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Shadowing and Hyperbolicity de Sergei Yu Pilyugin

Shadowing and Hyperbolicity: Lecture Notes in Mathematics, cartea 2193

Autor Sergei Yu Pilyugin, Kazuhiro Sakai
en Limba Engleză Paperback – 2 sep 2017
Focusing on the theory of shadowing of approximate trajectories (pseudotrajectories) of dynamical systems, this book surveys recent progress in establishing relations between shadowing and such basic notions from the classical theory of structural stability as hyperbolicity and transversality.
Special attention is given to the study of "quantitative" shadowing properties, such as Lipschitz shadowing (it is shown that this property is equivalent to structural stability both for diffeomorphisms and smooth flows), and to the passage to robust shadowing (which is also equivalent to structural stability in the case of diffeomorphisms, while the situation becomes more complicated in the case of flows).
Relations between the shadowing property of diffeomorphisms on their chain transitive sets and the hyperbolicity of such sets are also described.
The book will allow young researchers in the field of dynamical systems to gain a better understanding of new ideas in the global qualitative theory. It will also be of interest to specialists in dynamical systems and their applications.
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Specificații

ISBN-13: 9783319651835
ISBN-10: 3319651838
Pagini: 218
Ilustrații: XIV, 218 p. 5 illus.
Dimensiuni: 155 x 235 x 15 mm
Greutate: 3.58 kg
Ediția:1st ed. 2017
Editura: Springer International Publishing
Colecția Springer
Seria Lecture Notes in Mathematics

Locul publicării:Cham, Switzerland

Cuprins

Preface.- 1 Main Definitions and Basic Results.- Lipschitz and H¨older Shadowing and Structural Stability.- 3 C1 interiors of Sets of Systems with Various Shadowing Properties.- 4 Chain Transitive Sets and Shadowing.- References.- Index.

Recenzii

“The book is clearly written and appropriate both for advanced graduate students in the area and for researchers working or being interested in the field.” (Christian Pötzsche, zbMATH 1426.37004, 2020)

“This book gives an up-to-date account of results on the relations between shadowing and such basic notions from the classical theory of structural stability as hyperbolicity and transversality. … The style of presentation is very clear and, in my opinion, the book is quite suitable for researchers in the field of dynamical systems to understand the global qualitative theory from different points of view.” (Yujun Zhu, Mathematical Reviews, July, 2018)

Textul de pe ultima copertă

Focusing on the theory of shadowing of approximate trajectories (pseudotrajectories) of dynamical systems, this book surveys recent progress in establishing relations between shadowing and such basic notions from the classical theory of structural stability as hyperbolicity and transversality. Special attention is given to the study of "quantitative" shadowing properties, such as Lipschitz shadowing (it is shown that this property is equivalent to structural stability both for diffeomorphisms and smooth flows), and to the passage to robust shadowing (which is also equivalent to structural stability in the case of diffeomorphisms, while the situation becomes more complicated in the case of flows).
Relations between the shadowing property of diffeomorphisms on their chain transitive sets and the hyperbolicity of such sets are also described.
The book will allow young researchers in the field of dynamical systems to gain a better understanding of new ideas in the global qualitative theory. It will also be of interest to specialists in dynamical systems and their applications.

Caracteristici

Provides a survey of current research and new approaches in the theory of shadowing of approximate trajectories of dynamical systems Contains novelty approach for proving hyperbolicity by using the sifting method of Liao, which is both powerful and self-contained A main feature is the direct, straightforward approach to the results, well written, in an easy-to-read, comfortable pace Can be used right after a course of introduction to dynamical systems or even hyperbolic dynamics Includes supplementary material: sn.pub/extras