AbstractThis article presents a new algorithm for obtaining a block diagonalization of Hankel matrices by means of truncated polynomial divisions, such that every block is a lower Hankel matrix. In fact, the algorithm generates a block LU-factorization of the matrix. Two applications of this algorithm are also presented. By the one hand, this algorithm yields an algebraic proof of Frobenius’ Theorem, which gives the signature of a real regular Hankel matrix by using the signs of its principal leading minors. On the other hand, the close relationship between Hankel matrices and linearly recurrent sequences leads to a comparison with the Berlekamp–Massey algorithm
The inversion problem for square matrices having the structure of a block Hankel-like matrix is stud...
Consider a $n \times n$ lower triangular matrix $L$ whose $(i+1)$-st row is defined by the coeffici...
International audienceSparse polynomial interpolation, sparse linear system solving or modular ratio...
We give a new algorithm for the blocs diagonalization of Hankel matrices. When the matrix correspond...
We introduce a new algorithm for the approximate block factorization of real Hankel matrices. We the...
It is shown that a real Hankel matrix admits an approximate block diagonalization in which...
AbstractWe explore the connections between the Lanczos algorithm for matrix tridiagonalization and t...
AbstractIn this paper, the updating formulas used by three look-ahead methods for solving Hankel sys...
AbstractA simple interpretation of the Berlekamp-Massey algorithm in the light of the Hankel matrix ...
AbstractConsider an n × n lower triangular matrix L whose (i + 1)st row is defined by the coefficien...
On étudie la décomposition de matrice de Hankel comme une somme des matrices de Hankel de rang fai...
AbstractWe examine a result of Basor and Ehrhardt concerning Hankel and Toeplitz plus Hankel matrice...
AbstractThe inversion problem for square matrices having the structure of a block Hankel-like matrix...
We describe how the Euclidean algorithm can be interpreted as a method to solve Pade approximation p...
In this paper, we develop three essential ingredients of an algebraic structure theory of finite blo...
The inversion problem for square matrices having the structure of a block Hankel-like matrix is stud...
Consider a $n \times n$ lower triangular matrix $L$ whose $(i+1)$-st row is defined by the coeffici...
International audienceSparse polynomial interpolation, sparse linear system solving or modular ratio...
We give a new algorithm for the blocs diagonalization of Hankel matrices. When the matrix correspond...
We introduce a new algorithm for the approximate block factorization of real Hankel matrices. We the...
It is shown that a real Hankel matrix admits an approximate block diagonalization in which...
AbstractWe explore the connections between the Lanczos algorithm for matrix tridiagonalization and t...
AbstractIn this paper, the updating formulas used by three look-ahead methods for solving Hankel sys...
AbstractA simple interpretation of the Berlekamp-Massey algorithm in the light of the Hankel matrix ...
AbstractConsider an n × n lower triangular matrix L whose (i + 1)st row is defined by the coefficien...
On étudie la décomposition de matrice de Hankel comme une somme des matrices de Hankel de rang fai...
AbstractWe examine a result of Basor and Ehrhardt concerning Hankel and Toeplitz plus Hankel matrice...
AbstractThe inversion problem for square matrices having the structure of a block Hankel-like matrix...
We describe how the Euclidean algorithm can be interpreted as a method to solve Pade approximation p...
In this paper, we develop three essential ingredients of an algebraic structure theory of finite blo...
The inversion problem for square matrices having the structure of a block Hankel-like matrix is stud...
Consider a $n \times n$ lower triangular matrix $L$ whose $(i+1)$-st row is defined by the coeffici...
International audienceSparse polynomial interpolation, sparse linear system solving or modular ratio...