Difference between revisions of "Controllability and Observability"
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(Created page with "The observability and controllability of a system are mathematical duals. It is explained in the bookAnalysis and Control of Boolean Networks A Semi-tensor Product Approach<ref>{{:Book/Analysis and Control of Boolean Networks A Semi-tensor Product Approach#Controllability and Observability of Boolean Control Networks }}</...") |
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The [[observability]] and [[controllability]] of a system are mathematical duals. It is explained in the book[[:Book/Analysis and Control of Boolean Networks A Semi-tensor Product Approach | The [[observability]] and [[controllability]] of a system are mathematical duals. It is explained in the book chapter:[[:Book/Analysis and Control of Boolean Networks A Semi-tensor Product Approach|Analysis and Control of Boolean Networks A Semi-tensor Product Approach]]<ref>{{:Book/Analysis and Control of Boolean Networks A Semi-tensor Product Approach#Controllability and Observability of Boolean Control Networks | ||
}}</ref> | }}</ref>. | ||
<noinlcude> | <noinlcude> | ||
Revision as of 06:52, 26 December 2022
The observability and controllability of a system are mathematical duals. It is explained in the book chapter:Analysis and Control of Boolean Networks A Semi-tensor Product Approach[1].
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References
- ↑ Cheng, Daizhan; Qi, Hongsheng; Li, Zhiqiang (2011). Analysis and Control of Boolean Networks:A Semi-tensor Product Approach. local page: Springer-Verlag. ISBN 978-0-85729-097-7.
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