Anomalous Slow Diffusion from Perpetual Homogenization
Abstract
This paper is concerned with the asymptotic behavior of solutions of stochastic differential equations dyt=dωt -∇ V(yt) dt, y0=0. When d=1 and V is not periodic but obtained as a superposition of an infinite number of periodic potentials with geometrically increasing periods (V(x) = Σk=0∞ Uk(x/Rk), where Uk are smooth functions of period 1, Uk(0)=0, and Rk grows exponentially fast with k) we can show that yt has an anomalous slow behavior and we obtain quantitative estimates on the anomaly using and developing the tools of homogenization. Pointwise estimates are based on a new analytical inequality for sub-harmonic functions. When d≥ 1 and V is periodic, quantitative estimates are obtained on the heat kernel of yt, showing the rate at which homogenization takes place. The latter result proves Davies's conjecture and is based on a quantitative estimate for the Laplace transform of martingales that can be used to obtain similar results for periodic elliptic generators
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