Multi-scale homogenization with bounded ratios and Anomalous Slow Diffusion

Abstract

We show that the effective diffusivity matrix D(Vn) for the heat operator ∂t-(/2-∇ Vn ∇) in a periodic potential Vn=Σk=0n Uk(x/Rk) obtained as a superposition of Holder-continuous periodic potentials Uk (of period d:=d/d, d∈ *, Uk(0)=0) decays exponentially fast with the number of scales when the scale-ratios Rk+1/Rk are bounded above and below. From this we deduce the anomalous slow behavior for a Brownian Motion in a potential obtained as a superposition of an infinite number of scales: dyt=dωt -∇ V∞(yt) dt

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