Add to ORKGWe study linear differential-algebraic control systems and investigate decompositions with respect to controllability properties. We show that the augmented Wong sequences can be exploited for a transformation of the system into a Kalman controllability decomposition (KCD). The KCD decouples the system into a completely controllable part, an uncontrollable part given by an ordinary differential equation and an inconsistent part, which is behaviorally control-lable but contains no completely controllable part. This decomposition improves a known KCD from a behavioral point of view. We conclude the paper with some features of the KCD in the case of regular systems
The theory of multidimensional systems suffers in certain areas from a lack of development of fundam...
This paper is the applied counterpart to previous results [5] for linear-analytic control systems. I...
Control systems are usually described by differential equations, but their properties of interest ar...
We study linear differential-algebraic equations and investigate decompositions with respect to cont...
Different concepts related to controllability of differential-algebraic equations are described. The...
Piecewise constant rank systems and the differential Kalman decomposition are introduced in this not...
We consider linear differential-algebraic equations (DAEs) of the form Ex\. = Hx and the Kronecker c...
Feedback controllers for non-linear systems are often based on a linearized dynamic model. Such a li...
Abstract¿Feedback controllers for non-linear systems are often based on a linearized dynamic model. ...
International audienceIn this article, we study the controllability of a class of parabolic systems ...
The notion of controllability was identified by Kalman as one of the central properties determining ...
The paper determines the minimum number of general or dedicated controllers which are required to gu...
The notion of controllability was identified by Kalman as one of the central properties determining ...
The main objective of this article is to review the major progress that has been made on controllabi...
In this article, we study the controllability of a class of parabolic systems of the form Yt = (D∆+A...
The theory of multidimensional systems suffers in certain areas from a lack of development of fundam...
This paper is the applied counterpart to previous results [5] for linear-analytic control systems. I...
Control systems are usually described by differential equations, but their properties of interest ar...
We study linear differential-algebraic equations and investigate decompositions with respect to cont...
Different concepts related to controllability of differential-algebraic equations are described. The...
Piecewise constant rank systems and the differential Kalman decomposition are introduced in this not...
We consider linear differential-algebraic equations (DAEs) of the form Ex\. = Hx and the Kronecker c...
Feedback controllers for non-linear systems are often based on a linearized dynamic model. Such a li...
Abstract¿Feedback controllers for non-linear systems are often based on a linearized dynamic model. ...
International audienceIn this article, we study the controllability of a class of parabolic systems ...
The notion of controllability was identified by Kalman as one of the central properties determining ...
The paper determines the minimum number of general or dedicated controllers which are required to gu...
The notion of controllability was identified by Kalman as one of the central properties determining ...
The main objective of this article is to review the major progress that has been made on controllabi...
In this article, we study the controllability of a class of parabolic systems of the form Yt = (D∆+A...
The theory of multidimensional systems suffers in certain areas from a lack of development of fundam...
This paper is the applied counterpart to previous results [5] for linear-analytic control systems. I...
Control systems are usually described by differential equations, but their properties of interest ar...