Linear programming methods for discrete l1 approximation are used to provide solutions to problems of approximate identification with state space models and to problems of model validation for stable uncertain systems. Choice of model structure is studied via Kolmogorov n-width concept and a related n-width concept for state space models. Several results are given for FIR, Laguerre and Kautz models concerning their approximation properties in the space of bounded-input bounded-output (BIBO) stable systems. A robust convergence result is given for a modified least sum of absolute deviations identification algorithm for BIBO stable linear discrete-time systems. A simulation example with identification of Kautz models and subsequent model vali...
In subspace methods for linear system identi cation, the system matrices are usually estimated by le...
In subspace methods for system identification, the system matrices are usually estimated by least sq...
In this paper, we consider the identification of linear systems, a priori known to be stable, from ...
Linear programming methods for discrete l1 approximation are used to provide solutions to problems o...
Given measured data generated by a discrete-time linear system we propose a model consisting of a li...
A real time computational method is presented for the identification of linear discrete dynamic syst...
The model identification problem for asymptotically stable linear time invariant systems is consider...
Identification of linear systems, a priori known to be stable, from input output measurements corrup...
Exact and Approximate Modeling of Linear Systems: A Behavioral Approach elegantly introduces the beh...
In this paper we consider identification of multivariable linear systems using state-space models. A...
Abstract — The main features of the considered identification problem are that there is no a priori ...
This paper deals with the worst-case analysis of identification of linear shift-invariant (possibly)...
In the design of a robust control system, one needs a nominal model together with a quantitative bou...
A dynamical process is modelled by a system of non-linearizable ordinary differential equations with...
The aim of this paper is to study the validation of a model for non-linear systems. It evaluates the...
In subspace methods for linear system identi cation, the system matrices are usually estimated by le...
In subspace methods for system identification, the system matrices are usually estimated by least sq...
In this paper, we consider the identification of linear systems, a priori known to be stable, from ...
Linear programming methods for discrete l1 approximation are used to provide solutions to problems o...
Given measured data generated by a discrete-time linear system we propose a model consisting of a li...
A real time computational method is presented for the identification of linear discrete dynamic syst...
The model identification problem for asymptotically stable linear time invariant systems is consider...
Identification of linear systems, a priori known to be stable, from input output measurements corrup...
Exact and Approximate Modeling of Linear Systems: A Behavioral Approach elegantly introduces the beh...
In this paper we consider identification of multivariable linear systems using state-space models. A...
Abstract — The main features of the considered identification problem are that there is no a priori ...
This paper deals with the worst-case analysis of identification of linear shift-invariant (possibly)...
In the design of a robust control system, one needs a nominal model together with a quantitative bou...
A dynamical process is modelled by a system of non-linearizable ordinary differential equations with...
The aim of this paper is to study the validation of a model for non-linear systems. It evaluates the...
In subspace methods for linear system identi cation, the system matrices are usually estimated by le...
In subspace methods for system identification, the system matrices are usually estimated by least sq...
In this paper, we consider the identification of linear systems, a priori known to be stable, from ...