• DocumentCode
    2263419
  • Title

    Reconstruction of derivatives: Error analysis and design criteria

  • Author

    Condat, Laurent

  • Author_Institution
    ENSICAEN Joint Res. Unit,, GREYC, UCBN, Caen, France
  • fYear
    2011
  • fDate
    Aug. 29 2011-Sept. 2 2011
  • Firstpage
    839
  • Lastpage
    843
  • Abstract
    We present a general Fourier-based formalism which provides an accurate prediction of the approximation error, when the derivative of a signal s(t) is continuously reconstructed from uniform point samples or generalized measurements on s. At the heart of the formalism is the frequency error kernel, which can be minimized to design efficient reconstruction schemes which are near optimal in the least-squares sense.
  • Keywords
    Fourier analysis; approximation theory; least squares approximations; signal reconstruction; signal sampling; approximation error; error analysis; frequency error kernel; general Fourier-based formalism; least-square method; signal reconstruction; signal sampling; Image reconstruction; Interpolation; Kernel; Piecewise linear approximation; Reconstruction algorithms; Splines (mathematics);
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Signal Processing Conference, 2011 19th European
  • Conference_Location
    Barcelona
  • ISSN
    2076-1465
  • Type

    conf

  • Filename
    7073842