Stability Region Analysis Using Simulations and Sum-of-Squares Programming

Author

Topcu, Ufuk ; Packard, Andrew ; Seiler, Peter ; Wheeler, Timothy

Author_Institution

Dept. of Mech. Eng., Univ. of California, Berkeley, CA

fYear

2007

fDate

9-13 July 2007

Firstpage

6009

Lastpage

6014

Abstract

The problem of computing bounds on the region-of-attraction for systems with polynomial vector fields is considered. Invariant sets of the region-of-attraction are characterized as sublevel sets of Lyapunov functions. Finite dimensional polynomial parameterizations for the Lyapunov functions are used. A methodology utilizing information from simulations to generate Lyapunov function candidates satisfying necessary conditions for bilinear constraints is proposed. The suitability of the Lyapunov function candidates are assessed solving linear sum-of-squares optimization problems. Qualified candidates are used to compute provably invariant subsets of the region-of-attraction and to initialize various bilinear search strategies for further optimization. We illustrate the method on several small examples drawn from the literature.

Keywords

Lyapunov methods; linear programming; polynomials; search problems; stability; vectors; Lyapunov function candidates; ROA invariant subsets; bilinear constraints; bilinear search strategies; finite dimensional polynomial parameterizations; linear sum-of-squares optimization problems; polynomial vector fields; region-of-attraction; simulations; stability region analysis; sum-of-squares programming; Analytical models; Cities and towns; Computational modeling; Constraint optimization; Convergence; Linear matrix inequalities; Linear programming; Lyapunov method; Polynomials; Stability analysis;

fLanguage

English

Publisher

ieee

Conference_Titel

American Control Conference, 2007. ACC '07

Conference_Location

New York, NY

ISSN

0743-1619

Print_ISBN

1-4244-0988-8

Electronic_ISBN

0743-1619

Type

conf

DOI

10.1109/ACC.2007.4283013

Filename

4283013