AbstractBased on a generalization of the classical Bruhat factorization of nonsingular matrices to arbitrary rectangular matrices, a new canonical form for state space equivalence of controllable and observable linear systems is introduced. The proposed canonical form is shown to be closely related to a canonical form due to Bosgra and van der Weiden. Moreover, in the single-input single-output case and up to minor details, the proposed normal form is equivalent to the continued fraction canonical form introduced by Kalman. Connections to a cell decomposition by Fuhrmann and Krishnaprasad are discussed as well. Discrete invariants appearing in the Bruhat canonical form are shown to be invariants for restricted output feedback equivalence
AbstractThis paper derives two canonical state space forms (i.e., the observer canonical form and th...
AbstractCanonical forms are derived for the set of minimal systems of given order from a canonical f...
We study the feedback group action on single-input nonlinear control systems. We follow an approach ...
AbstractBased on a generalization of the classical Bruhat factorization of nonsingular matrices to a...
AbstractWe construct a new canonical form for reachable matrix pairs (A, B) under the similarity act...
We tackle the obtaining of canonical forms for classifying linear control systems with regard to cha...
In van der Schaff and Rapisarda (2011) [3] we showed that a state variable for a LTI system can be c...
It is well known that all linear time-invariant controllable systems can be transformed to Brunovsky...
AbstractIt is well known that all linear time-invariant controllable systems can be transformed to B...
The concepts of transformation and canonical form have been used in analyzing linear systems. These ...
We propose a weighted canonical form for single-input systems with noncontrollable first order appro...
AbstractA new finite atlas of overlapping balanced canonical forms for multivariate discrete-time lo...
AbstractThe main purpose of the paper is to present a uniform algorithm for transforming time-invari...
We study the feedback group action on single-input nonlinear control systems. We follow an approach ...
AbstractThis paper considers canonical forms for the similarity action of Gl(n) on ∑n,m={(A,B)∈Cn·n×...
AbstractThis paper derives two canonical state space forms (i.e., the observer canonical form and th...
AbstractCanonical forms are derived for the set of minimal systems of given order from a canonical f...
We study the feedback group action on single-input nonlinear control systems. We follow an approach ...
AbstractBased on a generalization of the classical Bruhat factorization of nonsingular matrices to a...
AbstractWe construct a new canonical form for reachable matrix pairs (A, B) under the similarity act...
We tackle the obtaining of canonical forms for classifying linear control systems with regard to cha...
In van der Schaff and Rapisarda (2011) [3] we showed that a state variable for a LTI system can be c...
It is well known that all linear time-invariant controllable systems can be transformed to Brunovsky...
AbstractIt is well known that all linear time-invariant controllable systems can be transformed to B...
The concepts of transformation and canonical form have been used in analyzing linear systems. These ...
We propose a weighted canonical form for single-input systems with noncontrollable first order appro...
AbstractA new finite atlas of overlapping balanced canonical forms for multivariate discrete-time lo...
AbstractThe main purpose of the paper is to present a uniform algorithm for transforming time-invari...
We study the feedback group action on single-input nonlinear control systems. We follow an approach ...
AbstractThis paper considers canonical forms for the similarity action of Gl(n) on ∑n,m={(A,B)∈Cn·n×...
AbstractThis paper derives two canonical state space forms (i.e., the observer canonical form and th...
AbstractCanonical forms are derived for the set of minimal systems of given order from a canonical f...
We study the feedback group action on single-input nonlinear control systems. We follow an approach ...