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Positive systems

Positive systems constitute a class of systems that has the important property that its state variables are never negative, given a positive initial state. These systems appear frequently in practical applications, as these variables represent physical quantities, with positive sign (levels, heights, concentrations, etc.).

The fact that a system is positive has important implications in the control system design. For instance, an asymptotically stable positive linear time-invariant system always admits a diagonal quadratic Lyapunov function, which makes these systems more numerical tractable in the context of Lyapunov analysis.

It is also important to take this positivity into account for state observer design, as standard observers (for example Luenberger observers) might give illogical negative values.

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Conditions for positivity

A continuous-time linear system x ˙ = A x {\displaystyle {\dot {x}}=Ax} is positive if and only if A is a Metzler matrix.8

A discrete-time linear system x ( k + 1 ) = A x ( k ) {\displaystyle x(k+1)=Ax(k)} is positive if and only if A is a nonnegative matrix.9

See also

References

  1. T. Kaczorek. Positive 1D and 2D Systems. Springer- Verlag, 2002

  2. L. Farina and S. Rinaldi, Positive Linear Systems; Theory and Applications, J. Wiley, New York, 2000

  3. Shorten, Robert; Wirth, Fabian; Leith, Douglas (June 2006). "A positive systems model of TCP-like congestion control: asymptotic results" (PDF). IEEE/ACM Transactions on Networking. 14 (3): 616–629. doi:10.1109/TNET.2006.876178. S2CID 14066559. Retrieved 15 February 2023. http://mural.maynoothuniversity.ie/1764/1/HamiltonPositiveSystems.pdf

  4. Tadeo, Fernando; Rami, Mustapha Ait (July 2010). "Selection of Time-after-injection in Bone Scanning using Compartmental Observers" (PDF). Proceedings of the World Congress on Engineering. 1. Retrieved 15 February 2023. https://www.iaeng.org/publication/WCE2010/WCE2010_pp656-661.pdf

  5. Hmamed, Abelaziz; Benzaouia, Abdellah; Rami, Mustapha Ait; Tadeo, Fernando (2008). "Memoryless Control to Drive States of Delayed Continuous-time Systems within the Nonnegative Orthant" (PDF). IFAC Proceedings Volumes. 41 (2): 3934–3939. doi:10.3182/20080706-5-KR-1001.00662. Retrieved 15 February 2023. https://folk.ntnu.no/skoge/prost/proceedings/ifac2008/data/papers/3024.pdf

  6. Rantzer, Anders (2015). "Scalable control of positive systems". European Journal of Control. 24: 72–80. arXiv:1203.0047. doi:10.1016/j.ejcon.2015.04.004. S2CID 31821230. https://linkinghub.elsevier.com/retrieve/pii/S094735801500059X

  7. Ait Rami, M.; Helmke, U.; Tadeo, F. (June 2007). "Positive observation problem for linear time-delay positive systems" (PDF). 2007 Mediterranean Conference on Control & Automation. pp. 1–6. doi:10.1109/MED.2007.4433692. ISBN 978-1-4244-1281-5. S2CID 15084715. Archived from the original (PDF) on 5 March 2016. Retrieved 15 February 2023. 978-1-4244-1281-5

  8. T. Kaczorek. Positive 1D and 2D Systems. Springer- Verlag, 2002

  9. T. Kaczorek. Positive 1D and 2D Systems. Springer- Verlag, 2002