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Universality of level spacing distributions in classical chaos |
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| Authors: | JF Laprise J Kröger PY St-Louis E Endress R Zomorrodi KJM Moriarty |
| Institution: | a Département de Physique, Université Laval - Québec, Québec G1V 0A6, Canada b Physics Department and Center for the Physics of Materials, McGill University - Montréal, Québec H3A 2T8, Canada c Frankfurt Institute for Advanced Studies, Goethe Universität Frankfurt, 60438 Frankfurt am Main, Germany11Present address. d Fachbereich Physik, Universität Mainz, D-55099 Mainz, Germany e Department of Computer Science, School of Engineering & Applied Science, Columbia University - New York, NY 10027, USA f Department of Mathematics, Statistics and Computing Science, Dalhousie University - Halifax, Nova Scotia B3H 3J5, Canada |
| Abstract: | We suggest that random matrix theory applied to a matrix of lengths of classical trajectories can be used in classical billiards to distinguish chaotic from non-chaotic behavior. We consider in 2D the integrable circular and rectangular billiard, the chaotic cardioid, Sinai and stadium billiard as well as mixed billiards from the Limaçon/Robnik family. From the spectrum of the length matrix we compute the level spacing distribution, the spectral auto-correlation and spectral rigidity. We observe non-generic (Dirac comb) behavior in the integrable case and Wignerian behavior in the chaotic case. For the Robnik billiard close to the circle the distribution approaches a Poissonian distribution. The length matrix elements of chaotic billiards display approximate GOE behavior. Our findings provide evidence for universality of level fluctuations—known from quantum chaos—to hold also in classical physics. |
| Keywords: | 05 45 -a 05 40 -a |
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