Density of proper delay times in chaotic and integrable quantum billiards


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We calculate the density P(tau) of the eigenvalues of the Wigner-Smith time delay matrix for two-dimensional rectangular and circular billiards with one opening. For long times, the density of these so-called proper delay times decays algebraically, in contradistinction to chaotic quantum billiards for which P(tau) exhibits a long-time cut-off.

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