Open AccessBayesian Regularization for Normal Mixture Estimation and Model-Based Clustering
Author(s) -
Chris Fraley,
Adrian E. Raftery
Publication year - 2007
Publication title -
journal of classification
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.657
H-Index - 40
eISSN - 1432-1343
pISSN - 0176-4268
DOI - 10.1007/s00357-007-0004-5
Subject(s) - maximum a posteriori estimation , mathematics , cluster analysis , maximum likelihood , bayesian information criterion , estimator , mixture model , gravitational singularity , expectation–maximization algorithm , bayesian probability , regularization (linguistics) , conjugate prior , estimation theory , a priori and a posteriori , algorithm , bayes estimator , statistics , computer science , bayes' theorem , artificial intelligence , mathematical analysis , philosophy , epistemology
Normal mixture models are widely used for statistical modeling of data, including cluster analysis.However maximum likelihood estimation (MLE) for normal mixtures using the EM algorithm may fail as the result of singularities or degeneracies. To avoid this, we propose replacing the MLE by a maximum a posteriori (MAP) estimator, also found by the EM algorithm. For choosing the number of components and the model parameterization, we propose a modified version of BIC, where the likelihood is evaluated at the MAP instead of the MLE. We use a highly dispersed proper conjugate prior, containing a small fraction of one observation's worth of information. The resulting method avoids degeneracies and singularities, but when these are not present it gives similar results to the standard method using MLE, EM and BIC.
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