Study of the localization-delocalization transition for phonons via transfer matrix method techniques

Abstract

We use a transfer-matrix method to study the localization properties of vibrations in a `mass and spring' model with simple cubic lattice structure. Disorder is applied as a box-distribution to the force-constants k of the springs. We obtain the reduced localization lengths M from calculated Lyapunov exponents for different system widths to roughly locate the squared critical transition frequency ωc2. The data is finite-size scaled to acquire the squared critical transition frequency of ωc2 = 12.54 0.03 and a critical exponent of = 1.55 0.002.