Localization and unique continuation for the Anderson-Bernoulli model with long-range hopping on Z

Abstract

In this paper, we study Anderson localization near the spectral edge for the Anderson-Bernoulli model on Z with long-range hopping. When the hopping has a rational Laurent symbol, a quantitative version of the unique continuation principle can be proved, and localization occurs. For the unique continuation in the general case, we give some counterexamples and prove a weaker result for hopping that decays faster than exponential rate. To the best of our knowledge, this is the first localization result for the long-range Anderson model with pure Bernoulli potentials.

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