Euclidean random matrix theory: low-frequency non-analyticities and Rayleigh scattering

Abstract

By calculating all terms of the high-density expansion of the euclidean random matrix theory (up to second-order in the inverse density) for the vibrational spectrum of a topologically disordered system we show that the low-frequency behavior of the self energy is given by (k,z) k2zd/2 and not (k,z) k2z(d-2)/2, as claimed previously. This implies the presence of Rayleigh scattering and long-time tails of the velocity autocorrelation function of the analogous diffusion problem of the form Z(t) t(d+2)/2.