On maxima of stationary fields

Abstract

Let \Xn : n∈Zd\ be a weakly dependent stationary field with maxima MA := \Xi : i∈ A\ for finite A⊂Zd and Mn := \Xi : 1 ≤ i ≤ n \ for n∈Nd. In a general setting we prove that P(M(n,n,…, n) ≤ vn) = (- nd P(X0 > vn , MAn ≤ vn)) + o(1), for some increasing sequence of sets An of size o(nd). For a class of fields satisfying a local mixing condition, including m-dependent ones, the theorem holds with a constant finite A replacing An. The above results lead to new formulas for the extremal index for random fields.