An extended nonlinear state predictor for a class of nonlinear time delay systems

Abstract An extended nonlinear state predictor (ENSP) for a classof nonlinear systems with input time delay is proposed. Based on the extended Kalman filter (EKF), the ENSP first estimates the current states according to the previous estimations and estimation errors, next calculates the future state values via the system model, and then adjusts the values based on the current errors. After a state predictive algorithm for a class of linear systems is presented, it is extended to a class of nonlinear time delay systems and the detailed ENSP algorithm is further proposed. Finally, computer simulations with the nonlinear example are presented, which demonstrates that the proposed ENSP can effectively and accurately predict the future states for a class of nonlinear time-delay systems no matter whether the state variables change quickly or slowly.

[1]  R. De Keyser,et al.  Adaptive PID control with neural network based predictor , 1994 .

[2]  A. Neubauer Genetic algorithms for adaptive nonlinear predictors , 1998, 1998 IEEE International Conference on Electronics, Circuits and Systems. Surfing the Waves of Science and Technology (Cat. No.98EX196).

[3]  Youxian Sun,et al.  Two Degree-of-Freedom Smith Predictor for Processes with Time Delay , 1998, Autom..

[4]  H. Kurz,et al.  Digital parameter-adaptive control of processes with unknown dead time , 1981, Autom..

[5]  D Vrecko,et al.  A new modified Smith predictor: the concept, design and tuning. , 2001, ISA transactions.

[6]  Don H. Johnson,et al.  Nonparametric prediction of non-Gaussian time series , 1993, 1993 IEEE International Conference on Acoustics, Speech, and Signal Processing.

[7]  Sanjeev R. Kulkarni,et al.  Universal prediction of nonlinear systems , 1995, Proceedings of 1995 34th IEEE Conference on Decision and Control.

[8]  Donghua Zhou,et al.  Strong tracking filter based adaptive generic model control , 1999 .

[9]  O Smith,et al.  CLOSER CONTROL OF LOOPS WITH DEAD TIME , 1957 .

[10]  Y. F. Miao,et al.  Adaptive prediction using neural networks , 1992, [Proceedings] 1992 IEEE International Symposium on Circuits and Systems.

[11]  Chang C. Hang,et al.  A Performance Study of Control Systems with Dead Time , 1980, IEEE Transactions on Industrial Electronics and Control Instrumentation.

[12]  Ahmad B. Rad,et al.  Adaptive delay compensated PID controller by phase margin design , 1998 .