LOCALIZATION AT WEAK DISORDER: SOME ELEMENTARY BOUNDS

Abstract

An elementary proof is given of localization for linear operators H = H_o + λV, with H_o translation invariant, or periodic, and V (·) a random potential, in energy regimes which for weak disorder (λ → 0) are close to the unperturbed spectrum σ (H_o). The analysis is within the approach introduced in the recent study of localization at high disorder by Aizenman and Molchanov [4]; the localization regimes discussed in the two works being supplementary. Included also are some general auxiliary results enhancing the method, which now yields uniform exponential decay for the matrix elements of the spectrally filtered unitary time evolution operators, with [a, b] in the relevant range.