Abstract
A method for tuning PI controller parameters, a prescribed maximum time delay error or a relative time delay error is presented. The method is based on integrator plus time delay models. The integral time constant is linear in the relative time delay error, and the proportional constant is seen inversely proportional to the relative time delay error. The keystone in the method is the method product parameter, i.e., the product of the PI controller proportional constant, the integral time constant, and the integrator plus time delay model, velocity gain. The method product parameter is found to be constant for various PI controller tuning methods. Optimal suggestions are given for choosing the method product parameter, i.e., optimal such that the integrated absolute error or, more interestingly, the Pareto performance objective (i.e., integrated absolute error for combined step changes in output and input disturbances) is minimised. Variants of the presented tuning method are demonstrated for tuning PI controllers for motivated (possible) higher order process model examples, i.e., the presented method is combined with the model reduction step (process–reaction curve) in Ziegler–Nichols.
Highlights
This paper concerns tuning of PI controllers based on Integrator Plus Time Delay (IPTD)
We demonstrate the above algorithm in an instance to enhance the robustness of the classical closed loop ZN PI controller tuning
From the PI controller setting in Equation (38) with τ0 = 1.7385, we find the Method Product (MP) parameter c = αβ = K p kTi ≈ 2.6985
Summary
This paper concerns tuning of PI controllers based on Integrator Plus Time Delay (IPTD). Using the Simple/Skogestad IMC (SIMC) PI controller tuning rules, presented in the works of [8,12,13], with closed loop time constant Tc = τ (i.e., is the only tuning parameter in SIMC) gives α = 0.5 and β = 8. The PI controller tuning method in the work of [1,2] is further developed with more optimal settings for the MP parameter as well as tuning for some special instance integrating systems.
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