A time delay control for a nonlinear dynamic beam under moving load

The bifurcation resulted from moving force may lead to instability for the system. Based on time delay feedback controller, a nonlinear beam under moving load is discussed in the case of the primary resonance and the 1/3 subharmonic resonance. The bifurcation may be eliminated or the bifurcation point's position may be changed. The perturbation method is used to obtain the bifurcation equation of the nonlinear dynamic system. The result indicates time delay feedback controller may work well on this system, but the selection of a proper time delay and its coefficient may depend on the engineering condition. This paper presents some theoretical results.

[1]  J. A. Gbadeyan,et al.  Dynamic behaviour of beams and rectangular plates under moving loads , 1995 .

[2]  M. Yener,et al.  Vehicle-structure interactions in bridge dynamics , 1983 .

[3]  S. S. Law,et al.  DYNAMIC LOAD ON CONTINUOUS MULTI-LANE BRIDGE DECK FROM MOVING VEHICLES , 2002 .

[4]  Massood Mofid,et al.  Closure of "Numerical Solution for Response of Beams With Moving Mass" , 1991 .

[5]  G. Visweswara Rao,et al.  Linear Dynamics of an Elastic Beam Under Moving Loads , 2000 .

[6]  Mohamed Abdel-Rohman,et al.  TIME-DELAY EFFECTS ON ACTIVELY DAMPED STRUCTURES , 1987 .

[7]  José Rodellar,et al.  Modal Predictive Control of Structures. II: Implementation , 1994 .

[8]  Andrew Y. T. Leung,et al.  Resonances of a Non-Linear s.d.o.f. System with Two Time-Delays in Linear Feedback Control , 2002 .

[9]  Bor-Sen Chen,et al.  Dynamical Feedback Compensator for Uncertain Time-Delay Systems Containing Saturating Actuator , 1989 .

[10]  An-Pei Wang,et al.  A ROBUST CONTROL OF A DYNAMIC BEAM STRUCTURE WITH TIME DELAY EFFECT , 2002 .

[11]  Dean G. Duffy,et al.  The Response of an Infinite Railroad Track to a Moving, Vibrating Mass , 1990 .

[12]  J. T. P. Yao,et al.  Reliability aspects of structural control , 1982 .

[13]  Bor-Sen Chen,et al.  Memoryless stabilization of uncertain dynamic delay systems: Riccati equation approach , 1991 .

[14]  Te-Jen Su,et al.  Robust stability for linear time-delay systems with linear parameter perturbations , 1988 .

[15]  A. Nayfeh Introduction To Perturbation Techniques , 1981 .

[16]  Moshe Eisenberger,et al.  Vibrations of non-uniform continuous beams under moving loads , 2002 .