Difference feedback can stabilize uncertain steady states

The paper is concerned with the stabilization of uncertain steady states by the state difference feedback. The feedback method has a peculiar feature that it uses only the difference between the present state x(t) and the past state x(t-T), considering exact information on the steady state is unavailable. Hitherto a condition is known under which such stabilization can not be realized. The article conversely shows that the state difference feedback can stabilize only if the exclusion condition is not true. Furthermore a dynamic output difference feedback is shown to be able to stabilize under quite a mild condition that the steady state is not associated with zero eigenvalues. The ability of the method is illustrated by using a cart-pendulum system which moves along a one dimensional varying slope.

[1]  Kestutis Pyragas,et al.  Stabilization of an unstable steady state in a Mackey-Glass system , 1995 .

[2]  H. Nakajima On analytical properties of delayed feedback control of chaos , 1997 .

[3]  Kestutis Pyragas,et al.  Experimental control of chaos by delayed self-controlling feedback , 1993 .

[4]  Wolfram Just,et al.  MECHANISM OF TIME-DELAYED FEEDBACK CONTROL , 1996, chao-dyn/9611012.

[5]  Tadahiro Hasegawa,et al.  Modeling of shape memory alloy actuator and tracking control system with the model , 2001, IEEE Trans. Control. Syst. Technol..

[6]  Keiji Konishi,et al.  Observer-based delayed-feedback control for discrete-time chaotic systems , 1998 .

[7]  E. R. Hunt,et al.  Derivative control of the steady state in Chua's circuit driven in the chaotic region , 1993 .

[8]  Jean-Michel Dion,et al.  Stability and robust stability of time-delay systems: A guided tour , 1998 .

[9]  T. Ushio Limitation of delayed feedback control in nonlinear discrete-time systems , 1996 .

[10]  Takashi Hikihara,et al.  An experimental study on stabilization of unstable periodic motion in magneto-elastic chaos , 1996 .

[11]  Kentaro Hirata,et al.  State difference feedback for stabilizing uncertain steady states of non-linear systems , 2001 .

[12]  W. Wonham On pole assignment in multi-input controllable linear systems , 1967 .

[13]  Glorieux,et al.  Controlling unstable periodic orbits by a delayed continuous feedback. , 1994, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[14]  Toshimitsu Ushio,et al.  A generalization of delayed feedback control in chaotic discrete-time systems , 1998, Proceedings of the 37th IEEE Conference on Decision and Control (Cat. No.98CH36171).

[15]  Toshimitsu Ushio,et al.  A dynamic delayed feedback controller for chaotic discrete-time systems , 2000, Proceedings of the 2000 American Control Conference. ACC (IEEE Cat. No.00CH36334).

[16]  Kestutis Pyragas Control of chaos via extended delay feedback , 1995 .

[17]  Glorieux,et al.  Stabilization and characterization of unstable steady states in a laser. , 1993, Physical review. A, Atomic, molecular, and optical physics.

[18]  Kestutis Pyragas Continuous control of chaos by self-controlling feedback , 1992 .