Energy--Level Statistics of Model Quantum Systems: Universality and Scaling in a Lattice--Point Problem

Abstract

We investigate the statistics of the number N(R,S) of lattice points, n∈ 2, in a ``random'' annular domain (R,w)=\,(R+w)A\, RA, where R,w >0. Here A is a fixed convex set with smooth boundary and w is chosen so that the area of (R,w) is S. The randomness comes from R being taken as random ( with a smooth denisity ) in some interval [c1T,c2T], c2>c1>0. We find that in the limit T∞ the variance and distribution of N=N(R;S)-S depends strongly on how S grows with T. There is a saturation regime S/T∞, as T∞ in which the fluctuations in N coming from the two boundaries of , are independent. Then there is a scaling regime, S/T z, 0<z<∞ in which the distribution depends on z in an almost periodic way going to a Gaussian as z\ 0. The variance in this limit approaches z for ``generic'' A but can be larger for ``degenerate'' cases. The former behavior is what one would expect from the Poisson limit of a distribution for annuli of finite area.

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