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Bayesian nonparametric covariance regression

Publication ,  Journal Article
Fox, EB; Dunson, DB; Airoldi, EM
Published in: Journal of Machine Learning Research
December 1, 2015

Capturing predictor-dependent correlations amongst the elements of a multivariate response vector is fundamental to numerous applied domains, including neuroscience, epidemiology, and finance. Although there is a rich literature on methods for allowing the variance in a univariate regression model to vary with predictors, relatively little has been done in the multivariate case. As a motivating example, we consider the Google Flu Trends data set, which provides indirect measurements of influenza incidence at a large set of locations over time (our predictor). To accurately characterize temporally evolving influenza incidence across regions, it is important to develop statistical methods for a time-varying covariance matrix. Importantly, the locations provide a redundant set of measurements and do not yield a sparse nor static spatial dependence structure. We propose to reduce dimensionality and induce a flexible Bayesian nonparametric covariance regression model by relating these location-specific trajectories to a lower-dimensional subspace through a latent factor model with predictor-dependent factor loadings. These loadings are in terms of a collection of basis functions that vary nonparametrically over the predictor space. Such low-rank approximations are in contrast to sparse precision assumptions, and are appropriate in a wide range of applications. Our formulation aims to address three challenges: scaling to large p domains, coping with missing values, and allowing an irregular grid of observations. The model is shown to be highly flexible, while leading to a computationally feasible implementation via Gibbs sampling. The ability to scale to large p domains and cope with missing values is fundamental in analyzing the Google Flu Trends data.

Duke Scholars

Published In

Journal of Machine Learning Research

EISSN

1533-7928

ISSN

1532-4435

Publication Date

December 1, 2015

Volume

16

Start / End Page

2501 / 2542

Related Subject Headings

  • Artificial Intelligence & Image Processing
  • 4905 Statistics
  • 4611 Machine learning
  • 17 Psychology and Cognitive Sciences
  • 08 Information and Computing Sciences
 

Citation

APA
Chicago
ICMJE
MLA
NLM
Fox, E. B., Dunson, D. B., & Airoldi, E. M. (2015). Bayesian nonparametric covariance regression. Journal of Machine Learning Research, 16, 2501–2542.
Fox, E. B., D. B. Dunson, and E. M. Airoldi. “Bayesian nonparametric covariance regression.” Journal of Machine Learning Research 16 (December 1, 2015): 2501–42.
Fox EB, Dunson DB, Airoldi EM. Bayesian nonparametric covariance regression. Journal of Machine Learning Research. 2015 Dec 1;16:2501–42.
Fox, E. B., et al. “Bayesian nonparametric covariance regression.” Journal of Machine Learning Research, vol. 16, Dec. 2015, pp. 2501–42.
Fox EB, Dunson DB, Airoldi EM. Bayesian nonparametric covariance regression. Journal of Machine Learning Research. 2015 Dec 1;16:2501–2542.

Published In

Journal of Machine Learning Research

EISSN

1533-7928

ISSN

1532-4435

Publication Date

December 1, 2015

Volume

16

Start / End Page

2501 / 2542

Related Subject Headings

  • Artificial Intelligence & Image Processing
  • 4905 Statistics
  • 4611 Machine learning
  • 17 Psychology and Cognitive Sciences
  • 08 Information and Computing Sciences