Incorporating delayed and infrequent measurements in Extended Kalman Filter based nonlinear state estimation

Abstract This work deals with state estimation in the presence of delayed and infrequent measurements. While most measurements (referred to as secondary measurements) are available frequently and instantaneously, there might be a delay associated with acquiring other measurements (primary measurements) due to long analysis times involved. The primary measurements are usually sampled at irregular intervals and the exact delay is also unknown. The traditional fixed-lag smoothing algorithm, which has been applied for a variety of chemical processes systems, can be computationally inefficient for such situations and alternate methods to handle delays are necessary. In this paper, we analyze several existing methods to incorporate measurement delays and reinterpret their results under a common unified framework (for Extended Kalman Filter). Extensions to handle time-varying and uncertain delays, as well as out of sequence measurement arrival are also presented. Simulation studies on a linear distillation column and a nonlinear polymerization reactor are used to compare the performance of these methods based on RMSE values and computation times. A large scale nonlinear reactive distillation column example is also used to illustrate the practicality of the suggested method.

[1]  Michael J. Kurtz,et al.  On-line state and parameter estimation of EPDM polymerization reactors using a hierarchical extended Kalman filter , 2004 .

[2]  Rudolph van der Merwe,et al.  Sigma-point kalman filters for probabilistic inference in dynamic state-space models , 2004 .

[3]  Harold L. Alexander,et al.  State estimation for distributed systems with sensing delay , 1991, Defense, Security, and Sensing.

[4]  Astrom Computer Controlled Systems , 1990 .

[5]  Masoud Soroush,et al.  Multirate nonlinear state estimation with application to a polymerization reactor , 1999 .

[6]  Jay H. Lee,et al.  Two‐step procedure for data‐based modeling for inferential control applications , 2000 .

[7]  B. Anderson,et al.  Optimal Filtering , 1979, IEEE Transactions on Systems, Man, and Cybernetics.

[8]  S.J. Julier,et al.  Fusion of time delayed measurements with uncertain time delays , 2005, Proceedings of the 2005, American Control Conference, 2005..

[9]  Moshood J. Olanrewaju,et al.  Development and application of linear process model in estimation and control of reactive distillation , 2005, Comput. Chem. Eng..

[10]  R. K. Mutha and,et al.  A New Multirate-Measurement-Based Estimator: Emulsion Copolymerization Batch Reactor Case Study , 1997 .

[11]  David Q. Mayne,et al.  Constrained state estimation for nonlinear discrete-time systems: stability and moving horizon approximations , 2003, IEEE Trans. Autom. Control..

[12]  Jay H. Lee,et al.  A moving horizon‐based approach for least‐squares estimation , 1996 .

[13]  R. Gudi,et al.  Multirate state and parameter estimation in an antibiotic fermentation with delayed measurements , 1994, Biotechnology and bioengineering.

[14]  Raghunathan Rengaswamy,et al.  Recursive estimation in constrained nonlinear dynamical systems , 2005 .

[15]  J. Mendel,et al.  Computational requirements for a discrete Kalman filter , 1971 .

[16]  William R. Cluett,et al.  On‐line nonlinear model‐based estimation and control of a polymer reactor , 1997 .

[17]  B. Bequette,et al.  Product property and production rate control of styrene polymerization , 2002 .

[18]  Yunmin Zhu,et al.  Optimal update with out-of-sequence measurements , 2005, IEEE Transactions on Signal Processing.

[19]  Arthur Gelb,et al.  Applied Optimal Estimation , 1974 .

[20]  Muhammad A. Al-Arfaj,et al.  Comparison of Alternative Control Structures for an Ideal Two-Product Reactive Distillation Column , 2000 .

[21]  Sirish L. Shah,et al.  Adaptive multirate state and parameter estimation strategies with application to a bioreactor , 1995 .

[22]  Dimitris K. Tasoulis,et al.  Simulation and Analysis of Delay Handling Mechanisms in Sensor Networks , 2008, Tenth International Conference on Computer Modeling and Simulation (uksim 2008).

[23]  Niels Kjølstad Poulsen,et al.  Incorporation of time delayed measurements in a discrete-time Kalman filter , 1998, Proceedings of the 37th IEEE Conference on Decision and Control (Cat. No.98CH36171).