A regularity property of fractional Brownian sheets

Abstract

A function f defined on [0, 1]d is called strongly chargeable if there is a continuous vector-field v such that f(x1, …,xd) equals the flux of v through the rectangle [0, x1] × ·s × [0, xd] for all (x1, …, xd) ∈ [0, 1]d. In other words, f is the primitive of the divergence of a continuous vector-field. We prove that the sample paths of the Brownian sheet with d ≥ 2 parameters are almost surely not strongly chargeable. On the other hand, those of the fractional Brownian sheet of Hurst parameter (H1, …, Hd) are shown to be almost surely strongly chargeable whenever \[ H1 + ·s + Hdd > d - 1d. \]