• DocumentCode
    1048731
  • Title

    On Attaining the Multiple Solutions of Selective Harmonic Elimination PWM Three-Level Waveforms Through Function Minimization

  • Author

    Agelidis, Vassilios G. ; Balouktsis, Anastasios I. ; Cossar, Calum

  • Author_Institution
    Univ. of Sydney, Sydney
  • Volume
    55
  • Issue
    3
  • fYear
    2008
  • fDate
    3/1/2008 12:00:00 AM
  • Firstpage
    996
  • Lastpage
    1004
  • Abstract
    Selective harmonic elimination pulsewidth modulation techniques are some of the control methods used in voltage/current source converters. However, challenges such as the task of finding all the multiple sets of solutions of the switching angles for a given problem may be difficult to deal with. In this paper, a direct minimization of the nonlinear transcendental trigonometric Fourier functions in combination with a random search is discussed. The unipolar (three-level) waveform is used to illustrate the proposed method confirming its ability to find multiple sets of solutions, including a case where 51 angles are sought for single- and three-phase applications. A simple harmonic distortion factor is studied for each set of solutions to assess their performance against the noneliminated harmonics. The results presented both at theoretical and experimental level are in close agreement and confirm the robustness of the proposed approach.
  • Keywords
    Fourier analysis; PWM rectifiers; harmonics suppression; PWM three-level waveform; function minimization; harmonic distortion factor; harmonic elimination pulsewidth modulation techniques; multiple solution; nonlinear transcendental trigonometric Fourier function; random search; selective harmonic elimination; unipolar waveform; Function minimization; inverter control; pulsewidth modulation; selective harmonic elimination;
  • fLanguage
    English
  • Journal_Title
    Industrial Electronics, IEEE Transactions on
  • Publisher
    ieee
  • ISSN
    0278-0046
  • Type

    jour

  • DOI
    10.1109/TIE.2007.909728
  • Filename
    4441341