References
- Alhajri, M. , & Safonov, M . (2011). Setting the hysteresis constant to zero in adaptive switching control. In Proceedings of the American Control Conference (pp. 3542–3546). San Francisco, CA.
- Anderson, B. (1977). Exponential stability of linear equations arising in adaptive identification. IEEE Transactions on Automatic Control, 22 (1), 83–88.
- Astrom, K. , & Bohlin, T . (1966). Numerical identification of linear dynamic systems from normal operating records. In Theory of self-adaptive control systems (pp. 96–111). Springer.
- Baldi, S. , Battistelli, G. , Mosca, E. , & Tesi, P. (2010). Multi-model unfalsified adaptive switching supervisory control. Automatica, 46 (2), 249–259.
- Battistelli, G. , Mosca, E. , Safonov, M. , & Tesi, P . (2010). Stability of unfalsified adaptive switching control in noisy environments. IEEE Transactions on Automatic Control, 55 (10): 2424–2429.
- Bertsekas, D. , Hager, W. , & Mangasarian, O . (1999). Nonlinear programming . Belmont, MA: Athena Scientific Belmont.
- Bitmead, R. (1984). Persistence of excitation conditions and the convergence of adaptive schemes. IEEE Transactions on Information Theory, 30 (2), 183–191.
- Boyd, S. , & Sastry, S. (1986). Necessary and sufficient conditions for parameter convergence in adaptive control. Automatica, 22 (6), 629–639.
- Dai, S. , Ren, Z. , & Bernstein, D. S. (2017). Adaptive control of nonminimum-phase systems using shifted laurent series. International Journal of Control, 90 (3), 407–427.
- Eykhoff, P. (1968). Process parameter and state estimation. Automatica, 4 (4), 205–224.
- Faizrahnemoon, M. , Schlote, A. , Maggi, L. , Crisostomi, E. , & Shorten, R. (2015). A big-data model for multi-modal public transportation with application to macroscopic control and optimisation. International Journal of Control, 88 (11), 2354–2368.
- Hespanha, J. , Liberzon, D. , Morse, A. , Anderson, B. , Brinsmead, T. , & De Bruyne, F. (2001). Multiple model adaptive control. Part 2: switching. International Journal of Robust and Nonlinear Control, 11 (5), 479–496.
- Hespanha, J. , & Morse, A . (1999). Stability of switched systems with average dwell-time. In 1999 Proceedings of the 38th IEEE conference on decision and control (Vol. 3, pp. 2655–2660). Phoenix, AZ.
- Huang, M. , Wang, X. , & Wang, Z. (2015). Multiple model self-tuning control for a class of nonlinear systems. International Journal of Control, 88 (10), 1984–1994.
- Kenné, G. , Fotso, A. S. , & Lamnabhi-Lagarrigue, F. (2017). A new adaptive control strategy for a class of nonlinear system using RBF neuro-sliding-mode technique: Application to seig wind turbine control system. International Journal of Control, 90 (4), 855–872.
- Li, Y. , & Tong, S. (2016). Adaptive fuzzy output constrained control design for multi-input multioutput stochastic nonstrict-feedback nonlinear systems. IEEE Transactions on Cybernetics, PP (99), 1–10.
- Liberzon, D. , Hespanha, J. , & Morse, A . (2000). Hierarchical hysteresis switching. In Proceedings of the 39th IEEE conference on decision and control (Vol. 1, pp. 484–489).
- Manuelli, C. , Cheong, S. , Mosca, E. , & Safonov, M . (2007). Stability of unfalsified adaptive control with non SCLI controllers and related performance under different prior knowledge. Proceeding of the european control conference (pp. 702–708). Kos, Greece.
- Middleton, R. , Goodwin, G. , Hill, D. , & Mayne, D. (1988). Design issues in adaptive control. IEEE Transactions on Automatic Control, 33 (1), 50–58.
- Morse, A. (1996). Supervisory control of families of linear set-point controllers—Part I: Exact matching. IEEE Transactions on Automatic Control, 41 (10), 1413–1431.
- Morse, A. (1997). Supervisory control of families of linear set-point controllers—Part II: Robustness. IEEE Transactions on Automatic Control, 42 (11), 1500–1515.
- Morse, A. , Mayne, D. , & Goodwin, G. (1992). Applications of hysteresis switching in parameter adaptive control. IEEE Transactions on Automatic Control, 37 (9), 1343–1354.
- Munkres, J . (1975). Topology: A first course . New Jersey: Prentice-Hall Englewood Cliffs.
- Narendra, K. , & Annaswamy, A. (1987). Persistent excitation in adaptive systems. International Journal of Control, 45 (1), 127–160.
- Safonov, M. , & Tsao, T.-C. (1997). The unfalsified control concept and learning. IEEE Transactions on Automatic Control, 42 (6), 843–847.
- Sánchez-Peña, R. , Colmegna, P. , & Bianchi, F. (2015). Unfalsified control based on the h ∞ controller parameterisation. International Journal of Systems Science, 46 (15), 2820–2831.
- Stefanovic, M. , & Safonov, M. (2008). Safe adaptive switching control: Stability and convergence. IEEE Transactions on Automatic Control, 53 (9), 2012–2021.
- Stefanovic, M. , & Safonov, M. G . (2011). Safe adaptive control: Data-driven stability analysis and robust synthesis . Vol. 35. Berlin: Springer-Verlag. Lecture Notes in Control and Information Sciences.
- Stefanovic, M. , Wang, R. , & Safonov, M. . (2004, June 30–July 2). Stability and convergence in adaptive systems. In Proceeding of the american control conference (Vol. 2, pp. 1923–1928). Boston, MA: IEEE Press.
- Tong, S. , Sui, S. , & Li, Y. (2015). Fuzzy adaptive output feedback control of MIMO nonlinear systems with partial tracking errors constrained. IEEE Transactions on Fuzzy Systems, 23 (4), 729–742.
- Wang, R. , Paul, A. , Stefanovic, M. , & Safonov, M . (2007). Cost-detectability and stability of adaptive control systems. In International Journal of Robust and Nonlinear Control, (Vol. 17 (5-6), pp. 549–561). Wiley Online Library.
- Willems, J. C . (1974). Qualitative behavior of interconnected systems (pp. 61–80). Boston, MA: Springer.
- Willems, J. (1976). Mechanisms for the stability and instability in feedback systems. Proceedings of the IEEE, 64 (1), 24–35.
- Zames, G. (1966). On the input-output stability of time-varying nonlinear feedback systems Part I: Conditions derived using concepts of loop gain, conicity, and positivity. IEEE Transactions on Automatic Control, 11 (2), 228–238.