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Anomalous Slow Diffusion from Perpetual Homogenization

Probability 2007-05-23 v2 Mathematical Physics math.MP

Abstract

This paper is concerned with the asymptotic behavior of solutions of stochastic differential equations dyt=dωtV(yt)dtdy_t=d\omega_t -\nabla V(y_t) dt, y0=0y_0=0. When d=1d=1 and VV is not periodic but obtained as a superposition of an infinite number of periodic potentials with geometrically increasing periods (V(x)=k=0Uk(x/Rk)V(x) = \sum_{k=0}^\infty U_k(x/R_k), where UkU_k are smooth functions of period 1, Uk(0)=0U_k(0)=0, and RkR_k grows exponentially fast with kk) we can show that yty_t 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 d1d\geq 1 and VV is periodic, quantitative estimates are obtained on the heat kernel of yty_t, 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

Keywords

Cite

@article{arxiv.math/0105165,
  title  = {Anomalous Slow Diffusion from Perpetual Homogenization},
  author = {Houman Owhadi},
  journal= {arXiv preprint arXiv:math/0105165},
  year   = {2007}
}

Comments

Published version. Contains the full proof of Davies's conjecture