Nonparametric Bayesian posterior contraction rates for scalar diffusions with high-frequency data

Abstract

We consider inference in the scalar diffusion model dXt=b(Xt)dt+σ(Xt)dWt with discrete data (Xjn)0≤ j ≤ n, n ∞,~n 0 and periodic coefficients. For σ given, we prove a general theorem detailing conditions under which Bayesian posteriors will contract in L2-distance around the true drift function b0 at the frequentist minimax rate (up to logarithmic factors) over Besov smoothness classes. We exhibit natural nonparametric priors which satisfy our conditions. Our results show that the Bayesian method adapts both to an unknown sampling regime and to unknown smoothness.