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PREDICTIVE DENSITY ESTIMATION FOR MULTIPLE REGRESSION

Published online by Cambridge University Press:  15 January 2008

Edward I. George
Affiliation:
The Wharton School, University of Pennsylvania
Xinyi Xu
Affiliation:
The Ohio State University

Abstract

Suppose we observe XNm(Aβ,σ2I) and would like to estimate the predictive density p(y|β) of a future YNn(Bβ,σ2I). Evaluating predictive estimates by Kullback–Leibler loss, we develop and evaluate Bayes procedures for this problem. We obtain general sufficient conditions for minimaxity and dominance of the “noninformative” uniform prior Bayes procedure. We extend these results to situations where only a subset of the predictors in A is thought to be potentially irrelevant. We then consider the more realistic situation where there is model uncertainty and this subset is unknown. For this situation we develop multiple shrinkage predictive estimators and obtain general minimaxity and dominance conditions. Finally, we provide an explicit example of a minimax multiple shrinkage predictive estimator based on scaled harmonic priors.We acknowledge Larry Brown, Feng Liang, Linda Zhao, and three referees for their helpful suggestions. This work was supported by various NSF grants, DMS-0605102 the most recent.

Type
Research Article
Copyright
© 2008 Cambridge University Press

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