A criterion for absolute continuity relative to the law of fractional Brownian motion

Abstract

Let X be the sum of a fractional Brownian motion with Hurst parameter H and an absolutely continuous and adapted drift process. We establish a simple criterion that guarantees that the law of X is absolutely continuous with respect to the law of the original fractional Brownian motion. For H<1/2, the trajectories of the derivative of the drift need to be bounded by an almost surely finite random variable; for H>1/2, they need to satisfy a H\"older condition with some exponent larger than 2H-1. These are almost-sure conditions, and no expectation requirements are imposed. For the case in which X arises as the solution of a nonlinear stochastic integral equation driven by fractional Brownian motion, we provide a simple criterion on the drift coefficient under which the law of X is automatically equivalent to the one of fractional Brownian motion.