Hassan Bevrani

Renewable Integrated Power System Stability and Control


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Power System Monitoring and Control

      The system data are collected from the distributed PMUs in the grid through a secure communication network. The development of information and communication technology (ICT) enables more flexibility in wide‐area monitoring of power system with fast and large data transmission. Especially, the wide‐area measurement system (WAMS) with PMUs is a promising technique as one of the smart grid technologies in the bulk power grid.

Schematic illustration of an overall data-driven control framework for renewable integrated power systems. Schematic illustration of P M U-based wide-area measurement system and control.

      As mentioned, using significant number of distributed micro‐sources into power systems adds new technical challenges. As the electric industry seeks to reliably integrate large amounts of DGs/RESs into the power system in regulated environment, considerable effort is needed to accommodate and effectively manage the installed micro‐sources. A key aspect is how to handle changes in topology and dynamics caused by penetration of numerous DGs/RESs in the network and how to make the power grid robust and able to take advantage of the potential flexibility of distributed micro‐sources. In a modern control framework, a part of power produced by available DGs/RESs in the grid are used as a primary energy source of inertia emulator to provide virtual inertia as a supporting control for abovementioned controllers (like a fine tuner) to improve power grid stability.

      From a system dynamic point of view, the bulk generating units, due to their high inertia, provide a long time constant; such that the rotor speed and thus the grid frequency cannot alter suddenly, while the load changes. Hence, the total rotating mass enhances the dynamic stability. In future, a significant share of DGs/RESs/MGs in the electric power grids is expected. This increases the total system generation power, while does not contribute to the system rotational inertia. System dynamics are faster in power systems with low rotational inertia, making control and power system operation more challenging [32].

      The power system is a nonlinear multivariable time‐varying system. It is represented by a nonlinear set of equations for the generators (swing equations), for the transmission lines and for the loads, which for a typical power system has a few hundreds of states. For the control design purpose, usually a reduced‐order linearized model around an operating point is used and it is assumed that all system parameters are known and time‐invariant. These assumptions, however, are not valid in a real power system with dominated DGs/RESs/MGs. The main dynamic modes of the system are varying stochastically during a day because of the variation of load and aggregated inertia. The dynamic modes will change more significantly by integration of new RESs into the power system (e.g. because of long‐term variation of the mean value of the aggregated inertia). Therefore, a fixed linearized time‐invariant model will not represent correctly the behavior of the power system.

      The frequency response of the system can be identified offline/online using the data for different load and generation configurations (when the share of DGs/RESs is increased) and saved in a database for the models. The small variation of the system (originated from measurement noise, load variation, and system nonlinearity) will be modeled by frequency domain uncertainty. The long‐term effect of change in system inertia can be considered by identifying several frequency‐domain models for different levels of RES penetration. One can represent this model's database by an LPV model [116]. It should be mentioned that the model of the power system for the frequency, voltage, and rotor angle is different because they have different inputs and outputs and scheduling parameters.

      1.4.1 Modeling of Frequency, Voltage, and Angle Controls

      Unlike grid frequency, since the voltage is known as a local variable,