Strong Convergence of Peaks Over a Threshold

Abstract

Extreme Value Theory plays an important role to provide approximation results for the extremes of a sequence of independent random variables when their distribution is unknown. An important one is given by the generalised Pareto distribution Hγ(x) as an approximation of the distribution Ft(s(t)x) of the excesses over a threshold t, where s(t) is a suitable norming function. In this paper we study the rate of convergence of Ft(s(t)·) to Hγ in variational and Hellinger distances and translate it into that regarding the Kullback-Leibler divergence between the respective densities.