Abstract
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We derive a Bayesian search algorithm for learning the structure of
latent variable models. This is performed by searching for subsets of
the observed variables whose covariance matrix can be represented as a
sum of a matrix of low rank and a diagonal matrix of residuals. The
resulting search procedure is relatively efficient by using a
variational approximation. The model itself is a generalization of
factor analysis and its variations, where we do not constrain the
dependency structure among latents. The resulting models are often
simpler and give a better fit than models where latents are constrained,
e.g., to be independent.
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Pradeep Ravikumar Last modified: Thu Apr 21 23:32:54 EDT 2005