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＜E-Book＞
Dynamics of One-Dimensional Maps / by A.N. Sharkovsky, S.F. Kolyada, A.G. Sivak, V.V. Fedorenko
(Mathematics and Its Applications ; 407)

Edition	1st ed. 1997.
Publisher	Dordrecht : Springer Netherlands : Imprint: Springer
Year	1997
Language	English
Size	IX, 262 p : online resource
Authors	*Sharkovsky, A.N author Kolyada, S.F author Sivak, A.G author Fedorenko, V.V author SpringerLink (Online service)
Subjects	LCSH:Global analysis (Mathematics) LCSH:Manifolds (Mathematics) LCSH:Measure theory LCSH:Differential equations FREE:Global Analysis and Analysis on Manifolds FREE:Measure and Integration FREE:Differential Equations
Notes	Contets -- 1. Fundamental Concepts of the Theory of Dynamical Systems. Typical Examples and Some Results -- 2. Elements of Symbolic Dynamics -- 3. Coexistence of Periodic Trajectories -- 4. Simple Dynamical Systems -- 5. Topological Dynamics of Unimodal Maps -- 6. Metric Aspects of Dynamics -- 7. Local Stability of Invariant Sets. Structural Stability of Unimodal Maps -- 8. One-Parameter Families of Unimodal Maps -- References -- Notation maps whose topological entropy is equal to zero (i.e., maps that have only cyeles of pe­ 2 riods 1,2,2 , ... ) are studied in detail and elassified. Various topological aspects of the dynamics of unimodal maps are studied in Chap­ ter 5. We analyze the distinctive features of the limiting behavior of trajectories of smooth maps. In particular, for some elasses of smooth maps, we establish theorems on the number of sinks and study the problem of existence of wandering intervals. In Chapter 6, for a broad elass of maps, we prove that almost all points (with respect to the Lebesgue measure) are attracted by the same sink. Our attention is mainly focused on the problem of existence of an invariant measure absolutely continuous with respect to the Lebesgue measure. We also study the problem of Lyapunov stability of dynamical systems and determine the measures of repelling and attracting invariant sets. The problem of stability of separate trajectories under perturbations of maps and the problem of structural stability of dynamical systems as a whole are discussed in Chap­ ter 7. In Chapter 8, we study one-parameter families of maps. We analyze bifurcations of periodic trajectories and properties of the set of bifurcation values of the parameter, in­ eluding universal properties such as Feigenbaum universality HTTP:URL=https://doi.org/10.1007/978-94-015-8897-3

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