References
- Alanqar, A., Ellis, M., & Christofides, P.D. (2015). Economic model predictive control of nonlinear process systems using empirical models. AIChE Journal, 61(3), 816–830.
- Angeli, D., Amrit, R., & Rawlings, J.B. (2012). On average performance and stability of economic model predictive control. IEEE Transactions on Automatic Control, 57(7), 1615–1626.
- Barz, T., Cárdenas, D.C.L., Arellano-Garcia, H., & Wozny, G. (2012). Experimental evaluation of an approach to online redesign of experiments for parameter determination. AIChE Journal, 59(6), 1981–1995.
- Başar, T., & Bernhard, P. (1995). H∞-optimal control and related minimax design problems: A dynamic game approach. Boston, Berlin: Birkhauser.
- Besançon, G. (2007a). Identification of parametric models from experimental data. In Lecture notes in control and information sciences (Vol. 363). Berlin: Springer-Verlag.
- on, G. (2007b). Nonlinear observers and application. In Lecture notes in control and information sciences (Vol. 363). Berlin: Springer-Verlag.
- Besançon, G., & Ticlea, A. (2007). An immersion-based observer design for rank-observable nonlinear systems. IEEE Transactions on Automatic Control, 52(1), 83–88.
- Boizot, N., Busvelle, E., & Gauthier, J.-P. (2010). An adaptive high-gain observer for nonlinear systems. Automatica, 46(9), 1483–1488.
- Bornard, G., Couenne, N., & Celle, F. (1988). Regularly persistent observers for bilinear system. In Lecture notes in control and information sciences (Vol. 122, pp. 130–140). Springer-Verlag.
- Calvet, J.-P., & Arkun, Y. (1989). Stabilization of feedback linearized nonlinear processes under bounded perturbations. American control conference (pp. 747–752), Pittsburgh, PA.
- Castillo, F., Witrant, E., Prieur, C., & Dugard, L. (2012). Dynamic boundary stabilization of linear and quasi-linear hyperbolic systems. IEEE conference on decision and control (CDC) (pp. 2952–2957), Maui, HI.
- Cox, H. (1964). On the estimation of state variables and parameters for noisy dynamic systems. IEEE Transactions on Automatic Control, 9(1), 5–12.
- Dufour, P., Flila, S., & Hammouri, H. (2012). Observer design for MIMO non-uniformly observable systems. IEEE Transactions on Automatic Control, 57(2), 511–516.
- Ellis, M., Durand, H., & Christofides, P.D. (2014). A tutorial review of economic model predictive control methods. Journal of Process Control, 24(8), 1156–1178.
- Flila, S., Dufour, P., & Hammouri, H. (2008). Optimal input design for on-line identification: A coupled observer-MPC approach. IFAC World congress (pp. 11457–11462), Seoul, South Korea.
- Franceschini, G., & Macchietto, S. (2008). Optimal experiment design for linear systems with input–output constraints: State of the art. Chemical Engineering Science, 63, 4846–4872.
- Gauthier, J.P., Hammouri, H., & Othman, S. (1992). A simple observer for nonlinear systems applications to bioreactors. IEEE Transactions on Automatic Control, 37(6), 875–880.
- Goodwin, G.C., & Payne, R.L. (1977). Dynamic system identification: Experiment design and data analysis. In Mathematics in science and engineering (Vol. 136). New York: Academic Press.
- Hammouri, H. & Morales, J.D.L. (1990). Observer synthesis for state-affine systems. IEEE conference on decision and control (Vol. 2, pp. 784–785), Honolulu, HI.
- Huang, R., Harinath, E., & Biegler, L.T. (2011). Lyapunov stability of economically oriented NMPC for cyclic processes. Journal of Process Control, 21(4), 501–509.
- Jain, H., Kaul, V., & Ananthkrishnan, N. (2005). Parameter estimation of unstable, limit cycling systems using adaptive feedback linearization: Example of delta wing roll dynamics. Journal of Sound and Vibration, 287, 939–960.
- Jayasankar, B., Huang, B., & Ben-Zv, A. (2010). Receding horizon experiment design with application in SOFC parameter estimation. Dynamics and control of process systems (pp. 527–532), Leuven, Belgium.
- Keviczky, L. (1975). Design of experiments for the identification of linear dynamic systems. Technometrics, 17(3), 303–308.
- Ljung, L. (1979). Asymptotic behavior of the extended Kalman filter as a parameter estimator for linear systems. IEEE Transactions on Automatic Control, 24, 36–50.
- Ljung, L. (1999). System identification: Theory for the user (2nd ed. ), Upper Saddel River: Prentice Hall.
- Nadri, M., Hammouri, H., & Grajales, R. (2013). Observer design for uniformly observable systems with sampled measurements. IEEE Transactions on Automatic Control, 58(3), 757–762.
- Nayfeh, A.H., Elzeba, J.M., & Mook, D.T. (1989). Analytical study of the subsonic wing-rock phenomenon for slender delta wings. Journal of Aircraft, 26(9), 805–809.
- Nelson, L., & Stear, E. (1976). The simultaneous on-line estimation of parameters and states in linear systems. IEEE Transactions on Automatic Control, 21, 94–98.
- Ng, T.S., Goodwin, G.C., & Söderström, T. (1997). Optimal experiment design for linear systems with input-output constraints. Automatica, 13(6), 571–577.
- Qian, J., Dufour, P., & Nadri, M. (2013). Observer and model predictive control for on-line parameter identification in nonlinear systems. IFAC dynamics and control of process systems (pp. 571–576), Mumbai, India.
- Qian, J., Nadri, M., Moroşan, P.D.M., & Dufour, P. (2014). Closed loop optimal experiment design for on-line parameter estimation. IFAC IEEE European control conference (pp. 1813–1818), Strasbourg, France.
- Rawlings, J.B., Angeli, D., & Bates, C.N. (2012). Fundamentals of economic model predictive control. IEEE conference on decision and control (pp. 3851–3861), Naui, Hawaii.
- Walter, E., & Pronzato, L. (1994). Identification of parametric models from experimental data. London: Springer.
- Willems, J.L. (1970). A general stability criterion for non-linear time-varying feedback systems. International Journal of Control, 11(4), 625–631.
- Zanon, M., Gros, S., & Diehl, M. (2014). Indefinite linear MPC and approximated economic MPC for nonlinear systems. Journal of Process Control, 24(8), 1273–1281.
- Zavala, V.M., & Biegler, L.T. (2009). The advanced-step NMPC controller: Optimality, stability and robustness. Automatica, 45(1), 86–93.
- Zhu, Y., & Huang, B. (2011). Constrained receding-horizon experiment design and parameter estimation in the presence of poor initial conditions. AIChE Journal, 57(10), 2808–2820.