A functional limit theorem for irregular SDEs

Abstract

Let X1, X2, … be a sequence of i.i.d. real-valued random variables with mean zero, and consider the scaled random walk of the form YNk+1 = YNk + aN(YNk) Xk+1, where aN: R R+. We show, under mild assumptions on the law of Xi, that one can choose the scale factor aN in such a way that the process (YN N t )t ∈ R+ converges in distribution to a given diffusion (Mt)t ∈ R+ solving a stochastic differential equation with possibly irregular coefficients, as N ∞. To this end we embed the scaled random walks into the diffusion M with a sequence of stopping times with expected time step 1/N.