the classical Frobenius companion matrices of a monic polynomial p(z) have b...
The proceeding at: 6th Conference on Structured Numerical Linear and Multilinear Algebra: Analysis, ...
AbstractThe main concern of this paper is linear matrix equations with block-companion matrix coeffi...
The development of new classes of linearizations of square matrix polynomials that generalize the c...
AbstractThe development of new classes of linearizations of square matrix polynomials that generaliz...
Let A be an m × n real matrix with m \u3e n such that the submatrix of A consisting of the first n r...
The development of new classes of linearizations of square matrix polynomials that generalize the cl...
Fiedler pencils are a family of strong linearizations for polynomials expressed in the monomial basi...