English

Annealed estimates on the Green function

Probability 2014-01-14 v2

Abstract

We consider a random, uniformly elliptic coefficient field a(x)a(x) on the dd-dimensional integer lattice Zd\mathbb{Z}^d. We are interested in the spatial decay of the quenched elliptic Green function G(a;x,y)G(a;x,y). Next to stationarity, we assume that the spatial correlation of the coefficient field decays sufficiently fast to the effect that a logarithmic Sobolev inequality holds for the ensemble \langle\cdot\rangle. We prove that all stochastic moments of the first and second mixed derivatives of the Green function, that is, xG(x,y)p\langle|\nabla_x G(x,y)|^p\rangle and xyG(x,y)p\langle|\nabla_x\nabla_y G(x,y)|^p\rangle, have the same decay rates in xy1|x-y|\gg 1 as for the constant coefficient Green function, respectively. This result relies on and substantially extends the one by Delmotte and Deuschel \cite{DeuschelDelmotte}, which optimally controls second moments for the first derivatives and first moments of the second mixed derivatives of GG, that is, xG(x,y)2\langle|\nabla_x G(x,y)|^2\rangle and xyG(x,y)\langle|\nabla_x\nabla_y G(x,y)|\rangle. As an application, we are able to obtain optimal estimates on the random part of the homogenization error even for large ellipticity contrast.

Keywords

Cite

@article{arxiv.1304.4408,
  title  = {Annealed estimates on the Green function},
  author = {Daniel Marahrens and Felix Otto},
  journal= {arXiv preprint arXiv:1304.4408},
  year   = {2014}
}

Comments

37 pages

R2 v1 2026-06-22T00:00:29.756Z