Moment estimates for solutions of linear stochastic differential equations driven by analytic fractional Brownian motion

Abstract

As a general rule, differential equations driven by a multi-dimensional irregular path are solved by constructing a rough path over . The domain of definition ? and also estimates ? of the solutions depend on upper bounds for the rough path; these general, deterministic estimates are too crude to apply e.g. to the solutions of stochastic differential equations with linear coefficients driven by a Gaussian process with H\"older regularity α < 1/2. We prove here (by showing convergence of Chen's series) that linear stochastic differential equations driven by analytic fractional Brownian motion [7, 8] with arbitrary Hurst index α ∈ (0, 1) may be solved on the closed upper halfplane, and that the solutions have finite variance.