https://orcid.org/0000-0001-5747-060X
References
- Alaviani, S. S. (2009). Delay dependent stabilization of linear time-varying system with time delay. Asian Journal of Control, 11(5), 557–563. doi: 10.1002/asjc.136
- Anderson, B. (1971). Stability properties of Kalman–Bucy filters. Journal of the Franklin Institute, 291(2), 137–144. doi: 10.1016/0016-0032(71)90016-0
- Anderson, B. (1977, February). Exponential stability of linear equations arising in adaptive identification. IEEE Transactions on Automatic Control, 22(1), 83–88. doi: 10.1109/TAC.1977.1101406
- Andrieu, V., Praly, L., & Astolfi, A. (2008). Homogeneous approximation, recursive observer design, and output feedback. SIAM Journal on Control and Optimization, 47(4), 1814–1850. doi: 10.1137/060675861
- Anguelova, M., & Wennberg, B. (2008). State elimination and identifiability of the delay parameter for nonlinear time-delay systems. Automatica, 44(5), 1373–1378. doi: 10.1016/j.automatica.2007.10.013
- Assche, V. V., Ahmed-Ali, T., Hann, C., & Lamnabhi-Lagarrigue, F. (2011). High gain observer design for nonlinear systems with time varying delayed measurements. IFAC Proceedings Volumes, 44(1), 692–696. doi: 10.3182/20110828-6-IT-1002.02421
- Astolfi, A., & Marconi, L. (Eds.). (2008). Analysis and design of nonlinear control systems. Berlin: Springer-Verlag.
- Besançon, G. (Ed.). (2007). Nonlinear observers and applications (Vol. 363). Berlin: Springer-Verlag.
- Besançon, G., Georges, D., & Benayache, Z. (2007, July). Asymptotic state prediction for continuous-time systems with delayed input and application to control. 2007 European control conference (ECC) (pp. 1786–1791).
- Bucy, R. S. (1972). The Riccati equation and its bounds. Journal of Computer and System Sciences, 6(4), 343–353. doi: 10.1016/S0022-0000(72)80026-6
- Cacace, F., Conte, F., Germani, A., & Palombo, G. (2017, September). Joint state estimation and delay identification for nonlinear systems with delayed measurements. IEEE Transactions on Automatic Control, 62(9), 4848–4854. doi: 10.1109/TAC.2017.2689503
- Cacace, F., Germani, A., & Manes, C. (2010). An observer for a class of nonlinear systems with time varying observation delay. Systems & Control Letters, 59(5), 305–312. doi: 10.1016/j.sysconle.2010.03.005
- Casti, J. L. (1987). Chapter 4: Observability/constructibility. In J. L. Casti (Ed.), Linear dynamical systems. Mathematics in Science and Engineering (Vol. 135, pp. 72–87). Orlando, FL: Academic Press.
- Crassidis, J. L., & Junkins, J. L. (2012). Optimal estimation of dynamic systems (2nd ed.). Boca Raton, FL: CRC Press.
- Cruz-Zavala, E., & Moreno, J. A. (2016). Lyapunov functions for continuous and discontinuous differentiators. IFAC-PapersOnLine, 49(18), 660–665. doi: 10.1016/j.ifacol.2016.10.241
- Cruz-Zavala, E., Moreno, J. A., & Fridman, L. (2012, December). Asymptotic stabilization in fixed time via sliding mode control. 2012 IEEE 51st annual conference on decision and control (CDC) (pp. 6460–6465).
- Cruz-Zavala, E., Moreno, J. A., & Fridman, L. M. (2011, November). Uniform robust exact differentiator. IEEE Transactions on Automatic Control, 56(11), 2727–2733. doi: 10.1109/TAC.2011.2160030
- Fridman, E. (2014a). Introduction to time-delay systems. Basel: Birkhäuser.
