On generalized Piterbarg-Berman function

Abstract

This paper aims to evaluate the Piterbarg-Berman function given by P\!Bαh(x, E) = ∫RezP \∫E I(2Bα(t) - |t|α - h(t) - z>0 ) d t > x \ d z, x∈[0, mes(E)], with h a drift function and Bα a fractional Brownian motion (fBm) with Hurst index α/2∈(0,1], i.e., a mean zero Gaussian process with continuous sample paths and covariance function align* Cov(Bα(s), Bα(t)) = 12 (|s|α + |t|α - |s-t|α). align* This note specifies its explicit expression for the fBms with α=1 and 2 when the drift function h(t)=ctα, c>0 and E=R+\0\. For the Gaussian distribution B2, we investigate P\!B2h(x, E) with general drift functions h(t) such that h(t)+t2 being convex or concave, and finite interval E=[a,b]. Typical examples of P\!B2h(x, E) with h(t)=c|t|λ-t2 and several bounds of P\!Bαh(x, E) are discussed. Numerical studies are carried out to illustrate all the findings. Keywords: Piterbarg-Berman function; sojourn time; fractional Brownian motion; drift function