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Localization lengths for Schroedinger operators on Z^2 with decaying random potentials

Mathematical Physics 2007-05-23 v3 math.MP

Abstract

We study a class of Schr\"odinger operators on Z2\Z^2 with a random potential decaying as x\dex|x|^{-\dex}, 0<\dex120<\dex\leq\frac12, in the limit of small disorder strength λ\lambda. For the critical exponent \dex=12\dex=\frac12, we prove that the localization length of eigenfunctions is bounded below by 2λ14+η2^{\lambda^{-\frac14+\eta}}, while for 0<\dex<120<\dex<\frac12, the lower bound is λ2η12\dex\lambda^{-\frac{2-\eta}{1-2\dex}}, for any η>0\eta>0. These estimates "interpolate" between the lower bound λ2+η\lambda^{-2+\eta} due to recent work of Schlag-Shubin-Wolff for \dex=0\dex=0, and pure a.c. spectrum for \dex>12\dex>\frac12 demonstrated in recent work of Bourgain.

Keywords

Cite

@article{arxiv.math-ph/0503064,
  title  = {Localization lengths for Schroedinger operators on Z^2 with decaying random potentials},
  author = {Thomas Chen},
  journal= {arXiv preprint arXiv:math-ph/0503064},
  year   = {2007}
}

Comments

AMS Latex, 26 pages, 1 Figure. Final version. To appear in Int. Math. Res. Notices