In control theory, multiple model control is an approach to ensure stability in cases of large model uncertainty or changing plant dyanamics. It uses a number of models, which are distributed to give a suitable cover of the region of uncertainty, and adapts control based on the responses of the plant and the models. A model is chosen at every instant, depending on which is closest to the plant according to some metric, and this is used to determine the appropriate control input. The method offers satisfactory performance when no restrictions are put on the number of available models. [1]
Approaches
editThere are a number of multiple model methods, including:
- “Switching”, the control input to the plant is based on the fixed model chosen at that instant. It is discontinuous, fast, but coarse. However it does have the advantage of verifiable stability bounds.[2]
- “Switching and tuning”, an adaptive model is initialized from the location of the fixed model chosen, and the parameters of the best model determine the control to be used. It is continuous, slow, but accurate.
- "Blending", the control input is chosen based on a weighted combination of a number of suitable models.
Applications
editMultiple model method can be used for:
- controlling an unknown plant - parameter estimate and the identification errors can be used collectively to determine the control input to the overall system,
- applying multi observer - significantly improving transients and reducing observer overshoot.[3]
See also
editReferences
edit- ^ Narendra, Kumpati S.; Han, Zhuo (August 2011). "Adaptive Control Using Collective Information Obtained from Multiple Models". IFAC Proceedings Volumes. 18 (1): 362–367. doi:10.3182/20110828-6-IT-1002.02237.
- ^ Buchstaller, Dominic (March 2016). "Robust Stability for Multiple Model Adaptive Control: Part I—The Framework" (PDF). IEEE Transactions on Automatic Control. 61 (3): 677–692. doi:10.1109/TAC.2015.2492518.
- ^ Bernat, J.; Stepien, S. (2015), "Multi modelling as new estimation schema for High Gain Observers", International Journal of Control, 88 (6): 1209–1222, Bibcode:2015IJC....88.1209B, doi:10.1080/00207179.2014.1000380, S2CID 8599596
General references
edit- Narendra, K.S.; Balakrishnan, J. (September 1994), "Improving Transient Response of Adaptive Control Systems Using Multiple Models and Switching", IEEE Transactions on Automatic Control, 39 (9): 1861–1866, doi:10.1109/9.317113
- Postoyan, R.; Hamid, M. H. A.; Daafouz, J. (December 2015). "A multi-observer approach for the state estimation of nonlinear systems". 2015 54th IEEE Conference on Decision and Control (CDC). pp. 1793–1798. doi:10.1109/CDC.2015.7402470. ISBN 978-1-4799-7886-1. S2CID 12588430.