Results 341 to 350 of about 2,912,421 (388)
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Nonlinear Discrete Dynamical Systems
2001Most of the dynamics displayed by highly complicated nonlinear systems also appear for simple nonlinear systems. The reader is first introduced to the tent function, which is composed of two straight lines. The graphical method of iteration is introduced using this simple function since the constructions may be easily carried out with graph paper, rule,
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Box dimension and bifurcations of one-dimensional discrete dynamical systems
, 2011This paper is devoted to study the box dimension of the orbits of one-dimensional discrete dynamical systems and their bifurcations in nonhyperbolic fixed points. It is already known that there is a connection between some bifurcations in a nonhyperbolic
L. H. Dmitrović
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A Ying-Yang Theory in Nonlinear Discrete Dynamical Systems
International Journal of Bifurcation and Chaos in Applied Sciences and Engineering, 2010This paper presents a Ying–Yang theory for nonlinear discrete dynamical systems considering both positive and negative iterations of discrete iterative maps.
A. Luo
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Discrete Dispersive Dynamical Systems
2021In this chapter we study turnpike properties for a discrete dispersive dynamical system generated by set-valued mappings which was introduced by A. M. Rubinov in 1980. This dispersive dynamical system has a prototype in mathematical economics. In particular, it is an abstract extension of the classical von Neumann–Gale model.
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A representation of discrete event dynamical systems
Proceedings of 32nd IEEE Conference on Decision and Control, 2002The problem of determining a representation of the state dynamics associated to a generator of formal language, which models a discrete event dynamical system, is addressed. A definition of independence between states of the generator is formulated, based on the languages generated starting from these states.
DE SANTIS, Elena, DI GENNARO, Stefano
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, 2012
• A sequence is a function whose domain is the set of all nonnegative integers and whose range is a subset of the real numbers. • A dynamical system is a relationship among the terms in a sequence. • A numerical solution is a table of values that satisfy
G. Teschl
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• A sequence is a function whose domain is the set of all nonnegative integers and whose range is a subset of the real numbers. • A dynamical system is a relationship among the terms in a sequence. • A numerical solution is a table of values that satisfy
G. Teschl
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Chaotification of Discrete Dynamical Systems in Banach Spaces
International Journal of Bifurcation and Chaos in Applied Sciences and Engineering, 2006This paper is concerned with chaotification of discrete dynamical systems in Banach spaces via feedback control techniques. A criterion of chaos in Banach spaces is first established. This criterion extends and improves the Marotto theorem.
Yuming Shi, P. Yu, Guanrong Chen
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Dynamics of Some Rational Discrete Dynamical Systems via Invariants
International Journal of Bifurcation and Chaos in Applied Sciences and Engineering, 2006We consider several discrete dynamical systems for which some invariants can be found. Our study includes complex Mobius transformations as well as the third-order Lyness recurrence.
A. Cima, A. Gasull, Víctor Mañosa
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Introduction to discrete dynamical systems and chaos
, 1999Discrete Dynamical Systems. One-Dimensional Dynamical Systems. R ~ q, Matrices, and Functions. Discrete Linear Dynamical Systems. Nonlinear Dynamical Systems. Chaotic Behavior. Analysis of Four Dynamical Systems. Appendices. Index.
M. Martelli
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Chaotification of Discrete Dynamical Systems Governed by Continuous Maps
International Journal of Bifurcation and Chaos in Applied Sciences and Engineering, 2005This paper is concerned with chaotification of discrete dynamical systems in finite-dimensional real spaces, via feedback control techniques. A chaotification theorem for one-dimensional discrete dynamical systems and a chaotification theorem for general
Yuming Shi, Guanrong Chen
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