Lower bound for the expected supremum of fractional Brownian motion using coupling

Abstract

We derive a new theoretical lower bound for the expected supremum of drifted fractional Brownian motion with Hurst index H∈(0,1) over (in)finite time horizon. Extensive simulation experiments indicate that our lower bound outperforms the Monte Carlo estimates based on very dense grids for H∈(0,12). Additionally, we derive the Paley-Wiener-Zygmund representation of a Linear Fractional Brownian motion and give an explicit expression for the derivative of the expected supremum at H=12 in the sense of recent work by Bisewski, Debicki & Rolski (2021).