Theory for the density of interacting quasi-localised modes in amorphous solids

Abstract

Quasi-localised modes appear in the vibrational spectrum of amorphous solids at low-frequency. Though never formalised, these modes are believed to have a close relationship with other important local excitations, including shear transformations and two-level systems. We provide a theory for their frequency density, DL(ω)ωα, that establishes this link for systems at zero temperature under quasi-static loading. It predicts two regimes depending on the density of shear transformations P(x) xθ (with x the additional stress needed to trigger a shear transformation). If θ>1/4, α=4 and a finite fraction of quasi-localised modes form shear transformations, whose amplitudes vanish at low frequencies. If θ<1/4, α=3+ 4 θ and all quasi-localised modes form shear transformations with a finite amplitude at vanishing frequencies. We confirm our predictions numerically.