论文信息 - Discretization of a non-linear, exponentially stabilizing control law using an L/sub p/-gain approach

Discretization of a non-linear, exponentially stabilizing control law using an L/sub p/-gain approach

Considers the input-output stability of exponentially stable, non-linear systems with sampled-data output. Results for linear systems are generalized showing that the L/sub p/-gain with respect to the sampled-data output exists and converges to the L/sub p/-gain associated with the continuous-time output when the sampling period approaches +0. The results are applied to a non-linear control configuration and compared to a Lyapunov function analysis based approach previously developed for a non-linear sliding-mode like control. In contrast to the Lyapunov function technique, the sampling-time constraint vanishes for a stable plant if no control is used.

Sarah K. Spurgeon | Guido Herrmann | Christopher Edwards

[1] M. Corless,et al. Ultimate Boundedness and Asymptotic Stability of a Class of Uncertain Dynamical Systems via Continuous and Discontinuous Feedback Control , 1984 .

[2] Guido Herrmann,et al. A new approach to discretization applied to a continuous, nonlinear, sliding-mode-like control using nonsmooth analysis , 2001 .

[3] Sarah K. Spurgeon,et al. A new non-linear, continuous-time control law using sliding-mode control approaches , 1998 .

[4] Bruce A. Francis,et al. Optimal Sampled-Data Control Systems , 1996, Communications and Control Engineering Series.

[5] Pablo A. Iglesias. Input-output stability of sampled-data linear time-varying systems , 1995 .

[6] Saïd Djennoune,et al. Stabilization and regulation of a class of nonlinear singularly perturbed systems with discretized composite feedback , 1998, Int. J. Syst. Sci..

[7] Guido Herrmann,et al. Discretization of sliding mode based control schemes , 1999, Proceedings of the 38th IEEE Conference on Decision and Control (Cat. No.99CH36304).