Differential Equations Driven by Rough Paths: An Approach via Discrete Approximation
Abstract
A theory of systems of differential equations of the form dy i = ∑ j f i j ( y ) dx i , where the driving path x ( t ) is nondifferentiable, has recently been developed by Lyons. I develop an alternative approach to this theory, using (modified) Euler approximations, and investigate its applicability to stochastic differential equations driven by Brownian motion. I also give some other examples showing that the main results are reasonably sharp.