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Thermal conductivity of nonlinear waves in disordered chains

arXiv:1101.4530 · doi:10.1007/s12043-011-0186-0

Abstract

We present computational data on the thermal conductivity of nonlinear waves in disordered chains. Disorder induces Anderson localization for linear waves and results in a vanishing conductivity. Cubic nonlinearity restores normal conductivity, but with a strongly temperature-dependent conductivity $κ(T)$. We find indications for an asymptotic low-temperature $κ\sim T^4$ and intermediate temperature $κ\sim T^2$ laws. These findings are in accord with theoretical studies of wave packet spreading, where a regime of strong chaos is found to be intermediate, followed by an asymptotic regime of weak chaos (EPL 91 (2010) 30001).

8 pages, 3 figures