• DocumentCode
    3015895
  • Title

    Recurrence and finiteness for systems in a general setting

  • Author

    Arbib, M. ; Manes, E.G.

  • Author_Institution
    University of Massachusetts at Amherst, Amherst, Massachusetts
  • fYear
    1976
  • fDate
    1-3 Dec. 1976
  • Firstpage
    1180
  • Lastpage
    1183
  • Abstract
    An X-system is G : I ?? Q, Fx : Q ?? Q (x ?? X) and H : Q ?? Y. X-systems generalize linear and bilinear systems over a ring. If I and Y are finite, morphic recurrence is necessary and sufficient for a finite realization. For systems over a ring, if X is finite and if Y is an Artinian, injective module, morphic recurrence is necessary and sufficient for an Artinian realization. For systems with equationally-definable state space, a Hankel matrix has finite rank if and only if it has an Artinian, Noetherian realization.
  • Keywords
    Equations; Information science; Linear systems; Mathematics; Modules (abstract algebra); Nonlinear systems; Polynomials; Roentgenium; State-space methods;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Decision and Control including the 15th Symposium on Adaptive Processes, 1976 IEEE Conference on
  • Conference_Location
    Clearwater, FL, USA
  • Type

    conf

  • DOI
    10.1109/CDC.1976.267665
  • Filename
    4045773