• DocumentCode
    1887756
  • Title

    Double factors algorithm for computing DFT

  • Author

    Li, Haijun ; Yan, Caojun ; Peng, Wenbiao

  • Author_Institution
    Electr. & Inf. Coll., China Three Gorge Univ., Yichang
  • fYear
    2009
  • fDate
    11-12 April 2009
  • Firstpage
    133
  • Lastpage
    137
  • Abstract
    A fast Fourier transform algorithm for computing N=N1timesN2-point DFT, where both factors N1 and N2 are smaller positive integer, said to be a double factors algorithm(DFA), is developed. The DFA subdivides a DFT of length N=N1timesN2 into smaller transforms of length N1 and N2 and takes the following steps:(1) computes N1 N2-point DFTs , (2) multiplies the values of DFT by twiddle factors, (3) computes N2 N1-point DFTs. The structure of the DFA is similar to those of the most simple PFA and WFTA, but N1 and N2 are not necessarily relatively prime. When N=2M or 4M, the total number of computations of DFT in the DFA is less than those in the radix-2 and radix-4 FFT algorithm but slightly more than that in the split-radix FFT algorithm. When N is other values, the total number of computations of DFT in the DFA is less than those in the PFA and WFTA.
  • Keywords
    discrete Fourier transforms; DFT computation; double factors algorithm; fast Fourier transform algorithm; radix FFT algorithm; twiddle factor; Algorithm design and analysis; Discrete Fourier transforms; Doped fiber amplifiers; Educational institutions; Fast Fourier transforms; Time domain analysis; double factors algorithm; prime factor algorithm; radix-4 FFT; smaller-length DFT; splix-radix FFT;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Image Analysis and Signal Processing, 2009. IASP 2009. International Conference on
  • Conference_Location
    Taizhou
  • Print_ISBN
    978-1-4244-3987-4
  • Type

    conf

  • DOI
    10.1109/IASP.2009.5054641
  • Filename
    5054641