Dynamical delocalization in random Landau Hamiltonians

François Germinet; Abel Klein; Jeffrey H. Schenker

Journal ArticleOPEN ACCESS

Dynamical delocalization in random Landau Hamiltonians

Annals of Mathematics (2007) 166(1) 215-244

DOI: 10.4007/annals.2007.166.215

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Abstract

We prove the existence of dynamical delocalization for random Landau Hamiltonians near each Landau level. Since typically there is dynamical localization at the edges of each disordered-broadened Landau band, this implies the existence of at least one dynamical mobility edge at each Landau band, namely a boundary point between the localization and delocalization regimes, which we prove to converge to the corresponding Landau level as either the magnetic field goes to infinity or the disorder goes to zero.

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APA

Germinet, F., Klein, A., & Schenker, J. H. (2007). Dynamical delocalization in random Landau Hamiltonians. Annals of Mathematics, 166(1), 215–244. https://doi.org/10.4007/annals.2007.166.215

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Dynamical delocalization in random Landau Hamiltonians

Abstract

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