ε-Strong Simulation for Multidimensional Stochastic Differential Equations via Rough Path Analysis

Abstract

Consider a multidimensional diffusion process X=\X(t) :t∈0,1]\. Let >0 be a deterministic, user defined, tolerance error parameter. Under standard regularity conditions on the drift and diffusion coefficients of X, we construct a probability space, supporting both X and an explicit, piecewise constant, fully simulatable process X such that \[ 0≤ t≤1 X(t) -X(t) ∞< \] with probability one. Moreover, the user can adaptively choose ∈(0,) so that X (also piecewise constant and fully simulatable) can be constructed conditional on X to ensure an error smaller than >0 with probability one. Our construction requires a detailed study of continuity estimates of the Ito map using Lyon's theory of rough paths. We approximate the underlying Brownian motion, jointly with the L\'evy areas with a deterministic error in the underlying rough path metric.