On the Lack of Gaussian Tail for Rough Line Integrals along Fractional Brownian Paths

Abstract

We show that the tail probability of the rough line integral ∫01φ(Xt)dYt, where (X,Y) is a 2D fractional Brownian motion with Hurst parameter H∈(1/4,1/2) and φ is a Cb∞-function satisfying a mild non-degeneracy condition on its derivative, cannot decay faster than a γ-Weibull tail with any exponent γ>2H+1. In particular, this produces a simple class of examples of differential equations driven by fBM, whose solutions fail to have Gaussian tail even though the underlying vector fields are assumed to be of class Cb∞. This also demonstrates that the well-known upper tail estimate proved by Cass-Litterer-Lyons in 2013 is essentially sharp.