A Bayesian approach to the estimation of maps between riemannian manifolds

Abstract

Let be a smooth compact oriented manifold without boundary, embedded in a euclidean space and let γ be a smooth map into a riemannian manifold . An unknown state θ ∈ is observed via X=θ+ε where ε>0 is a small parameter and is a white Gaussian noise. For a given smooth prior on and smooth estimator g of the map γ we derive a second-order asymptotic expansion for the related Bayesian risk. The calculation involves the geometry of the underlying spaces and , in particular, the integration-by-parts formula. Using this result, a second-order minimax estimator of γ is found based on the modern theory of harmonic maps and hypo-elliptic differential operators.