Nonparametric Estimation of the Transition Density Function for Diffusion Processes

Abstract

We assume that we observe N independent copies of a diffusion process on a time-interval [0,2T]. For a given time t, we estimate the transition density pt(x,y), namely the conditional density of Xt + s given Xs = x, under conditions on the diffusion coefficients ensuring that this quantity exists. We use a least squares projection method on a product of finite dimensional spaces, prove risk bounds for the estimator and propose an anisotropic model selection method, relying on several reference norms. A simulation study illustrates the theoretical part for Ornstein-Uhlenbeck or square-root (Cox-Ingersoll-Ross) processes.