Pickands' constant at first order in an expansion around Brownian motion

Abstract

In the theory of extreme values of Gaussian processes, many results are expressed in terms of the Pickands constant Hα. This constant depends on the local self-similarity exponent α of the process, i.e. locally it is a fractional Brownian motion (fBm) of Hurst index H=α/2. Despite its importance, only two values of the Pickands constant are known: H1 =1 and H2=1/π. Here, we extend the recent perturbative approach to fBm to include drift terms. This allows us to investigate the Pickands constant Hα around standard Brownian motion (α =1) and to derive the new exact result Hα=1 - (α-1) γ E + O\!( α-1)2.