Title :
Nonlinear Stabilization of Shock-Like Unstable Equilibria in the Viscous Burgers PDE
Author :
Krstic, Miroslav ; Magnis, Lionel ; Vazquez, Rafael
Author_Institution :
Dept. of Mech. & Aerosp. Eng., California Univ., San Diego, CA
Abstract :
We stabilize the unstable ldquoshock-likerdquo equilibrium profiles of the viscous Burgers equation using control at the boundaries. These equilibria are not stabilizable (even locally) using the standard ldquoradiation feedback boundary conditions.rdquo Using a nonlinear spatially-scaled transformation (that employs three ingredients, of which one is the Hopf-Cole nonlinear integral transformation) and linear backstepping, we design an explicit nonlinear full-state control law that achieves exponential stability, with a region of attraction for which we give an estimate. The region of attraction is not the entire state space since the Burgers PDE is known not to be globally controllable.
Keywords :
asymptotic stability; feedback; nonlinear systems; partial differential equations; transforms; Hopf-Cole nonlinear integral transformation; exponential stability; linear backstepping; nonlinear full-state control law; nonlinear stabilization; radiation feedback boundary condition; shock-like equilibrium profile; shock-like unstable equilibria; viscous Burger partial differential equation; Backstepping; Boundary conditions; Control systems; Electric shock; Integral equations; Linear feedback control systems; Nonlinear control systems; Nonlinear equations; Stability; State-space methods; Burgers PDE;
Journal_Title :
Automatic Control, IEEE Transactions on
DOI :
10.1109/TAC.2008.928121
