Berry-Robnik level statistics in a smooth billiard system
arXiv:cond-mat/9803341 · doi:10.1088/0305-4470/31/34/005
Abstract
Berry-Robnik level spacing distribution is demonstrated clearly in a generic quantized plane billiard for the first time. However, this ultimate semi-classical distribution is found to be valid only for extremely small semi-classical parameter (effective Planck's constant) where the assumption of statistical independence of regular and irregular levels is achieved. For sufficiently larger semiclassical parameter we find (fractional power-law) level repulsion with phenomenological Brody distribution providing an adequate global fit.
10 pages in LaTeX with 4 eps figures included