English

On Predictive Density Estimation under $\alpha$-divergence Loss

Statistics Theory 2018-06-08 v1 Statistics Theory

Abstract

Based on XNd(θ,σX2Id)X \sim N_d(\theta, \sigma^2_X I_d), we study the efficiency of predictive densities under α\alpha-divergence loss LαL_{\alpha} for estimating the density of YNd(θ,σY2Id)Y \sim N_d(\theta, \sigma^2_Y I_d). We identify a large number of cases where improvement on a plug-in density are obtainable by expanding the variance, thus extending earlier findings applicable to Kullback-Leibler loss. The results and proofs are unified with respect to the dimension dd, the variances σX2\sigma^2_X and σY2\sigma^2_Y, the choice of loss LαL_{\alpha}; α(1,1)\alpha \in (-1,1). The findings also apply to a large number of plug-in densities, as well as for restricted parameter spaces with θΘRd\theta \in \Theta \subset \mathbb{R}^d. The theoretical findings are accompanied by various observations, illustrations, and implications dealing for instance with robustness with respect to the model variances and simultaneous dominance with respect to the loss.

Keywords

Cite

@article{arxiv.1806.02600,
  title  = {On Predictive Density Estimation under $\alpha$-divergence Loss},
  author = {Aziz L'Moudden and Éric Marchand},
  journal= {arXiv preprint arXiv:1806.02600},
  year   = {2018}
}

Comments

19 pages, 5 Figures

R2 v1 2026-06-23T02:22:15.606Z