Arnold Diffusion for Smooth Systems of Two and a Half Degrees of Freedom

Arnold Diffusion for Smooth Systems of Two and a Half Degrees of Freedom
Author :
Publisher : Princeton University Press
Total Pages : 219
Release :
ISBN-10 : 9780691204932
ISBN-13 : 0691204934
Rating : 4/5 (934 Downloads)

Book Synopsis Arnold Diffusion for Smooth Systems of Two and a Half Degrees of Freedom by : Vadim Kaloshin

Download or read book Arnold Diffusion for Smooth Systems of Two and a Half Degrees of Freedom written by Vadim Kaloshin and published by Princeton University Press. This book was released on 2020-11-03 with total page 219 pages. Available in PDF, EPUB and Kindle. Book excerpt: The first complete proof of Arnold diffusion—one of the most important problems in dynamical systems and mathematical physics Arnold diffusion, which concerns the appearance of chaos in classical mechanics, is one of the most important problems in the fields of dynamical systems and mathematical physics. Since it was discovered by Vladimir Arnold in 1963, it has attracted the efforts of some of the most prominent researchers in mathematics. The question is whether a typical perturbation of a particular system will result in chaotic or unstable dynamical phenomena. In this groundbreaking book, Vadim Kaloshin and Ke Zhang provide the first complete proof of Arnold diffusion, demonstrating that that there is topological instability for typical perturbations of five-dimensional integrable systems (two and a half degrees of freedom). This proof realizes a plan John Mather announced in 2003 but was unable to complete before his death. Kaloshin and Zhang follow Mather's strategy but emphasize a more Hamiltonian approach, tying together normal forms theory, hyperbolic theory, Mather theory, and weak KAM theory. Offering a complete, clean, and modern explanation of the steps involved in the proof, and a clear account of background material, this book is designed to be accessible to students as well as researchers. The result is a critical contribution to mathematical physics and dynamical systems, especially Hamiltonian systems.


Arnold Diffusion for Smooth Systems of Two and a Half Degrees of Freedom Related Books

Arnold Diffusion for Smooth Systems of Two and a Half Degrees of Freedom
Language: en
Pages: 219
Authors: Vadim Kaloshin
Categories: Science
Type: BOOK - Published: 2020-11-03 - Publisher: Princeton University Press

DOWNLOAD EBOOK

The first complete proof of Arnold diffusion—one of the most important problems in dynamical systems and mathematical physics Arnold diffusion, which concerns
Hamiltonian Systems
Language: en
Pages: 378
Authors: Albert Fathi
Categories: Mathematics
Type: BOOK - Published: 2024-05-09 - Publisher: Cambridge University Press

DOWNLOAD EBOOK

Dynamical systems that are amenable to formulation in terms of a Hamiltonian function or operator encompass a vast swath of fundamental cases in applied mathema
Topics in Dynamics and Ergodic Theory
Language: en
Pages: 276
Authors: Sergey Bezuglyi
Categories: Mathematics
Type: BOOK - Published: 2003-12-08 - Publisher: Cambridge University Press

DOWNLOAD EBOOK

This book contains a collection of survey papers by leading researchers in ergodic theory, low-dimensional and topological dynamics and it comprises nine chapte
A Dynamical Systems Theory of Thermodynamics
Language: en
Pages: 744
Authors: Wassim M. Haddad
Categories: Mathematics
Type: BOOK - Published: 2019-06-04 - Publisher: Princeton University Press

DOWNLOAD EBOOK

A brand-new conceptual look at dynamical thermodynamics This book merges the two universalisms of thermodynamics and dynamical systems theory in a single compen
Kam Story, The: A Friendly Introduction To The Content, History, And Significance Of Classical Kolmogorov-arnold-moser Theory
Language: en
Pages: 378
Authors: H Scott Dumas
Categories: Mathematics
Type: BOOK - Published: 2014-02-28 - Publisher: World Scientific Publishing Company

DOWNLOAD EBOOK

This is a semi-popular mathematics book aimed at a broad readership of mathematically literate scientists, especially mathematicians and physicists who are not