On Metrizing Vague Convergence of Random Measures with Applications on Bayesian Nonparametric Models

Abstract

This paper deals with studying vague convergence of random measures of the form μn=Σi=1n pi,n δθi, where (θi)1 i n is a sequence of independent and identically distributed random variables with common distribution , (pi,n)1 i n are random variables chosen according to certain procedures and are independent of (θi)i ≥ 1 and δθi denotes the Dirac measure at θi. We show that μn converges vaguely to μ=Σi=1∞ pi δθi if and only if μ(k)n=Σi=1k pi,n δθi converges vaguely to μ(k)=Σi=1k pi δθi for all k fixed. The limiting process μ plays a central role in many areas in statistics, including Bayesian nonparametric models. A finite approximation of the beta process is derived from the application of this result. A simulated example is incorporated, in which the proposed approach exhibits an excellent performance over several existing algorithms.