Dual Lyapunov stability analysis in behavioral approach

Author

Kojima, Chiaki

Author_Institution

Dept. of Inf. Phys. & Comput., Univ. of Tokyo, Tokyo, Japan

fYear

2008

fDate

9-11 Dec. 2008

Firstpage

5152

Lastpage

5157

Abstract

This paper considers a Lyapunov stability analysis for continuous-time systems described by high order difference-algebraic equation from the viewpoint of the semidefinite programming (SDP) duality. In the behavioral system theory, a Lyapunov function is described by a quadratic differential form (QDF) and equivalently characterized by a two-variable polynomial matrix. We first develop the SDP duality to the non-negativity and positivity of two-variable polynomial matrices. Using the duality, we derive an alternative stability condition in terms of the two-variable polynomial matrix equation and QDFs as a main result.

Keywords

Lyapunov methods; asymptotic stability; continuous time systems; differential algebraic equations; duality (mathematics); optimisation; polynomial matrices; behavioral system theory; continuous-time system; dual Lyapunov stability analysis; high order difference-algebraic equation; quadratic differential form; semidefinite programming duality; two-variable polynomial matrix; Control systems; Difference equations; Differential algebraic equations; Kernel; Linear matrix inequalities; Lyapunov method; Polynomials; Stability analysis; Sufficient conditions; Uncertainty;

fLanguage

English

Publisher

ieee

Conference_Titel

Decision and Control, 2008. CDC 2008. 47th IEEE Conference on

Conference_Location

Cancun

ISSN

0191-2216

Print_ISBN

978-1-4244-3123-6

Electronic_ISBN

0191-2216

Type

conf

DOI

10.1109/CDC.2008.4739451

Filename

4739451