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      The Routh–Hurwitz conditions of fractional type in stability analysis of the Lorenz dynamical system

      Author(s): ,
      Publication date (Electronic):
      Journal: Nonlinear Dynamics
      Publisher: Springer Science and Business Media LLC

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          Chaotic dynamics of the fractional Lorenz system.

          Elena Grigorenko, Ilia Grigorenko (2003)
          In this Letter we introduce a generalization of the Lorenz dynamical system using fractional derivatives. Thus, the system can have an effective noninteger dimension Sigma defined as a sum of the orders of all involved derivatives. We found that the system with Sigma<3 can exhibit chaotic behavior. A striking finding is that there is a critical value of the effective dimension Sigma(cr), under which the system undergoes a transition from chaotic dynamics to regular one.
          Article 0 comments Cited 114 times – based on 0 reviews     Review now
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            On some Routh–Hurwitz conditions for fractional order differential equations and their applications in Lorenz, Rössler, Chua and Chen systems

            E. Ahmed, A.M.A El-Sayed, Hala El-Saka (2006)
            Article 0 comments Cited 100 times – based on 0 reviews     Review now
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              Fractional-Order Nonlinear Systems

              Ivo Petras (2011)
              Book 0 comments Cited 84 times – based on 0 reviews
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                Author and article information

                Journal
                Title: Nonlinear Dynamics
                Abbreviated Title: Nonlinear Dyn
                Publisher: Springer Science and Business Media LLC
                ISSN (Print): 0924-090X
                ISSN (Electronic): 1573-269X
                Publication date Created: January 2017
                Publication date (Electronic): September 24 2016
                Publication date (Print): January 2017
                Volume: 87
                Issue: 2
                Pages: 939-954
                Article
                DOI: 10.1007/s11071-016-3090-9
                SO-VID: 66d8d801-51e5-4c83-92a6-c49172f53537
                Copyright © © 2017
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                http://www.springer.com/tdm

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