Extremes of the standardized Gaussian noise

Abstract

Let \n, n∈d\ be a d-dimensional array of i.i.d. Gaussian random variables and define (A)=Σn∈ A n, where A is a finite subset of d. We prove that the appropriately normalized maximum of (A)/|A|, where A ranges over all discrete cubes or rectangles contained in \1,…,n\d, converges in the weak sense to the Gumbel extreme-value distribution as n∞. We also prove continuous-time counterparts of these results.