Self-consistent equations and quantum diffusion for the Anderson model

Abstract

We consider the Anderson tight-binding model on Zd, d≥ 2, with Gaussian noise and at low disorder λ>0. We derive a diffusive scaling limit for the entries of the resolvent R(z) at imaginary part *Im zλ2+d, d>0, with high probability. As consequences, we establish quantum diffusion (in a time-averaged sense) for the Schr\"odinger propagator at the longest timescale known to date and improve the best available lower bounds on the localization length of eigenfunctions. Our results for d=2 are the first quantum diffusion results for the Anderson model on Z2. The proof avoids the use of diagrammatic expansions and instead proceeds by analyzing certain self-consistent equations for R(z). This is facilitated by new estimates for \|R(z)\|p→ q that control the recollisions.