Anderson Localization for the Almost Mathieu Operator in Exponential Regime
Abstract
For the almost Mathieu operator (Hλ,α,θu)n=un+1+un-1+2λ 2π(θ+nα)un, Avila and Jitomirskaya guess that for a.e. θ, Hλ,α,θ satisfies Anderson localization if |λ| > e β , and they establish this for |λ| > e169 β. In the present paper, we extend their result to regime |λ| > e32 β.
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