论文信息 - Quantization of the three-dimensional Sinai billiard.

Quantization of the three-dimensional Sinai billiard.

For the first time a three--dimensional (3D) chaotic billiard -- the 3D Sinai billiard -- was quantized, and high--precision spectra with thousands of eigenvalues were calculated. We present here a semiclassical and statistical analysis of the spectra, and point out some of the features which are genuine consequences of the three dimensionality of this chaotic billiard.

Primack | Smilansky

[1] Gerhard Werner,et al. Fractals in the Nervous System: Conceptual Implications for Theoretical Neuroscience , 2009, Front. Physiology.

[2] Michael V Berry,et al. Some quantum-to-classical asymptotics , 1991 .

[3] Jorge V. José,et al. Chaos in classical and quantum mechanics , 1990 .

[4] Arindam Banerjee,et al. Submitted for publication , 1981 .

[5] Eberhard R. Hilf,et al. Spectra of Finite Systems , 1980 .

[6] M. Tinkham. Group Theory and Quantum Mechanics , 1964 .

[7] P. Morse. Annals of Physics , 1957, Nature.