Optimality Principles and Neural Ordinary Differential Equations-based Process Modeling for Distributed Control

TL;DR

This paper introduces a process modeling framework that combines classical process models with data-driven neural ODEs, enabling distributed control, optimization, and conservation property integration in process networks.

Contribution

It presents a novel formalism integrating topology-based conservation laws with neural ODEs for process modeling and control.

Findings

Successful integration of neural ODEs with process topology in inventory control

Demonstrated control law implementation alters system equilibrium towards objectives

Framework maintains conservation properties while learning from data

Abstract

Most recent advances in machine learning and analytics for process control pose the question of how to naturally integrate new data-driven methods with classical process models and control. We propose a process modeling framework enabling integration of data-driven algorithms through consistent topological properties and conservation of extensive quantities. Interconnections among process network units are represented through connectivity matrices and network graphs. We derive the system's natural objective function equivalent to the non-equilibrium entropy production in a steady state system as a driving force for the process dynamics. We illustrate how distributed control and optimization can be implemented into process network structures and how control laws and algorithms alter the system's natural equilibrium towards engineered objectives. The basic requirement is that the flow conditions can be expressed in terms of conic sector (passivity) conditions. Our formalism allows integration of fundamental conservation properties from topology with learned dynamic relations from data through sparse deep neural networks. We demonstrate in a practical example of a simple inventory control system how to integrate the basic topology of a process with a neural network ordinary differential equation model. The system specific constitutive equations are left undescribed and learned by the neural ordinary differential equation algorithm using the adjoint method in combination with an adaptive ODE solver from synthetic time-series data. The resulting neural network forms a state space model for use in e.g. a model predictive control algorithm.