2024 : 6 : 18
Ali Hesami Naghshbandy

Ali Hesami Naghshbandy

Academic rank: Associate Professor
Education: PhD.
ScopusId: 54891980200
Faculty: Faculty of Engineering
Phone: 33663563


Three-Stage Data-Driven Phase Analysis to Reveal Generator-Site Origin Source of Forced Oscillations Under Resonance
Generators, Resonant frequency, Power system stability, Oscillations, Angular Velocity, ,
Journal IEEE Access
Researchers Kaveh Naderi ، Ali Hesami Naghshbandy ، Udaya Annakkage


This paper proposes a novel three-stage near real-time phase-driven procedure to locate the generator-type source of forced oscillations, inspired by the concept of Transient Energy Function (TEF), independent of the amplitude of any signal. In the commencement of the process, each generation bus is assigned with its active power and angular velocity angles reached from the reduced power system graph. Next, the difference in the synchronous generators’ active power angles and the difference in their angular velocity angles is exploited as the graph branches’ weight coefficients. Then, three exclusive and first-proposed decision functions are applied sequentially. First, the weighting coefficients of branches and nodes are fed to the first decision function. Regardless of the grid size, the result of this step is limited to up to four generators. The next step focuses exclusively on the first step outcomes, which results in two generators as recommended items. The last step, relying on the output of the second one, reveals the target generator accurately. The methodological procedure has been validated on the New England 10-machine 39-bus benchmark power system modelled in the Real-Time Digital Simulator (RTDS/RSCAD) and then scrutinised in the MATLAB environment. In each study scenario, the results are compared with the conventional transient energy method. The simulation results revealed that the presented approach reliably releases all sources, including limit cycle and turbine governing reference signal modulation, under the most intense parametric resonance.