• DocumentCode
    1562195
  • Title

    Preservation of displacement ranks and the numerical stability of time recursive fast algorithms

  • Author

    Gueguen, C. ; Desbouvries, Francois

  • Author_Institution
    Signal Processing Dept., Ecole Nat. Superieure Telecommun., Paris, France
  • fYear
    1989
  • Firstpage
    1294
  • Abstract
    The authors investigate the role played by the preservation of the displacement rank in the update of covariance matrix time-recursive fast algorithms. Standard fast recursive-least-squares algorithms assume the constancy in time of the displacement rank and act on a supposed reduced set of generators. The authors show that some closure relationships have to be maintained in order to preserve the low displacement structure, and they advocate a preliminary canonical reduction procedure. A state-space interpretation of the Kalman gain is introduced that makes it possible to compute it from past prediction errors
  • Keywords
    filtering and prediction theory; least squares approximations; Kalman gain; covariance matrix; fast recursive-least-squares algorithms; filtering; numerical stability; preservation of the displacement rank; state-space interpretation; time recursive fast algorithms; Adaptive algorithm; Character generation; Computational efficiency; Covariance matrix; Kalman filters; Least squares methods; Linear algebra; Numerical stability; Roundoff errors; Time varying systems;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Acoustics, Speech, and Signal Processing, 1989. ICASSP-89., 1989 International Conference on
  • Conference_Location
    Glasgow
  • ISSN
    1520-6149
  • Type

    conf

  • DOI
    10.1109/ICASSP.1989.266673
  • Filename
    266673