System identification: theory for the user
System identification: theory for the user
Graphical Models in Applied Multivariate Statistics
Graphical Models in Applied Multivariate Statistics
A Guide to the Literature on Learning Probabilistic Networks from Data
IEEE Transactions on Knowledge and Data Engineering
L2E estimation of mixture complexity for count data
Computational Statistics & Data Analysis
Decision making on the sole basis of statistical likelihood
Artificial Intelligence
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This paper compares three approaches to the problem of selecting among probability models to fit data: (1) use of statistical criteria such as Akaike's information criterion and Schwarz's "Bayesian information criterion," (2) maximization of the posterior probability of the model, and (3) maximization of an "effectiveness ratio" trading off accuracy and computational cost. The unifying characteristic of the approaches is that all can be viewed as maximizing a penalized likelihood function. The second approach with suitable prior distributions has been shown to reduce to the first. This paper shows that the third approach reduces to the second for a particular form of the effectiveness ratio, and illustrates all three approaches with the problem of selecting the number of components in a mixture of Gaussian distributions. Unlike the first two approaches, the third can be used even when the candidate models are chosen for computational efficiency, without regard to physical interpretation, so that the likelihoods and the prior distribution over models cannot be interpreted literally. As the most general and computationally oriented of the approaches, it is especially useful for artificial intelligence applications.