Minimax Predictive Density for Sparse Count Data
Abstract
This paper discusses predictive densities under the Kullback--Leibler loss for high-dimensional Poisson sequence models under sparsity constraints. Sparsity in count data implies zero-inflation. We present a class of Bayes predictive densities that attain asymptotic minimaxity in sparse Poisson sequence models. We also show that our class with an estimator of unknown sparsity level plugged-in is adaptive in the asymptotically minimax sense. For application, we extend our results to settings with quasi-sparsity and with missing-completely-at-random observations. The simulation studies as well as application to real data illustrate the efficiency of the proposed Bayes predictive densities.
Cite
@article{arxiv.1812.06037,
title = {Minimax Predictive Density for Sparse Count Data},
author = {Keisuke Yano and Ryoya Kaneko and Fumiyasu Komaki},
journal= {arXiv preprint arXiv:1812.06037},
year = {2020}
}
Comments
49 pages; the supplement is included in pp. 32-49 Accepted for publication in Bernoulli journal