AbstractLU-factorization has been an original motivation for the development of Semi-Separability (semi-separable systems of equations are sometimes called “quasi-separable”) theory, to reduce the computational complexity of matrix inversion. In the case of infinitely indexed matrices, it got side-tracked in favor of numerically more stable methods based on orthogonal transformations and structural “canonical forms”, in particular external (coprime) and outer–inner factorizations. This paper shows how these factorizations lead to what the author believes are new, closed and canonical expressions for the L and U factors, related existence theorems and a factorization algorithm for the case where the original system is invertible and the fact...
We obtain closed-form solutions of several inhomogeneous Li´enard equations by the factorization met...
In the study of matrices, we are always searching for tools which allow us to simplify our investiga...
This paper concerns the study of a unitary transformation from a generic symmetric matrix $A$ into ...
AbstractLU-factorization has been an original motivation for the development of Semi-Separability (s...
Abstract. Sparse linear equations Kd r are considered, where K is a specially structured symmetric i...
LU decomposition is a fundamental in linear algebra. Numerous tools exists that provide this importa...
In this paper, we address the problem of preconditioning sequences of large sparse indefinite system...
In this thesis, we study a important class of structured matrices: "Hierarchically Semi-Separable" m...
AbstractAn LU-type factorization theorem due to Elsner and to Gohberg and Goldberg is generalized to...
AbstractWe consider the problem of computing the inverse of a large class of infinite systems of lin...
The problem of factoring a linear partial differential operator is studied. An algorithm is designed...
AbstractLet A be a semiinfinite band matrix whose bands are made up from the coefficients of a polyn...
A left canonical factorization theorem for rational matrix functions relative to the unit circle is ...
AbstractA factorization method is constructed for sequences of second-order linear difference equati...
AbstractA method of factorisation of a U-resultant into linear factors is given. Using this method w...
We obtain closed-form solutions of several inhomogeneous Li´enard equations by the factorization met...
In the study of matrices, we are always searching for tools which allow us to simplify our investiga...
This paper concerns the study of a unitary transformation from a generic symmetric matrix $A$ into ...
AbstractLU-factorization has been an original motivation for the development of Semi-Separability (s...
Abstract. Sparse linear equations Kd r are considered, where K is a specially structured symmetric i...
LU decomposition is a fundamental in linear algebra. Numerous tools exists that provide this importa...
In this paper, we address the problem of preconditioning sequences of large sparse indefinite system...
In this thesis, we study a important class of structured matrices: "Hierarchically Semi-Separable" m...
AbstractAn LU-type factorization theorem due to Elsner and to Gohberg and Goldberg is generalized to...
AbstractWe consider the problem of computing the inverse of a large class of infinite systems of lin...
The problem of factoring a linear partial differential operator is studied. An algorithm is designed...
AbstractLet A be a semiinfinite band matrix whose bands are made up from the coefficients of a polyn...
A left canonical factorization theorem for rational matrix functions relative to the unit circle is ...
AbstractA factorization method is constructed for sequences of second-order linear difference equati...
AbstractA method of factorisation of a U-resultant into linear factors is given. Using this method w...
We obtain closed-form solutions of several inhomogeneous Li´enard equations by the factorization met...
In the study of matrices, we are always searching for tools which allow us to simplify our investiga...
This paper concerns the study of a unitary transformation from a generic symmetric matrix $A$ into ...