Reducibility or nonuniform hyperbolicity for quasiperiodic Schrödinger cocycles

Artur Avila; Raphaël Krikorian

doi:10.4007/annals.2006.164.911

Reducibility or nonuniform hyperbolicity for quasiperiodic Schrödinger cocycles

Artur Avila
, Raphaël Krikorian

Collège de France
Sorbonne Université

Résultats de recherche: Contribution à un journal › Article › Revue par des pairs

Résumé

We show that for almost every frequency α ∈ ℝ\ℚ, for every C^ω potential v : ℝ/ℤ → ℝ, and for almost every energy E the corresponding quasiperiodic Schrödinger cocycle is either reducible or nonuniformly hyperbolic. This result gives very good control on the absolutely continuous part of the spectrum of the corresponding quasiperiodic Schrödinger operator, and allows us to complete the proof of the Aubry-André conjecture on the measure of the spectrum of the Almost Mathieu Operator.

langue originale	Anglais
Pages (de - à)	911-940
Nombre de pages	30
journal	Annals of Mathematics
Volume	164
Numéro de publication	3
Les DOIs	https://doi.org/10.4007/annals.2006.164.911
état	Publié - 1 janv. 2006

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abstract = "We show that for almost every frequency α ∈ ℝ\textbackslash{}ℚ, for every Cω potential v : ℝ/ℤ → ℝ, and for almost every energy E the corresponding quasiperiodic Schr{\"o}dinger cocycle is either reducible or nonuniformly hyperbolic. This result gives very good control on the absolutely continuous part of the spectrum of the corresponding quasiperiodic Schr{\"o}dinger operator, and allows us to complete the proof of the Aubry-Andr{\'e} conjecture on the measure of the spectrum of the Almost Mathieu Operator.",

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N2 - We show that for almost every frequency α ∈ ℝ\ℚ, for every Cω potential v : ℝ/ℤ → ℝ, and for almost every energy E the corresponding quasiperiodic Schrödinger cocycle is either reducible or nonuniformly hyperbolic. This result gives very good control on the absolutely continuous part of the spectrum of the corresponding quasiperiodic Schrödinger operator, and allows us to complete the proof of the Aubry-André conjecture on the measure of the spectrum of the Almost Mathieu Operator.

AB - We show that for almost every frequency α ∈ ℝ\ℚ, for every Cω potential v : ℝ/ℤ → ℝ, and for almost every energy E the corresponding quasiperiodic Schrödinger cocycle is either reducible or nonuniformly hyperbolic. This result gives very good control on the absolutely continuous part of the spectrum of the corresponding quasiperiodic Schrödinger operator, and allows us to complete the proof of the Aubry-André conjecture on the measure of the spectrum of the Almost Mathieu Operator.

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Reducibility or nonuniform hyperbolicity for quasiperiodic Schrödinger cocycles

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