Paper

State Estimation in Unobservable Power Systems via Graph Signal Processing Tools

We consider the problem of estimating the states in an unobservable power system. To this end, we propose novel graph signal processing (GSP) methods. For simplicity, we start with analyzing the DC power flow (DC-PF) model and then extend our algorithms to the AC power flow (AC-PF) model. The main assumption behind the proposed GSP approach is that the grid states, which include the vector of phases and the vector of the magnitudes of the voltages in the system, is a smooth graph signal with respect to the system admittance matrix that represents the underlying graph. Thus, the first step in this paper is to validate the graph-smoothness assumption of the states, both empirically and theoretically. Then, we develop the regularized GSP weighted least squares (GSP-WLS) state estimator, which does not require observability of the network. We propose a sensor placement strategy that aims to optimize the estimation performance of the GSP-WLS estimator. Finally, we extend the GSP-WLS estimator method to the AC-PF model by integrating a smoothness regularization term into the Gauss-Newton algorithm. Numerical results on the IEEE 118-bus system demonstrate that the new GSP methods outperform commonly-used estimation approaches and are robust to missing data.

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