Determination of all stabilizing fractional-order PID controllers that satisfy a weighted sensitivity constraint

This paper presents a method for determining all stabilizing fractional-order (FO) proportional-integral-derivative (PID) controllers that satisfy an H<sub>∞</sub> weighted-sensitivity constraint for a system of integer or non-integer order. All the parameters of such FO PID controllers are calculated in the frequency domain and are given in terms of the proportional gain K<sub>p</sub>, integral gain K<sub>i</sub>, and derivative gain K<sub>d</sub>. In this paper, they will be plotted on the (K<sub>p</sub>, K<sub>i</sub>), (K<sub>p</sub>, K<sub>d</sub>), and (K<sub>i</sub>, K<sub>d</sub>) planes. In particular, this approach provides all the possible values of the gain parameters of the FO PID controllers that satisfy a given weighted-sensitivity condition even when the transfer function of a system is not available, as long as the frequency response thereof can be obtained. An example is given by way of illustrating the usefulness and effectiveness of the method.