Frequentistic approximations to Bayesian prevision of exchangeable random elements

Abstract

Given a sequence 1, 2,... of X-valued, exchangeable random elements, let q((n)) and pm((n)) stand for posterior and predictive distribution, respectively, given (n) = (1,..., n). We provide an upper bound for limsup bn d[[X]](q((n)), δ) and limsup bn d[Xm](pm((n)), m), where is the empirical measure, bn is a suitable sequence of positive numbers increasing to +∞, d[[X]] and d[Xm] denote distinguished weak probability distances on [[X]] and [Xm], respectively, with the proviso that [S] denotes the space of all probability measures on S. A characteristic feature of our work is that the aforesaid bounds are established under the law of the n's, unlike the more common literature on Bayesian consistency, where they are studied with respect to product measures (p0)∞, as p0 varies among the admissible determinations of a random probability measure.