We prove that for Diophantine \om and almost every \th, the almost Mathieu
operator, (H_{\omega,\lambda,\theta}\Psi)(n)=\Psi(n+1) + \Psi(n-1) +
\lambda\cos 2\pi(\omega n +\theta)\Psi(n), exhibits localization for \lambda >
2 and purely absolutely continuous spectrum for \lambda < 2. This completes the
proof of (a correct version of) the Aubry-Andr\'e conjecture.Comment: 17 pages, published versio

Jitomirskaya, Svetlana Ya.

English

arXiv

We prove that for Diophantine ù and almost every è, the almost Mathieu operator, (Hù,ë,è )(n) = (n+1)+ (n.1)+ë cos 2ð(ùn+è) (n), exhibits localization for ë > 2 and purely absolutely continuous spectrum for ë < 2. This completes the proof of (a correct version of) the Aubry-Andr/e conjecture

Metal-insulator transition for the almost Mathieu operator

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