Renormalisation in area-preserving maps
Author(s)
Bibliographic Information
Renormalisation in area-preserving maps
(Advanced series in nonlinear dynamics, v. 6)
World Scientific, c1993
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Note
Includes bibliographical references
Description and Table of Contents
Description
This book is adapted and revised from the author's seminal PhD thesis, in which two forms of asymptotically universal structure were presented and explained for area-preserving maps. Area-preserving maps are the discrete-time analogue of two degree-of-freedom Hamiltonian systems. How they work and much of their dynamics are described in this book. The asymptotically universal structure is found on small scales in phase-space and long time-scales. The key to understanding it is renormalisation, that is, looking at a system on successively smaller phase-space and longer time scales. Having presented this idea, the author briefly surveys the use of the idea of renormalisation in physics. The renormalisation picture is then presented as the key to understanding the transition from regular to chaotic motion in area-preserving maps. Although written ten years ago, the subject matter continues to interest many today. This updated version will be useful to both researchers and students.
Table of Contents
- Part 1 Introduction to area-preserving maps: conservative systems and maps
- periodic orbits
- invariant circles
- stochastic behaviour. Part 2 Introduction to renormalization: renormalization in physics
- renormalization in dynamical systems
- renormalization techniques. Part 3 Period doubling in area-preserving maps: period doubling sequencers
- renormalization
- the universal one parameter family
- appendices. Part 4 Renormalization for invariant circles: renormalization
- fixed point analysis
- simple fixed point
- critical fixed point
- the universal one parameter family
- discussion
- renormalization for maps on a circle.
by "Nielsen BookData"