Synchronization and Aggregation of Nonlinear Power Systems with Consideration of Bus Network Structures
For power system engineers, this provides a theoretical foundation for model reduction based on synchronization, enabling more efficient analysis of large-scale power networks.
This paper introduces a synchronization concept for nonlinear power systems that considers both generators and their buses jointly, linking it to graph symmetry. It shows that synchronization across partitions relates to graph symmetry or equitable partitions, and demonstrates that exact reduced models can be obtained by aggregating synchronized generators and buses, preserving the power system structure.
We study nonlinear power systems consisting of generators, generator buses, and non-generator buses. First, looking at a generator and its bus' variables jointly, we introduce a synchronization concept for a pair of such joint generators and buses. We show that this concept is related to graph symmetry. Next, we extend, in two ways, the synchronization from a pair to a partition of all generators in the networks and show that they are related to either graph symmetry or equitable partitions. Finally, we show how an exact reduced model can be obtained by aggregating the generators and associated buses in the network when the original system is synchronized with respect to a partition, provided that the initial condition respects the partition. Additionally, the aggregation-based reduced model is again a power system.