International Journal of Science, Technology and Society

Special Issue

Recent Advances in Fractional-order Discrete/Continuous Systems

  • Submission Deadline: May 01, 2022
  • Status: Submission Closed
  • Lead Guest Editor: Iqbal Batiha
About This Special Issue
Investigating chaotic dynamics has acquired significant consideration over the last few years. Numerous endeavors have been dedicated to exploring the traditional systems (outlined by differential or difference equations of integer-order) as well as fractional-order systems (outlined by differential or difference equations of fractional-order). Regardless of the type of system, chaos can appear in the form of "hidden attractors" or "self-excited attractors". On the first occasion, the initial conditions are situated near the saddle points of the motion for the purpose of getting chaos, whereas on the last occasion, the initial conditions may only be set up via wide range of computer-based search, given that the corresponding dynamic systems are distinguished by the presence of stable equilibrium points or else by the absence of them at all. In general, the fractional-order discrete/continuous systems have recently received significant consideration by many researchers due to the wide range of their applications in applied science and engineering areas. In particular, their infinite memory characteristic allows modeling their general form very flexibly, which surely leads to acquiring a higher degree of chaotic behavior. This, actually, increases their appropriateness in several applications especially in data encryption, secure communications, and control theory. From this point of view, this Special Issue intends to develop different schemes and approaches to deal with such systems in terms of deeply studying their chaotic modes.

Keywords:

  1. Chaotic Fractional Order Discrete/Continuous Systems
  2. Stability of Fractional-Order Discrete/Continuous Systems
  3. Self-Excited Chaos Attractors
  4. Hidden Chaos Attractors
  5. Coexisting Chaos Attractors
  6. Secure Communications
  7. Data Encryption
  8. Chaotic Tests, Like The 0-1 Test and the Approximate Entropy (Apen) Test
  9. Control Method of Stabilization
  10. Chaotic Synchronization
Lead Guest Editor
  • Iqbal Batiha

    Department of Mathematics, Faculty of Science and Technology, Irbid National University, Irbid, Jordan