In this paper we propose a new recursive algorithm for computing the staircase form of a matrix pencil, and implicitly its Kronecker structure. The algorithm compares favorably to existing ones in terms of elegance, versatility, and complexity. In particular, the algorithm without any modification yields the structural invariants associated with a generalized state-space system and its system pencil. Two related geometric aspects are also discussed: we show that an appropriate choice of a set of nested spaces related to the pencil leads directly to the staircase form; and we extend the notion of deflating subspace to the singular pencil cas
In this paper we discuss algorithmic aspects of the computation of the Jordan canonical form. Inspir...
This paper presents a novel method of extracting the general structure of a pencil ¿B-A using stabl...
AbstractThe set of n by n matrices with a given Jordan canonical form defines a subset of matrices i...
In this paper we propose a new recursive algorithm for computing the staircase form of a matrix penc...
Abstract. We present structure preserving algorithms for the numerical computation of structured sta...
AbstractWe give an O(m2n) algorithm for computing the Kronecker structure of an arbitrary m×n pencil...
We derive versal deformations of the Kronecker canonical form by deriving the tangent space and orth...
We give canonical forms for a general singular matrix pencil from which several observer design prob...
We develop stable algorithms for the computation of the Kronecker structure of an arbitrary pencil. ...
AbstractWe develop stable algorithms for the computation of the Kronecker structure of an arbitrary ...
Funding Information: Supported by an Academy of Finland grant (Suomen Akatemian päätös 331240).Suppo...
In this paper we introduce the new concept of reducing subspaces of a singular pencil, which extends...
AbstractThe challenge consists in describing the relationships between the Kronecker invariants of a...
[[abstract]]We present an algorithm for the computation of the Kronecker structure of a symmetric pe...
Collection of Julia functions to determine the Kronecker structure of a linear pencil, with applicat...
In this paper we discuss algorithmic aspects of the computation of the Jordan canonical form. Inspir...
This paper presents a novel method of extracting the general structure of a pencil ¿B-A using stabl...
AbstractThe set of n by n matrices with a given Jordan canonical form defines a subset of matrices i...
In this paper we propose a new recursive algorithm for computing the staircase form of a matrix penc...
Abstract. We present structure preserving algorithms for the numerical computation of structured sta...
AbstractWe give an O(m2n) algorithm for computing the Kronecker structure of an arbitrary m×n pencil...
We derive versal deformations of the Kronecker canonical form by deriving the tangent space and orth...
We give canonical forms for a general singular matrix pencil from which several observer design prob...
We develop stable algorithms for the computation of the Kronecker structure of an arbitrary pencil. ...
AbstractWe develop stable algorithms for the computation of the Kronecker structure of an arbitrary ...
Funding Information: Supported by an Academy of Finland grant (Suomen Akatemian päätös 331240).Suppo...
In this paper we introduce the new concept of reducing subspaces of a singular pencil, which extends...
AbstractThe challenge consists in describing the relationships between the Kronecker invariants of a...
[[abstract]]We present an algorithm for the computation of the Kronecker structure of a symmetric pe...
Collection of Julia functions to determine the Kronecker structure of a linear pencil, with applicat...
In this paper we discuss algorithmic aspects of the computation of the Jordan canonical form. Inspir...
This paper presents a novel method of extracting the general structure of a pencil ¿B-A using stabl...
AbstractThe set of n by n matrices with a given Jordan canonical form defines a subset of matrices i...