Rectangular Hull Confidence Regions for Multivariate Parameters
Statistics Theory
2023-12-07 v2 Methodology
Statistics Theory
Abstract
We introduce three notions of multivariate median bias, namely, rectilinear, Tukey, and orthant median bias. Each of these median biases is zero under a suitable notion of multivariate symmetry. We study the coverage probabilities of rectangular hull of independent multivariate estimators, with special attention to the number of estimators needed to ensure a miscoverage of at most . It is proved that for estimators with zero orthant median bias, we need for some constant . Finally, we show that there exists an asymptotically valid (non-trivial) confidence region for a multivariate parameter if and only if there exists a (non-trivial) estimator with an asymptotic orthant median bias of zero.
Cite
@article{arxiv.2311.16598,
title = {Rectangular Hull Confidence Regions for Multivariate Parameters},
author = {Aniket Jain and Arun K Kuchibhotla},
journal= {arXiv preprint arXiv:2311.16598},
year = {2023}
}
Comments
Added the proof of Proposition 3.9