Poisson statistics for eigenvalues of continuum random schr"odinger operators
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We prove Poisson statistics for eigenvalues of random Schrdinger operators in the continuum. More specifically, we prove a Minami estimate for continuum Anderson Hamiltonians in the continuum and
derive Poisson statistics for the eigenvalues in the localization region at the bottom of the spectrum. We also prove simplicity of the eigenvalues in that region. (Joint work with J.-M. Combes and F.Germinet)
This talk is part of the Isaac Newton Institute Seminar Series series.
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Tuesday 19 August 2008, 09:00-10:00