Extremal clustering and cluster counting for spatial random fields

Abstract: We consider a stationary random field indexed by an increasing sequence of subsets of Z d obeying a very broad geometrical assumption on how the sequence expands. Under certain mixing and local conditions, we show how the tail distribution of the individual variables relates to the tail behavior of the maximum of the field over the index sets in the limit as the index sets expand.Furthermore, in a framework where we let the increasing index sets be scalar multiplications of a fixed set C, potentially with diff… Show more