Physics:Relativistic chaos
From HandWiki
Short description: Theory in physics
 | This article has multiple issues. Please help improve it or discuss these issues on the talk page. (Learn how and when to remove these template messages)
(Learn how and when to remove this template message)
|
In physics, relativistic chaos is the application of chaos theory to dynamical systems described primarily by general relativity, and also special relativity.
Barrow (1982) showed that the Einstein equations exhibit chaotic behaviour and modelled the Mixmaster universe as a dynamical system. Later work showed that relativistic chaos is coordinate invariant (Motter 2003).
See also
References
- X. Ni (2012). "Effect of chaos on relativistic quantum tunneling". Europhysics Letters 98 (5). doi:10.1209/0295-5075/98/50007. Bibcode: 2012EL.....9850007N. https://apps.dtic.mil/sti/pdfs/ADA566483.pdf.
- P. Schewe; J. Riordon; B. Stein (2003). "Relativistic Chaos". Physical News Update (664). http://www.aip.org/enews/physnews/2003/split/664-2.html.
- J. D. Barrow (1982). "General relativistic chaos and nonlinear dynamics". General Relativity and Gravitation 14 (6): 523–530. doi:10.1007/BF00756214. Bibcode: 1982GReGr..14..523B. http://plouffe.fr/simon/math/math10280.pdf.
- A. E. Motter (2003). "Relativistic chaos is coordinate invariant". Physical Review Letters 93 (23). doi:10.1103/PhysRevLett.91.231101. PMID 14683170. Bibcode: 2003PhRvL..91w1101M. http://chaosbook.org/library/Motter03.pdf.
- H.-W. Lee (1995). "Relativistic chaos in time-driven linear and nonlinear oscillators". Proceedings of the XXXIst Winter School of Theoretical Physics. Lecture Notes in Physics. 457. pp. 503–506. doi:10.1007/3-540-60188-0_76. ISBN 3-540-60188-0. Bibcode: 1995LNP...457..503L.
 |  |
