English

Exact adaptive confidence intervals for linear regression coefficients

Methodology 2017-07-10 v2

Abstract

We propose an adaptive confidence interval procedure (CIP) for the coefficients in the normal linear regression model. This procedure has a frequentist coverage rate that is constant as a function of the model parameters, yet provides smaller intervals than the usual interval procedure, on average across regression coefficients. The proposed procedure is obtained by defining a class of CIPs that all have exact 1α1-\alpha frequentist coverage, and then selecting from this class the procedure that minimizes a prior expected interval width. Such a procedure may be described as "frequentist, assisted by Bayes" or FAB. We describe an adaptive approach for estimating the prior distribution from the data so that exact non-asymptotic 1α1-\alpha coverage is maintained. Additionally, in a "pp growing with nn" asymptotic scenario, this adaptive FAB procedure is asymptotically Bayes-optimal among 1α1-\alpha frequentist CIPs.

Keywords

Cite

@article{arxiv.1705.08331,
  title  = {Exact adaptive confidence intervals for linear regression coefficients},
  author = {Peter D. Hoff and Chaoyu Yu},
  journal= {arXiv preprint arXiv:1705.08331},
  year   = {2017}
}
R2 v1 2026-06-22T19:56:37.068Z