| 1 |
Single-step full-state feedback control design for nonlinear hyperbolic PDEs
Xu QQ, Aksikas I, Dubljevic S
International Journal of Control, 92(11), 2484, 2019 |
| 2 |
Energy Decay Rate of the Wave Equations on Riemannian Manifolds with Critical Potential
Liu YX, Yao PF
Applied Mathematics and Optimization, 78(1), 61, 2018 |
| 3 |
BEST EXPONENTIAL DECAY RATE OF ENERGY FOR THE VECTORIAL DAMPED WAVE EQUATION
Klein G
SIAM Journal on Control and Optimization, 56(5), 3432, 2018 |
| 4 |
Modeling of in-cylinder pressure oscillations under knocking conditions: A general approach based on the damped wave equation
di Gaeta A, Giglio V, Police G, Rispoli N
Fuel, 104, 230, 2013 |
| 5 |
NULL CONTROLLABILITY OF THE STRUCTURALLY DAMPED WAVE EQUATION WITH MOVING CONTROL
Martin P, Rosier L, Rouchon P
SIAM Journal on Control and Optimization, 51(1), 660, 2013 |
| 6 |
Asymptotic stability for intermittently controlled second-order evolution equations
Haraux A, Martinez P, Vancostenoble J
SIAM Journal on Control and Optimization, 43(6), 2089, 2005 |
| 7 |
A spillover phenomenon in the optimal location of actuators
Hebrard P, Henrot A
SIAM Journal on Control and Optimization, 44(1), 349, 2005 |
| 8 |
Achieving arbitrarily large decay in the damped wave equation
Castro C, Cox SJ
SIAM Journal on Control and Optimization, 39(6), 1748, 2001 |
| 9 |
Optimality of energy estimates for the wave equation with nonlinear boundary velocity feedbacks
Vancostenoble J, Martinez P
SIAM Journal on Control and Optimization, 39(3), 776, 2000 |
