The Ehrenfest Oscillations in The Level Statistics of Chaotic Quantum Dots

Abstract

We study a crossover from classical to quantum picture in the electron energy statistics in a system with broken time-reversal symmetry. The perturbative and nonperturbative parts of the two level correlation function, R(ω) are analyzed. We find that in the intermediate region, ω tE-1 terg-1, where tE and terg are the Ehrenfest and ergodic times, respectively, R(ω) consists of a series of oscillations with the periods depending on tE, deviating from the universal Wigner-Dyson statistics. These Ehrenfest oscillations have the period dependence as tE-1 in the perturbative part. [For systems with time-reversal symmetry, this oscillation in the perturbative part of R(ω) was studied in an earlier work (I. L. Aleiner and A. I. Larkin, Phys. Rev. E 55, R1243 (1997))]. In the nonperturbative part they have the period dependence as (-1+α tE)-1 with α a universal numerical factor. The amplitude of the leading order Ehrenfest oscillation in the nonperturbative part is larger than that of the perturbative part.

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