论文信息 - LMI‐based computation of optimal quadratic Lyapunov functions for odd polynomial systems

LMI‐based computation of optimal quadratic Lyapunov functions for odd polynomial systems

The problem of estimating the domain of attraction (DA) of equilibria is considered for odd polynomial systems. Specifically, the computation of the optimal quadratic Lyapunov function (OQLF), i.e. the quadratic Lyapunov function (QLF) which maximizes the volume of the largest estimate of the DA (LEDA), is addressed. In order to tackle this double non‐convex optimization problem, a relaxation approach based on homogeneous polynomial forms is proposed. The first contribution of the paper shows that a lower bound of the LEDA for a fixed QLF can be obtained via linear matrix inequalities (LMIs) based procedures. Also, condition for checking tightness of the lower bound are provided. The second contribution is a strategy for selecting a good starting point for the OQLF search, which is based on the volume maximization of the region where the time derivative of the QLFs is negative and is given in terms of LMIs. Several application examples are presented to illustrate the numerical behaviour of the proposed approach. Copyright © 2005 John Wiley & Sons, Ltd.

A. Garulli | A. Vicino | A. Tesi | G. Chesi

[1] Davison,et al. A computational method for determining quadratic Lyapunov Functions for nonlinear systems , 1970 .

[2] E. Davison,et al. A computational method for determining quadratic lyapunov functions for non-linear systems , 1971 .

[3] R. Brockett. Lie Algebras and Lie Groups in Control Theory , 1973 .

[4] A. Michel,et al. Stability analysis of complex dynamical systems: Some computational methods , 1981, 1981 20th IEEE Conference on Decision and Control including the Symposium on Adaptive Processes.

[5] N. Bose. Applied multidimensional systems theory , 1982 .

[6] R. K. Miller,et al. Stability analysis of complex dynamical systems , 1982 .

[7] A. Vicino,et al. On the estimation of asymptotic stability regions: State of the art and new proposals , 1985 .

[8] Stephen P. Boyd,et al. Linear Matrix Inequalities in Systems and Control Theory , 1994 .

[9] Graziano Chesi,et al. Optimal ellipsoidal stability domain estimates for odd polynomial systems , 1997, Proceedings of the 36th IEEE Conference on Decision and Control.

[10] P. Parrilo. Structured semidefinite programs and semialgebraic geometry methods in robustness and optimization , 2000 .

[11] Graziano Chesi,et al. Solving quadratic distance problems: an LMI-based approach , 2003, IEEE Trans. Autom. Control..