Uniform asymptotic stability of hybrid dynamical systems with delay

We formulate a model for hybrid dynamical systems with delay, which covers a large class of delay systems. Under several mild assumptions, we establish sufficient conditions for uniform asymptotic stability of hybrid dynamical systems with delay via a Lyapunov-Razumikhin technique. To demonstrate the developed theory, we conduct stability analyses for delay sampled-data feedback control systems including a nonlinear continuous-time plant and a linear discrete-time controller.

[1]  Cheong Boon Soh,et al.  Lyapunov stability of a class of hybrid dynamic systems , 2000, Autom..

[2]  A. Michel,et al.  Lyapunov Stability of a Class of Discrete Event Systems , 1991, 1991 American Control Conference.

[3]  J. Hale Theory of Functional Differential Equations , 1977 .

[4]  Changyun Wen,et al.  A unified approach for stability analysis of impulsive hybrid systems , 1999, Proceedings of the 38th IEEE Conference on Decision and Control (Cat. No.99CH36304).

[5]  John Guckenheimer,et al.  A Dynamical Simulation Facility for Hybrid Systems , 1993, Hybrid Systems.

[6]  Bo Hu,et al.  Robustness analysis of digital feedback control systems with time-varying sampling periods , 2000, J. Frankl. Inst..

[7]  Anthony N. Michel,et al.  Stability analysis of a class of nonlinear multirate digital control systems , 1998 .

[8]  K. Aihara,et al.  Stability of genetic regulatory networks with time delay , 2002 .

[9]  Dingjun Luo,et al.  Qualitative Theory of Dynamical Systems , 1993 .

[10]  Zhengguo Li,et al.  Robust stability of a class of hybrid nonlinear systems , 2001, IEEE Trans. Autom. Control..

[11]  Robert L. Grossman,et al.  Timed Automata , 1999, CAV.

[12]  K. Aihara,et al.  A model of periodic oscillation for genetic regulatory systems , 2002 .

[13]  Pablo A. Iglesias,et al.  On the stability of sampled-data linear time-varying feedback systems , 1994, Proceedings of 1994 33rd IEEE Conference on Decision and Control.

[14]  A. Michel,et al.  Stability theory for hybrid dynamical systems , 1998, IEEE Trans. Autom. Control..

[15]  K. Aihara,et al.  Stability and bifurcation analysis of differential-difference-algebraic equations , 2001 .