Latent Variable Graphical Model Selection Via Convex Optimization

Author(s)

Chandrasekaran, Venkat; Parrilo, Pablo A.; Willsky, Alan S.

Abstract

Suppose we have samples of a subset of a collection of random variables. No additional information is provided about the number of latent variables, nor of the relationship between the latent and observed variables. Is it possible to discover the number of hidden components, and to learn a statistical model over the entire collection of variables? We address this question in the setting in which the latent and observed variables are jointly Gaussian, with the conditional statistics of the observed variables conditioned on the latent variables being specified by a graphical model. As a first step we give natural conditions under which such latent-variable Gaussian graphical models are identifiable given marginal statistics of only the observed variables. Essentially these conditions require that the conditional graphical model among the observed variables is sparse, while the effect of the latent variables is “spread out” over most of the observed variables. Next we propose a tractable convex program based on regularized maximum-likelihood for model selection in this latent-variable setting; the regularizer uses both the ℓ[subscript 1] norm and the nuclear norm. Our modeling framework can be viewed as a combination of dimensionality reduction (to identify latent variables) and graphical modeling (to capture remaining statistical structure not attributable to the latent variables), and it consistently estimates both the number of hidden components and the conditional graphical model structure among the observed variables. These results are applicable in the high-dimensional setting in which the number of latent/observed variables grows with the number of samples of the observed variables. The geometric properties of the algebraic varieties of sparse matrices and of low-rank matrices play an important role in our analysis.

Date issued

2011-02

URI

http://hdl.handle.net/1721.1/72612

Department

Massachusetts Institute of Technology. Department of Electrical Engineering and Computer Science
Massachusetts Institute of Technology. Laboratory for Information and Decision Systems

Journal

48th Annual Allerton Conference on Communication, Control, and Computing 2010 (Allerton)

Publisher

Institute of Electrical and Electronics Engineers (IEEE)

Citation

Chandrasekaran, Venkat, Pablo A. Parrilo, and Alan S. Willsky. “Latent Variable Graphical Model Selection via Convex Optimization.” 48th Annual Allerton Conference on Communication, Control, and Computing 2010 (Allerton). 1610–1613. © Copyright 2010 IEEE

Version: Final published version

ISBN

978-1-4244-8215-3