Asymptotic Conditional Distribution of Exceedance Counts: Fragility Index with Different Margins

Abstract

Let X=(X1,...,Xd) be a random vector, whose components are not necessarily independent nor are they required to have identical distribution functions F1,...,Fd. Denote by Ns the number of exceedances among X1,...,Xd above a high threshold s. The fragility index, defined by FI=sE(Ns Ns>0) if this limit exists, measures the asymptotic stability of the stochastic system X as the threshold increases. The system is called stable if FI=1 and fragile otherwise. In this paper we show that the asymptotic conditional distribution of exceedance counts (ACDEC) pk=sP(Ns=k Ns>0), 1 k d, exists, if the copula of X is in the domain of attraction of a multivariate extreme value distribution, and if s(1-Fi(s))/(1-F(s))=γi∈[0,∞) exists for 1 i d and some ∈1,...,d. This enables the computation of the FI corresponding to X and of the extended FI as well as of the asymptotic distribution of the exceedance cluster length also in that case, where the components of X are not identically distributed.