A Robust Generalized-Maximum Likelihood Unscented Kalman Filter for Power System Dynamic State Estimation

This paper develops a new robust generalized maximum-likelihood-type unscented Kalman filter (GM-UKF) that is able to suppress observation and innovation outliers while filtering out non-Gaussian process and measurement noise. Because the errors of the real and reactive power measurements calculated using phasor measurement units (PMUs) follow long-tailed probability distributions, the conventional UKF provides strongly biased state estimates since it relies on the weighted least squares estimator. By contrast, the state estimates and residuals of our GM-UKF are proved to be roughly Gaussian, allowing the sigma points to reliably approximate the mean and the covariance matrices of the predicted and corrected state vectors. To develop our GM-UKF, we first derive a batch-mode regression form by processing the predictions and observations simultaneously, where the statistical linearization approach is used. We show that the set of equations so derived are equivalent to those of the unscented transformation. Then, a robust GM-estimator that minimizes a convex Huber cost function while using weights calculated via projection statistics (PSs) is proposed. The PSs are applied to a two-dimensional matrix that consists of a serially correlated predicted state and innovation vectors to detect observation and innovation outliers. These outliers are suppressed by the GM-estimator using the iteratively reweighted least squares algorithm. Finally, the asymptotic error covariance matrix of the GM-UKF state estimates is derived from the total influence function. Extensive simulation results carried out on IEEE New England 39-bus 10-machine test system verify the effectiveness and robustness of the proposed method.

[1]  Zhenyu Huang,et al.  Assessing Gaussian Assumption of PMU Measurement Error Using Field Data , 2018, IEEE Transactions on Power Delivery.

[2]  Lubin Chang,et al.  Unified Form for the Robust Gaussian Information Filtering Based on M-Estimate , 2017, IEEE Signal Processing Letters.

[3]  Herman Bruyninckx,et al.  Comment on "A new method for the nonlinear transformation of means and covariances in filters and estimators" [with authors' reply] , 2002, IEEE Trans. Autom. Control..

[4]  L. Mili,et al.  Power System Stability Agents Using Robust Wide-Area Control , 2002, IEEE Power Engineering Review.

[5]  Lamine Mili,et al.  Robust state estimation based on projection statistics , 1996 .

[6]  I. Kamwa,et al.  Dynamic State Estimation in Power System by Applying the Extended Kalman Filter With Unknown Inputs to Phasor Measurements , 2011, IEEE Transactions on Power Systems.

[7]  D. Ruppert,et al.  Breakdown in Nonlinear Regression , 1992 .

[8]  James S. Thorp,et al.  Methodology for Performing Synchrophasor Data Conditioning and Validation , 2015, IEEE Transactions on Power Systems.

[9]  L. Fernholz von Mises Calculus For Statistical Functionals , 1983 .

[10]  M. A. M. Ariff,et al.  Estimating Dynamic Model Parameters for Adaptive Protection and Control in Power System , 2015, IEEE Transactions on Power Systems.

[11]  C. W. Taylor,et al.  Model validation for the August 10, 1996 WSCC system outage , 1999 .

[12]  K. Schneider,et al.  Feasibility studies of applying Kalman Filter techniques to power system dynamic state estimation , 2007, 2007 International Power Engineering Conference (IPEC 2007).

[13]  Lamine Mili,et al.  A Robust GM-Estimator for the Automated Detection of External Defects on Barked Hardwood Logs and Stems , 2007, IEEE Transactions on Signal Processing.

[14]  Xiaogang Wang,et al.  Huber-based unscented filtering and its application to vision-based relative navigation , 2010 .

[15]  Renke Huang,et al.  A Robust State Estimation Framework Considering Measurement Correlations and Imperfect Synchronization , 2018, IEEE Transactions on Power Systems.

[16]  Innocent Kamwa,et al.  Wide-area measurement based stabilizing control of large power systems-a decentralized/hierarchical approach , 2001 .

[17]  Claudio A. Canizares,et al.  Benchmark systems for small signal stability analysis and control , 2015 .

[18]  Baiqing Hu,et al.  Huber-based novel robust unscented Kalman filter , 2012 .

[19]  G. Evensen Sequential data assimilation with a nonlinear quasi‐geostrophic model using Monte Carlo methods to forecast error statistics , 1994 .

[20]  Hugh F. Durrant-Whyte,et al.  A new method for the nonlinear transformation of means and covariances in filters and estimators , 2000, IEEE Trans. Autom. Control..

[21]  Lamine Mili,et al.  Robust Unscented Kalman Filter for Power System Dynamic State Estimation With Unknown Noise Statistics , 2019, IEEE Transactions on Smart Grid.

[22]  Pengwei Du,et al.  Generator dynamic model validation and parameter calibration using phasor measurements at the point of connection , 2013, 2014 IEEE PES General Meeting | Conference & Exposition.

[23]  Shuai Lu,et al.  Capturing real-time power system dynamics: Opportunities and challenges , 2015, 2015 IEEE Power & Energy Society General Meeting.

[24]  Lingling Fan,et al.  Extended Kalman filtering based real-time dynamic state and parameter estimation using PMU data , 2013 .

[25]  Qi Huang,et al.  A Closed Normal Form Solution Under Near-Resonant Modal Interaction in Power Systems , 2017, IEEE Transactions on Power Systems.

[26]  Lamine Mili,et al.  Power System Robust Decentralized Dynamic State Estimation Based on Multiple Hypothesis Testing , 2018, IEEE Transactions on Power Systems.

[27]  A. Abur,et al.  Linear Phasor Estimator Assisted Dynamic State Estimation , 2018, IEEE Transactions on Smart Grid.

[28]  Junping Du,et al.  Robust unscented Kalman filter with adaptation of process and measurement noise covariances , 2016, Digit. Signal Process..

[29]  Greg Welch,et al.  Dynamic State Estimation of a Synchronous Machine Using PMU Data: A Comparative Study , 2015, IEEE Transactions on Smart Grid.

[30]  Shaobu Wang,et al.  An Alternative Method for Power System Dynamic State Estimation Based on Unscented Transform , 2012, IEEE Transactions on Power Systems.

[31]  L. Mili,et al.  A Robust Iterated Extended Kalman Filter for Power System Dynamic State Estimation , 2017, IEEE Transactions on Power Systems.

[32]  Bikash C. Pal,et al.  Decentralized Dynamic State Estimation in Power Systems Using Unscented Transformation , 2014, IEEE Transactions on Power Systems.

[33]  Lamine Mili,et al.  Robust Kalman Filter Based on a Generalized Maximum-Likelihood-Type Estimator , 2010, IEEE Transactions on Signal Processing.

[34]  John Law,et al.  Robust Statistics—The Approach Based on Influence Functions , 1986 .

[35]  Qi Huang A Closed Normal Form Solution Under Near-Resonant Modal Interaction in Power Systems , 2018, 2018 IEEE Power & Energy Society General Meeting (PESGM).