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Rao-blackwellization for Bayesian variable selection and model averaging in linear and binary regression: A novel data augmentation approach

Publication ,  Journal Article
Ghosh, J; Clyde, MA
Published in: Journal of the American Statistical Association
October 21, 2011

Choosing the subset of covariates to use in regression or generalized linear models is a ubiquitous problem. The Bayesian paradigm addresses the problem of model uncertainty by considering models corresponding to all possible subsets of the covariates, where the posterior distribution over models is used to select models or combine them via Bayesian model averaging (BMA). Although conceptually straightforward, BMA is often difficult to implement in practice, since either the number of covariates is too large for enumeration of all subsets, calculations cannot be done analytically, or both. For orthogonal designs with the appropriate choice of prior, the posterior probability of any model can be calculated without having to enumerate the entire model space and scales linearly with the number of predictors, p. In this article we extend this idea to a much broader class of nonorthogonal design matrices. We propose a novel method which augments the observed nonorthogonal design by at most p new rows to obtain a design matrix with orthogonal columns and generate the "missing" response variables in a data augmentation algorithm. We show that our data augmentation approach keeps the original posterior distribution of interest unaltered, and develop methods to construct Rao-Blackwellized estimates of several quantities of interest, including posterior model probabilities of any model, which may not be available from an ordinary Gibbs sampler. Our method can be used for BMA in linear regression and binary regression with nonorthogonal design matrices in conjunction with independent "spike and slab" priors with a continuous prior component that is a Cauchy or other heavy tailed distribution that may be represented as a scale mixture of normals. We provide simulated and real examples to illustrate the methodology. Supplemental materials for the manuscript are available online. © 2011 American Statistical Association.

Duke Scholars

Published In

Journal of the American Statistical Association

DOI

ISSN

0162-1459

Publication Date

October 21, 2011

Volume

106

Issue

495

Start / End Page

1041 / 1052

Related Subject Headings

  • Statistics & Probability
  • 4905 Statistics
  • 3802 Econometrics
  • 1603 Demography
  • 1403 Econometrics
  • 0104 Statistics
 

Citation

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MLA
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Ghosh, J., & Clyde, M. A. (2011). Rao-blackwellization for Bayesian variable selection and model averaging in linear and binary regression: A novel data augmentation approach. Journal of the American Statistical Association, 106(495), 1041–1052. https://doi.org/10.1198/jasa.2011.tm10518
Ghosh, J., and M. A. Clyde. “Rao-blackwellization for Bayesian variable selection and model averaging in linear and binary regression: A novel data augmentation approach.” Journal of the American Statistical Association 106, no. 495 (October 21, 2011): 1041–52. https://doi.org/10.1198/jasa.2011.tm10518.
Ghosh J, Clyde MA. Rao-blackwellization for Bayesian variable selection and model averaging in linear and binary regression: A novel data augmentation approach. Journal of the American Statistical Association. 2011 Oct 21;106(495):1041–52.
Ghosh, J., and M. A. Clyde. “Rao-blackwellization for Bayesian variable selection and model averaging in linear and binary regression: A novel data augmentation approach.” Journal of the American Statistical Association, vol. 106, no. 495, Oct. 2011, pp. 1041–52. Scopus, doi:10.1198/jasa.2011.tm10518.
Ghosh J, Clyde MA. Rao-blackwellization for Bayesian variable selection and model averaging in linear and binary regression: A novel data augmentation approach. Journal of the American Statistical Association. 2011 Oct 21;106(495):1041–1052.
Journal cover image

Published In

Journal of the American Statistical Association

DOI

ISSN

0162-1459

Publication Date

October 21, 2011

Volume

106

Issue

495

Start / End Page

1041 / 1052

Related Subject Headings

  • Statistics & Probability
  • 4905 Statistics
  • 3802 Econometrics
  • 1603 Demography
  • 1403 Econometrics
  • 0104 Statistics