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Journal of Difference Equations and Applications Volume 12, 2006 - Issue 3-4
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Original Articles

Li–Yorke chaos in higher dimensions: a review

Peter Kloeden J.W. Goethe-Universität, Faculty of Mathematics, 60054, Frankfurt a.M., GermanyCorrespondence[email protected]
&
Zhong Li FernUniversität in Hagen, Faculty of Electrical and Computer Engineering, 58084, Hagen, GermanyView further author information
Pages 247-269 | Received 24 Nov 2005, Accepted 09 Jan 2006, Published online: 31 Aug 2006

References

  • Aulbach , B. and Kieninger , B. 2001 . On three definitions of chaos . Nonlinear Dynamics and Systems Theory , 1 : 23 – 37 .
  • Aulbach , B. and Kieninger , B. 2004 . An elementary proof for hyperbolicity and chaos of the logistic maps . Journal of Difference Equations and Applications , 10 : 1243 – 1250 .
  • Banks , J. , Brooks , J. , Cairns , G. , Davis , G. and Stacey , P. 1992 . On the Devaney's definition of chaos . American Mathematical Monthly , 99 ( 4 ) : 332 – 334 .
  • Barna , B. 1975 . Über die iterationen reeler funktionen III . Publicationes Mathematicae Debrecen , 22 : 269 – 278 .
  • Čelikovský , S. and Chen , G. 2002 . On a generalized Lorenz canonical form of chaotic systems . International Journal of Bifurcations and Chaos , 12 ( 8 ) : 1789 – 1812 .
  • Chen , G. , Hsu , S. and Zhou , J. 1998 . Snap-back repellers as a cause of chaotic vibration of hte wave equation with a Van de Pol boundary condition and energy injection at the middle of the span . Journal of Mathematical Physics , 39 ( 12 ) : 6459 – 6489 .
  • Chen , G. and Ueta , T. 1999 . Yet another chaotic attractor . International Journal of Bifurcations and Chaos , 9 : 1465 – 1466 .
  • Devaney , R. 1989 . An Introduction to Chaotic Dynamical Systems , New York : Addison-Wesley Publishing Co. .
  • Devaney , R. 1992 . A First Course in Chaotic Dynamical Systems: Theory and Experiment , Cambridge, MA : Perseus Books .
  • Diamond , P. 1976 . Chaotic behavior of systems of differnce equations . International Journal of Systems Science , 7 : 953 – 956 .
  • Diamond , P. and Kloeden , P.E. 1990 . Characterization of compact subsets of fuzzy sets . Fuzzy Sets and Systems , 35 : 241 – 249 .
  • Diamond , P. and Kloeden , P.E. 1994 . Metric Spaces of Fuzzy Sets: Theory and Applications , Singapore : World Scientific .
  • Du , B.S. 2005 . On the invariance of Li–Yorke chaos of interval maps . Journal of Difference Equations and Applications ,
  • Guckenheimer , J. , Oster , G. and Ipaktachi , A. 1977 . The dynamics of density dependent population models . Journal of Mathematical Biology , 4 : 101 – 147 .
  • Hénon , M. 1976 . A two-dimensional mapping with a strange attractor . Communications in Mathematical Physics , 50 : 69 – 77 .
  • Kaleva , O. 1985 . On the convergence of fuzzy sets . Fuzzy Sets and Systems , 17 : 53 – 65 .
  • Kloeden , P.E. 1976 . Chaotic difference equations are dense . Bulletin of the Australian Mathematical Society , 15 : 37l – 380 .
  • Kloeden , P.E. 1979 . On Sharkovsky's cycle coexistence ordering . Bulletin of the Australian Mathematical Society , 20 : 171 – 177 .
  • Kloeden , P.E. 1981 . Chaotic difference equations in ℝn . Journal of the Australian Mathematical Society (Series A) , 31 : 217 – 225 .
  • Kloeden , P.E. 1984 . “ Cycles and chaos in higher dimensional difference equations ” . In Proceedings of the 9th International Conference Nonlinear Oscillations Edited by: Mitropolsky , Yu. A. Vol. 2 , 184 – 187 . (Kiev Naukova Dumka)
