A novel two stages funnel controller limiting the error derivative. (English) Zbl 1521.93093
Summary: As a powerful adaptive control method for the output tracking problem, funnel control has attracted considerable attention in theoretical research and engineering practice. The funnel control strategy can guarantee both transient behavior and arbitrary good accuracy. A noticeable shortcoming is however that the derivative of the tracking error may become unnecessarily large resulting in a bouncing behavior of the tracking error between the funnel boundaries. To avoid this phenomenon, we present a novel two stages funnel control scheme to solve the output-tracking control problem for uncertain nonlinear systems with relative degree one and stable internal dynamics. This new scheme defines the control input in terms of a desired error derivative while still ensuring that the tracking error evolves within the prescribed funnel. In particular, we can quantify the range of the error derivative with a derivative funnel in terms of the known bounds of the system dynamics. Furthermore, we extend our approach to the situation where input saturations are present and extend the control law outside the funnel to ensure well-defined behavior in case the input saturations are too restrictive to keep the error within the funnel.
References:
| [1] | Ilchmann, A.; Ryan, E. P., Universal \(\lambda \)-tracking for nonlinearly-perturbed systems in the presence of noise, Automatica, 30, 2, 337-346 (1994) · Zbl 0800.93793 |
| [2] | Ilchmann, A.; Ryan, E. P.; Sangwin, C. J., Tracking with prescribed transient behaviour, ESAIM Control Optim. Calc. Var., 7, 471-493 (2002) · Zbl 1044.93022 |
| [3] | Ilchmann, A.; Ryan, E. P., High-gain control without identification: a survey, GAMM-Mitt., 31, 1, 115-125 (2008) · Zbl 1196.93036 |
| [4] | Berger, T.; Ilchmann, A.; Ryan, E. P., Funnel control of nonlinear systems, Math. Control Signals Systems, 33, 1, 151-194 (2021) · Zbl 1461.93246 |
| [5] | Hackl, C. M., (Non-Identifier Based Adaptive Control in Mechatronics-Theory and Application. Non-Identifier Based Adaptive Control in Mechatronics-Theory and Application, Lecture Notes in Control and Information Sciences, vol. 466 (2017), Springer-Verlag: Springer-Verlag Cham, Switzerland) · Zbl 1371.93002 |
| [6] | Bechlioulis, C. P.; Rovithakis, G. A., Robust adaptive control of feedback linearizable MIMO nonlinear systems with prescribed performance, IEEE Trans. Autom. Control, 53, 9, 2090-2099 (2008) · Zbl 1367.93298 |
| [7] | Bechlioulis, C. P.; Rovithakis, G. A., A low-complexity global approximation-free control scheme with prescribed performance for unknown pure feedback systems, Automatica, 50, 4, 1217-1226 (2014) · Zbl 1298.93171 |
| [8] | Tee, K. P.; Ge, S. S.; Tay, E. H., Barrier Lyapunov Functions for the control of output-constrained nonlinear systems, Automatica, 45, 4, 918-927 (2009) · Zbl 1162.93346 |
| [9] | Lavretsky, E.; Wise, K. A., (Robust and Adaptive Control. Robust and Adaptive Control, Advanced Textbooks in Control and Signal Processing (2013), Springer-Verlag) · Zbl 1254.93001 |
| [10] | Anderson, R. B.; Marshall, J. A.; L’Afflitto, A., Novel model reference adaptive control laws for improved transient dynamics and guaranteed saturation constraints, J. Franklin Inst., 358, 12, 6281-6308 (2021) · Zbl 1470.93082 |
| [11] | Ilchmann, A.; Ryan, E. P., Asymptotic tracking with prescribed transient behaviour for linear systems, Internat. J. Control, 79, 8, 910-917 (2006) · Zbl 1103.93033 |
| [12] | Lee, J. G.; Trenn, S., Asymptotic tracking via funnel control, (Proc. 58th IEEE Conf. Decis. Control, Nice, France (2019)), 4228-4233 |
| [13] | J. Hu, S. Trenn, X. Zhu, Funnel control for relative degree one nonlinear systems with input saturation, in: Proc. 2022 European Control Conf., ECC, London, UK, 2022, pp. 227-232, http://dx.doi.org/10.23919/ECC55457.2022.9837979. |
| [14] | Ilchmann, A.; Ryan, E. P.; Trenn, S., Tracking control: Performance funnels and prescribed transient behaviour, Systems Control Lett., 54, 7, 655-670 (2005) · Zbl 1129.93503 |
| [15] | Byrnes, C. I.; Isidori, A., Asymptotic stabilization of minimum phase nonlinear systems, IEEE Trans. Autom. Control, 36, 10, 1122-1137 (1991) · Zbl 0758.93060 |
| [16] | Hopfe, N.; Ilchmann, A.; Ryan, E. P., Funnel control with saturation: nonlinear SISO systems, IEEE Trans. Autom. Control, 55, 9, 2177-2182 (2010) · Zbl 1368.93250 |
This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. In some cases that data have been complemented/enhanced by data from zbMATH Open. This attempts to reflect the references listed in the original paper as accurately as possible without claiming completeness or a perfect matching.
