Schr\"odinger operators with random δ magnetic fields
Abstract
We shall consider the Schr\"odinger operators on R2 with random δ magnetic fields. Under some mild conditions on the positions and the fluxes of the δ-fields, we prove the spectrum coincides with [0,∞) and the integrated density of states (IDS) decays exponentially at the bottom of the spectrum (Lifshitz tail), by using the Hardy type inequality by Laptev-Weidl. We also give a lower bound for IDS at the bottom of the spectrum.
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