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Chaotic dynamics in nonlinear theory

Using phase–plane analysis, findings from the theory of topological horseshoes and linked-twist maps, this book presents a novel method to prove the existence of chaotic dynamics. In dynamical systems, complex behavior in a map can be indicated by showing the existence of a Smale-horseshoe-like stru...

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Detalles Bibliográficos
Autor principal: Burra, Lakshmi
Lenguaje:eng
Publicado: Springer 2014
Materias:
Acceso en línea:https://dx.doi.org/10.1007/978-81-322-2092-3
http://cds.cern.ch/record/1952407
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author Burra, Lakshmi
author_facet Burra, Lakshmi
author_sort Burra, Lakshmi
collection CERN
description Using phase–plane analysis, findings from the theory of topological horseshoes and linked-twist maps, this book presents a novel method to prove the existence of chaotic dynamics. In dynamical systems, complex behavior in a map can be indicated by showing the existence of a Smale-horseshoe-like structure, either for the map itself or its iterates. This usually requires some assumptions about the map, such as a diffeomorphism and some hyperbolicity conditions. In this text, less stringent definitions of a horseshoe have been suggested so as to reproduce some geometrical features typical of the Smale horseshoe, while leaving out the hyperbolicity conditions associated with it. This leads to the study of the so-called topological horseshoes. The presence of chaos-like dynamics in a vertically driven planar pendulum, a pendulum of variable length, and in other more general related equations is also proved.
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spelling cern-19524072021-04-21T20:52:16Zdoi:10.1007/978-81-322-2092-3http://cds.cern.ch/record/1952407engBurra, LakshmiChaotic dynamics in nonlinear theoryMathematical Physics and MathematicsUsing phase–plane analysis, findings from the theory of topological horseshoes and linked-twist maps, this book presents a novel method to prove the existence of chaotic dynamics. In dynamical systems, complex behavior in a map can be indicated by showing the existence of a Smale-horseshoe-like structure, either for the map itself or its iterates. This usually requires some assumptions about the map, such as a diffeomorphism and some hyperbolicity conditions. In this text, less stringent definitions of a horseshoe have been suggested so as to reproduce some geometrical features typical of the Smale horseshoe, while leaving out the hyperbolicity conditions associated with it. This leads to the study of the so-called topological horseshoes. The presence of chaos-like dynamics in a vertically driven planar pendulum, a pendulum of variable length, and in other more general related equations is also proved.Springeroai:cds.cern.ch:19524072014
spellingShingle Mathematical Physics and Mathematics
Burra, Lakshmi
Chaotic dynamics in nonlinear theory
title Chaotic dynamics in nonlinear theory
title_full Chaotic dynamics in nonlinear theory
title_fullStr Chaotic dynamics in nonlinear theory
title_full_unstemmed Chaotic dynamics in nonlinear theory
title_short Chaotic dynamics in nonlinear theory
title_sort chaotic dynamics in nonlinear theory
topic Mathematical Physics and Mathematics
url https://dx.doi.org/10.1007/978-81-322-2092-3
http://cds.cern.ch/record/1952407
work_keys_str_mv AT burralakshmi chaoticdynamicsinnonlineartheory