Implementation challenges of covariance estimation techniques for an experimental polymerization system

In this paper, we study the estimation of covariance matrices using experimental data obtained from a laboratory emulsion polymerization reactor. Two different methods, the Autocovariance Least-Squares (ALS) and the Direct Optimization (D.O.) are considered for this purpose. The obtained covariance matrices are implemented to define the statistics of stochastic state estimation techniques. The similarities and differences between both approaches are highlighted assuming the same disturbance noise structure, initial guess for the covariance matrices, filter used to perform the covariance estimation and experimental data. The results show that the ALS method can obtain less noisy estimates for the unmeasured states when compared to the D.O. On the other hand, the ALS technique requires further mathematical assumptions on the system conditions that affect the selection of the system model and the noise disturbance structure.

[1]  Claudia Sayer,et al.  Calorimetric Estimation Employing the Unscented Kalman Filter for a Batch Emulsion Polymerization Reactor , 2013 .

[2]  Vinay A. Bavdekar,et al.  Identification of process and measurement noise covariance for state and parameter estimation using extended Kalman filter , 2011 .

[3]  Fernando V. Lima,et al.  Covariance and State Estimation of Weakly Observable Systems: Application to Polymerization Processes , 2013, IEEE Transactions on Control Systems Technology.

[4]  R. Gesthuisen,et al.  Simultaneous estimation of the heat of reaction and the heat transfer coefficient by calorimetry: estimation problems due to model simplification and high jacket flow rates—theoretical development , 2005 .

[5]  D. Wilson,et al.  Experiences implementing the extended Kalman filter on an industrial batch reactor , 1998 .

[6]  A. Klein,et al.  Composition Control and Kalman Filtering in Emulsion Copolymerization , 1988, 1988 American Control Conference.

[7]  Effect of Cooling Fluid Flow Rate on the Estimation of Conversion by Calorimetry in a Lab-Scale Reactor , 2008 .

[8]  Eric Walter,et al.  Identification of Parametric Models: from Experimental Data , 1997 .

[9]  Fernando V. Lima,et al.  Nonlinear stochastic modeling to improve state estimation in process monitoring and control , 2011 .

[10]  James B. Rawlings,et al.  Critical Evaluation of Extended Kalman Filtering and Moving-Horizon Estimation , 2005 .

[11]  Claudia Sayer,et al.  In-Line Monitoring of Emulsion Polymerization Reactions Combining Heat Flow and Heat Balance Calorimetry , 2010 .

[12]  J. O. Trierweiler,et al.  A New Process Noise Covariance Matrix Tuning Algorithm for Kalman Based State Estimators , 2009 .

[13]  F. Lima,et al.  Robust Calorimetric Estimation of Semi‐Continuous and Batch Emulsion Polymerization Systems with Covariance Estimation , 2014 .

[14]  James B. Rawlings,et al.  The autocovariance least-squares method for estimating covariances: application to model-based control of chemical reactors , 2006, IEEE Transactions on Control Systems Technology.

[15]  Christos Georgakis,et al.  Online Estimation of Reaction Rates in Semicontinuous Reactors , 1995 .

[16]  James B. Rawlings,et al.  A new autocovariance least-squares method for estimating noise covariances , 2006, Autom..

[17]  Fernando V. Lima,et al.  The Autocovariance Least-Squares Method for Batch Processes: Application to Experimental Chemical Systems , 2014 .

[18]  Christos Georgakis,et al.  How To NOT Make the Extended Kalman Filter Fail , 2013 .

[19]  James B. Rawlings,et al.  Estimation of the disturbance structure from data using semidefinite programming and optimal weighting , 2009, Autom..

[20]  Jaleel Valappil,et al.  Systematic estimation of state noise statistics for extended Kalman filters , 2000 .