Bayesian Bridge Regression. Academic Article uri icon

Overview

abstract

  • Classical bridge regression is known to possess many desirable statistical properties such as oracle, sparsity, and unbiasedness. One outstanding disadvantage of bridge regularization, however, is that it lacks a systematic approach to inference, reducing its flexibility in practical applications. In this study, we propose bridge regression from a Bayesian perspective. Unlike classical bridge regression that summarizes inference using a single point estimate, the proposed Bayesian method provides uncertainty estimates of the regression parameters, allowing coherent inference through the posterior distribution. Under a sparsity assumption non the high-dimensional parameter, we provide sufficient conditions for strong posterior consistency of the Bayesian bridge prior. On simulated datasets, we show that the proposed method performs well compared to several competing methods across a wide range of scenarios. Application to two real datasets further revealed that the proposed method performs as well as or better than published methods while offering the advantage of posterior inference.

publication date

  • May 10, 2017

Identity

PubMed Central ID

  • PMC6426306

Scopus Document Identifier

  • 85019091798

Digital Object Identifier (DOI)

  • 10.1080/02664763.2017.1324565

PubMed ID

  • 30906097

Additional Document Info

volume

  • 45

issue

  • 6