[Alma, M. and Darouach, M. (2014). Adaptive observers design for a class of linear descriptor systems, Automatica50(2): 578–583.10.1016/j.automatica.2013.11.036]Search in Google Scholar
[Bestle, D. and Zeitz, M. (1983). Canonical form observer design for non-linear time-variable systems, International Journal of Control38(2): 419–431.10.1080/00207178308933084]Search in Google Scholar
[Bezzaoucha, S., Marx, B., Maquin, D. and Ragot, J. (2013). State and parameter estimation for time-varying systems: A Takagi–Sugeno approach, American Control Conference (ACC), Washington, DC, USA, pp. 1050–1055.]Search in Google Scholar
[Bodizs, L., Srinivasan, B. and Bonvin, D. (2011). On the design of integral observers for unbiased output estimation in the presence of uncertainty, Journal of Process Control21(3): 379–390.10.1016/j.jprocont.2010.11.015]Search in Google Scholar
[Boker, A. and Khalil, H. (2013). Nonlinear observers comprising high-gain observers and extended Kalman filters, Automatica49(12): 3583–3590.10.1016/j.automatica.2013.08.031]Search in Google Scholar
[Bouraoui, I., Farza, M., Ménard, T., Abdennour, R.B., M’Saad, M. and Mosrati, H. (2015). Observer design for a class of uncertain nonlinear systems with sampled outputs: Application to the estimation of kinetic rates in bioreactors, Automatica55: 78–87.10.1016/j.automatica.2015.02.036]Search in Google Scholar
[Chen, W., Khan, A.Q., Abid, M. and Ding, S.X. (2011). Integrated design of observer based fault detection for a class of uncertain nonlinear systems, International Journal of Applied Mathematics and Computer Science21(3): 423–430, DOI: 10.2478/v10006-011-0031-0.10.2478/v10006-011-0031-0]Search in Google Scholar
[Ciccarella, G., Mora, M.D. and Germani, A. (1993). A Luenberger-like observer for nonlinear systems, International Journal of Control57(3): 537–556.10.1080/00207179308934406]Search in Google Scholar
[Efimov, D. and Fridman, L. (2011). Global sliding-mode observer with adjusted gains for locally Lipschitz systems, Automatica47(3): 565–570.10.1016/j.automatica.2010.12.003]Search in Google Scholar
[Farza, M., Bouraoui, I., Ménard, T., Abdennour, R.B. and M’Saad, M. (2014). Adaptive observers for a class of uniformly observable systems with nonlinear parametrization and sampled outputs, Automatica50(11): 2951–2960.10.1016/j.automatica.2014.10.032]Search in Google Scholar
[Farza, M., M’Saad, M., Triki, M. and Maatoug, T. (2011). High gain observer for a class of non-triangular systems, Systems and Control Letters60(1): 27–35.10.1016/j.sysconle.2010.09.009]Search in Google Scholar
[Fliess, M. (1990). Generalized controller canonical forms for linear and nonlinear dynamics, IEEE Transactions on Automatic Control35(9): 994–1001.10.1109/9.58527]Search in Google Scholar
[Gauthier, J. and Bornard, G. (1981). Observability for any u(t) of a class of nonlinear systems, IEEE Transactions on Automatic ControlAC-26(4): 922–926.10.1109/TAC.1981.1102743]Search in Google Scholar
[Gauthier, J., Hammouri, H. and Othman, S. (1992). A simple observer for nonlinear systems. Applications to bioreactors, IEEE Transactions on Automatic Control37(6): 875–880.]Search in Google Scholar
[Ghosh, D., Saha, P. and Chowdhury, A. (2010). Linear observer based projective synchronization in delay Roessler system, Communications in Nonlinear Science and Numerical Simulation15(6): 1640–1647.10.1016/j.cnsns.2009.06.019]Search in Google Scholar
[Gille, J., Decaulne, P. and Pélegrin, M. (1988). Systèmes asservis non linéaires, 5ième edn, Dunod, Paris.]Search in Google Scholar
[Gißler, J. and Schmid, M. (1990). Vom Prozeß zur Regelung. Analyse, Entwurf, Realisierung in der Praxis, Siemens, Berlin/München.]Search in Google Scholar
[Glumineau, A. and Lôpez-Morales, V. (1999). Transformation to State Affine System and Observer Design, Lecture Notes in Control and Information Science, Vol. 244, Springer, London.]Search in Google Scholar
[Guerra, T., Estrada-Manzo, V. and Lendek, Z. (2015). Observer design for Takagi–Sugeno descriptor models: An LMI approach, Automatica52: 154–159.10.1016/j.automatica.2014.11.008]Search in Google Scholar
[Hermann, R. and Krener, A. (1977). Nonlinear controllability and observability, IEEE Transactions on Automatic ControlAC-22(5): 728–740.10.1109/TAC.1977.1101601]Search in Google Scholar
[Krener, A. and Isidori, A. (1983). Linearization by output injection and nonlinear observers, Systems & Control Letters3(1): 47–52.10.1016/0167-6911(83)90037-3]Search in Google Scholar