  • Kloeden , P.E. 1991 . Chaotic iterations of fuzzy sets . Fuzzy Sets and Systems , 42 ( 1 ) : 37 – 42 .
  • Kloeden , P.E. , Deakin , M. and Tirkel , A. 1976 . A precise definition of chaos . Nature , 264 : 295
  • Kloeden , P. and Li , Z. 2006 . “ Beyond the Li–Yorke definition of chaos ” . In Integration of Fuzzy Logic and Chaos Theory , Edited by: Li , Halang and Chen . Heidelberg : Springer-Verlag .
  • Kloeden , P.E. and Mees , A.I. 1985 . Chaotic phenomena . Bulletin of the Mathematical Biology , 47 : 697 – 738 .
  • Kolyada , S.F. 2004 . Li–Yorke sensitivity and other concepts of chaos . Ukrainian Mathematical Journal , 56 ( 8 ) : 1242 – 1257 .
  • Li , C.P. and Chen , G. 2003 . An improved version of the Marotto theorem . Chaos, Solitons and Fractals , 18 : 69 – 77 .
  • Li , T.Y. and Yorke , J.A. 1975 . Period three implies chaos . American Mathematical Monthly , 82 : 481 – 485 .
  • Lin , W. , Ruan , J. and Zhou , W. 2002 . On the mathematical clarification of the snapback repeller in high-dimensional systems and chaos in a discrete neural network model . International Journal of Bifurcations and Chaos , 12 ( 5 ) : 1129 – 1139 .
  • Lorenz , E.N. 1963 . Deterministic nonperiodic flow . Journal of Atmospheric Sciences , 20 : 130 – 141 .
  • Marotto , F.R. 1978 . Snap-back repellers imply chaos in ℝn . Journal of Mathematical Analysis and Applications , 63 : 199 – 223 .
  • May , R.M. 1976 . Simple mathematical models with very complicated dynamics . Nature , 261 : 459 – 467 .
  • Piorek , J. 1985 . On the generic chaos in dynamical systems . Universitatis Iagellonicae Acta Mathematica , 25 : 293 – 298 .
  • Sharkovsky , A.N. 1964 . Coexistence of cycles of a continuous transformation of a line into itself . Ukrainian Mathematical Journal , 16 ( 1 )
  • Sharkovsky , A.N. 1965 . On cycles and the structure of a continuous transformation . Ukrainian Mathematical Journal , 17 ( 3 ) : 104 – 111 .
  • Shi , Y.M. and Chen , G. 2004 . Chaos of discrete dynamical systems in complete metric spaces . Chaos, Solitons and Fractals , 22 : 555 – 571 .
  • Shi , Y.M. and Chen , G. 2004 . Discrete chaos in Banach spaces . Science in China Series A: Mathematics , 34 : 595 – 609 .
  • Shiraiwa , K. and Kurata , M. 1981 . A generalization of a theorem of Marroto . Nagoya Mathematical Journal , 82 : 83 – 97 .
  • Silva , C.P. 1993 . Shil'nikov theorem—a tutorial . IEEE Transactions on Circuits and Systems-I , 40 : 675 – 682 .
  • Smale , S. 1967 . Differentiable dynamical systems . Bulletin of the Mathematical Society , 73 : 747 – 817 .
  • Stein , P.R. and Ulam , S.M. 1964 . Nonlinear transformation studies on electronic computers . Rozprawy Matematyczne XXXIX , : 1 – 65 .
  • Stewart , I. Aug. 2000 . The Lorenz attractor exists . Nature , 406 : 948 – 949 .
  • Tucker , W. 1999 . The Lorenz attractor exists . Comptes Rendus de l'Acadõmie des Sciences , 328 : 1197 – 1202 .
  • Vellekoop , M. and Berglund , R. 1994 . On Intervals, Transitivity = Chaos . American Mathematical Monthly , 101 ( 4 ) : 353 – 355 .
  • Zhou , T. , Tang , Y. and Chen , G. 2004 . Chen's attractor exists . International Journal of Bifurcations and Chaos , 14 ( 9 ) : 3167 – 3177 .
  • Zhou , T. , Chen , G. and Čelikovský , S. 2005 . Š i'lnikov chaos in the generalized Lorenz canonical form of dynamical systems . Nonlinear Dynamics , 39 : 319 – 334 .

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