Generalized maximum likelihood estimation of the mean of parameters of mixtures, with applications to sampling

Abstract

Let f(y|θ), \; θ ∈ be a parametric family, η(θ) a given function, and G an unknown mixing distribution. It is desired to estimate EG (η(θ)) ηG based on independent observations Y1,...,Yn, where Yi f(y|θi), and θi G are iid. We explore the Generalized Maximum Likelihood Estimators (GMLE) for this problem. Some basic properties and representations of those estimators are shown. In particular we suggest a new perspective, of the weak convergence result by Kiefer and Wolfowitz (1956), with implications to a corresponding setup in which θ1,...,θn are fixed parameters. We also relate the above problem, of estimating ηG, to non-parametric empirical Bayes estimation under a squared loss. Applications of GMLE to sampling problems are presented. The performance of the GMLE is demonstrated both in simulations and through a real data example.