| 1 |
Stability Analysis of Dissipative Systems Subject to Nonlinear Damping via Lyapunov Techniques
Marx S, Chitour Y, Prieur C
IEEE Transactions on Automatic Control, 65(5), 2139, 2020 |
| 2 |
Distributed stabilization of Korteweg-de Vries-Burgers equation in the presence of input delay
Kang W, Fridman E
Automatica, 100, 260, 2019 |
| 3 |
Two Approaches for the Stabilization of Nonlinear KdV Equation With Boundary Time-Delay Feedback
Baudouin L, Crepeau E, Valein J
IEEE Transactions on Automatic Control, 64(4), 1403, 2019 |
| 4 |
Boosting the decay of solutions of the linearised Korteweg-de Vries-Burgers equation to a predetermined rate from the boundary
Ozsari T, Arabaci E
International Journal of Control, 92(8), 1753, 2019 |
| 5 |
Electric-field-induced transition from SmA to ferroelectric SmC* in MC881, where antiferroelectric SmCA* but not SmC* emerges just below SmA
Yamada Y, Sano W, Fukuda A
Molecular Crystals and Liquid Crystals, 682(1), 1, 2019 |
| 6 |
PSEUDO-BACKSTEPPING AND ITS APPLICATION TO THE CONTROL OF KORTEWEG-DE VRIES EQUATION FROM THE RIGHT ENDPOINT ON A FINITE DOMAIN
Ozsari T, Batal A
SIAM Journal on Control and Optimization, 57(2), 1255, 2019 |
| 7 |
NULL CONTROLLABILITY OF A LINEARIZED KORTEWEG-DE VRIES EQUATION BY BACKSTEPPING APPROACH
Xiang S
SIAM Journal on Control and Optimization, 57(2), 1493, 2019 |
| 8 |
EXACT CONTROLLABILITY OF A LINEAR KORTEWEG-DE VRIES EQUATION BY THE FLATNESS APPROACH
Martin P, Rivas I, Rosier L, Rouchon P
SIAM Journal on Control and Optimization, 57(4), 2467, 2019 |
| 9 |
Output feedback stabilization of the Korteweg-de Vries equation
Marx S, Cerpa E
Automatica, 87, 210, 2018 |
| 10 |
A de Vries (SmC*) Phase in a Novel Series of Chiral Fluorinated Organosiloxane Liquid Crystals
Zoghaib WM, Carboni C, Kashoub FA, Al-Rushidi JS, Al-Jabri BY, Al-Alawi AS, Al-Mendhry HF
Molecular Crystals and Liquid Crystals, 666(1), 54, 2018 |