- Fridman, E. (2014b). Tutorial on Lyapunov-based methods for time-delay systems. European Journal of Control, 20(6), 271–283. doi: 10.1016/j.ejcon.2014.10.001
- Ghanes, M., Leon, J. D., & Barbot, J. (2013, June). Observer design for nonlinear systems under unknown time-varying delays. IEEE Transactions on Automatic Control, 58(6), 1529–1534. doi: 10.1109/TAC.2012.2225554
- Ibrir, S. (2009). Adaptive observers for time-delay nonlinear systems in triangular form. Automatica, 45(10), 2392–2399. doi: 10.1016/j.automatica.2009.06.027
- Kalman, R. (1960). Contributions to the theory of optimal control. Boletín de la Sociedad Matemática Mexicana, 5(2), 102–119.
- Khalil, H. K. (2002). Nonlinear systems (3rd ed.). Upper Saddle River, NJ: Prentice Hall.
- Khosravian, A., Trumpf, J., Mahony, R., & Hamel, T. (2016). State estimation for invariant systems on lie groups with delayed output measurements. Automatica, 68, 254–265. doi: 10.1016/j.automatica.2016.01.024
- Kruszewski, A., Jiang, W. -J., Fridman, E., Richard, J. P., & Toguyeni, A. (2012, July). A switched system approach to exponential stabilization through communication network. IEEE Transactions on Control Systems Technology, 20(4), 887–900. doi: 10.1109/TCST.2011.2159793
- Léchappé, V., Moulay, E., & Plestan, F. (2016, December). Dynamic observation-prediction for LTI systems with a time-varying delay in the input. 2016 IEEE 55th conference on decision and control (CDC) (pp. 2302–2307).
- Lopez-Ramirez, F., Efimov, D., Polyakov, A., & Perruquetti, W. (2016). Fixed-time output stabilization of a chain of integrators. Proceedings of 55th IEEE conference on decision and control (CDC), Las Vegas.
- Mazenc, F., & Malisoff, M. (2016, March). Stability analysis for time-varying systems with delay using linear Lyapunov functionals and a positive systems approach. IEEE Transactions on Automatic Control, 61(3), 771–776. doi: 10.1109/TAC.2015.2446111
- Meurer, T., Graichen, K., & Gilles, E. D. (Eds.). (2005). Control and observer design for nonlinear finite and infinite dimensional systems (Vol. 322). Berlin: Springer-Verlag.
- Moreno, J. A. (2012). Lyapunov approach for analysis and design of second order sliding mode algorithms. In L. Fridman, J. A. Moreno, & R. Iriarte (Eds.), Sliding modes after the first decade of the 21st century: State of the art (1st ed.). Berlin, Heidelberg: Springer-Verlag.
- Polyakov, A. (2012, January). Fixed-time stabilization of linear systems via sliding mode control. 2012 12th International workshop on variable structure systems (VSS) (pp. 1–6).
- Ríos, H., & Teel, A. (2016). A hybrid observer for uniform finite-time state estimation of linear systems. Proceedings of 55th IEEE conference on decision and control (CDC), Las Vegas.
- Rueda-Escobedo, J. G., Ushirobira, R., Efimov, D., & Moreno, J. A. (2018, June). A Gramian-based observer with uniform convergence rate for delayed measurements. 2018 European control conference (pp. 1572–1577).
- Sun, J., & Chen, J. (2017). A survey on Lyapunov-based methods for stability of linear time-delay systems. Frontiers of Computer Science, 11(4), 555–567. doi: 10.1007/s11704-016-6120-3
- Vafaei, A., & Yazdanpanah, M. J. (2016). A chain observer for nonlinear long constant delay systems: A matrix inequality approach. Automatica, 65, 164–169. doi: 10.1016/j.automatica.2015.11.012
- Zhou, B., & Egorov, A. V. (2016). Razumikhin and Krasovskii stability theorems for time-varying time-delay systems. Automatica, 71, 281–291. doi: 10.1016/j.automatica.2016.04.048