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Level spacing statistics of classically integrable systems -Investigation along the line of the Berry-Robnik approach-

arXiv:nlin/0303044 · doi:10.1103/PhysRevE.67.066205

Abstract

By extending the approach of Berry and Robnik, the limiting level spacing distribution of a system consisting of infinitely many independent components is investigated. The limiting level spacing distribution is characterized by a single monotonically increasing function $\barμ(S)$ of the level spacing $S$. Three cases are distinguished: (i) Poissonian if $\barμ(+\infty)=0$, (ii) Poissonian for large $S$, but possibly not for small $S$ if $0<\barμ(+\infty)< 1$, and (iii) sub-Poissonian if $\barμ(+\infty)=1$. This implies that, even when energy-level distributions of individual components are statistically independent, non-Poissonian level spacing distributions are possible.

19 pages, 4 figures. Accepted for publication in Phys. Rev. E