Controllability and optimization for differential linear repetitive processes

Dymkou, Siarhei; Rogers, E.; Dymkov, M.; Galkowski, K.; Owens, D.

Title: Controllability and optimization for differential linear repetitive processes
Creator: Dymkou, Siarhei; Rogers, E.; Dymkov, M.; Galkowski, K.; Owens, D.
Date: 2003
Type: Text; Conference paper
Identifier: http://researchonline.federation.edu.au/vital/access/HandleResolver/1959.17/63522
Identifier: vital:1337
Identifier: https://doi.org/10.1109/CDC.2003.1272630
Abstract: Differential linear repetitive processes are a class of continuous-discrete 2D systems of both systems theoretic and applications interest. The feature which makes them distinct from other classes of such systems is the fact that information propagation in one of the two independent directions only occurs over a finite interval. In this paper we develop an operator theory approach for the study of basic systems theoretic structural and control properties of these processes. In particular, we first develop a characterization of the range space of an operator generated by dynamics of the processes under consideration and use it to characterize a controllability property. Also we extend this operator setting to produce new results for a (again physically relevant) linear-quadratic optimization problem for these processes and the resulting optimal feedback control law.; E1
Publisher: Hawaii, USA : IEEE Control Systems Society
Relation: Paper presented at the 42nd IEEE Conference on Decision and Control, Hawaii, USA : 8th December, 2003
Rights: Copyright IEEE
Rights: This metadata is freely available under a CCO license
Subject: Optimisation; Linear processes
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