On the speed of convergence of discrete Pickands constants to continuous ones

Abstract

In this manuscript, we address open questions raised by Dieker \& Yakir (2014), who proposed a novel method of estimation of (discrete) Pickands constants Hδα using a family of estimators δα(T), T>0, where α∈(0,2] is the Hurst parameter, and δ≥0 is the step-size of the regular discretization grid. We derive an upper bound for the discretization error Hα0 - Hαδ, whose rate of convergence agrees with Conjecture 1 of Dieker & Yakir (2014) in case α∈(0,1] and agrees up to logarithmic terms for α∈(1,2). Moreover, we show that all moments of αδ(T) are uniformly bounded and the bias of the estimator decays no slower than \- CTα\, as T becomes large.