Convergence of trapezoid rule to rough integrals

Abstract

Rough paths techniques give the ability to define solutions of stochastic differential equations driven by signals X which are not semimartingales and whose p-variation is finite only for large values of p. In this context, rough integrals are usually Riemann-Stieltjes integrals with correction terms that are sometimes seen as unnatural. As opposed to those somewhat artificial correction terms, our endeavor in this note is to produce a trapezoid rule for rough integrals driven by general d-dimensional Gaussian processes. Namely we shall approximate a generic rough integral ∫ y \, dX by Riemann sums avoiding the usual higher order correction terms, making the expression easier to work with and more natural. Our approximations apply to all controlled processes y and to a wide range of Gaussian processes X including fractional Brownian motion with a Hurst parameter H>1/4. As a corollary of the trapezoid rule, we also consider the convergence of a midpoint rule for integrals of the form ∫ f(X) dX.