A non-parametric Bayesian approach to decompounding from high frequency data

Given a sample from a discretely observed compound Poisson process, we consider non-parametric estimation of the density (Formula presented.) of its jump sizes, as well as of its intensity (Formula presented.) We take a Bayesian approach to the problem and specify the prior on (Formula presented.) as the Dirichlet location mixture of normal densities. An independent prior for (Formula presented.) is assumed to be compactly supported and to possess a positive density with respect to the Lebesgue measure. We show that under suitable assumptions the posterior contracts around the pair (Formula presented.) at essentially (up to a logarithmic factor) the (Formula presented.)-rate, where n is the number of observations and (Formula presented.) is the mesh size at which the process is sampled. The emphasis is on high frequency data, (Formula presented.) but the obtained results are also valid for fixed (Formula presented.) In either case we assume that (Formula presented.) Our main result implies existence of Bayesian point estimates converging (in the frequentist sense, in probability) to (Formula presented.) at the same rate. We also discuss a practical implementation of our approach. The computational problem is dealt with by inclusion of auxiliary variables and we develop a Markov chain Monte Carlo algorithm that samples from the joint distribution of the unknown parameters in the mixture density and the introduced auxiliary variables. Numerical examples illustrate the feasibility of this approach.