An Integrated Model Predictive Iterative Learning Control Strategy for Batch Processes

A novel integrated model predictive iterative learning control (MPILC) strategy is proposed in this paper. It systematically integrates batch-axis information and time-axis information into one uniform frame, namely the iterative learning controller (ILC) in the domain of batch-axis, while a model predictive controller (MPC) with time-varying prediction horizon in the domain of time-axis. As a result, the operation policy of batch process can be regulated during one batch, which leads to superior tracking performance and better robustness against disturbance and uncertainty. The convergence and tracking performance of the proposed learning control system are firstly given rigorous description and proof. Lastly, the effectiveness of the proposed method is verified by examples.

[1]  Min-Sen Chiu,et al.  Integrated neuro-fuzzy model and dynamic R-parameter based quadratic criterion-iterative learning control for batch process , 2012, Neurocomputing.

[2]  Jay H. Lee,et al.  ITERATIVE LEARNING CONTROL APPLIED TO BATCH PROCESSES: AN OVERVIEW , 2006 .

[3]  Min-Sen Chiu,et al.  An integrated iterative learning control strategy with model identification and dynamic R-parameter for batch processes , 2013 .

[4]  Thivaharan Albin,et al.  Benefits of model predictive control for gasoline airpath control , 2018, Science China Information Sciences.

[5]  Se-Kyu Oh,et al.  Iterative learning model predictive control for constrained multivariable control of batch processes , 2016, Comput. Chem. Eng..

[6]  Zhihua Xiong,et al.  Design and Analysis of Integrated Predictive Iterative Learning Control for Batch Process Based on Two-dimensional System Theory , 2014 .

[7]  Jun Zhao,et al.  Optimal Iterative Learning Control Based on a Time-Parametrized Linear Time-Varying Model for Batch Processes , 2013 .

[8]  Jie Zhang,et al.  Product Quality Trajectory Tracking in Batch Processes Using Iterative Learning Control Based on Time-Varying Perturbation Models , 2003 .

[9]  Lawrence B. Evans,et al.  A coordinate‐transformation method for the numerical solution of nonlinear minimum‐time control problems , 1975 .

[10]  Eric Rogers,et al.  Stability Analysis for Linear Repetitive Processes , 1992 .

[11]  Dominique Bonvin,et al.  Optimal operation of batch reactors—a personal view , 1998 .

[12]  Jie Chen,et al.  An optimization-based shared control framework with applications in multi-robot systems , 2017, Science China Information Sciences.