Optimization of an Input Filter for a Three-Phase Matrix Converter

Year 2020, Volume: 8 Issue: 3, 254 - 259, 30.07.2020

Güllü Boztaş

https://doi.org/10.17694/bajece.763403

Cited By: 2

Abstract

This study includes an optimization of the input filter for three-phase matrix converters. An input filter effects on the power factor while improving the Total Harmonic Distortion (THD) of the input current. Unity power factor being one of the most important advantages of matrix converters will be eliminated if this is not taken into consideration. For this reason, an optimization was used by taking both parameters into consideration in this study. A Particle Swarm Optimization (PSO) algorithm was used in order to reduce the THD of the input current about 3% with nearly unit power factor as 0.985. The first of the optimization objective functions is to decrease the THD of the input current, and the second is to increase the power factor. The matrix converter was used for a constant frequency and modulation by using the switching strategy of Venturini Method and feeds an RL load. The optimized input filter was analyzed in detail in MATLAB/SimPowerSystems environment and examined in the results. Additionally, FFT spectra of the input and output waveforms are given in the results. Thus, the most suitable input filter was obtained for this system.

Keywords

Matrix converter, Venturini Method, Power Factor, Input Filter, Harmonic Distortion

References

• Reference1 M. Hamouda, H. F. Blanchette, and K. Al-Haddad, “Unity Power Factor Operation of Indirect Matrix Converter Tied to Unbalanced Grid,” IEEE Trans. Power Electron., vol. 31, no. 2, pp. 1095–1107, Feb. 2016.
• Reference2 R. Kumar, A. V. Goyal, S. Srivastava, S. P. Singh, and N. Singh, “Modelling and simulation of matrix converter based DC-DC converter,” in 2013 International Conference on Energy Efficient Technologies for Sustainability, ICEETS 2013, 2013, pp. 134–138.
• Reference3 L. Gyugyi and B. R. Pelly, “Static power frequency changers: Theory, performance, and application,” undefined, 1976.
• Reference4 E. Watanabe, S. Ishii, E. Yamamoto, H. Hara, J. K. Kang, and A. M. Hava, “High performance motor drive using matrix converter,” in IEE Colloquium (Digest), 2000, no. 72, pp. 33–38.
• Reference5 P. Wheeler and D. Grant, “Optimised input filter design and low-loss switching techniques for a practical matrix converter,” IEE Proc. Electr. Power Appl., vol. 144, no. 1, pp. 53–60, 1997.
• Reference6 A. Alesina and M. G. B. Venturini, “Analysis and Design of Optimum-Amplitude Nine-Switch Direct AC–AC Converters,” IEEE Trans. Power Electron., vol. 4, no. 1, pp. 101–112, 1989.
• Reference7 A. K. Sahoo, K. Basu, and N. Mohan, “Systematic input filter design of matrix converter by analytical estimation of RMS current ripple,” IEEE Trans. Ind. Electron., vol. 62, no. 1, pp. 132–143, Jan. 2015.
• Reference8 P. Wheeler, J. Clare, L. Empringham, M. Apap, and M. Bland, “Matrix converters,” Power Eng. J., vol. 16, no. 6, pp. 273–282, 2002.
• Reference9 K. You, D. Xiao, M. F. Rahman, and M. N. Uddin, “Applying reduced general direct space vector modulation approach of AC-AC matrix converter theory to achieve direct power factor controlled three-phase AC-DC matrix rectifier,” in IEEE Transactions on Industry Applications, 2014, vol. 50, no. 3, pp. 2243–2257.
• Reference10 H. M. Nguyen, H. H. Lee, and T. W. Chun, “Input power factor compensation algorithms using a new direct-SVM method for matrix converter,” IEEE Trans. Ind. Electron., vol. 58, no. 1, pp. 232–243, Jan. 2011.
• Reference11 H. H. Lee, H. M. Nguyen, and T. W. Chun, “New direct-SVM method for matrix converter with main input power factor compensation,” in IECON Proceedings (Industrial Electronics Conference), 2008, pp. 1281–1286.
