Laszlo Erdoes, David Hasler
Published 2010-12-23Version 1
We consider a two dimensional magnetic Schroedinger operator with a spatially stationary random magnetic field. We assume that the magnetic field has a positive lower bound and that it has Fourier modes on arbitrarily short scales. We prove the Wegner estimate at arbitrary energy, i.e. we show that the averaged density of states is finite throughout the whole spectrum. We also prove Anderson localization at the bottom of the spectrum.
Anderson localization for random magnetic Laplacian on Z^2
Wegner Estimate for Indefinite Anderson Potentials: Some Recent Results and Applications
An Introduction to the Mathematics of Anderson Localization
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