Stabilization of discrete linear repetitive processes with switched dynamics
Bochniak, J, Galkowski, K, Rogers, E, Mehdi, D, Bachelier, O and Kummert, A (2006) Stabilization of discrete linear repetitive processes with switched dynamics. Multidimensional Systems and Signal Processing, 17, 271-295.
Repetitive processes are a distinct class of 2D systems (i.e. information propagation in two independent directions) of both systems theoretic and applications interest. They cannot be controlled by direct extension of existing techniques from either standard (termed 1D here) or 2D systems theory. Here we give new results on the relatively open problem of the design of physically based control laws. These results are for a sub-class of discrete linear repetitive processes with switched dynamics in both independent directions of information propagation.
|Divisions:||Faculty of Physical and Applied Science > Electronics and Computer Science > Comms, Signal Processing & Control
|Date Deposited:||03 Aug 2007|
|Last Modified:||20 Aug 2012 04:25|
|Contributors:||Bochniak, J (Author)
Galkowski, K (Author)
Rogers, E (Author)
Mehdi, D (Author)
Bachelier, O (Author)
Kummert, A (Author)
|Further Information:||Google Scholar|
|ISI Citation Count:||5|
|RDF:||RDF+N-Triples, RDF+N3, RDF+XML, Browse.|
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