Simple Marginally Noninformative Prior Distributions for Covariance Matrices
- ️M. P. Wand
- ️Sat Jun 01 2013
June 2013
Simple Marginally Noninformative Prior Distributions for Covariance Matrices
Alan Huang, M. P. Wand
Bayesian Anal. 8(2): 439-452 (June 2013). DOI: 10.1214/13-BA815
Abstract
A family of prior distributions for covariance matrices is studied. Members of the family possess the attractive property of all standard deviation and correlation parameters being marginally noninformative for particular hyperparameter choices. Moreover, the family is quite simple and, for approximate Bayesian inference techniques such as Markov chain Monte Carlo and mean field variational Bayes, has tractability on par with the Inverse-Wishart conjugate family of prior distributions. A simulation study shows that the new prior distributions can lead to more accurate sparse covariance matrix estimation.
Citation
Download CitationAlan Huang. M. P. Wand. "Simple Marginally Noninformative Prior Distributions for Covariance Matrices." Bayesian Anal. 8 (2) 439 - 452, June 2013. https://doi.org/10.1214/13-BA815
Information
Published: June 2013
First available in Project Euclid: 24 May 2013
Digital Object Identifier: 10.1214/13-BA815
Keywords: Bayesian inference , Gibbs sampling , Markov chain Monte Carlo , Mean field variational Bayes
Rights: Copyright © 2013 International Society for Bayesian Analysis