Consistent inference for diffusions from low frequency measurements

Abstract

Let (Xt) be a reflected diffusion process in a bounded convex domain in Rd, solving the stochastic differential equation dXt = ∇ f(Xt) dt + 2f (Xt) dWt, ~t 0, with Wt a d-dimensional Brownian motion. The data X0, XD, …, XND consist of discrete measurements and the time interval D between consecutive observations is fixed so that one cannot `zoom' into the observed path of the process. The goal is to infer the diffusivity f and the associated transition operator Pt,f. We prove injectivity theorems and stability inequalities for the maps f Pt,f PD,f, t<D. Using these estimates we establish the statistical consistency of a class of Bayesian algorithms based on Gaussian process priors for the infinite-dimensional parameter f, and show optimality of some of the convergence rates obtained. We discuss an underlying relationship between the degree of ill-posedness of this inverse problem and the `hot spots' conjecture from spectral geometry.