Abstract
With the use of specialmultivalued functions, we give a description of nonwandering set of C 1-smooth skewproducts of maps of an interval with Ω-stable quotient map of the type ≻ 2∞.
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References
Katok, A., Hasselblatt, B. Introduction to the Modern Theory of Dynamical Systems (Cambridge University Press, Cambridge, 1997; Faktorial, Moscow, 1999).
Arteaga, C. “Smooth Triangular Maps of the Square With Closed Set of Periodic Points”, J. Math. Anal. and Appl. 196, 987–997 (1995).
Kupka, J. “The Triangular MapsWith Closed Sets of Periodic Points”, J. Math. Anal. and Appl. 319, 302–314 (2006).
Efremova, L. S. “On the Nonwandering Set and the Center of Triangular Maps With Closed Set of Periodic Points in the Base”, Dynamic Systems and Nonlinear Phenomena (Inst. Math. NAS Ukraine, Kiev, 1990). pp. 15–25 [in Russian].
Efremova, L. S. “On the Nonwandering Set and Center of Some Skew Products ofMappings of the Interval”, Russian Mathematics (Iz. VUZ) 50, No. 10, 17–25 (2006).
Guirao, J. L. G., Pelao, F. L. “On Skew ProductMaps with the Base Having a Closed Set of Periodic Points”, Intern. J. Comput. Math. 83, 441–445 (2008).
Guirao, J. L. G., Rubio, R. G. “Nonwandering Set of Skew Product Maps with Base Having Closed Set of Periodic Points”, J. Math. Anal. and Appl. 362, 350–354 (2010).
Efremova, L. S. “Remarks on the Nonwandering Set of Skew ProductsWith a Closed Set of Periodic Points of the Quotient Map”, Nonlinear Maps and Their Applic. Springer Proc. in Math. and Statist. 57, 39–58 (2014).
Jakobson, M. V. “On Smooth Mappings of the Circle Into Itself”, Mathematics of the USSR–Sbornik 14, 161–185 (1971).
Efremova, L. S. “On the Concept of Ω-Function for the Skew Product of Interval Mappings”, J. Math. Sci. (New York) 105, 1779–1798 (2001).
Kuratowski, K. Topology (InstytutMatematyczny, PAN, Warszawa, 1933; Mir, Moscow, 1966). Vol. 1.
Efremova, L. S. “A Decomposition Theorem for the Space of C 1-Smooth Skew ProductsWith Complicated Dynamics of the QuotientMap”, Sbornik: Mathematics (2013). 204, No. 11, 1598–1623 (2013).
Efremova, L. S. “Periodic Isometries of Discrete Semi-Dynamical Systems”, Candidate’s Dissertation in Mathematics and Physics (Gorky, 1981).
Coven, E. M., Nitecki, Z. “Nonwandering Sets of the Powers of Maps of the Interval”, Ergod. Theory and Dynam. Syst. 1, 9–31 (1981).
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Original Russian Text © L.S. Efremova, 2016, published in Izvestiya Vysshikh Uchebnykh Zavedenii. Matematika, 2016, No. 2, pp. 93–98.
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Efremova, L.S. Multivalued functions and nonwandering set of skew products of maps of an interval with complicated dynamics of quotient map. Russ Math. 60, 77–81 (2016). https://doi.org/10.3103/S1066369X16020122
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DOI: https://doi.org/10.3103/S1066369X16020122