| 1 |
Uniform Input-To-State Stability for Switched and Time-Varying Impulsive Systems
Mancilla-Aguilar JL, Haimovich H
IEEE Transactions on Automatic Control, 65(12), 5028, 2020 |
| 2 |
Disturbance-tailored super-twisting algorithms: Properties and design framework
Haimovich H, De Battista H
Automatica, 101, 318, 2019 |
| 3 |
ISS implies iISS even for switched and time-varying systems (if you are careful enough)
Haimovich H, Mancilla-Aguilar JL
Automatica, 104, 154, 2019 |
| 4 |
State Measurement Error-to-State Stability Results Based on Approximate Discrete-Time Models
Vallarella AJ, Haimovich H
IEEE Transactions on Automatic Control, 64(8), 3308, 2019 |
| 5 |
A Characterization of Integral ISS for Switched and Time-Varying Systems
Haimovich H, Mancilla-Aguilar JL
IEEE Transactions on Automatic Control, 63(2), 578, 2018 |
| 6 |
Global Stability Results for Switched Systems Based on Weak Lyapunov Functions
Mancilla-Aguilar JL, Haimovich H, Garcia RA
IEEE Transactions on Automatic Control, 62(6), 2764, 2017 |
| 7 |
Ideal switched-model dynamic stability conditions for semi-quasi-Z-source inverters
De Nicolo L, Haimovich H, Middleton RH
Automatica, 63, 47, 2016 |
| 8 |
Characterization of Controllability Based on Continuity of Closed-Loop Eigenvectors: Application to Controller-Driven Sampling Stabilization
Haimovich H, Osella EN
IEEE Transactions on Automatic Control, 61(1), 276, 2016 |
| 9 |
Bounds and invariant sets for a class of discrete-time switching systems with perturbations
Haimovich H, Seron MM
International Journal of Control, 87(2), 371, 2014 |
| 10 |
Bounds and invariant sets for a class of switching systems with delayed-state-dependent perturbations
Haimovich H, Seron MM
Automatica, 49(3), 748, 2013 |
