Abstract
We study a random measure which describes distribution of eigenvalues and corresponding eigenfunctions of random Schrödinger operators on $L^{2}(\mathbf{R}^{d})$. We show that in the natural scaling every limiting point is infinitely divisible.
Citation
Fumihiko Nakano. "Infinite divisibility of random measures associated to some random Schrödinger operators." Osaka J. Math. 46 (3) 845 - 862, September 2009.
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