Abstract
We construct an example of the skew product on n-dimensional cell with transitive but not totally transitive n-dimensional attractor.
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Anishchenko, V. S., Astakhov, V. V., Vadivasova, T. E., Neiman, A. B., Strelkova, G. I., Shimansky-Geyer, L. Nonlinear Effects in Chaotic and Stochastic Systems (Inst. Komp. Issled., Moscow–Izhevsk, 2003) [in Russian].
Efremova, L. S. “Example of the Smooth Skew Product in the Plane with the One-Dimensional Ramified Continuum as the Global Attractor”, Proc. of ESAIM36, 15–24 (2012).
Efremova, L. S. “Differential Properties and Attracting Sets of a Simplest Skew Product of Interval Maps”, Sbornik: Mathematics 201, No. 6, 873–907 (2010).
Volk, D. “Persistent Massive Attractors of Smooth Maps”, Ergodic Theory and Dynamical Systems 34, No. 2, 693–704 (2014).
Viana, M. “Multidimensional Nonhyperbolic Attractors”, Publ.Math. de L’IHES 85, No. 1, 63–96 (1997).
Bamon, R., Kiwi, J., Rivera-Letelier, J., Urzua, R. “On the Topology of Solenoidal Attractors of the Cylinder”, Annales de l’Institut Henri Poincaré. Nonlinear Anal. 23, No. 2, 209–236 (2006).
de Melo, W., van Strienm, S. One-Dimensional Dynamics (Springer, 1996).
Katok, A., Hasselblatt, B. Introduction to the Modern Theory of Dynamical Systems (Cambridge Univ. Press, Cambridge, 1995; Factorial,Moscow, 1999).
Alseda, Ll., Del Rio, M. A., Rodriguez, J. A. “A Survey on the Relation Between Transitivity and Dense Periodicity for GraphMaps”, JDEA9, No. 3–4, 281–288 (2003).
Efremova, L. S., Fil’chenkov, A. S. “Boundary Conditions forMaps in Fibers and Topological Transitivity of Skew Products of Interval Maps”, J. Math. Sci. (NY) 208, No. 1, 109–114 (2015).
D’yakonov, V. P. Encyclopedia of Computer Algebra (DMK-Press,Moscow, 2009) [in Russian].
Sharkovskii, A. N., Maistrenko, Yu. L., Romanenko, E. Yu. Difference Equations and Their Applications (Naukova Dumka, Kiev, 1986) [in Russian].
Kurosh, A. G. Higher Algebra (Nauka, Moscow, 1968) [in Russian].
Zorich, V. A. Mathematical Analysis (Fazis,Moscow, 1997) [in Russian].
Broer, H. W., Dumortier, F., van Strien, S., Takens, F. Structures in Dynamics: Finite Dimensional Deterministic Studies (North-Holland, Amsterdam, 1991; Inst. Komp. Issled.,Moscow–Izhevsk, 2003).
Devaney R. An Introduction to Chaotic Dynamical Systems (Addison-Wesley, 1989).
Banks, J., Brooks, J., Cairns, G., Davis, G., Stacey, P. “On Devaney’sDefinition of Chaos”, The Amer.Math. Monthly 99, No. 4, 332–334 (1992).
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Original Russian Text © A.S. Fil’chenkov, 2016, published in Izvestiya Vysshikh Uchebnykh Zavedenii. Matematika, 2016, No. 6, pp. 91–100.
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Fil’chenkov, A.S. The skew product on n-dimensional cell with transitive but not totally transitive n-dimensional attractor. Russ Math. 60, 79–87 (2016). https://doi.org/10.3103/S1066369X16060104
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DOI: https://doi.org/10.3103/S1066369X16060104