Bayesian posterior consistency in the functional randomly shifted curves model

Abstract

In this paper, we consider the so-called Shape Invariant Model which stands for the estimation of a function f0 submitted to a random translation of law g0 in a white noise model. We are interested in such a model when the law of the deformations is unknown. We aim to recover the law of the process f0,g0 as well as f0 and g0. In this perspective, we adopt a Bayesian point of view and find prior on f and g such that the posterior distribution concentrates around f0,g0 at a polynomial rate when n goes to +∞. We obtain a logarithmic posterior contraction rate for the shape f0 and the distribution g0. We also derive logarithmic lower bounds for the estimation of f0 and g0 in a frequentist paradigm.