Nonlinear stabilization of a viscous Hamilton-Jacobi PDE

Author

Bekiaris-Liberis, Nikolaos ; Bayen, Alexandre M.

Author_Institution

Depts. of Electr. Eng. & Comput. Sci. & Civil & Environ. Eng., Univ. of California Berkeley, Berkeley, CA, USA

fYear

2014

fDate

15-17 Dec. 2014

Firstpage

2858

Lastpage

2863

Abstract

We consider the boundary stabilization problem for the non-uniform equilibrium profiles of a viscous Hamilton-Jacobi (HJ) Partial Differential Equation (PDE) with parabolic concave Hamiltonian. We design a nonlinear full-state feedback control law, assuming Neumann actuation, which achieves an arbitrary rate of convergence to the equilibrium. Our design is based on a feedback linearizing transformation which is locally invertible. We prove local exponential stability of the closed-loop system in the H¹ norm, by constructing a Lyapunov functional, and provide an estimate of the region of attraction.

Keywords

Lyapunov methods; asymptotic stability; closed loop systems; control system synthesis; convergence; linearisation techniques; nonlinear control systems; partial differential equations; state feedback; Lyapunov functional; Neumann actuation; arbitrary convergence rate; attraction region estimation; boundary stabilization problem; closed-loop system; feedback linearizing transformation; local exponential stability; nonlinear full-state feedback control law design; nonlinear stabilization; nonuniform equilibrium profiles; viscous Hamilton-Jacobi PDE; viscous Hamilton-Jacobi partial differential equation; Backstepping; Closed loop systems; Eigenvalues and eigenfunctions; Equations; Jacobian matrices; Stability;

fLanguage

English

Publisher

ieee

Conference_Titel

Decision and Control (CDC), 2014 IEEE 53rd Annual Conference on

Conference_Location

Los Angeles, CA

Print_ISBN

978-1-4799-7746-8

Type

conf

DOI

10.1109/CDC.2014.7039828

Filename

7039828