References
- Baños, A. , & Barreiro, A. (2009). Delay-independent stability of reset control systems. IEEE Transactions on Automatic Control , 54 , 341–346.
- Baños, A. , & Barreiro, A. (2012). Reset control systems , London: Springer.
- Baños, A. , Mulero, J. I. , Barreiro, A. , & Davó, M. A. (2016). An impulsive dynamical systems framework for reset control systems. International Journal of Control , 89 (10), 1985–2007.
- Barreiro, A. , & Baños, A. (2010). Delay-dependent stability of reset systems. Automatica , 46 , 216–221.
- Beker, O. , Hollot, C. , & Chait, Y. (2001). Plant with integrator: An example of reset control overcoming limitations of linear feedback. IEEE Transactions on Automatic Control , 46 (11), 1797–1799.
- Cánovas, C. D. ,, , Mulero, J. I. , & Baños, A. (2016). Well-posedness of reset control systems with input delay. In Proceedings of the 20th International Conference on System Theory, Control and Computing , (pp. 404–409), Sinaia: IEEE.
- Carrasco, J. , Baños, A. , & van der Schaft, A. (2010). A passivity-based approach to reset control systems stability. Systems & Control Letters , 59 (1), 18–24.
- Clegg, J. C. (1958). A nonlinear integrator for servomechanisms. Transactions of the American Institute of Electrical Engineers , 77 , 41–42.
- Davó, M. A. , & Baños, A. (2013). Delay-dependent stability of reset control systems with input/output delays. In Proceedings of the IEEE 52nd Annual Conference on Decision and Control (pp. 2018–2023), Florence: IEEE.
- Davó, M. A. , Gouaisbaut, F. , Baños, A. , Tarbouriech, S. , & Seuret, A. (2015). Stability of time-delay reset control systems with time-dependent resetting law. IFAC-PapersOnLine , 48 (27), 371–376.
- Fetzer, M. , & Scherer, C. W. (2016). A general integral quadratic constraints theorem with applications to a class of sampled-data systems. SIAM Journal on Control and Optimization , 54 (3), 1105–1125.
- Forni, F. , Nešić, D. , & Zaccarian, L. (2011). Reset passivation of nonlinear controllers via a suitable time-regular reset map. Automatica , 47 (9), 2099–2106.
- Grant, M. , & Boyd, S. (2015). CVX: Matlab software for disciplined convex programming, version 2.1 . Retrieved from http://cvxr.com/cvx.
- Horowitz, I. M. , & Rosenbaum, P. (1975). Non-linear design for cost of feedback reduction in systems with large parameter uncertainty. International Journal of Control , 21 (6), 977–1001.
- Kao, C.-Y. , & Rantzer, A. (2007). Stability analysis of systems with uncertain time-varying delays. Automatica , 43 (6), 959–970.
- Khalil, H. K. (2002). Nonlinear systems , Upper Saddle River, NJ: Prentice Hall.
- Krishman, K. R. , & Horowitz, I. M. (1974). Synthesis of a non-linear feedback system with significant plant-ignorance for prescribed system tolerances. International Journal of Control , 19 (4), 689–706.
- Megretski, A. , & Rantzer, A. (1997). System analysis via integral quadratic constraints. IEEE Transactions on Automatic Control , 42 (6), 819–830.
- Mercader, P. , Carrasco, J. , & Baños, A. (2013). IQC analysis for time-delay reset control systems with first order reset elements. In Proceedings of the IEEE 52nd Annual Conference on Decision and Control (pp. 2251–2256), Florence: IEEE.
- Mercader, P. , , Davó, M. A. , & Baños, A. (2013). H∞ / H2 analysis for time-delay reset control systems. In Proceedings of the 3rd International Conference on Systems and Control (pp. 518–523), Algiers: IEEE.
- Nešić, D. , Zaccarian, L. , & Teel, A. R. (2008). Stability properties of reset systems. Automatica , 44 (8), 2019–2026.
- Pfifer, H. , & Seiler, P. (2015). An overview of integral quadratic constraints for delayed nonlinear and parameter-varying systems. arXiv preprint arXiv:1504.02502 .
- Rantzer, A. (1996). On the Kalman–Yakubovich–Popov lemma. Systems & Control Letters , 28 (1), 7–10.
- Tugal, H. , Carrasco, J. , Falcon, P. , & Barreiro, A. (2016). Stability analysis of bilateral teleoperation with bounded and monotone environments via Zames-Falb multipliers. IEEE Transactions on Control Systems Technology , 25 (4), 1331–1344.
- van der Schaft, A . (2000). L2-gain and passivity techniques in nonlinear control . London: Springer.
- Veenman, J. , Scherer, C. W. , & Köroğlu, H. (2016). Robust stability and performance analysis based on integral quadratic constraints. European Journal of Control , 31 , 1–32.
- Zheng, Y. , Chait, Y. , Hollot, C. , Steinbuch, M. , & Norg, M. (2000). Experimental demonstration of reset control design. Control Engineering Practice , 8 (2), 113–120.