• Reference12 H. Wu, H. Ge, Y. Xu, and W. Zhang, “The power factor correction of three-phase to single-phase matrix converter with an active power decoupling capacity,” in IEEE Transportation Electrification Conference and Expo, ITEC Asia-Pacific 2014 - Conference Proceedings, 2014.
• Reference13 D. Borojević, “Space Vector Modulated Three-Phase to Three-Phase Matrix Converter with Input Power Factor Correction,” IEEE Trans. Ind. Appl., vol. 31, no. 6, pp. 1234–1246, 1995.
• Reference14 D. Casadei, G. Serra, A. Tani, A. Trentin, and L. Zarri, “Theoretical and experimental investigation on the stability of matrix converters,” IEEE Trans. Ind. Electron., vol. 52, no. 5, pp. 1409–1419, Oct. 2005.
• Reference15 D. Casadei, G. Serra, A. Tani, and L. Zarri, “Effects of input voltage measurement on stability of matrix converter drive system,” IEE Proc. Electr. Power Appl., vol. 151, no. 4, pp. 487–497, Jul. 2004.
• Reference16 D. Casadei et al., “Large-signal model for the stability analysis of matrix converters,” IEEE Trans. Ind. Electron., vol. 54, no. 2, pp. 939–950, Apr. 2007.
• Reference17 J. W. Kolar, F. Schafmeister, S. D. Round, and H. Ertl, “Novel three-Phase AC-AC sparse matrix converters,” IEEE Trans. Power Electron., vol. 22, no. 5, pp. 1649–1661, Sep. 2007.
• Reference18 K. Yamada et al., “Integrated filters and their combined effects in matrix converter,” in Conference Record - IAS Annual Meeting (IEEE Industry Applications Society), 2005, vol. 2, pp. 1406–1413.
• Reference19 K. E. Parsopoulos, “Particle Swarm Methods,” in Handbook of Heuristics, Springer International Publishing, 2015, pp. 1–47.
• Reference20 J. Kennedy ; R. Eberhart, “Particle swarm optimization,” in In: Proceedings of the IEEE international joint conference on neural networks, 1995, vol. 4, no. 6, pp. 1942–1948.
• Reference21 Y. Shi and R. Eberhart, “Modified particle swarm optimizer,” in Proceedings of the IEEE Conference on Evolutionary Computation, ICEC, 1998, pp. 69–73.
• Reference22 R. Eberhart and J. Kennedy, “New optimizer using particle swarm theory,” in Proceedings of the International Symposium on Micro Machine and Human Science, 1995, pp. 39–43.
• Reference23 M. Erik and H. Pedersen, “Good Parameters for Particle Swarm Optimization,” 2010.
• Reference24 M. Agrawal, M. Mishra, and S. P. S. Kushwah, “Association rules optimization using improved PSO algorithm,” 2016, pp. 395–398.
• Reference25 M. G. B. Venturini, “Solid-State Power Conversion: A Fourier Analysis Approach to Generalized Transformer Synthesis,” IEEE Trans. Circuits Syst., vol. 28, no. 4, pp. 319–330, 1981.
• Reference26 O. Aydogmus and S. Sünter, “Implementation of EKF based sensorless drive system using vector controlled PMSM fed by a matrix converter,” Int. J. Electr. Power Energy Syst., vol. 43, no. 1, pp. 736–743, Dec. 2012.
• Reference27 A. Popovici, V. Popescu, M. I. Băbăiţă, D. Lascu, and D. Negoitescu, “Modeling, Simulation and Design of Input Filter for Matrix Converters,” in 2005 WSEAS Int. Conf. on on Dynamıcal Systems and Control, 2005, pp. 439–444.
• Reference28 Y. Zhang, S. Balochian, P. Agarwal, V. Bhatnaga, and O. J. Housheya, “Artificial Intelligence and Its Applications,” Math. Probl. Eng., vol. 2014, pp. 1–10, 2014.
• Reference29 T. M. Blooming and D. J. Carnovale, “Application of IEEE STD 519-1992 harmonic limits,” in IEEE Conference Record of Annual Pulp and Paper Industry Technical Conference, 2006.
• Reference30 D. Committee, I. Power, and E. Society, “IEEE Std 519-2014 (Revision of IEEE Std 519-1992),” IEEE Std 519-2014 (Revision IEEE Std 519-1992), vol. 2014, pp. 1–29, 2014.