A forward--backward random process for the spectrum of 1D Anderson operators

Abstract

We give a new expression for the law of the eigenvalues of the discrete Anderson model on the finite interval [0,N], in terms of two random processes starting at both ends of the interval. Using this formula, we deduce that the tail of the eigenvectors behaves approximatelylike (σ B\|n-k|-γ|n-k|4) where B\s is the Brownian motion and k is uniformly chosen in [0,N] independentlyof B\s. A similar result has recently been shown by B. Rifkind and B. Virag in the critical case, that is, when the random potential is multiplied by a factor 1N