论文信息 - On stabilization of nonlinear systems with enlarged domain of attraction

On stabilization of nonlinear systems with enlarged domain of attraction

This paper presents a systematic procedure to design a control law that guarantees asymptotic stability of an equilibrium with an enlarged domain of attraction for a class of nonlinear systems. To this end, we use a natural extension of well-known linear time-invariant transformation methods to write the system in controller canonical form with a forcing term. The control law is implemented in two steps, first we calculate a nonlinear state feedback that cancels the nonlinear terms of the unforced system, so that for the resulting system a suitable Lyapunov function candidate is available. Then, we add a linear state feedback that stabilizes the equilibrium and maximizes its domain of attraction. Interestingly enough, the latter maximization problem reduces to a classical, linear time invariant H∞ minimization problem. An example is given to illustrate the procedure.

Romeo Ortega | K. Ichikawa | R. Ortega | K. Ichikawa

[1] Eduardo D. Sontag,et al. FEEDBACK STABILIZATION OF NONLINEAR SYSTEMS , 1990 .

[2] P. Khargonekar,et al. Robust stabilization of uncertain linear systems: quadratic stabilizability and H/sup infinity / control theory , 1990 .

[3] A. Schaft. On a state space approach to nonlinear H ∞ control , 1991 .

[4] K. Glover,et al. A state space approach to H ∞ optimal control , 1989 .

[5] P. Kokotovic,et al. On vanishing stability regions in nonlinear systems with high-gain feedback , 1986 .

[6] K. Glover. All optimal Hankel-norm approximations of linear multivariable systems and their L, ∞ -error bounds† , 1984 .

[7] David Q. Mayne,et al. Design of stabilizing control laws for smooth non-linear systems , 1991 .

[8] Te-son Kuo,et al. Trace bounds on the solution of the algebraic matrix Riccati and Lyapunov equation , 1986 .