Simplified filtered Smith predictor for MIMO processes with multiple time delays.

This paper proposes a simplified tuning strategy for the multivariable filtered Smith predictor. It is shown that offset-free control can be achieved with step references and disturbances regardless of the poles of the primary controller, i.e., integral action is not explicitly required. This strategy reduces the number of design parameters and simplifies tuning procedure because the implicit integrative poles are not considered for design purposes. The simplified approach can be used to design continuous-time or discrete-time controllers. Three case studies are used to illustrate the advantages of the proposed strategy if compared with the standard approach, which is based on the explicit integrative action.

[1]  Xin Qi,et al.  A new control method for MIMO first order time delay non-square systems , 2011 .

[2]  Eduardo F. Camacho,et al.  Control of dead-time processes , 2007 .

[3]  Babatunde A. Ogunnaike,et al.  Multivariable controller design for linear systems having multiple time delays , 1979 .

[4]  Bismark Claure Torrico,et al.  Simplified dead-time compensator for multiple delay SISO systems. , 2016, ISA transactions.

[5]  Julio E. Normey-Rico,et al.  On the filtered Smith predictor for MIMO processes with multiple time delays , 2014 .

[6]  Pedro Albertos,et al.  Dead-time-compensator for unstable MIMO systems with multiple time delays☆☆☆ , 2010 .

[7]  W. H. Ray,et al.  High‐Performance multivariable control strategies for systems having time delays , 1986 .

[8]  Chen Lin,et al.  Multivariable Smith Predictors Design for Nonsquare Plants , 2006, IEEE Transactions on Control Systems Technology.

[9]  Ian Postlethwaite,et al.  Multivariable Feedback Control: Analysis and Design , 1996 .

[10]  Julio E. Normey-Rico,et al.  Dealing with noise in unstable dead-time process control , 2010 .

[11]  M. Chidambaram,et al.  Smith delay compensator for multivariable non-square systems with multiple time delays , 2006, Comput. Chem. Eng..

[12]  J. E. Normey-Rico,et al.  Simple Tuning Rules for Dead-Time Compensation of Stable, Integrative, and Unstable First-Order Dead-Time Processes , 2013 .

[13]  J. B. Gomm,et al.  Solution to the Shell standard control problem using genetically tuned PID controllers , 2002 .

[14]  Julio E. Normey-Rico,et al.  Unified approach for minimal output dead time compensation in MIMO processes , 2011 .

[15]  Jan M. Maciejowski Robustness of multivariable smith predictors , 1994 .