Normal modes, and acoustic properties, of an elastic solid with line defects

Abstract

The normal modes of a continuum solid endowed with a random distribution of line defects that behave like elastic strings are described. These strings interact with elastic waves in the bulk, generating wave dispersion and attenuation. As in amorphous materials, the attenuation as a function of frequency $\omega$ behaves as $\omega^4$ for low frequencies, and, as frequency increases, crosses over to $\omega^2$ and then to linear in $\omega$. Dispersion is negative in the frequency range where attenuation is quartic and quadratic in frequency. Explicit formulae are provided that relate these properties to the density of string states. { Continuum mechanics can thus be applied both to crystalline materials and their amorphous counterparts at similar length scales.} The possibility of linking this model with the microstructure of amorphous materials is discussed