This paper studies the excursion set of a real stationary isotropic Gaussian random field above a fixed level. We show that the standardized Lipschitz-Killing curvatures of the intersection of the excursion set with a window converges in distribution to a normal distribution as the window grows to the $d$-dimensional Euclidean space. Moreover a lower bound for the asymptotic variance is shown.
The Modulo 1 Central Limit Theorem and Benford's Law for Products
A central limit theorem for the zeroes of the zeta function
Central limit theorem for multiplicative class functions on the symmetric group
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