AbstractWe study to which extent well-known facts concerning Vandermonde factorization or canonical representation of scalar Hankel matrices transfer to block Hankel matrices with p × q blocks. It is shown that nonsingular block Hankel matrices can be factored, like in the scalar case, into nonconfluent Vandermonde matrices and that the theorem on full-rank factorization of arbitrary Hankel matrices transfers (in a weak version) to the 2 × 2 block case but not to larger block sizes. In general, the minimal rank of a Vandermonde factorization (both with finite nodes and affine) is described in terms of the Hankel matrix. The main tools are realization, partial realization, and Moebius transformations
AbstractA scaled version of the lower and the upper triangular factors of the inverse of the Vanderm...
The LU factorization of the Vandermonde matrix is obtained, using complete symmetric functions, and ...
AbstractThe LU factorization of the Vandermonde matrix is obtained, using complete symmetric functio...
AbstractWe study to which extent well-known facts concerning Vandermonde factorization or canonical ...
Abstract. We show that an arbitrary Hankel matrix of a nite rank admits a Vandermonde decomposition:...
AbstractThe main purpose of this paper is to prove factorization results for finite Hankel and Toepl...
In this paper, we develop three essential ingredients of an algebraic structure theory of finite blo...
AbstractThe basic results of N.I. Achiezer and M.G. Krein from the classical polynomial moment theor...
It is shown that a real Hankel matrix admits an approximate block diagonalization in which...
We introduce a new algorithm for the approximate block factorization of real Hankel matrices. We the...
This paper gives displacement structure algorithms for the factorization positive definite and indef...
AbstractWe show that certain matrices built from Vandermonde matrices are of full rank. This result ...
AbstractIn this note we show that an asymptotically fast algorithm may be designed in order to reali...
AbstractThis paper analyzes the factorization of the inverse of a Cauchy-Vandermonde matrix as a pro...
(eng) In this paper, we first show that a confluent Vandermonde matrix may be viewed as composed of ...
AbstractA scaled version of the lower and the upper triangular factors of the inverse of the Vanderm...
The LU factorization of the Vandermonde matrix is obtained, using complete symmetric functions, and ...
AbstractThe LU factorization of the Vandermonde matrix is obtained, using complete symmetric functio...
AbstractWe study to which extent well-known facts concerning Vandermonde factorization or canonical ...
Abstract. We show that an arbitrary Hankel matrix of a nite rank admits a Vandermonde decomposition:...
AbstractThe main purpose of this paper is to prove factorization results for finite Hankel and Toepl...
In this paper, we develop three essential ingredients of an algebraic structure theory of finite blo...
AbstractThe basic results of N.I. Achiezer and M.G. Krein from the classical polynomial moment theor...
It is shown that a real Hankel matrix admits an approximate block diagonalization in which...
We introduce a new algorithm for the approximate block factorization of real Hankel matrices. We the...
This paper gives displacement structure algorithms for the factorization positive definite and indef...
AbstractWe show that certain matrices built from Vandermonde matrices are of full rank. This result ...
AbstractIn this note we show that an asymptotically fast algorithm may be designed in order to reali...
AbstractThis paper analyzes the factorization of the inverse of a Cauchy-Vandermonde matrix as a pro...
(eng) In this paper, we first show that a confluent Vandermonde matrix may be viewed as composed of ...
AbstractA scaled version of the lower and the upper triangular factors of the inverse of the Vanderm...
The LU factorization of the Vandermonde matrix is obtained, using complete symmetric functions, and ...
AbstractThe LU factorization of the Vandermonde matrix is obtained, using complete symmetric functio...