Time delayed control of structural systems

Time delays are ubiquitous in control systems. They usually enter because of the sensors and actuators used in them. Traditionally, time delays have been thought to have a deleterious effect on both the stability and the performance of controlled systems, and much research has been done in attempting to eliminate them, compensate for them, or nullify their presence. In this paper we take a different view. We investigate whether purposefully injected time delays can be used to improve both the system's stability and performance. Our analytical, numerical, and experimental investigation shows that this can indeed be done. Analytical results of the effects of time delays on collocated and non-collocated control of classically damped and non-classically damped systems are given. Experimental and numerical results confirm the theoretical expectations. Issues of system uncertainties and robustness of time delayed control are addressed. The results are of practical value in improving the performance and stability of controllers because these characteristics (performance and stability) improve dramatically with the intentional injection of small time delays in the control system. The introduction of such time delays constitutes a ‘minimal change’ to a controller already installed in a structural system for active control. Hence, from a practical standpoint, time delays can be implemented in a nearly costless and highly reliable manner to improve control performance and stability, an aspect that cannot be ignored when dealing with the economics and safety of large structural systems subjected to strong earthquake ground shaking. Copyright © 2003 John Wiley & Sons, Ltd.

[1]  Jann N. Yang,et al.  EFFECT OF TIME DELAY ON CONTROL OF SEISMIC-EXCITED BUILDINGS , 1990 .

[2]  Firdaus E. Udwadia,et al.  Can time delays be useful in the control of structural systems , 2000 .

[3]  Anil K. Agrawal,et al.  Compensation of time-delay for control of civil engineering structures , 2000 .

[4]  F. E. Udwadia,et al.  Time Delayed Control of Classically Damped Structures , 1996 .

[5]  Ye-Hwa Chen,et al.  Adaptive robust control of uncertain systems , 1990, 29th IEEE Conference on Decision and Control.

[6]  M. Corless,et al.  Continuous state feedback guaranteeing uniform ultimate boundedness for uncertain dynamic systems , 1981 .

[7]  George Leitmann,et al.  Stabilizing Control for Linear Systems with Bounded Parameter and Input Uncertainty , 1975, Optimization Techniques.

[8]  J. L. Fanson,et al.  Positive position feedback control for large space structures , 1987 .

[9]  M. Balas Direct Velocity Feedback Control of Large Space Structures , 1979 .

[10]  Firdaus E. Udwadia,et al.  Effect of time delay on the control of a torsional bar , 2001 .

[11]  Mohammad Hosseini,et al.  Robust Stabilization of Systems with Time Delays , 1996 .

[12]  J. N. Aubrun,et al.  Theory of the control of structures by low authority controllers , 1978 .

[13]  Y. Fujino,et al.  Instability due to time delay and its compensation in active control of structures , 1993 .

[14]  J. Aubrun Theory of the control of structures by low authority controllers , 1978 .

[15]  T. K. Caughey,et al.  On the stability problem caused by finite actuator dynamics in the collocated control of large space structures , 1985 .

[16]  R. H. Cannon,et al.  Experiments in control of flexible structures with noncolocated sensors and actuators , 1984 .

[17]  Anil K. Agrawal,et al.  Effect of fixed time delay on stability and performance of actively controlled civil engineering structures , 1997 .

[18]  Wook Hyun Kwon,et al.  Delayed State Feedback Controller for the Stabilization of Ordinary Systems , 1989, 1989 American Control Conference.

[19]  F. Udwadia,et al.  Time delayed control of classically damped structural systems , 1994 .

[20]  S. Lang Complex Analysis , 1977 .

[21]  Mohammad Hosseini,et al.  Robust control of uncertain systems with time varying delays in control input , 1997, Proceedings of the 1997 American Control Conference (Cat. No.97CH36041).