A moving horizon approach to networked control system design GC Goodwin, H Haimovich, DE Quevedo, JS Welsh IEEE Transactions on Automatic Control 49 (9), 1427-1445, 2004 | 351 | 2004 |
A systematic method to obtain ultimate bounds for perturbed systems E Kofman, H Haimovich, MM Seron International Journal of Control 80 (2), 167-178, 2007 | 193 | 2007 |
Uniform stability of nonlinear time-varying impulsive systems with eventually uniformly bounded impulse frequency JL Mancilla-Aguilar, H Haimovich, P Feketa Nonlinear Analysis: Hybrid Systems 38, 100933, 2020 | 54 | 2020 |
Robust exact differentiators with predefined convergence time R Seeber, H Haimovich, M Horn, LM Fridman, H De Battista Automatica 134, 109858, 2021 | 51 | 2021 |
Componentwise ultimate bound and invariant set computation for switched linear systems H Haimovich, MM Seron Automatica 46 (11), 1897-1901, 2010 | 51 | 2010 |
Control design with guaranteed ultimate bound for perturbed systems E Kofman, MM Seron, H Haimovich Automatica 44 (7), 1815-1821, 2008 | 47 | 2008 |
Bounds and invariant sets for a class of switching systems with delayed-state-dependent perturbations H Haimovich, MM Seron Automatica 49 (3), 748-754, 2013 | 41 | 2013 |
Uniform input-to-state stability for switched and time-varying impulsive systems JL Mancilla-Aguilar, H Haimovich IEEE Transactions on Automatic Control 65 (12), 5028-5042, 2020 | 34 | 2020 |
Systematic ultimate bound computation for sampled-data systems with quantization H Haimovich, E Kofman, MM Seron Automatica 43 (6), 1117-1123, 2007 | 30 | 2007 |
Quantisation issues in feedback control H Haimovich University of Newcastle, 2006 | 28 | 2006 |
Bounds and invariant sets for a class of discrete-time switching systems with perturbations H Haimovich, MM Seron International Journal of Control 87 (2), 371-383, 2014 | 27 | 2014 |
Feedback stabilization of switching discrete-time systems via Lie-algebraic techniques H Haimovich, JH Braslavsky, FE Felicioni IEEE transactions on automatic control 56 (5), 1129-1135, 2011 | 25 | 2011 |
Global stability results for switched systems based on weak Lyapunov functions JL Mancilla-Aguilar, H Haimovich, RA Garcia IEEE Transactions on Automatic Control 62 (6), 2764-2777, 2016 | 23 | 2016 |
ISS implies iISS even for switched and time-varying systems (if you are careful enough) H Haimovich, JL Mancilla-Aguilar Automatica 104, 154-164, 2019 | 22 | 2019 |
Large-signal stability conditions for semi-quasi-Z-source inverters: Switched and averaged models H Haimovich, RH Middleton, L De Nicoló 52nd IEEE Conference on Decision and Control, 5999-6004, 2013 | 22 | 2013 |
Strong ISS implies strong iISS for time-varying impulsive systems H Haimovich, JL Mancilla-Aguilar Automatica 122, 109224, 2020 | 21 | 2020 |
Sufficient conditions for generic feedback stabilizability of switching systems via Lie-algebraic solvability H Haimovich, JH Braslavsky IEEE Transactions on Automatic Control 58 (3), 814-820, 2012 | 19 | 2012 |
Feedback stabilisation of switched systems via iterative approximate eigenvector assignment H Haimovich, JH Braslavsky 49th IEEE Conference on Decision and Control (CDC), 1269-1274, 2010 | 18 | 2010 |
Control design with guaranteed ultimate bound for feedback linearizable systems E Kofman, F Fontenla, H Haimovich, MM Seron IFAC Proceedings Volumes 41 (2), 242-247, 2008 | 18 | 2008 |
Analysis and improvements of a systematic componentwise ultimate-bound computation method H Haimovich, E Kofman, MM Seron IFAC Proceedings Volumes 41 (2), 1319-1324, 2008 | 17 | 2008 |