Weak convergence of predictive distributions

Abstract

Let (Xn) be a sequence of random variables with values in a standard Borel space S. We investigate the condition gatherx56w1q E\f(Xn+1) X1,…,Xn\\, in probability,* \ n→∞, for each bounded Borel function f:S→R. gather Some consequences of x56w1q are highlighted and various sufficient conditions for it are obtained. In particular, x56w1q is characterized in terms of stable convergence. Since x56w1q holds whenever (Xn) is conditionally identically distributed, three weak versions of the latter condition are investigated as well. For each of such versions, our main goal is proving (or disproving) that x56w1q holds. Several counterexamples are given.