Stabilization of a linear hyperbolic PDE with actuator and sensor dynamics
Journal article, Peer reviewed
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OriginalversjonAutomatica. 2018, 95 104-111. 10.1016/j.automatica.2018.05.019
We consider a scalar 1-D linear hyperbolic partial differential equation (PDE) for which infinite-dimensional backstepping controllers have previously been designed based on boundary actuation and sensing, and incorporate first order actuator and sensor dynamics into the design. Two observer designs are proposed, and combined with a state-feedback into output-feedback control laws which render the origin of the closed-loop system exponentially stable with arbitrary convergence rate. The theory is verified in simulations.