Abstract

The article reviews the results of a number of recent papers dealing with the revision of the simplest approaches to the control of first-order time-delayed systems. The concise introductory review is extended by an analysis of two discrete-time approaches to dead-time compensation control of stable, integrating, and unstable first-order dead-time processes including simple diagnostics of the model used and focusing on the possibility of simplified but reliable plant modelling. The first approach, based on the first historically known dead-time compensator (DTC) with possible dead-beat performance, is based on the reconstruction of the actual process variables and the compensation of input disturbances by an extended state observer (ESO). Such solutions play an important role both in a disturbance observer (DOB) based control and in an active disturbance rejection control (ADRC). The second approach considered comes from the Smith predictor with two degrees of freedom, which combines feedforward control with output disturbance reconstruction and compensation by the parallel plant model. It is shown that these two approaches offer advantageous properties in the case of actuator limitations, in contrast to the commonly used PID controllers. However, when applied to integrating and unstable first-order systems, the unconstrained and possibly unobservable output disturbance signal of the second solution must be eliminated from the control loop, due to the hidden structural instability of the Smith predictor-like solutions. The modified solutions, usually referred to as filtered Smith predictor (FSP), then no longer provide a disturbance signal and thus no longer fully fit into the concept of Industry 4.0, which is focused on further optimization, predictive maintenance in dynamic systems, diagnosis, fault detection and fault identification of dynamic processes and forms the basis for the digitalization of smart production. Nevertheless, the detailed analysis of the elimination of the unstable disturbance response mode is also worth mentioning in terms of other possible solutions. The application of both approaches to the control of a thermal process shows almost equivalent quality, but with different dependencies on the tuning parameters used. It is confirmed that a more detailed identification of the controlled process and the resulting higher complexity of the control algorithms does not necessarily lead to an increase in the resulting quality of the transients, which underlines the importance of the simplified plant modelling for practice.

Highlights

  • Time delays due to the terminal velocity of information transmission and processing, the computational speed of computers, or the terminal velocity of mass and energy transport are among the fundamental aspects of the control of dynamical systems

  • The results show that by not considering possibilities of the simplified process modelling given by the use of IPDT approximations, the works from the dead-time compensator (DTC)

  • Since the number of papers written on filtered Smith predictor (FSP) and based on a primary loop with a PI control is really high, see, e.g., [47,48,49,51,52,53,54,55], whereas it was not sufficiently explained why the conceptual schemes, implementation and equivalent controller differ and what are the impacts on the control task, it may take longer to correct the understanding of Smith predictor (SP), FSP and other alternatives in DTC design

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Summary

Introduction

Time delays due to the terminal velocity of information transmission and processing, the computational speed of computers, or the terminal velocity of mass and energy transport are among the fundamental aspects of the control of dynamical systems. First-order time-delayed (FOTD) systems are the most commonly used process models in control design [8]. In addition to their use in classical tuning methods, they are successfully used in model-based control. Skogestad [9] has shown that classical PID controllers can result from a delayed-model approach when the delay is replaced by the first terms of Padé or Taylor series approximations. Such simplifications [10] were common in the analog controller era, when implementing dead time was a major challenge. In terms of dead-time approximations, it is surprising that there were still doubts whether

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