• DocumentCode
    152828
  • Title

    Deconvolution using projections onto the epigraph set of a convex cost function

  • Author

    Tofighi, Mohammad ; Bozkurt, Alican ; Kose, Kivanc ; Cetin, A. Enis

  • Author_Institution
    Elektrik ve Elektron. Muhendisligi Bolumu, Bilkent Univ., Ankara, Turkey
  • fYear
    2014
  • fDate
    23-25 April 2014
  • Firstpage
    1638
  • Lastpage
    1641
  • Abstract
    A new deconvolution algorithm based on making orthogonal projections onto the epigraph set of a convex cost function is presented. In this algorithm, the dimension of the minimization problem is lifted by one and sets corresponding to the cost function and observations are defined. If the utilized cost function is convex in RN, the corresponding epigraph set is also convex in RN+1. The deconvolution algorithm starts with an arbitrary initial estimate in RN+1. At each iteration cycle of the algorithm, first deconvolution projections are performed onto the hyperplanes representing observations, then an orthogonal projection is performed onto epigraph of the cost function. The method provides globally optimal solutions for total variation, l1, l2, and entropic cost functions.
  • Keywords
    costing; deconvolution; entropy; iterative methods; minimisation; set theory; convex cost function; deconvolution algorithm; deconvolution projections; entropic cost function; epigraph set; hyperplanes; iteration cycle; l1 cost function; l2 cost function; minimization problem; orthogonal projections; total variation cost function; Conferences; Cost function; Deconvolution; Magnetic resonance imaging; Signal processing; Signal processing algorithms; Epigraph of a cost function; deconvolution; projection onto convex sets; total variation;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Signal Processing and Communications Applications Conference (SIU), 2014 22nd
  • Conference_Location
    Trabzon
  • Type

    conf

  • DOI
    10.1109/SIU.2014.6830560
  • Filename
    6830560