Asymptotic behaviors of the integrated density of states for random Schr\"odinger operators associated with Gibbs Point Processes
Abstract
The asymptotic behaviors of the integrated density of states N(λ) of Schr\"odinger operators with nonpositive potentials associated with Gibbs point processes are studied. It is shown that for some Gibbs point processes, the leading terms of N(λ) as λ-∞ coincide with that for a Poisson point process, which is known. Moreover, for some Gibbs point processes corresponding to pairwise interactions, the leading terms of N(λ) as λ-∞ are determined, which are different from that for a Poisson point process.
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