Litcius/Paper detail

<scp>Time–space</scp> coupled learning method for model reduction of distributed parameter systems with <scp>encoder‐decoder</scp> and <scp>RNN</scp>

Xiangyun Qing, Jin Jing, Yugang Niu, Shuangliang Zhao

2020AIChE Journal23 citationsDOI

Abstract

Abstract Model reduction of a high‐dimensional distributed parameter system (DPS) reduces the complexity of the system for various applications, from monitoring to model predictive control, while retaining its intrinsic properties. Unfortunately, the assumption of time–space separability usually fails to hold for popular time–space separation model reduction methods because the space and time of the DPS are inherently coupled. In this study, a time–space coupled learning method for a data‐driven model reduction of the DPS is presented. The proposed method has the advantage of preserving the time–space coupling characteristics and increasing the number of degrees of freedom during the model reduction learning process. A novel deep‐learning architecture is presented by combining encoder‐decoder networks with recurrent neural networks. Given a high‐dimensional system without an exact partial differential equation description, the dimension‐reduced model and its temporal dynamics are jointly learned using the collected input and output data. The learned model is then applied to predict the low‐dimensional representations and reconstruct the high‐dimensional outputs. The proposed method was demonstrated on the catalytic rod in a tubular reactor with recycle, the results of which indicate a better modeling accuracy and lower intrinsic dimensionality compared with classical time–space separation model reduction methods.

Topics & Concepts

Dimensionality reductionReduction (mathematics)EncoderComputer scienceRecurrent neural networkDimension (graph theory)Curse of dimensionalityDeep learningCoupling (piping)AlgorithmControl theory (sociology)Space (punctuation)Artificial neural networkArtificial intelligenceMathematicsEngineeringControl (management)Operating systemGeometryPure mathematicsMechanical engineeringModel Reduction and Neural NetworksHydraulic and Pneumatic Systems