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Asymptotic ergodicity of the eigenvalues of random operators in the localized phase

We prove that, for a general class of random operators, the family of the unfolded eigenvalues in the localization region is asymptotically ergodic in the sense of N. Minami (see [Mi:11]). N. Minami conjectured this to be the case for discrete Anderson model in the localized regime. We also provide a local analogue of this result. From the asymptotics ergodicity, one can recover the statistics of the level spacings as well as a number of other spectral statistics. Our proofs rely on the analysis developed in abs/1011.1832.

preprint2011arXivOpen access
Frédéric Klopp
math-phmath.PRmath.MPmath.SP
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Frédéric Klopp

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