Some properties of stationary determinantal point processes on Z
Abstract
We study properties of stationary determinantal point processes on from different points of views. It is proved that is almost surely Bohr-dense and good universal for almost everywhere convergence in L1, and that is not syndetic but + = Z. For the associated centered random field, we obtain a sub-Gaussian property, a Salem-Littlewood inequality and a Khintchine-Kahane inequality. Results can be generalized to d.
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