Frequency Shifting and Filtering Algorithm for Power System Harmonic Estimation

Harmonic estimation plays an important part in harmonic suppression of power system. Due to the normal fluctuation of power frequency, it is difficult to realize synchronous sampling. Consequently, the unavoidable productions, i.e., spectral leakage and picket fence effect, will affect the accuracy of harmonic analysis significantly when using the Fourier transform. To overcome this problem, a novel algorithm for power system harmonic estimation called frequency shifting and filtering (FSF) algorithm is proposed in this paper. A reference signal is at first generated to shift the frequency of the sampled signal. Then the iterative averaging filter is adopted to eliminate the spectral interferences. Finally, accurate estimation of harmonics can be achieved because only interested components are retained. Furthermore, a simplified FSF with much less computational burden is presented by using an equivalent weighting filter. The salient features of the proposed algorithm are validated by the simulations and practical experiments.

[1]  Pradipta Kishore Dash,et al.  A Fast Recursive Algorithm for the Estimation of Frequency, Amplitude, and Phase of Noisy Sinusoid , 2011, IEEE Transactions on Industrial Electronics.

[2]  Cheng-I Chen,et al.  Comparative Study of Harmonic and Interharmonic Estimation Methods for Stationary and Time-Varying Signals , 2014, IEEE Transactions on Industrial Electronics.

[3]  Patricio G. Donato,et al.  Harmonics Measurement With a Modulated Sliding Discrete Fourier Transform Algorithm , 2014, IEEE Transactions on Instrumentation and Measurement.

[4]  Daniel Belega,et al.  Frequency estimation via weighted multipoint interpolated DFT , 2008 .

[5]  滕召胜,et al.  Measurement of power system harmonic based on adaptive Kaiser self-convolution window , 2015 .

[6]  Hui Xue,et al.  Subspace-Least Mean Square Method for Accurate Harmonic and Interharmonic Measurement in Power Systems , 2012, IEEE Transactions on Power Delivery.

[7]  G. M. Burt,et al.  P and M Class Phasor Measurement Unit Algorithms Using Adaptive Cascaded Filters , 2013, IEEE Transactions on Power Delivery.

[8]  José Antonio de la O. Serna,et al.  Polynomial Implementation of the Taylor–Fourier Transform for Harmonic Analysis , 2014, IEEE Transactions on Instrumentation and Measurement.

[9]  Dariusz Kania,et al.  Interpolated-DFT-Based Fast and Accurate Frequency Estimation for the Control of Power , 2014, IEEE Transactions on Industrial Electronics.

[10]  Radek Martinek,et al.  Power System Dynamic Frequency Measurement Based on Novel Interpolated STFT Algorithm , 2017 .

[11]  Aurobinda Routray,et al.  A novel Kalman filter for frequency estimation of distorted signals in power systems , 2002, IEEE Trans. Instrum. Meas..

[12]  Yong Wang,et al.  Spectral Correction Approach Based on Desirable Sidelobe Window for Harmonic Analysis of Industrial Power System , 2013, IEEE Transactions on Industrial Electronics.

[13]  Zhaosheng Teng,et al.  Harmonic Phasor Analysis Based on Improved FFT Algorithm , 2011, IEEE Transactions on Smart Grid.

[14]  Wen Huang,et al.  Characteristics and Restraining Method of Fast Transient Inrush Fault Currents in Synchronverters , 2017, IEEE Transactions on Industrial Electronics.

[15]  F. Zhou,et al.  Time-domain quasi-synchronous sampling algorithm for harmonic analysis , 2010, Proceedings of 14th International Conference on Harmonics and Quality of Power - ICHQP 2010.

[16]  Xiaona Xu,et al.  A Simple Harmonic Reduction Method in Multipulse Rectifier Using Passive Devices , 2017, IEEE Transactions on Industrial Informatics.

[17]  Mohammad A. S. Masoum,et al.  An Adaptive Recursive Wavelet Based Algorithm for Real-Time Measurement of Power System Variables During Off-Nominal Frequency Conditions , 2018, IEEE Transactions on Industrial Informatics.

[18]  José R. Espinoza,et al.  Digital Implementation of Selective Harmonic Elimination Techniques in Modular Current Source Rectifiers , 2013, IEEE Transactions on Industrial Informatics.

[19]  Siyu Guo,et al.  Harmonic Estimation Using Symmetrical Interpolation FFT Based on Triangular Self-Convolution Window , 2015, IEEE Transactions on Industrial Informatics.

[20]  Daniel Belega,et al.  Accuracy Analysis of the Multicycle Synchrophasor Estimator Provided by the Interpolated DFT Algorithm , 2013, IEEE Transactions on Instrumentation and Measurement.

[21]  Bhim Singh,et al.  Power Quality Event Classification Under Noisy Conditions Using EMD-Based De-Noising Techniques , 2014, IEEE Transactions on Industrial Informatics.

[22]  Gary W. Chang,et al.  An Efficient Prony-Based Solution Procedure for Tracking of Power System Voltage Variations , 2013, IEEE Transactions on Industrial Electronics.

[23]  Gerd Bumiller,et al.  Improvement of mains frequency estimation robustness towards ripple control signals , 2017, 2017 IEEE International Workshop on Applied Measurements for Power Systems (AMPS).

[24]  Zhou Chen,et al.  Frequency Shifting And Filtering Algorithm for Power System Harmonic Estimation , 2017, 2017 IEEE International Workshop on Applied Measurements for Power Systems (AMPS).

[25]  Graeme Burt,et al.  Frequency and fundamental signal measurement algorithms for distributed control and protection applications , 2009 .

[26]  Ahmed Faheem Zobaa,et al.  A New Approach for Harmonic Distortion Minimization in Power Systems Supplying Nonlinear Loads , 2014, IEEE Transactions on Industrial Informatics.

[27]  Krzysztof Okarma Polynomial windows with low sidelobes' level , 2007, Signal Process..

[28]  Zhongxing Geng,et al.  The algorithm of interpolating windowed FFT for harmonic analysis of electric power system , 2001 .