A family of fractional diffusion equations derived from stochastic harmonic chains with long-range interactions

Abstract

We consider one-dimensional infinite chains of harmonic oscillators with stochastic perturbations and long-range interactions which have polynomial decay rate |x|-θ, x ∞, θ > 1, where x ∈ Z is the interaction range. We prove that if 2< θ 3, then the time evolution of the macroscopic thermal energy distribution is superdiffusive and governed by a fractional diffusion equation with exponent 37-θ, while if θ > 3, then the exponent is 34. The threshold is θ = 3 because the derivative of the dispersion relation diverges as k 0 when θ 3.