[Lorenz, E. (1963). Deterministic nonperiodic flow, Journal of the Atmospheric Sciences20(2): 130–141.10.1175/1520-0469(1963)020<0130:DNF>2.0.CO;2]Search in Google Scholar
[Luenberger, D. (1966). Observers for multivariable systems, IEEE Transactions on Automatic ControlAC-11(2): 190–197.10.1109/TAC.1966.1098323]Search in Google Scholar
[Martínez-Guerra, R., Mata-Machuca, J., Aguilar-López, R. and Rodríguez-Bollain, A. (2011). Applications of Chaos and Nonlinear Dynamics in Engineering, Vol. 1, Springer-Verlag, Berlin/Heidelberg.]Search in Google Scholar
[Mazenc, F. and Dinh, T. (2014). Construction of interval observers for continuous-time systems with discrete measurements, Automatica50(10): 2555–2560.10.1016/j.automatica.2014.08.008]Search in Google Scholar
[Menini, L. and Tornambè, A. (2011). Design of state detectors for nonlinear systems using symmetries and semi-invariants, Systems and Control Letters60(2): 128–137.10.1016/j.sysconle.2010.11.004]Search in Google Scholar
[Mobki, H., Sadeghia, M. and Rezazadehb, G. (2015). Design of direct exponential observers for fault detection of nonlinear MEMS tunable capacitor, IJE Transactions A: Basics28(4): 634–641.10.5829/idosi.ije.2015.28.04a.19]Search in Google Scholar
[Morales, A. and Ramirez, J. (2002). A PI observer for a class of nonlinear oscillators, Physics Letters A297(3–4): 205–209.10.1016/S0375-9601(02)00191-3]Search in Google Scholar
[Raghavan, S. and Hedrick, J. (1994). Observer design for a class of nonlinear systems, International Journal of Control59(2): 515–528.10.1080/00207179408923090]Search in Google Scholar
[Rauh, A., Butt, S.S. and Aschemann, H. (2013). Nonlinear state observers and extended Kalman filters for battery systems, International Journal of Applied Mathematics and Computer Science23(3): 539–556, DOI: 10.2478/amcs-2013-0041.10.2478/amcs-2013-0041]Search in Google Scholar
[Röbenack, K. and Lynch, A. (2004). An efficient method for observer design with approximately linear error dynamics, International Journal of Control77(7): 607–612.10.1080/00207170410001682515]Search in Google Scholar
[Röbenack, K. and Lynch, A.F. (2006). Observer design using a partial nonlinear observer canonical form, International Journal of Applied Mathematics and Computer Science16(3): 333–343.]Search in Google Scholar
[Schwaller, B., Ensminger, D., Dresp-Langley, B. and Ragot, J. (2013). State estimation for a class of nonlinear systems, International Journal of Applied Mathematics and Computer Science23(2): 383–394, DOI: 10.2478/amcs-2013-0029.10.2478/amcs-2013-0029]Search in Google Scholar
[Söffker, D., Yu, T. and Müller, P. (1995). State estimation of dynamical systems with nonlinearities by using proportional-integral observers, International Journal of Systems Science26(9): 1571–1582.10.1080/00207729508929120]Search in Google Scholar
[Thabet, R., Raïssi, T., Combastel, C., Efimov, D. and Zolghadri, A. (2014). An effective method to interval observer design for time-varying systems, Automatica50(10): 2677–2684.10.1016/j.automatica.2014.08.035]Search in Google Scholar
[Tornambè, A. (1992). High-gain observers for non-linear systems, International Journal of Systems Science23(9): 1475–1489.10.1080/00207729208949400]Search in Google Scholar
[Tyukina, I., Steurb, E., Nijmeijerc, H. and van Leeuwenb, C. (2013). Adaptive observers and parameter estimation for a class of systems nonlinear in the parameters, Automatica49(8): 24092423.10.1016/j.automatica.2013.05.008]Search in Google Scholar
[Veluvolu, K., Soh, Y. and Cao, W. (2007). Robust observer with sliding mode estimation for nonlinear uncertain systems, IET Control Theory and Applications1(5): 15331540.10.1049/iet-cta:20060434]Search in Google Scholar
[Zeitz, M. (1985). Canonical forms for nonlinear-systems, in B. Jakubczyk et al. (Eds.), Proceedings of the Conference on Geometric Theory of Nonlinear Control Systems, Wrocław Technical University Press, Wrocław, pp. 255–278.]Search in Google Scholar
[Zeitz, M. (1987). The extended Luenberger observer for nonlinear systems, Systems and Control Letters Archive9(2): 149–156.10.1016/0167-6911(87)90021-1]Search in Google Scholar
[Zheng, G., Boutat, D. and Barbot, J. (2009). Multi-output dependent observability normal form, Nonlinear Analysis: Theory, Methods and Applications70(1): 404–418.10.1016/j.na.2007.12.012]Search in Google Scholar