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Switched Differential Linear Repetitive Processes
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| Author(s) |
J.Bochniak, K. Galkowski, E. Rogers |
| Abstract |
Differential linear repetitive processes are a distinct
class of hybrid linear 2D systems where information is propagated
in two independent directions. In particular, information is
propagated in one direction as a function of a continuous variable
and in the other as a function of a discrete variable. Moreover, the
former of these only occurs over a finite duration where this is due
to the underlying dynamics and not an assumption introduced
for analysis or other purposes. Recently, applications have arisen
which can be modelled as a differential linear repetitive process
where the dynamics switch as a function of the discrete variable.
In this paper we extend previously reported stability analysis
to such models. The main results are in the form of sufficient
conditions which can be implemented through the use of the
Linear Matrix Inequality (LMI) algorithms. |
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| Filename: | 259 |
| Filesize: | 168.8 KB |
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| Type |
Members Only |
| Date |
Last modified 2006-02-08 by System |
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