A Decoupled Orthogonal Row Processing Algorithm for Power System State Estimation

This paper presents a fast, reliable and storage -saving algorithm for Power System State Estimation (PSSE). Instead of using a Single sub-Matrix of a Decoupled Gain matrix (SMDG), the new algorithm employs a Single sub-Matrix of a Decoupled Jacobian matrix (SMDJ); the Givens transformations is then used to solve a PSSE weighted least-squares problem. Thus, the algorithm has the advantages of both decoupling and orthogonal transformations. It will be shown in theory and practice that the new algorithm performs better than the algorithm using the SMDG. The new algorithm has been tested on two power systems, including an IEEE 30-bus test power system. From the numerical results we conclude that the proposed algorithm is considerably superior to the conventional normal equation algorithm and other decoupling algorithms.

[1]  William F. Tinney,et al.  State Estimation in Power Systems Part II: Implementation and Applications , 1970 .

[2]  William F. Tinney,et al.  Sparsity-Directed Decomposition for Gaussian Elimination on Matrices , 1970 .

[3]  John Peschon,et al.  State Estimation in Power Systems Part I: Theory and Feasibility , 1970 .

[4]  Fred C. Schweppe,et al.  Power System Static-State Estimation, Part I: Exact Model , 1970 .

[5]  L. S. VanSlyck,et al.  Techniques for the Real-Time Monitoring of Power System Operations , 1970 .

[6]  Fred C. Schweppe,et al.  Bad Data Suppression in Power System Static State Estimation , 1971 .

[7]  W. E. Gentleman Least Squares Computations by Givens Transformations Without Square Roots , 1973 .

[8]  E. Handschin,et al.  Bad data analysis for power system state estimation , 1975, IEEE Transactions on Power Apparatus and Systems.

[9]  H.P. Horisberger,et al.  A fast decoupled static state-estimator for electric power systems , 1976, IEEE Transactions on Power Apparatus and Systems.

[10]  A. Monticelli,et al.  Fast Decoupled State Estimation and Bad Data Processing , 1979, IEEE Transactions on Power Apparatus and Systems.

[11]  A. George,et al.  Solution of sparse linear least squares problems using givens rotations , 1980 .

[12]  M. Ribbens-Pavella,et al.  A Two-Level Static State Estimator for Electric Power Systems , 1981, IEEE Transactions on Power Apparatus and Systems.

[13]  V. Quintana,et al.  A Robust Numerical Technique for Power System State Estimation , 1981, IEEE Transactions on Power Apparatus and Systems.

[14]  V. Quintana,et al.  An Orthogonal Row Processing Algorithm for Power System Sequential State Estimation , 1981, IEEE Transactions on Power Apparatus and Systems.

[15]  C. Weygandt,et al.  Design of a Power System State Estimator , 1981, IEEE Transactions on Power Apparatus and Systems.

[16]  A. Simoes-Costa,et al.  Bad Data Detection and Identification Techniques Using Estimation Orthogonal Methods , 1982, IEEE Transactions on Power Apparatus and Systems.

[17]  A. Sasson,et al.  A Fast and Reliable State Estimation Algorithm for AEP's New Control Center , 1982, IEEE Transactions on Power Apparatus and Systems.

[18]  V. H. Quintana Numerically-robust techniques for the monitoring of power system operations , 1982, Canadian Electrical Engineering Journal.