• DocumentCode
    3018083
  • Title

    A numerical algorithm to solve AT X A - X = Q

  • Author

    Barraud, A.Y.

  • Author_Institution
    Ecole Nationale Sup??rieure d´Electrotechnique et de G??nie Physique, Grenoble C??dex, France
  • fYear
    1977
  • fDate
    7-9 Dec. 1977
  • Firstpage
    420
  • Lastpage
    423
  • Abstract
    Two kinds of algorithm are usually resorted to in order to solve the well-known Lyapounov discrete equation AT X A - X = Q : transformation of the original linear system in a classical one with n(n+1)/2 unknowns, and iterative scheme [1]. The first requires n4/4 storage words and a cost of n6/3 multiplications, which is impractical with a large system, and the second applies only if A is a stable matrix. The solution proposed requires no stability assumption and operates in only some n2 words and n3 multiplications.
  • Keywords
    Costs; Eigenvalues and eigenfunctions; Equations; Instruction sets; Iterative algorithms; Iterative methods; Linear systems; Matrices; Modular construction;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Decision and Control including the 16th Symposium on Adaptive Processes and A Special Symposium on Fuzzy Set Theory and Applications, 1977 IEEE Conference on
  • Conference_Location
    New Orleans, LA, USA
  • Type

    conf

  • DOI
    10.1109/CDC.1977.271607
  • Filename
    4045877