We show that the effective diffusivity matrix $D(V^n)$ for the heat operator
$\partial_t-(\Delta/2-\nabla V^n \nabla)$ in a periodic potential
$V^n=\sum_{k=0}^n U_k(x/R_k)$ obtained as a superposition of Holder-continuous
periodic potentials $U_k$ (of period $\T^d:=\R^d/\Z^d$, $d\in \N^*$,
$U_k(0)=0$) decays exponentially fast with the number of scales when the
scale-ratios $R_{k+1}/R_k$ 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: $dy_t=d\omega_t -\nabla
V^\infty(y_t) dt$Comment: 29 pages, 1 figure, submitted versio

Ben-Arous, Gérard

Owhadi, Houman

English

arXiv

We show that the effective diffusivity matrix D(V^n) for the heat operator ∂_t − (Δ/2 − ∇V^n∇) in a periodic potential V^n = Σ^n_(k=0)U_k(x/R_k) obtained as a superposition of Hölder-continuous periodic potentials U_k (of period T^d:= ℝ^d/ℤ^d, d ∈ ℕ^*, U_k(0) = 0) decays exponentially fast with the number of scales when the scale ratios R_(k+1)/R_k 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, dy_t = dω_t − ∇V^∞(yt)dt

Ben Arous, Gérard

Caltech Authors - Main

Multi-scale homogenization with bounded ratios and Anomalous Slow Diffusion

http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.237.8374

Multi-scale homogenization with bounded ratios and Anomalous Slow Diffusion

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Caltech Authors - Main