IEEE Transactions on Automatic Control, Vol.63, No.10, 3551-3557, 2018
Delay-Robust Control Design for Two Heterodirectional Linear Coupled Hyperbolic PDEs
We detail in this paper the importance of a change of strategy for the delay robust control of systems composed of two linear first-order hyperbolic equations. One must go back to the classical tradeoff between convergence rate and delay robustness. More precisely, we prove that, for systems with strong reflections, canceling the reflection at the actuated boundary will yield zero delay robustness. Indeed, for such systems, using a backstepping controller, the corresponding target system should preserve a small amount of this reflection to ensure robustness to a small delay in the loop. This implies, in some cases, giving up finite time convergence.
Keywords:Backstepping;delay robustness;hyperbolic partial differential equations (PDEs);stabilization