Abstract :
A self-contained exposition is given of an approach to mathematical models, in particular, to the theory of dynamical systems. The basic ingredients form a triptych, with the behavior of a system in the center, and behavioral equations with latent variables as side panels. The author discusses a variety of representation and parametrization problems, in particular, questions related to input/output and state models. The proposed concept of a dynamical system leads to a new view of the notions of controllability and observability, and of the interconnection of systems, in particular, to what constitutes a feedback control law. The final issue addressed is that of system identification. It is argued that exact system identification leads to the question of computing the most powerful unfalsified model
Keywords :
controllability; feedback; identification; large-scale systems; observability; behavioral equations; controllability; dynamical systems; feedback control law; identification; input/output; interconnection; observability; parametrization problems; representation; state models; Controllability; Equations; Feedback control; Helium; Mathematical model; Mathematics; Observability; Power system interconnection; Power system modeling; System identification;
