• DocumentCode
    1804125
  • Title

    Folded sums of chaotic trajectories distribute uniformly

  • Author

    Callegari, S. ; Rovatti, R. ; Setti, G.

  • Author_Institution
    CEG-DEIS, Bologna Univ., Italy
  • Volume
    3
  • fYear
    2002
  • fDate
    2002
  • Abstract
    We investigate the properties of a process where the subsequent values assumed by the state of a chaotic map are summed to each other and the result is constrained within a finite domain by a folding operation. It is found that the limit distribution is always uniform, that the folded sums tend to be independent of the future evolution of the chaotic trajectory and that, whenever the map state is multi-dimensional, the folded sum vectors tend to be made of independent components. As an example, an application to the formal derivation of the spectrum of chaotically frequency modulated signals is also reported.
  • Keywords
    chaos; frequency modulation; multidimensional signal processing; nonlinear functions; spectral analysis; vectors; FM signals; chaotic map state values; chaotic trajectory folded sums uniform distribution; chaotic trajectory future evolution; chaotically frequency modulated signal spectrum derivation; finite domain constraints; folded sum vectors; folding operations; independent vector components; multi-dimensional map state; nonlinear functions; subsequent value summing; uniform limit distribution; Chaos; Character generation; Feeds; Frequency modulation; Gaussian distribution; Phase modulation; Probability; Quantization; Random processes; Trajectory;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Circuits and Systems, 2002. ISCAS 2002. IEEE International Symposium on
  • Print_ISBN
    0-7803-7448-7
  • Type

    conf

  • DOI
    10.1109/ISCAS.2002.1010368
  • Filename
    1010368