Hybrid confidence intervals for informative uniform asymptotic inference after model selection Journal Article uri icon

Overview

abstract

  • Abstract; I propose a new type of confidence interval for correct asymptotic inference after using data to select a model of interest without assuming any model is correctly specified. This hybrid confidence interval is constructed by combining techniques from the selective inference and post-selection inference literatures to yield a short confidence interval across a wide range of data realizations. I show that hybrid confidence intervals have correct asymptotic coverage, uniformly over a large class of probability distributions that do not bound scaled model parameters. I illustrate the use of these confidence intervals in the problem of inference after using the lasso objective function to select a regression model of interest and provide evidence of their desirable length and coverage properties in small samples via a set of Monte Carlo experiments that entail a variety of different data distributions as well as an empirical application to the predictors of diabetes disease progression.

publication date

  • February 12, 2024

has restriction

  • green

Date in CU Experts

  • November 8, 2023 7:31 AM

Full Author List

  • McCloskey A

author count

  • 1

Other Profiles

International Standard Serial Number (ISSN)

  • 0006-3444

Electronic International Standard Serial Number (EISSN)

  • 1464-3510

Additional Document Info

start page

  • 109

end page

  • 127

volume

  • 111

issue

  • 1