Hyperbolic dynamics and Brownian motion : an introduction
著者
書誌事項
Hyperbolic dynamics and Brownian motion : an introduction
(Oxford mathematical monographs)(Oxford science publications)
Oxford University Press, 2012
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注記
Includes bibliographical references (p. [249]-254) and index
内容説明・目次
内容説明
Hyperbolic Dynamics and Brownian Motion illustrates the interplay between distinct domains of mathematics. There is no assumption that the reader is a specialist in any of these domains: only basic knowledge of linear algebra, calculus and probability theory is required.
The content can be summarized in three ways:
Firstly, this book provides an introduction to hyperbolic geometry, based on the Lorentz group. The Lorentz group plays, in relativistic space-time, a role analogue to the rotations in Euclidean space. The hyperbolic geometry is the geometry of the unit pseudo-sphere. The boundary of the hyperbolic space is defined as the set of light rays. Special attention is given to the geodesic and horocyclic flows. Hyperbolic geometry is presented via special relativity to benefit from the physical
intuition.
Secondly, this book introduces basic notions of stochastic analysis: the Wiener process, Ito's stochastic integral, and calculus. This introduction allows study in linear stochastic differential equations on groups of matrices. In this way the spherical and hyperbolic Brownian motions, diffusions on the stable leaves, and the relativistic diffusion are constructed.
Thirdly, quotients of the hyperbolic space under a discrete group of isometries are introduced. In this framework some elements of hyperbolic dynamics are presented, as the ergodicity of the geodesic and horocyclic flows. This book culminates with an analysis of the chaotic behaviour of the geodesic flow, performed using stochastic analysis methods. This main result is known as Sinai's central limit theorem.
目次
- Introduction
- Summary
- 1. The Lorentz-Mobius group PSO(1
- d)
- 2. Hyperbolic Geometry
- 3. Operators and Measures
- 4. Kleinian groups
- 5. Measures and flows on GAMMA/F2
- 6. Basic Ito Calculus
- 7. Brownian motions on groups of matrices
- 8. Central Limit Theorem for geodesics
- 9. Appendix relating to geometry
- 10. Appendix relating to stochastic calculus
- 11. Index of notation, terms, and figures
- References
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