Journal ArticleDOI
Model quality in identification of nonlinear systems
Mario Milanese,Carlo Novara +1 more
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TLDR
The Nonlinear Set Membership (NSM) method, recently proposed by the authors, is taken, assuming that the nonlinear regression function, representing the difference between the system to be identified and a linear approximation, has gradient norm bounded by a constant /spl gamma/.Abstract:
In this note, the problem of the quality of identified models of nonlinear systems, measured by the errors in simulating the system behavior for future inputs, is investigated. Models identified by classical methods minimizing the prediction error, do not necessary give "small" simulation error on future inputs and even boundedness of this error is not guaranteed. In order to investigate the simulation error boundedness (SEB) property of identified models, a Nonlinear Set Membership (NSM) method recently proposed by the authors is taken, assuming that the nonlinear regression function, representing the difference between the system to be identified and a linear approximation, has gradient norm bounded by a constant /spl gamma/. Moreover, the noise sequence is assumed unknown but bounded by a constant /spl epsiv/. The NSM method allows to obtain validation conditions, useful to derive "validated regions" within which to suitably choose the bounding constants /spl gamma/ and /spl epsiv/. Moreover, the method allows to derive an "optimal" estimate of the true system. If the chosen linear approximation is asymptotically stable (a necessary condition for the SEB property), in the present note a sufficient condition on /spl gamma/ is derived, guaranteeing that the identified optimal NSM model has the SEB property. If values of /spl gamma/ in the validated region exist, satisfying the sufficient condition, the previous results can be used to give guidelines for choosing the bounding constants /spl gamma/ and /spl epsiv/, additional to the ones required for assumptions validation and useful for obtaining models with "low" simulation errors. The numerical example, representing a mass-spring-damper system with nonlinear damper and input saturation, demonstrates the effectiveness of the presented approach.read more
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Journal ArticleDOI
Unified Set Membership theory for identification, prediction and filtering of nonlinear systems
Mario Milanese,Carlo Novara +1 more
TL;DR: The problem of making inferences from data measured on nonlinear systems is investigated within a Set Membership (SM) framework and it is shown that identification, prediction and filtering can be treated as specific instances of the general presented theory.
Journal ArticleDOI
Direct feedback control design for nonlinear systems
TL;DR: It is shown that f^* is an almost-optimal controller (in a worst-case sense), and the closed-loop stability is guaranteed for a set of trajectories of interest, when the number of data used for control design tends to infinity and these data are dense in the controller domain.
Journal ArticleDOI
Direct Filtering: A New Approach to Optimal Filter Design for Nonlinear Systems
TL;DR: A new approach overcoming issues is proposed, allowing the design of optimal filters for nonlinear systems in both the cases of known and unknown system, based on the direct filter design from a set of data generated by the system.
Journal ArticleDOI
Sparse Identification of Nonlinear Functions and Parametric Set Membership Optimality Analysis
TL;DR: A combined l1-relaxed-greedy algorithm is proposed and conditions are given, under which the approximation derived by the algorithm is a sparsest one, and it is shown that the algorithms is able to exactly select the basis functions which define the unknown function and to provide an optimal estimate of their coefficients.
Journal ArticleDOI
Prediction and simulation errors in parameter estimation for nonlinear systems
TL;DR: This article compares the pros and cons of using prediction error and simulation error to define cost functions for parameter estimation in the context of nonlinear system identification and shows that, in general, the use of simulation error is preferable to prediction error.
References
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Identification and control of dynamical systems using neural networks
TL;DR: It is demonstrated that neural networks can be used effectively for the identification and control of nonlinear dynamical systems and the models introduced are practically feasible.
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Jonas Sjöberg,Qinghua Zhang,Lennart Ljung,Albert Benveniste,Bernard Delyon,Pierre-Yves Glorennec,Håkan Hjalmarsson,Anatoli Juditsky +7 more
TL;DR: What are the common features in the different approaches, the choices that have to be made and what considerations are relevant for a successful system-identification application of these techniques are described, from a user's perspective.
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Linear System Theory
TL;DR: In this article, a mathematical notation and review of state equation representation state equation solution transition matrix properties two important cases internal stability Lyapunov stability criteria additional stability criteria controllability and observability realizability minimal realization input-out-put stability controller and observer forms linear feedback state observation polynomial fraction description polynoial fraction applications geometric theory applications of geometric theory.
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Neural Networks for Modelling and Control of Dynamic Systems: A Practitioner’s Handbook
TL;DR: In this paper, the authors present an approach for detecting models and controllers from data using a multilayer perceptron (MLP) model and a linear model of the control system.
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Neural Networks for Modelling and Control of Dynamic Systems
TL;DR: This chapter discusses Neural-Network-based Control, a method for automating the design and execution of nonlinear control systems, and its application to Predictive Control.