Title :
Feedback control for quadratic nonlinear systems
Author :
Alvergue, Luis ; Gu, Guoxiang
Author_Institution :
Dept. of Electr. & Comput. Eng., Louisiana State Univ., Baton Rouge, LA, USA
Abstract :
We propose two state feedback control strategies based on quadratic stability for quadratic nonlinear systems, specifically reduced order fluid flow models. Stabilizing linear controllers are designed at each operating point, but unlike traditional linear designs, the nonlinear dynamics are taken into account during the design process by representing them as elements of a bounding set. By solving a set of linear matrix inequalities an estimate of the region of attraction at each operating point of the closed loop system is presented. The overall design consists of a sequence of linear controllers that regionally stabilize and enlarge the region of attraction of the desired operating points. Under the assumption that the system admits a centered-ε-cover, a switching strategy is proposed that achieves semiglobal stabilization of the nonlinear system.
Keywords :
Navier-Stokes equations; closed loop systems; control system synthesis; flow control; linear matrix inequalities; linear systems; nonlinear control systems; reduced order systems; stability; state feedback; centered-ε-cover; closed loop system; design process; linear controller stabilization; linear matrix inequalities; nonlinear dynamics; operating point; quadratic nonlinear system; quadratic stability; semiglobal stabilization; specifically reduced order fluid flow model; state feedback control strategies; switching strategy; Asymptotic stability; Design methodology; Equations; Mathematical model; Nonlinear systems; Stability analysis; State feedback; LMI; flow control; nonlinear systems; quadratic stability;
Conference_Titel :
Control and Decision Conference (CCDC), 2012 24th Chinese
Conference_Location :
Taiyuan
Print_ISBN :
978-1-4577-2073-4
DOI :
10.1109/CCDC.2012.6244408
